CFR /  Title 31  /  Part 356  /  Sec. 356.35 Who approved the information collections?

The Office of Management and Budget approved the collections of information contained in Sec. Sec. 356.11, 356.12, 356.13, 356.14, and 356.15 and in appendix A of this part under control number 1535-0112.

Sec. Appendix A to Part 356--Bidder Categories

I. Categories of Eligible Bidders

We describe below various categories of bidders eligible to bid in Treasury auctions. You may use them to determine whether we consider you and other persons or entities to be one bidder or more than one bidder for auction bidding and compliance purposes. For example, we use these definitions to apply the competitive and noncompetitive award limitations and for other requirements. Notwithstanding these definitions, we consider any persons or entities that intentionally act together with respect to bidding in a Treasury auction to collectively be one bidder. Even if an auction participant does not fall under any of the categories listed below, it is our intent that no auction participant receives a larger auction award by acquiring securities through others than it could have received had it been considered one of these types of bidders.

(a) Corporation--We consider a corporation to be one bidder. A corporation includes all of its affiliates, which may be persons, partnerships, or other entities. We consider a business trust, such as a Massachusetts or Delaware business trust, to be a corporation. We use the term ``corporate structure'' to refer to the collection of affiliates that we consider collectively to be one bidder. An affiliate is any:

Entity that is more than 50-percent owned, directly or indirectly, by the corporation;

Entity that is more than 50-percent owned, directly or indirectly, by any other affiliate of the corporation;

Person or entity that owns, directly or indirectly, more than 50 percent of the corporation;

Person or entity that owns, directly or indirectly, more than 50 percent of any other affiliate of the corporation; or

Entity, a majority of whose board of directors or a majority of whose general partners are directors or officers of the corporation, or of any affiliate of the corporation.

An entity that is more than 50-percent owned as described in this definition is not an affiliate, however, if:

The purpose of such ownership is to seek a return on investment and not to engage in the business of the entity;

The owner does not routinely exercise operational or management control over the entity;

The owner does not exercise any control over investment decisions of the entity regarding U.S. Treasury securities;

The corporation has written policies or procedures, including ongoing compliance monitoring processes, that are designed to prevent it from acting together with the entity regarding participation in Treasury auctions or investment strategies regarding Treasury securities being auctioned; and

The corporation submits notice and certification to us, as provided in this appendix A.

A corporation that plans to make use of this exception to the definition of ``affiliate'' must inform us of this fact in writing and provide the following certification:

[Name of corporation] hereby certifies that, with regard to any entity of which it owns more than 50 percent as defined in appendix A to 31 CFR part 356, but for which the purpose of such ownership is to seek a return on investment and not to engage in the business of the entity:

We do not routinely exercise operational or management control over the entity;

We do not exercise any control over investment decisions of the entity regarding U.S. Treasury securities;

We have written policies or procedures, including ongoing compliance monitoring processes, that are designed to prevent the corporation from acting together with the entity regarding participation in Treasury auctions or investment strategies regarding Treasury securities being auctioned; and

We will continue to meet the terms of this certification until we notify the Treasury of a change.

(b) Partnership--We consider a partnership to be one bidder if it is a partnership for which the Internal Revenue Service has assigned a tax-identification number. A partnership includes all of its affiliates, which may be persons, corporations, general partners acting on behalf of the partnership, or other entities. We use the term ``partnership structure'' to refer to the collection of affiliates that we consider collectively to be one bidder. We may consider a partnership structure that contains one or more corporations as a ``partnership'' or a ``corporation,'' but not both.

An affiliate is any:

Entity that is more than 50-percent owned, directly or indirectly, by the partnership;

Entity that is more than 50-percent owned, directly or indirectly, by any other affiliate of the partnership;

Person or entity that owns, directly or indirectly, more than 50 percent of the partnership;

Person or entity that owns, directly or indirectly, more than 50 percent of any other affiliate of the partnership; or

Entity, a majority of whose general partners or a majority of whose board of directors are general partners or directors of the partnership or of any affiliate of the partnership.

An entity that is more than 50-percent owned as described in this definition is not an affiliate, however, if:

The purpose of such ownership is to seek a return on investment and not to engage in the business of the entity;

The owner does not routinely exercise operational or management control over the entity;

The owner does not exercise any control over investment decisions of the entity regarding U.S. Treasury securities;

The partnership has written policies or procedures, including ongoing compliance monitoring processes, that are designed to prevent it from acting together with the entity regarding participation in Treasury auctions or investment strategies regarding Treasury securities being auctioned; and

The partnership submits notice and certification to us, as provided in this appendix A.

A partnership that plans to make use of this exception to the definition of ``affiliate'' must inform us of this fact in writing and provide the following certification:

[Name of partnership] hereby certifies that, with regard to any entity of which it owns more than 50 percent as defined in appendix A to 31 CFR part 356, but for which the purpose of such ownership is to seek a return on investment and not to engage in the business of the entity:

We do not routinely exercise operational or management control over the entity;

We do not exercise any control over investment decisions of the entity regarding U.S. Treasury securities;

We have written policies or procedures, including ongoing compliance monitoring processes, that are designed to prevent the partnership from acting together with the entity regarding participation in Treasury auctions or investment strategies regarding Treasury securities being auctioned; and

We will continue to meet the terms of this certification until we notify the Treasury of a change.

(c) Government-related entity--We consider each of the following entities to be one bidder:

(1) A state government or the government of the District of Columbia

(2) A unit of local government, including any county, city, municipality, or township, or other unit of general government as defined by the Bureau of the Census for statistical purposes.

(3) A commonwealth, territory, or possession of the United States.

(4) A governmental entity, body, or corporation established under Federal, State, or local law.

(5) A foreign central bank, the government of a foreign state, or an international organization in which the United States holds membership. This type of entity applies only when such entity is not using an account at the Federal Reserve Bank of New York (See paragraph (f).).

We generally consider an investment, reserve, or other fund of one of the above government-related entities as part of that entity and not a separate bidder. We will consider a government-related entity's fund to be a separate bidder if it meets the definition of the ``trust or other fiduciary estate'' category, or if applicable law requires that the investments of such fund be made separately.

(d) Trust or other fiduciary estate--We consider a legal entity created under a valid trust instrument, court order, or other legal authority that designates a trustee or fiduciary to act for the benefit of a named beneficiary to be one bidder. The following conditions must also be met for us to consider a trust entity to be one bidder:

The legal entity must be able to be identified by:

1. The name or title of the trustee or fiduciary;

2. Specific reference to the trust instrument, court order, or legal authority under which the trustee or fiduciary is acting; and

3. The unique IRS-assigned employer identification number (not social security number) for the entity.

The trustee or fiduciary must make the decisions on participating in auctions on behalf of the trust or fiduciary estate.

(e) Individual--We consider a person to be one bidder, regardless of whether he or she is acting as an individual, a sole proprietor, or for any entity not otherwise defined as a bidder. If a person meets the definition of an affiliate within a corporate or partnership structure, we will consider him or her to be a bidder in this ``individual'' category if the corporation or partnership is not bidding in the same auction. We do not consider a person acting in an official capacity as an employee or other representative of a bidder defined in any other category to be an ``individual'' bidder. We consider a person, his or her spouse, and any children under the age of 21 having a common household to be one ``individual'' bidder.

(f) Foreign and International Monetary Authority (``FIMA'')--We consider one or more parties making up a foreign or international monetary organization that is not private in nature to be a bidder called a FIMA entity if at least one of the parties is a foreign or international entity that is (i) financial in nature, or (ii) not financial in nature but is authorized to open an account at the Federal Reserve Bank of New York. We consider each of the following entities to be a single FIMA entity:

(1) A foreign central bank or regional central bank.

(2) A foreign governmental monetary or finance entity.

(3) A non-governmental international financial organization that is not private in nature (for example, the International Monetary Fund, the World Bank, the Inter-American Development Bank, and the Asian Development Bank).

(4) A non-financial international organization that the United States participates in (for example, the United Nations).

(5) A multi-party arrangement of a governmental ministry and/or a foreign central bank or monetary authority with a United States Government Department and/or the Federal Reserve Bank of New York.

(6) A foreign or international monetary entity or an entity authorized by statute or by us to open accounts at the Federal Reserve Bank of New York.

(g) Other Bidder--We do not consider a bidder defined by any of the above categories to be a bidder in this category. For purposes of this definition, ``other bidder'' means an institution or organization with a unique IRS-assigned employer identification number. This definition includes such entities as an association, church, university, union, or club. This category does not include any person or entity acting in a fiduciary or investment management capacity, a sole proprietorship, an investment account, an investment fund, a form of registration, or investment ownership designation.

II. How To Obtain Separate Bidder Recognition

Under certain circumstances, we may recognize a major organizational component (e.g., the parent or a subsidiary) in a corporate or partnership structure as a bidder separate from the larger corporate or partnership structure. We also may recognize two or more major organizational components collectively as one bidder. All of the following criteria must be met for such component(s) to qualify for recognition as a separate bidder:

(a) Such component(s) must be prohibited by law or regulation from exchanging, or must have established written internal procedures designed to prevent the exchange of, information related to bidding in Treasury auctions with any other component in the corporate or partnership structure;

(b) Such component(s) must not be created for the purpose of circumventing our bidding and award limitations;

(c) Decisions related to purchasing Treasury securities at auction and participation in specific auctions must be made by employees of such component(s). Employees of such component(s) that make decisions to purchase or dispose of Treasury securities must not perform the same function for other components within the corporate or partnership structure; and

(d) The records of such component(s) related to the bidding for, acquisition of, and disposition of Treasury securities must be maintained by such component(s). Those records must be identifiable--separate and apart from similar records for other components within the corporate or partnership structure. To obtain recognition as a separate bidder, each component or group of components must request such recognition from us, provide a description of the component or group and its position within the corporate or partnership structure, and provide the following certification:

[Name of the bidder] hereby certifies that to the best of its knowledge and belief it meets the criteria for a separate bidder as described in appendix A to 31 CFR part 356. The above-named bidder also certifies that it has established written policies or procedures, including ongoing compliance monitoring processes, that are designed to prevent the component or group of components from:

(1) Exchanging any of the following information with any other part of the corporate [partnership] structure: (a) Yields, discount rates, or discount margins at which it plans to bid; (b) amounts of securities for which it plans to bid; (c) positions that it holds or plans to acquire in a security being auctioned; and (d) investment strategies that it plans to follow regarding the security being auctioned, or

(2) In any way intentionally acting together with any other part of the corporate [partnership] structure with respect to formulating or entering bids in a Treasury auction.

The above-named bidder agrees that it will promptly notify the Department in writing when any of the information provided to obtain separate bidder status changes or when this certification is no longer valid. [69 FR 45202, July 28, 2004, as amended at 70 FR 29456, May 23, 2005; 78 FR 46430, July 31, 2013]

Sec. Appendix B to Part 356--Formulas and Tables I. Computation of Interest on Treasury Bonds and Notes.II. Formulas for Conversion of Non-indexed Security Yields to Equivalent Prices.III. Formulas for Conversion of Inflation-Protected Security Yields to Equivalent Prices.IV. Formulas for Conversion of Floating Rate Note Discount Margins to Equivalent PricesV. Computation of Adjusted Values and Payment Amounts for Stripped Inflation-Protected Interest Components.VI. Computation of Purchase Price, Discount Rate, and Investment Rate (Coupon-Equivalent Yield) for Treasury Bills.

The examples in this appendix are given for illustrative purposes only and are in no way a prediction of interest rates on any bills, notes, or bonds issued under this part. In some of the following examples, we use intermediate rounding for ease in following the calculations. In actual practice, we generally do not round prior to determining the final result.

If you use a multi-decimal calculator, we recommend setting your calculator to at least 13 decimals and then applying normal rounding procedures. This should be sufficient to obtain the same final results. However, in the case of any discrepancies, our determinations will be final.

I. Computation of Interest on Treasury Bonds and Notes

A. Treasury Non-indexed Securities

1. Regular Half-Year Payment Period. We pay interest on marketable Treasury non-indexed securities on a semiannual basis. The regular interest payment period is a full half-year of six calendar months. Examples of half-year periods are: (1) February 15 to August 15, (2) May 31 to November 30, and (3) February 29 to August 31 (in a leap year). Calculation of an interest payment for a non-indexed note with a par amount of $1,000 and an interest rate of 8% is made in this manner: ($1,000 x .08)/2 = $40. Specifically, a semiannual interest payment represents one half of one year's interest, and is computed on this basis regardless of the actual number of days in the half-year.

2. Daily Interest Decimal. We compute a daily interest decimal in cases where an interest payment period for a non-indexed security is shorter or longer than six months or where accrued interest is payable by an investor. We base the daily interest decimal on the actual number of calendar days in the half-year or half-years involved. The number of days in any half-year period is shown in Table 1.

Table 1----------------------------------------------------------------------------------------------------------------

Beginning and ending days are Beginning and ending days are

1st or 15th of the months the last days of the months

listed under interest period listed under interest period

Interest period (number of days) (number of days)

---------------------------------------------------------------

Regular year Leap year Regular year Leap year----------------------------------------------------------------------------------------------------------------January to July................................. 181 182 181 182February to August.............................. 181 182 184 184March to September.............................. 184 184 183 183April to October................................ 183 183 184 184May to November................................. 184 184 183 183June to December................................ 183 183 184 184July to January................................. 184 184 184 184August to February.............................. 184 184 181 182September to March.............................. 181 182 182 183October to April................................ 182 183 181 182November to May................................. 181 182 182 183December to June................................ 182 183 181 182----------------------------------------------------------------------------------------------------------------

Table 2 below shows the daily interest decimals covering interest from \1/8\% to 20% on $1,000 for one day in increments of \1/8\ of one percent. These decimals represent \1/181\, \1/182\, \1/183\, or \1/184\ of a full semiannual interest payment, depending on which half-year is applicable.

Table 2

[Decimal for one day's interest on $1,000 at various rates of interest, payable semiannually or on a semiannual

basis, in regular years of 365 days and in years of 366 days (to determine applicable number of days, see table

1.)]----------------------------------------------------------------------------------------------------------------

Half-year of Half-year of Half-year of Half-year of

Rate per annum (percent) 184 days 183 days 182 days 181 days----------------------------------------------------------------------------------------------------------------\1/8\................................................... 0.003396739 0.003415301 0.003434066 0.003453039\1/4\................................................... 0.006793478 0.006830601 0.006868132 0.006906077\3/8\................................................... 0.010190217 0.010245902 0.010302198 0.010359116\1/2\................................................... 0.013586957 0.013661202 0.013736264 0.013812155\5/8\................................................... 0.016983696 0.017076503 0.017170330 0.017265193\3/4\................................................... 0.020380435 0.020491803 0.020604396 0.020718232\7/8\................................................... 0.023777174 0.023907104 0.024038462 0.0241712711....................................................... 0.027173913 0.027322404 0.027472527 0.0276243091\1/8\.................................................. 0.030570652 0.030737705 0.030906593 0.0310773481\1/4\.................................................. 0.033967391 0.034153005 0.034340659 0.0345303871\3/8\.................................................. 0.037364130 0.037568306 0.037774725 0.0379834251\1/2\.................................................. 0.040760870 0.040983607 0.041208791 0.0414364641\5/8\.................................................. 0.044157609 0.044398907 0.044642857 0.0448895031\3/4\.................................................. 0.047554348 0.047814208 0.048076923 0.0483425411\7/8\.................................................. 0.050951087 0.051229508 0.051510989 0.0517955802....................................................... 0.054347826 0.054644809 0.054945055 0.0552486192\1/8\.................................................. 0.057744565 0.058060109 0.058379121 0.0587016572\1/4\.................................................. 0.061141304 0.061475410 0.061813187 0.0621546962\3/8\.................................................. 0.064538043 0.064890710 0.065247253 0.0656077352\1/2\.................................................. 0.067934783 0.068306011 0.068681319 0.0690607732\5/8\.................................................. 0.071331522 0.071721311 0.072115385 0.0725138122\3/4\.................................................. 0.074728261 0.075136612 0.075549451 0.0759668512\7/8\.................................................. 0.078125000 0.078551913 0.078983516 0.0794198903....................................................... 0.081521739 0.081967213 0.082417582 0.0828729283\1/8\.................................................. 0.084918478 0.085382514 0.085851648 0.0863259673\1/4\.................................................. 0.088315217 0.088797814 0.089285714 0.0897790063\3/8\.................................................. 0.091711957 0.092213115 0.092719780 0.0932320443\1/2\.................................................. 0.095108696 0.095628415 0.096153846 0.0966850833\5/8\.................................................. 0.098505435 0.099043716 0.099587912 0.1001381223\3/4\.................................................. 0.101902174 0.102459016 0.103021978 0.1035911603\7/8\.................................................. 0.105298913 0.105874317 0.106456044 0.1070441994....................................................... 0.108695652 0.109289617 0.109890110 0.1104972384\1/8\.................................................. 0.112092391 0.112704918 0.113324176 0.1139502764\1/4\.................................................. 0.115489130 0.116120219 0.116758242 0.1174033154\3/8\.................................................. 0.118885870 0.119535519 0.120192308 0.1208563544\1/2\.................................................. 0.122282609 0.122950820 0.123626374 0.1243093924\5/8\.................................................. 0.125679348 0.126366120 0.127060440 0.1277624314\3/4\.................................................. 0.129076087 0.129781421 0.130494505 0.1312154704\7/8\.................................................. 0.132472826 0.133196721 0.133928571 0.1346685085....................................................... 0.135869565 0.136612022 0.137362637 0.1381215475\1/8\.................................................. 0.139266304 0.140027322 0.140796703 0.1415745865\1/4\.................................................. 0.142663043 0.143442623 0.144230769 0.1450276245\3/8\.................................................. 0.146059783 0.146857923 0.147664835 0.1484806635\1/2\.................................................. 0.149456522 0.150273224 0.151098901 0.1519337025\5/8\.................................................. 0.152853261 0.153688525 0.154532967 0.1553867405\3/4\.................................................. 0.156250000 0.157103825 0.157967033 0.1588397795\7/8\.................................................. 0.159646739 0.160519126 0.161401099 0.1622928186....................................................... 0.163043478 0.163934426 0.164835165 0.1657458566\1/8\.................................................. 0.166440217 0.167349727 0.168269231 0.1691988956\1/4\.................................................. 0.169836957 0.170765027 0.171703297 0.1726519346\3/8\.................................................. 0.173233696 0.174180328 0.175137363 0.1761049726\1/2\.................................................. 0.176630435 0.177595628 0.178571429 0.1795580116\5/8\.................................................. 0.180027174 0.181010929 0.182005495 0.1830110506\3/4\.................................................. 0.183423913 0.184426230 0.185439560 0.1864640886\7/8\.................................................. 0.186820652 0.187841530 0.188873626 0.1899171277....................................................... 0.190217391 0.191256831 0.192307692 0.1933701667\1/8\.................................................. 0.193614130 0.194672131 0.195741758 0.1968232047\1/4\.................................................. 0.197010870 0.198087432 0.199175824 0.2002762437\3/8\.................................................. 0.200407609 0.201502732 0.202609890 0.2037292827\1/2\.................................................. 0.203804348 0.204918033 0.206043956 0.2071823207\5/8\.................................................. 0.207201087 0.208333333 0.209478022 0.2106353597\3/4\.................................................. 0.210597826 0.211748634 0.212912088 0.2140883987\7/8\.................................................. 0.213994565 0.215163934 0.216346154 0.2175414368....................................................... 0.217391304 0.218579235 0.219780220 0.2209944758\1/8\.................................................. 0.220788043 0.221994536 0.223214286 0.2244475148\1/4\.................................................. 0.224184783 0.225409836 0.226648352 0.2279005528\3/8\.................................................. 0.227581522 0.228825137 0.230082418 0.2313535918\1/2\.................................................. 0.230978261 0.232240437 0.233516484 0.2348066308\5/8\.................................................. 0.234375000 0.235655738 0.236950549 0.238259669

8\3/4\.................................................. 0.237771739 0.239071038 0.240384615 0.2417127078\7/8\.................................................. 0.241168478 0.242486339 0.243818681 0.2451657469....................................................... 0.244565217 0.245901639 0.247252747 0.2486187859\1/8\.................................................. 0.247961957 0.249316940 0.250686813 0.2520718239\1/4\.................................................. 0.251358696 0.252732240 0.254120879 0.2555248629\3/8\.................................................. 0.254755435 0.256147541 0.257554945 0.2589779019\1/2\.................................................. 0.258152174 0.259562842 0.260989011 0.2624309399\5/8\.................................................. 0.261548913 0.262978142 0.264423077 0.2658839789\3/4\.................................................. 0.264945652 0.266393443 0.267857143 0.2693370179\7/8\.................................................. 0.268342391 0.269808743 0.271291209 0.27279005510...................................................... 0.271739130 0.273224044 0.274725275 0.27624309410\1/8\................................................. 0.275135870 0.276639344 0.278159341 0.27969613310\1/4\................................................. 0.278532609 0.280054645 0.281593407 0.28314917110\3/8\................................................. 0.281929348 0.283469945 0.285027473 0.28660221010\1/2\................................................. 0.285326087 0.286885246 0.288461538 0.29005524910\5/8\................................................. 0.288722826 0.290300546 0.291895604 0.29350828710\3/4\................................................. 0.292119565 0.293715847 0.295329670 0.29696132610\7/8\................................................. 0.295516304 0.297131148 0.298763736 0.30041436511...................................................... 0.298913043 0.300546448 0.302197802 0.30386740311\1/8\................................................. 0.302309783 0.303961749 0.305631868 0.30732044211\1/4\................................................. 0.305706522 0.307377049 0.309065934 0.31077348111\3/8\................................................. 0.309103261 0.310792350 0.312500000 0.31422651911\1/2\................................................. 0.312500000 0.314207650 0.315934066 0.31767955811\5/8\................................................. 0.315896739 0.317622951 0.319368132 0.32113259711\3/4\................................................. 0.319293478 0.321038251 0.322802198 0.32458563511\7/8\................................................. 0.322690217 0.324453552 0.326236264 0.32803867412...................................................... 0.326086957 0.327868852 0.329670330 0.33149171312\1/8\................................................. 0.329483696 0.331284153 0.333104396 0.33494475112\1/4\................................................. 0.332880435 0.334699454 0.336538462 0.33839779012\3/8\................................................. 0.336277174 0.338114754 0.339972527 0.34185082912\1/2\................................................. 0.339673913 0.341530055 0.343406593 0.34530386712\5/8\................................................. 0.343070652 0.344945355 0.346840659 0.34875690612\3/4\................................................. 0.346467391 0.348360656 0.350274725 0.35220994512\7/8\................................................. 0.349864130 0.351775956 0.353708791 0.35566298313...................................................... 0.353260870 0.355191257 0.357142857 0.35911602213\1/8\................................................. 0.356657609 0.358606557 0.360576923 0.36256906113\1/4\................................................. 0.360054348 0.362021858 0.364010989 0.36602209913\3/8\................................................. 0.363451087 0.365437158 0.367445055 0.36947513813\1/2\................................................. 0.366847826 0.368852459 0.370879121 0.37292817713\5/8\................................................. 0.370244565 0.372267760 0.374313187 0.37638121513\3/4\................................................. 0.373641304 0.375683060 0.377747253 0.37983425413\7/8\................................................. 0.377038043 0.379098361 0.381181319 0.38328729314...................................................... 0.380434783 0.382513661 0.384615385 0.38674033114\1/8\................................................. 0.383831522 0.385928962 0.388049451 0.39019337014\1/4\................................................. 0.387228261 0.389344262 0.391483516 0.39364640914\3/8\................................................. 0.390625000 0.392759563 0.394917582 0.39709944814\1/2\................................................. 0.394021739 0.396174863 0.398351648 0.40055248614\5/8\................................................. 0.397418478 0.399590164 0.401785714 0.40400552514\3/4\................................................. 0.400815217 0.403005464 0.405219780 0.40745856414\7/8\................................................. 0.404211957 0.406420765 0.408653846 0.41091160215...................................................... 0.407608696 0.409836066 0.412087912 0.41436464115\1/8\................................................. 0.411005435 0.413251366 0.415521978 0.41781768015\1/4\................................................. 0.414402174 0.416666667 0.418956044 0.42127071815\3/8\................................................. 0.417798913 0.420081967 0.422390110 0.42472375715\1/2\................................................. 0.421195652 0.423497268 0.425824176 0.42817679615\5/8\................................................. 0.424592391 0.426912568 0.429258242 0.43162983415\3/4\................................................. 0.427989130 0.430327869 0.432692308 0.43508287315\7/8\................................................. 0.431385870 0.433743169 0.436126374 0.43853591216...................................................... 0.434782609 0.437158470 0.439560440 0.44198895016\1/8\................................................. 0.438179348 0.440573770 0.442994505 0.44544198916\1/4\................................................. 0.441576087 0.443989071 0.446428571 0.44889502816\3/8\................................................. 0.444972826 0.447404372 0.449862637 0.45234806616\1/2\................................................. 0.448369565 0.450819672 0.453296703 0.45580110516\5/8\................................................. 0.451766304 0.454234973 0.456730769 0.45925414416\3/4\................................................. 0.455163043 0.457650273 0.460164835 0.46270718216\7/8\................................................. 0.458559783 0.461065574 0.463598901 0.46616022117...................................................... 0.461956522 0.464480874 0.467032967 0.46961326017\1/8\................................................. 0.465353261 0.467896175 0.470467033 0.47306629817\1/4\................................................. 0.468750000 0.471311475 0.473901099 0.476519337

17\3/8\................................................. 0.472146739 0.474726776 0.477335165 0.47997237617\1/2\................................................. 0.475543478 0.478142077 0.480769231 0.48342541417\5/8\................................................. 0.478940217 0.481557377 0.484203297 0.48687845317\3/4\................................................. 0.482336957 0.484972678 0.487637363 0.49033149217\7/8\................................................. 0.485733696 0.488387978 0.491071429 0.49378453018...................................................... 0.489130435 0.491803279 0.494505495 0.49723756918\1/8\................................................. 0.492527174 0.495218579 0.497939560 0.50069060818\1/4\................................................. 0.495923913 0.498633880 0.501373626 0.50414364618\3/8\................................................. 0.499320652 0.502049180 0.504807692 0.50759668518\1/2\................................................. 0.502717391 0.505464481 0.508241758 0.51104972418\5/8\................................................. 0.506114130 0.508879781 0.511675824 0.51450276218\3/4\................................................. 0.509510870 0.512295082 0.515109890 0.51795580118\7/8\................................................. 0.512907609 0.515710383 0.518543956 0.52140884019...................................................... 0.516304348 0.519125683 0.521978022 0.52486187819\1/8\................................................. 0.519701087 0.522540984 0.525412088 0.52831491719\1/4\................................................. 0.523097826 0.525956284 0.528846154 0.53176795619\3/8\................................................. 0.526494565 0.529371585 0.532280220 0.53522099419\1/2\................................................. 0.529891304 0.532786885 0.535714286 0.53867403319\5/8\................................................. 0.533288043 0.536202186 0.539148352 0.54212707219\3/4\................................................. 0.536684783 0.539617486 0.542582418 0.54558011019\7/8\................................................. 0.540081522 0.543032787 0.546016484 0.54903314920...................................................... 0.543478261 0.546448087 0.549450549 0.552486188----------------------------------------------------------------------------------------------------------------

3. Short First Payment Period. In cases where the first interest payment period for a Treasury non-indexed security covers less than a full half-year period (a ``short coupon''), we multiply the daily interest decimal by the number of days from, but not including, the issue date to, and including, the first interest payment date. This calculation results in the amount of the interest payable per $1,000 par amount. In cases where the par amount of securities is a multiple of $1,000, we multiply the appropriate multiple by the unrounded interest payment amount per $1,000 par amount.

Example

A 2-year note paying 8\3/8\% interest was issued on July 2, 1990, with the first interest payment on December 31, 1990. The number of days in the full half-year period of June 30 to December 31, 1990, was 184 (See Table 1.). The number of days for which interest actually accrued was 182 (not including July 2, but including December 31). The daily interest decimal, $0.227581522 (See Table 2, line for 8\3/8\%, under the column for half-year of 184 days.), was multiplied by 182, resulting in a payment of $41.419837004 per $1,000. For $20,000 of these notes, $41.419837004 would be multiplied by 20, resulting in a payment of $828.39674008 ($828.40).

4. Long First Payment Period. In cases where the first interest payment period for a bond or note covers more than a full half-year period (a ``long coupon''), we multiply the daily interest decimal by the number of days from, but not including, the issue date to, and including, the last day of the fractional period that ends one full half-year before the interest payment date. We add that amount to the regular interest amount for the full half-year ending on the first interest payment date, resulting in the amount of interest payable for $1,000 par amount. In cases where the par amount of securities is a multiple of $1,000, the appropriate multiple should be applied to the unrounded interest payment amount per $1,000 par amount.

Example

A 5-year 2-month note paying 7\7/8\% interest was issued on December 3, 1990, with the first interest payment due on August 15, 1991. Interest for the regular half-year portion of the payment was computed to be $39.375 per $1,000 par amount. The fractional portion of the payment, from December 3 to February 15, fell in a 184-day half-year (August 15, 1990, to February 15, 1991). Accordingly, the daily interest decimal for 7\7/8\% was $0.213994565. This decimal, multiplied by 74 (the number of days from but not including December 3, 1990, to and including February 15), resulted in interest for the fractional portion of $15.835597810. When added to $39.375 (the normal interest payment portion ending on August 15, 1991), this produced a first interest payment of $55.210597810, or $55.21 per $1,000 par amount. For $7,000 par amount of these notes, $55.210597810 would be multiplied by 7, resulting in an interest payment of $386.474184670 ($386.47).

B. Treasury Inflation-Protected Securities

1. Indexing Process. We pay interest on marketable Treasury inflation-protected securities on a semiannual basis. We issue inflation-protected securities with a stated rate of interest that remains constant until maturity. Interest payments are based on the security's inflation-adjusted principal at the time we pay interest. We make this adjustment by multiplying the par amount of the security by the applicable Index Ratio.

2. Index Ratio. The numerator of the Index Ratio, the Ref CPIDate, is the index number applicable for a specific day. The denominator of the Index Ratio is the Ref CPI applicable for the original issue date. However, when the dated date is different from the original issue date, the denominator is the Ref CPI applicable for the dated date. The formula for calculating the Index Ratio is:[GRAPHIC] [TIFF OMITTED] TR28JY04.000 Where Date = valuation date

3. Reference CPI. The Ref CPI for the first day of any calendar month is the CPI for the third preceding calendar month. For example, the Ref CPI applicable to April 1 in any year is the CPI for January, which is reported in February. We determine the Ref CPI for any other day of a month by a linear interpolation between the Ref CPI applicable to the first day of the month in which the day falls (in the example, January) and the Ref CPI applicable to the first day of the next month (in the example, February). For interpolation purposes, we truncate calculations with regard to the Ref CPI and the Index Ratio for a specific date to six decimal places, and round to five decimal places.

Therefore the Ref CPI and the Index Ratio for a particular date will be expressed to five decimal places.

(i) The formula for the Ref CPI for a specific date is:

[GRAPHIC] [TIFF OMITTED] TR28JY04.001

Where Date = valuation date D = the number of days in the month in which Date fallst = the calendar day corresponding to DateCPIM = CPI reported for the calendar month M by the Bureau of Labor StatisticsRef CPIM = Ref CPI for the first day of the calendar month in which Date falls, e.g., Ref CPIApril1 is the CPIJanuaryRef CPIM+1 = Ref CPI for the first day of the calendar month immediately following Date

(ii) For example, the Ref CPI for April 15, 1996 is calculated as follows:[GRAPHIC] [TIFF OMITTED] TR28JY04.002 where D = 30, t = 15Ref CPIApril 1, 1996 = 154.40, the non-seasonally adjusted CPI-U for January 1996. Ref CPIMay 1, 1996 = 154.90, the non-seasonally adjusted CPI-U for February 1996.

(iii) Putting these values in the equation in paragraph (ii) above:

[GRAPHIC] [TIFF OMITTED] TR28JY04.003

This value truncated to six decimals is 154.633333; rounded to five decimals it is 154.63333.

(iv) To calculate the Index Ratio for April 16, 1996, for an inflation-protected security issued on April 15, 1996, the Ref CPIApril 16, 1996 must first be calculated. Using the same values in the equation above except that t=16, the Ref CPIApril 16, 1996 is 154.65000.

The Index Ratio for April 16, 1996 is: Index RatioApril 16, 1996 = 154.65000/154.63333 = 1.000107803.

This value truncated to six decimals is 1.000107; rounded to five decimals it is 1.00011.

4. Index Contingencies.

(i) If a previously reported CPI is revised, we will continue to use the previously reported (unrevised) CPI in calculating the principal value and interest payments.

If the CPI is rebased to a different year, we will continue to use the CPI based on the base reference period in effect when the security was first issued, as long as that CPI continues to be published.

(ii) We will replace the CPI with an appropriate alternative index if, while an inflation-protected security is outstanding, the applicable CPI is:

Discontinued,

In the judgment of the Secretary, fundamentally altered in a manner materially adverse to the interests of an investor in the security, or

In the judgment of the Secretary, altered by legislation or Executive Order in a manner materially adverse to the interests of an investor in the security.

(iii) If we decide to substitute an alternative index we will consult with the Bureau of Labor Statistics or any successor agency. We will then notify the public of the substitute index and how we will apply it. Determinations of the Secretary in this regard will be final.

(iv) If the CPI for a particular month is not reported by the last day of the following month, we will announce an index number based on the last available twelve-month change in the CPI. We will base our calculations of our payment obligations that rely on that month's CPI on the index number we announce.

(a) For example, if the CPI for month M is not reported timely, the formula for calculating the index number to be used is:[GRAPHIC] [TIFF OMITTED] TR28JY04.004

(b) Generalizing for the last reported CPI issued N months prior to month M:[GRAPHIC] [TIFF OMITTED] TR28JY04.005

(c) If it is necessary to use these formulas to calculate an index number, we will use that number for all subsequent calculations that rely on the month's index number. We will not replace it with the actual CPI when it is reported, except for use in the above formulas. If it becomes necessary to use the above formulas to derive an index number, we will use the last CPI that has been reported to calculate CPI numbers for months for which the CPI has not been reported timely.

5. Computation of Interest for a Regular Half-Year Payment Period. Interest on marketable Treasury inflation-protected securities is payable on a semiannual basis. The regular interest payment period is a full half-year or six calendar months. Examples of half-year periods are January 15 to July 15, and April 15 to October 15. An interest payment will be a fixed percentage of the value of the inflation-adjusted principal, in current dollars, for the date on which it is paid. We will calculate interest payments by multiplying one-half of the specified annual interest rate for the inflation-protected securities by the inflation-adjusted principal for the interest payment date.

Specifically, we compute a semiannual interest payment on the basis of one-half of one year's interest regardless of the actual number of days in the half-year.

Example

A 10-year inflation-protected note paying 3\7/8%\ interest was issued on January 15, 1999, with the first interest payment on July 15, 1999. The Ref CPI on January 15, 1999 (Ref CPIIssueDate) was 164, and the Ref CPI on July 15, 1999 (Ref CPIDate) was 166.2. For a par amount of $100,000, the inflation-adjusted principal on July 15, 1999, was (166.2/164) x $100,000, or $101,341. This amount was multiplied by .03875/2, or .019375, resulting in a payment of $1,963.48.

C. Treasury Floating Rate Notes

1. Indexing and Interest Payment Process. We issue floating rate notes with a daily interest accrual feature. This means that the interest rate ``floats'' based on changes in the representative index rate. We pay interest on a quarterly basis. The index rate is the High Rate of the 13-week Treasury bill auction announced on the auction results press release that has been converted into a simple-interest money market yield computed on an actual/360 basis and rounded to nine decimal places. Interest payments are based on the floating rate note's variable interest rate from, and including, the dated date or last interest payment date to, but excluding, the next interest payment or maturity date. We make quarterly interest payments by accruing the daily interest amounts and adding those amounts together for the interest payment period.

2. Interest Rate. The interest rate on floating rate notes will be the spread plus the index rate (as it may be adjusted on the calendar day following each auction of 13-week bills).

3. Interest Accrual. In general, accrued interest for a particular calendar day in an accrual period is calculated by using the index rate from the most recent auction of 13-week bills that took place before the accrual day, plus the spread determined at the time of a new floating rate note auction, divided by 360, subject to a zero-percent minimum daily interest accrual rate. However, a 13-week bill auction that takes place in the two-business-day period prior to a settlement date or interest payment date will be excluded from the calculation of accrued interest for purposes of the settlement amount or interest payment. Any changes in the index rate that would otherwise have occurred during this two-business-day period will occur on the first calendar day following the end of the period.

4. Index Contingencies.

(i) If Treasury were to discontinue auctions of 13-week bills, the Secretary has authority to determine and announce a new index for outstanding floating rate notes.

(ii) If Treasury were to not conduct a 13-week bill auction in a particular week, then the interest rate in effect for the notes at the time of the last 13-week bill auction results announcement will remain in effect until such time, if any, as the results of a 13-week Treasury auction are again announced by Treasury. Treasury reserves the right to change the index rate for any newly issued floating rate note.

D. Accrued Interest

1. You will have to pay accrued interest on a Treasury bond or note when interest accrues prior to the issue date of the security. Because you receive a full interest payment despite having held the security for only a portion of the interest payment period, you must compensate us through the payment of accrued interest at settlement.

2. For a Treasury non-indexed security, if accrued interest covers a fractional portion of a full half-year period, the number of days in the full half-year period and the stated interest rate will determine the daily interest decimal to use in computing the accrued interest. We multiply the decimal by the number of days for which interest has accrued.

3. If a reopened bond or note has a long first interest payment period (a ``long coupon''), and the dated date for the reopened issue is less than six full months before the first interest payment, the accrued interest will fall into two separate half-year periods. A separate daily interest decimal must be multiplied by the respective number of days in each half-year period during which interest has accrued.

4. We round all accrued interest computations to five decimal places for a $1,000 par amount, using normal rounding procedures. We calculate accrued interest for a par amount of securities greater than $1,000 by applying the appropriate multiple to accrued interest payable for a $1,000 par amount, rounded to five decimal places. We calculate accrued interest for a par amount of securities less than $1,000 by applying the appropriate fraction to accrued interest payable for a $1,000 par amount, rounded to five decimal places.

5. For an inflation-protected security, we calculate accrued interest as shown in section III, paragraphs A and B of this appendix.

(1) Treasury Non-indexed Securities--(i) Involving One Half-Year: A note paying interest at a rate of 6\3/4%\, originally issued on May 15, 2000, as a 5-year note with a first interest payment date of November 15, 2000, was reopened as a 4-year 9-month note on August 15, 2000. Interest had accrued for 92 days, from May 15 to August 15. The regular interest period from May 15 to November 15, 2000, covered 184 days. Accordingly, the daily interest decimal, $0.183423913, multiplied by 92, resulted in accrued interest payable of $16.874999996, or $16.87500, for each $1,000 note purchased. If the notes have a par amount of $150,000, then 150 is multiplied by $16.87500, resulting in an amount payable of $2,531.25.

(i) Involving One Half-Year: A note paying interest at a rate of 6\3/4%\, originally issued on May 15, 2000, as a 5-year note with a first interest payment date of November 15, 2000, was reopened as a 4-year 9-month note on August 15, 2000. Interest had accrued for 92 days, from May 15 to August 15. The regular interest period from May 15 to November 15, 2000, covered 184 days. Accordingly, the daily interest decimal, $0.183423913, multiplied by 92, resulted in accrued interest payable of $16.874999996, or $16.87500, for each $1,000 note purchased. If the notes have a par amount of $150,000, then 150 is multiplied by $16.87500, resulting in an amount payable of $2,531.25.

(2) Involving Two Half-Years:

A 10\3/4%\ bond, originally issued on July 2, 1985, as a 20-year 1-month bond, with a first interest payment date of February 15, 1986, was reopened as a 19-year 10-month bond on November 4, 1985. Interest had accrued for 44 days, from July 2 to August 15, 1985, during a 181-day half-year (February 15 to August 15); and for 81 days, from August 15 to November 4, during a 184-day half-year (August 15, 1985, to February 15, 1986). Accordingly, $0.296961326 was multiplied by 44, and $0.292119565 was multiplied by 81, resulting in products of $13.066298344 and $23.661684765 which, added together, resulted in accrued interest payable of $36.727983109, or $36.72798, for each $1,000 bond purchased. If the bonds have a par amount of $11,000, then 11 is multiplied by $36.72798, resulting in an amount payable of $404.00778 ($404.01).

6. For a floating rate note, if accrued interest covers a portion of a full quarterly interest payment period, we calculate accrued interest as shown in section IV, paragraphs C and D of this appendix. II. Formulas for Conversion of Non-indexed Security Yields to Equivalent

Prices

Definitions P = price per 100 (dollars), rounded to six places, using normal rounding procedures.C = the regular annual interest per $100, payable semiannually, e.g., 6.125 (the decimal equivalent of a 6\1/8\% interest rate).i = nominal annual rate of return or yield to maturity, based on semiannual interest payments and expressed in decimals, e.g., .0719.n = number of full semiannual periods from the issue date to maturity, except that, if the issue date is a coupon frequency date, n will be one less than the number of full semiannual periods remaining to maturity. Coupon frequency dates are the two semiannual dates based on the maturity date of each note or bond issue. For example, a security maturing on November 15, 2015, would have coupon frequency dates of May 15 and November 15.r = (1) number of days from the issue date to the first interest payment (regular or short first payment period), or (2) number of days in fractional portion (or ``initial short period'') of long first payment period.s = (1) number of days in the full semiannual period ending on the first interest payment date (regular or short first payment period), or (2) number of days in the full semiannual period in which the fractional portion of a long first payment period falls, ending at the onset of the regular portion of the first interest payment. v\n\ = 1 / [1 + (i/2)] \n\ = present value of 1 due at the end of n periods.an = (1 - v\n\) / (i/2) = v + v\2\ + v\3\ + ... + v\n\ = present value of 1 per period for n periods

Special Case: If i = 0, then an[rceil] = n. Furthermore, when i = 0, an[rceil] cannot be calculated using the formula: (1 - v\n\)/(i/2). In the special case where i = 0, an[rceil] must be calculated as the summation of the individual present values (i.e., v + v\2\ + v\3\ + ... + v\n\). Using the summation method will always confirm that an[rceil] = n when i = 0. A = accrued interest.

A. For non-indexed securities with a regular first interest payment period: Formula: P[1 + (r/s)(i/2)] = (C/2)(r/s) + (C/2)an[rceil] + 100v\n\. Example:

(1) P[1 + .0442] = 4.375 + 91.2672164044 + 7.7940350840.(2) P[1.0442] = 103.4362514884.(3) P = 103.4362514884 / 1.0442.(4) P = 99.057893.

B. For non-indexed securities with a short first interest payment period: Formula: P[1 + (r/s)(i/2)] = (C/2)(r/s) + (C/2)an[rceil] + 100v\n\. Example:

(1) P[1 + .042480601] = 4.2035519126 + 11.7284111757 + 88.14740565.(2) P[1.042480601] = 104.0793687354.(3) P = 104.0793687354 / 1.042480601.(4) P = 99.838183.

C. For non-indexed securities with a long first interest payment period: Formula: P[1 + (r/s)(i/2)] = [(C/2)(r/s)]v + (C/2)an[rceil] + 100v\n\. Example:

(1) P[1 + .017672652] = 1.6890133062 + 34.0210179850 + 65.8589078339.(2) P[1.017672652] = 101.5689391251.(3) P = 101.5689391251 / 1.017672652. (4) P = 99.805118.

(1) For non-indexed securities reopened during a regular interest period where the purchase price includes predetermined accrued interest.

(2) For new non-indexed securities accruing interest from the coupon frequency date immediately preceding the issue date, with the interest rate established in the auction being used to determine the accrued interest payable on the issue date. Formula: (P + A)[1 + (r/s)(i/2)] = C/2 + (C/2)an[rceil] + 100v\n\.Where: A = [(s-r)/s](C/2). Example:

(1) (P + .367403)[1 + .044010497] = 4.75 + 58.4966583243 + 41.25703996.(2) (P + .367403)[1.044010497] = 104.5036982843.(3) (P + .367403) = 104.5036982843 / 1.044010497.(4) (P + .367403) = 100.098321.(5) P = 100.098321 -.367403.(6) P = 99.730918.

E. For non-indexed securities reopened during the regular portion of a long first payment period: Formula: (P+A)[1+ (r/s)(i/2)] = (r's'')(C/2) + C 2 + (C/2)an[rceil] + 100v\n\. Where: A = AI' + AI,AI' = (r'/s'')(C/2),AI = [(s-r) / s](C/2), and r = number of days from the reopening date to the first interest payment date,s = number of days in the semiannual period for the regular portion of the first interest payment period,r' = number of days in the fractional portion (or ``initial short period'') of the first interest payment period,s'' = number of days in the semiannual period ending with the commencement date of the regular portion of the first interest payment period. Example:

(1) (P + 3.672798)[1 + .02930462] = 1.3066298343 + 5.375 + 88.6392637512 + 13.6694798628.(2) (P + 3.672798)[1.02930462] = 108.9903734482.(3) (P + 3.672798) = 108.9903734482 / 1.02930462.(4) (P + 3.672798) = 105.887384.(5) P = 105.887384 -3.672798.(6) P = 102.214586.

F. For non-indexed securities reopened during a short first payment period: Formula: (P + A)[1 + (r/s)(i/2)] = (r'/s)(C/2) + (C/2)an[rceil] + 100v \n\. Where: A = [(r' - r)/s](C/2) and r' = number of days from the original issue date to the first interest payment date. Example:

(1) (P + 2.596467)[1 + .026325] = 5.2214673913 + 53.5300935520 + 46.31696332.(2) (P + 2.596467)[1.026325] = 105.0685242633.(3) (P + 2.596467) = 105.0685242633 / 1.026325.(4) (P + 2.596467) = 102.373541.(5) P = 102.373541 - 2.596467.(6) P = 99.777074.

G. For non-indexed securities reopened during the fractional portion (initial short period) of a long first payment period: Formula: (P + A)[1 + (r/s)(i/2)] = [(r'/s)(C/2)]v + (C/2)an[rceil] + 100v \n\. Where: A = [(r' - r)/s](C/2), andr = number of days from the reopening date to the end of the short period.r' = number of days in the short period.s = number of days in the semiannual period ending with the end of the short period. Example:

(1) (P + .825820)[1+ .00802459] = 1.549168216 + 43.4653701362 + 56.35631040.(2) (P + .825820)[1.00802459] = 101.3708487520.(3) (P + .825820) = 101.3708487520 / 1.00802459.(4) (P + .825820) = 100.563865.(5) P = 100.563865 -. 825820.(6) P = 99.738045.

III. Formulas for Conversion of Inflation-Indexed Security Yields to

Equivalent Prices

Definitions P = unadjusted or real price per 100 (dollars).Padj = inflation adjusted price; P x Index RatioDate.A = unadjusted accrued interest per $100 original principal.Aadj = inflation adjusted accrued interest; Ax Index RatioDate.SA = settlement amount including accrued interest in current dollars per $100 original principal; Padj + Aadj.r = days from settlement date to next coupon date.s = days in current semiannual period.i = real yield, expressed in decimals (e.g., 0.0325).C = real annual coupon, payable semiannually, in terms of real dollars paid on $100 initial, or real, principal of the security.n = number of full semiannual periods from issue date to maturity date, except that, if the issue date is a coupon frequency date, n will be one less than the number of full semiannual periods remaining until maturity. Coupon frequency dates are the two semiannual dates based on the maturity date of each note or bond issue. For example, a security maturing on July 15, 2026 would have coupon frequency dates of January 15 and July 15.v \n\ = 1/(1 + i/2)\n\ = present value of 1 due at the end of n periods.an[rceil] = (1 - v \n\) / (i/2) = v + v \2\ + v \3\ + \...\ + v \n\ = present value of 1 per period for n periods.

Special Case: If i = 0, then an[rceil] = n. Furthermore, when i = 0, an[rceil] cannot be calculated using the formula: (1 - v \n\)/(i/2). In the special case where i = 0, an[rceil] must be calculated as the summation of the individual present values (i.e., v + v \2\ + v \3\ + \...\ + v \n\). Using the summation method will always confirm that an[rceil] = n when i = 0. Date = valuation date.D = the number of days in the month in which Date falls.t = calendar day corresponding to Date.CPI = Consumer Price Index number.CPIM = CPI reported for the calendar month M by the Bureau of Labor Statistics.Ref CPIM = reference CPI for the first day of the calendar month in which Date falls (also equal to the CPI for the third preceding calendar month), e.g., Ref CPIApril 1 is the CPIJanuary.Ref CPIM+1 = reference CPI for the first day of the calendar month immediately following Date.Ref CPIDate = Ref CPIM - [(t - 1)/D][Ref CPIM+1-Ref CPIM].Index RatioDate = Ref CPIDate / Ref CPIIssueDate.

Note: When the Issue Date is different from the Dated Date, the denominator is the Ref CPIDatedDate.

A. For inflation-indexed securities with a regular first interest payment period:Formulas:[GRAPHIC] [TIFF OMITTED] TR02SE04.005 Padj = P x Index RatioDate.A = [(s-r)/s] x (C/2).Aadj = A x Index RatioDate.SA = Padj + AadjIndex RatioDate = Ref CPIDate/Ref CPIIssueDate. Example:

We issued a 10-year inflation-indexed note on January 15, 1999. The note was issued at a discount to yield of 3.898% (real). The note bears a 3\7/8\% real coupon, payable on July 15 and January 15 of each year. The base CPI index applicable to this note is 164. (We normally derive this number using the interpolative process described in appendix B, section I, paragraph B.) Definitions: C = 3.875.i = 0.03898.n = 19 (There are 20 full semiannual periods but n is reduced by 1 because the issue date is a coupon frequency date.).r = 181 (January 15, 1999 to July 15, 1999).s = 181 (January 15, 1999 to July 15, 1999).Ref CPIDate = 164.Ref CPIIssueDate = 164. Resolution: Index RatioDate = Ref CPIDate / Ref

CPIIssueDate = 164/164 = 1.A = [(181 - 181)/181] x 3.875/2 = 0.Aadj = 0 x 1 = 0.v\n\ = 1/(1 + i/2)\n\ = 1/(1 + .03898/2)\19\ = 0.692984572.an[rceil] = (1 - v\n\)/(i/2) = (1-0.692984572) / (.03898/2) =

15.752459107. Formula:[GRAPHIC] [TIFF OMITTED] TR02SE04.006 P = 99.811030.Padj = P x Index RatioDate.Padj = 99.811030 x 1 = 99.811030.SA = Padj x Aadj.SA = 99.811030 + 0 = 99.811030.

Note: For the real price (P), we have rounded to six places. These amounts are based on 100 par value.

(1) For inflation-indexed securities reopened during a regular interest period where the purchase price includes predetermined accrued interest.

(2) For new inflation-indexed securities accruing interest from the coupon frequency date immediately preceding the issue date, with the interest rate established in the auction being used to determine the accrued interest payable on the issue date.

Bidding: The dollar amount of each bid is in terms of the par amount. For example, if the Ref CPI applicable to the issue date of the note is 120, and the reference CPI applicable to the reopening issue date is 132, a bid of $10,000 will in effect be a bid of $10,000 x (132/120), or $11,000. Formulas:[GRAPHIC] [TIFF OMITTED] TR02SE04.007 Padj = P x Index RatioDate.A = [(s-r)/s] x (C/2).Aadj = A x Index RatioDate.SA = Padj + Aadj.Index RatioDate = Ref CPIDate/Ref

CPIIssueDate. Example:

We issued a 3\5/8\% 10-year inflation-indexed note on January 15, 1998, with interest payments on July 15 and January 15. For a reopening on October 15, 1998, with inflation compensation accruing from January 15, 1998 to October 15, 1998, and accrued interest accruing from July 15, 1998 to October 15, 1998 (92 days), solve for the price per 100 (P) at a real yield, as determined in the reopening auction, of 3.65%. The base index applicable to the issue date of this note is 161.55484 and the reference CPI applicable to October 15, 1998, is 163.29032. Definitions: C = 3.625.i = 0.0365.n = 18.r = 92 (October 15, 1998 to January 15, 1999).s = 184 (July 15, 1998 to January 15, 1999).Ref CPIDate = 163.29032.Ref CPIIssueDate = 161.55484. Resolution: Index RatioDate = Ref CPIDate/Ref

CPIIssueDate = 163.29032/161.55484 = 1.01074.v\n\ = 1/(1 + i/2)\n\ = 1/(1 + .0365/2)\18\ = 0.722138438.an[rceil] = (1-v\n\)/(i/2) = (1 - 0.722138438)/(.0365/2) =

15.225291068. Formula: [GRAPHIC] [TIFF OMITTED] TR02SE04.008 P = 100.703267 - 0.906250.P = 99.797017.Padj = P x Index RatioDate.Padj = 99.797017 x 1.01074 = 100.86883696.Padj = 100.868837.A = [(184-92)/184] x 3.625/2 = 0.906250.Aadj = A x Index RatioDate.Aadj = 0.906250 x 1.01074 = 0.91598313.Aadj = 0.915983.SA = Padj + Aadj = 100.868837 + 0.915983.SA = 101.784820.

Note: For the real price (P), and the inflation-adjusted price (Padj), we have rounded to six places. For accrued interest (A) and the adjusted accrued interest (Aadj), we have rounded to six places. These amounts are based on 100 par value.

IV. Formulas for Conversion of Floating Rate Note Discount Margins to

Equivalent Prices

Definitions for Newly Issued Floating Rate Notes P = the price per $100 par value.T0 = the issue date.N = the total number of quarterly interest payments.i and k = indexes that identify the sequence of interest payment dates.Ti = the ith quarterly interest payment date.Ti - Ti-1 = the number of days between the

interest payment date Ti and the preceding interest

payment date.TN = the maturity date.r = the index rate applicable to the issue date.s = the spread.m = the discount margin.

A. For newly issued floating rate notes issued at par: Formula: [GRAPHIC] [TIFF OMITTED] TR31JY13.000 Example:

The purpose of this example is to demonstrate how a floating rate note price is derived at the time of original issuance. Additionally, this example depicts the association of the July 31, 2012 issue date and the two-business-day lockout period. For a new two-year floating rate note auctioned on July 25, 2012, and issued on July 31, 2012, with a maturity date of July 31, 2014, and an interest accrual rate on the issue date of 0.215022819% (index rate of 0.095022819% plus a spread of 0.120%), solve for the price per 100 (P). This interest accrual rate is used for each daily interest accrual over the life of the security for the purposes of this example. In a new issuance (not a reopening) of a floating rate note, the discount margin determined at auction will be equal to the spread. Definitions: T0 = July 31, 2012.N = 8.TN = July 31, 2014.r = 0.095022819%.s = 0.120%.m = 0.120%.

As of the issue date the latest 13-week bill, auctioned at least two days prior, has the following information:

Table 1--13-Week Bill Auction Data----------------------------------------------------------------------------------------------------------------

Auction clearing

Auction date Issue date Maturity date price Auction high rate Index rate----------------------------------------------------------------------------------------------------------------

7/23/2012 7/26/2012 10/25/2012 99.975986 0.095% 0.095022819%----------------------------------------------------------------------------------------------------------------

The rationale for using a 13-week bill auction that has occurred at least two days prior to the issue date is due to the two-business-day lockout period. This lockout period applies only to the issue date and interest payment dates, thus any 13-week bill auction that occurs during the two-day lockout period is not used for calculations related to the issue date and interest payment dates. The following sample calendar depicts this relationship for the floating rate note issue date.[GRAPHIC] [TIFF OMITTED] TR31JY13.001

Computing the Projected Cash Flows

The following table presents the future interest payment dates and the number of days between them.

Table 2--Payment Dates------------------------------------------------------------------------

Dates Days between dates------------------------------------------------------------------------Issue Date: T0 = 7/31/2012........................1st Interest Date: T1 = 10/31/2012................ T1 - T0 = 922nd Interest Date: T2 = 1/31/2013................. T2 - T1 = 923rd Interest Date: T3 = 4/30/2013................. T3 - T2 = 894th Interest Date: T4 = 7/31/2013................. T4 - T3 = 925th Interest Date: T5 = 10/31/2013................ T5 - T4 = 926th Interest Date: T6 = 1/31/2014................. T6 - T5 = 927th Interest Date: T7 = 4/30/2014................. T7 - T6 = 898th Interest & Maturity Dates: T8 = 7/31/2014..... T8 - T7 = 92------------------------------------------------------------------------ Letai = 100 x max(r + s,0)/360 and Ai = ai x (Ti - Ti-1) + 100 x 1{i=8{time} ai represents the daily projected interest, for a $100 par value, that will accrue between the future interest payment dates Ti-1 and Ti, where i = 1,2, . . . ,8. ai's are computed using the spread s = 0.120% obtained at the auction, and the fixed index rate of r = 0.095022819% applicable to the issue date (7/31/2012). For example: a1 = 100 x max(0.00095022819 + 0.00120,0)/360 = 0.000597286 Ai represents the projected cash flow the floating rate note holder will receive, for a $100 par value, at the future interest payment date Ti, where i = 1,2, . . . ,8. Ti - Ti-1 is the number of days between the future interest payment dates Ti-1 and Ti. To account for the payback of the par value, the variable 1{i=8{time} takes the value 1 if the payment date is the maturity date, or 0 otherwise. For example: Ai = 92 x 0.000597286 = 0.054950312 and A8 = 92 x 0.000597286 + 100 = 100.054950312 Let Bi = 1 + (r + m) x (Ti - Ti - 1)/360 Bi represents the projected compound factor between the future dates Ti-1 and Ti, where i = 1,2, . . . ,8. All Bi's are computed using the discount margin m = 0.120% (equals the spread determined at the auction), and the fixed index rate of r = 0.095022819% applicable to the issue date (7/31/2012). For example: B3 = 1 + (0.00095022819 + 0.00120) x 89/360 = 1.000531584. The following table shows the projected daily accrued interest values for $100 par value (ai's), cash flows at interest payment dates (Ai's), and the compound factors between payment dates (Bi's).

Table 3--Projected Cash Flows and Compound Factors----------------------------------------------------------------------------------------------------------------

i ai Ai Bi----------------------------------------------------------------------------------------------------------------1.................................... 0.000597286 0.054950312 1.0005495032.................................... 0.000597286 0.054950312 1.0005495033.................................... 0.000597286 0.053158454 1.0005315844.................................... 0.000597286 0.054950312 1.0005495035.................................... 0.000597286 0.054950312 1.0005495036.................................... 0.000597286 0.054950312 1.0005495037.................................... 0.000597286 0.053158454 1.0005315848.................................... 0.000597286 100.054950312 1.000549503----------------------------------------------------------------------------------------------------------------

Computing the Price

The price is computed as follows: [GRAPHIC] [TIFF OMITTED] TR31JY13.002

B. For newly issued floating rate notes issued at a premium:Formula:[GRAPHIC] [TIFF OMITTED] TR31JY13.003 Example:

The purpose of this example is to demonstrate how a floating rate note auction can result in a price at a premium given a negative discount margin and spread at auction. For a new two-year floating rate note auctioned on July 25, 2012, and issued on July 31, 2012, with a maturity date of July 31, 2014, solve for the price per 100 (P). In a new issue (not a reopening) of a floating rate note, the discount margin established at auction will be equal to the spread. In this example, the discount margin determined at auction is -0.150%, but the floating rate note is subject to a daily interest rate accrual minimum of 0.000%. Definitions: T0 = July 31, 2012.N = 8.TN = July 31, 2014.r = 0.095022819%.s = -0.150%.m = -0.150%.

As of the issue date the latest 13-week bill, auctioned at least two days prior, has the following information:

Table 1--13-Week Bill Auction Data----------------------------------------------------------------------------------------------------------------

Auction clearing

Auction date Issue date Maturity date price Auction high rate Index rate----------------------------------------------------------------------------------------------------------------

7/23/2012 7/26/2012 10/25/2012 99.975986 0.095% 0.095022819%----------------------------------------------------------------------------------------------------------------

[GRAPHIC] [TIFF OMITTED] TR31JY13.004

Computing the Projected Cash Flows

The following table presents the future interest payment dates and the number of days between them.

Table 2--Payment Dates------------------------------------------------------------------------

Dates Days between dates------------------------------------------------------------------------Issue Date: T0 = 7/31/2012........................1st Interest Date: T1 = 10/31/2012................ T1 - T0 = 922nd Interest Date: T2 = 1/31/2013................. T2 - T1 = 923rd Interest Date: T3 = 4/30/2013................. T3 - T2 = 894th Interest Date: T4 = 7/31/2013................. T4 - T3 = 925th Interest Date: T5 = 10/31/2013................ T5 - T4 = 926th Interest Date: T6 = 1/31/2014................. T6 - T5 = 927th Interest Date: T7 = 4/30/2014................. T7 - T6 = 898th Interest & Maturity Dates: T8 = 7/31/2014..... T8 - T7 = 92------------------------------------------------------------------------ Let ai = 100 x max(r + s,0)/360 and Ai = ai x (Ti - Ti - 1) +

100x1{i=8{time} ai Represents the daily projected interest, for a $100 par value, that will accrue between the future interest payment dates Ti - 1 and Ti where i = 1,2, . . . ,8. ai's are computed using the spread s = - 0.150%, and the fixed index rate of r = 0.095022819% applicable to the issue date (7/31/2012). For example: ai = 100 x max(0.00095022819-0.00150,0)/360 = 100 x 0/360 =

0.000000000

Ai represents the projected cash flow the floating rate note holder will receive, for a $100 par value, at the future interest payment date Ti, where i = 1,2, . . ., 8. Ti - Ti-1 is the number of days between the future interest payment dates Ti-1 and Ti. To account for the payback of the par value, the variable 1{i=8{time} takes the value 1 if the payment date is the maturity date, or 0 otherwise. For example: A1 = 92 x 0.000000000 = 0.000000000 and A8 = 92 x 0.000000000 + 100 = 100.000000000 Let Bi = 1 + (r + m) x (Ti-Ti-1)/360

Bi represents the projected compound factor between the future dates Ti-1 and Ti, where i = 1,2, . . ., 8. All Bi's are computed using the discount margin m = -0.150% (equals the spread obtained at the auction), and the fixed index rate of r = 0.095022819% applicable to the issue date (7/31/2012). For example: B3 = 1 + (0.00095022819-0.00150) x 89/360 = 0.999864084.

The following table shows the projected daily accrued interests for $100 par value (ai's), cash flows at interest payment dates (Ai's), and the compound factors between payment dates (Bi's).

Table 3--Projected Cash Flows and Compound Factors----------------------------------------------------------------------------------------------------------------

i ai Ai Bi----------------------------------------------------------------------------------------------------------------1.................................... 0.000000000 0.000000000 0.9998595032.................................... 0.000000000 0.000000000 0.9998595033.................................... 0.000000000 0.000000000 0.9998640844.................................... 0.000000000 0.000000000 0.9998595035.................................... 0.000000000 0.000000000 0.9998595036.................................... 0.000000000 0.000000000 0.9998595037.................................... 0.000000000 0.000000000 0.9998640848.................................... 0.000000000 100.000000000 0.999859503----------------------------------------------------------------------------------------------------------------

Computing the Price

The price is computed as follows:

[GRAPHIC] [TIFF OMITTED] TR31JY13.005

Definitions for Reopenings of Floating Rate Notes and Calculation of

Interest Payments IPi = the quarterly interest payment at date Ti.PD = the price that includes the accrued interest per $100 par value as

of the reopening issue date.AI = accrued interest per $100 par value as of the reopening issue date. PC = the price without accrued interest per $100 par value as of the

reopening issue date.T-1 = the dated date if the reopening occurs before the first

interest payment date, or, otherwise, the latest interest

payment date prior to the reopening issue date.T0 = the reopening issue date.N = the total number of remaining quarterly interest payments as of the

reopening issue date.i and k = indexes that identify the sequence of interest payment dates

relative to the issue date. For example T1,

T2, and T3 represent the first, second,

and the third interest payment dates after the issue date

respectively, while T-1 represents the preceding

interest payment date before the issue date.j = an index that identifies days between consecutive interest payment

dates.Ti = the ith remaining quarterly interest payment

date.Ti - Ti-1 = the number of days between the

interest payment date Ti and the preceding interest

payment date.TN = the maturity date.rj's = the effective index rates for days between the last

interest payment date and the reopening issue date.r = the index rate applicable to the reopening issue date.s = the spread.m = the discount margin.

C. Pricing and accrued interest for reopened floating rate notes Formula:[GRAPHIC] [TIFF OMITTED] TR26SE13.512 [GRAPHIC] [TIFF OMITTED] TR26SE13.101 Example:

The purpose of this example is to determine the floating rate note prices with and without accrued interest at the time of the reopening auction. For a two-year floating rate note that was originally auctioned on July 25, 2012, with an issue date of July 31, 2012, reopened in an auction on August 30, 2012 and issued on August 31, 2012, with a maturity date of July 31, 2014, solve for accrued interest per 100 (AI), the price with accrued interest per 100 (PD) and the price without accrued interest per 100 (PC). Since this is a reopening of an original issue from the prior month, Table 2 as shown in the example is used for accrued interest calculations. In the case of floating rate note reopenings, the spread on the security remains equal to the spread that was established at the original auction of the floating rate notes. Definitions: T-1 = July 31, 2012.T0 = August 31, 2012.N = 8.TN = July 31, 2014.r = 0.105027876%.s = 0.120%.m = 0.100%.

The following table shows the past results for the 13-week bill auction.

Table 1--13-Week Bill Auction Data----------------------------------------------------------------------------------------------------------------

Auction Auction high Index rate

Auction date Issue date Maturity date clearing price rate (percent) (percent)----------------------------------------------------------------------------------------------------------------7/23/2012....................... 7/26/2012 10/25/2012 99.975986 0.095 0.0950228197/30/2012....................... 8/2/2012 11/1/2012 99.972194 0.110 0.1100305958/6/2012........................ 8/9/2012 11/8/2012 99.974722 0.100 0.1000252848/13/2012....................... 8/16/2012 11/15/2012 99.972194 0.110 0.1100305958/20/2012....................... 8/23/2012 11/23/2012 99.973167 0.105 0.1050281838/27/2012....................... 8/30/2012 11/29/2012 99.973458 0.105 0.105027876----------------------------------------------------------------------------------------------------------------

[GRAPHIC] [TIFF OMITTED] TR31JY13.007

The following table shows the index rates applicable for the accrued interest.

Table 2--Applicable Index Rate----------------------------------------------------------------------------------------------------------------

Applicable floating rate

Number of days -------------------------------

Accrual starts Accrual ends in accrual Index rate

period Auction date (percent)----------------------------------------------------------------------------------------------------------------7/31/2012....................................... 7/31/2012 1 7/23/2012 0.0950228198/1/2012........................................ 8/6/2012 6 7/30/2012 0.1100305958/7/2012........................................ 8/13/2012 7 8/6/2012 0.1000252848/14/2012....................................... 8/20/2012 7 8/13/2012 0.1100305958/21/2012....................................... 8/27/2012 7 8/20/2012 0.1050281838/28/2012....................................... 8/30/2012 3 8/27/2012 0.105027876----------------------------------------------------------------------------------------------------------------

Computing the Accrued Interest

The accrued interest as of the new issue date (8/31/2012) for a $100 par value is: AI = 1 x 100 x max (0.00095022819 + 0.00120,0)/360+ 6 x 100 x max (0.00110030595 + 0.00120,0)/360+ 7 x 100 x max (0.00100025284 + 0.00120,0)/360+ 7 x 100 x max (0.00110030595 + 0.00120,0)/360+ 7 x 100 x max (0.00105028183 + 0.00120,0)/360+ 3 x 100 x max (0.00105027876 + 0.00120,0)/360 AI = 1x0.000597286+ 6x0.000638974+ 7x0.000611181+ 7x0.000638974+ 7x0.000625078+ 3x0.000625077AI = 0.000597286 + 0.003833844 + 0.004278267 + 0.004472818 + 0.004375546

+ 0.001875231AI = 0.019432992 = $0.019433

Computing the Projected Cash Flows

The following table presents the future interest payment dates and the number of days between them.

Table 3--Payment Dates------------------------------------------------------------------------

Dates Days between dates------------------------------------------------------------------------Original Issue Date: T-1 = 7/31/2012..............New Issue Date: T0 = 8/31/2012.................... T0 - T-1 = 311st Interest Date: T1 = 10/31/2012................ T1 - T0 = 612nd Interest Date: T2 = 1/31/2013................. T2 - T1 = 923rd Interest Date: T3 = 4/30/2013................. T3 - T2 = 894th Interest Date: T4 = 7/31/2013................. T4 - T3 = 925th Interest Date: T5 = 10/31/2013................ T5 - T4 = 926th Interest Date: T6 = 1/31/2014................. T6 - T5 = 927th Interest Date: T7 = 4/30/2014................. T7 - T6 = 898th Interest & Maturity Dates: T8 = 7/31/2014..... T8 - T7 = 92------------------------------------------------------------------------ Let ai = 100 x max(r + s, 0)/360and Ai = ai x (Ti - Ti-1) +

100x1{i=8{time}

ai represents the daily projected interest, for a $100 par value, that will accrue between the future interest payment dates Ti-1 and Ti, where i=1,2,...,8. ai's are computed using the spread s = 0.120% obtained at the original auction, and the fixed index rate of r = 0.105027876% applicable to the new issue date (8/31/2012). For example: ai = 100 x max(0.00105027876 + 0.00120,0)/360 = 0.000625077

Ai represents the projected cash flow the floating rate note holder will receive, less accrued interest, for a $100 par value, at the future interest payment date Ti, where i=1,2,...,8. Ti - Ti-1 is the number of days between the future interest payment dates Ti-1 and Ti. To account for the payback of the par value, the variable 1{i=8{time} takes the value 1 if the payment date is the maturity date, or 0 otherwise. For example: A1 = 61x0.000625077 = 0.038129697

and A8 = 92x0.000625077 + 100 = 100.057507084

Let Bi = 1 + (r + m) x (Ti - Ti-1)/360

Bi represents the projected compound factor between the future dates Ti-1 and Ti, where i=1,2,...,8. All Bi's are computed using the discount margin m = 0.100% obtained at the reopening auction, and the fixed index rate of r = 0.105027876% applicable to the new issue date (8/31/2012). For example: B3 = 1 + (0.00105027876 + 0.00100)x89/360 = 1.000506874

The following table shows the projected daily accrued interests for $100 par value (ai's), cash flows at interest payment dates (Ai's), and the compound factors between payment dates (Bi's).

Table 4--Projected Cash Flows and Compound Factors----------------------------------------------------------------------------------------------------------------

i ai Ai Bi----------------------------------------------------------------------------------------------------------------1.................................... 0.000625077 0.038129697 1.0003474082.................................... 0.000625077 0.057507084 1.0005239603.................................... 0.000625077 0.055631853 1.0005068744.................................... 0.000625077 0.057507084 1.0005239605.................................... 0.000625077 0.057507084 1.0005239606.................................... 0.000625077 0.057507084 1.0005239607.................................... 0.000625077 0.055631853 1.0005068748.................................... 0.000625077 100.057507084 1.000523960----------------------------------------------------------------------------------------------------------------

Computing the Price

The price with accrued interest is computed as follows: [GRAPHIC] [TIFF OMITTED] TR31JY13.008

D. For calculating interest payments: Example:

For calculating interest payments:

Example:

For a new issue of a two-year floating rate note auctioned on July 25, 2012, and issued on July 31, 2012, with a maturity date of July 31, 2014, and a first interest payment date of October 31, 2012, calculate the quarterly interest payments (IPi) per 100. In a new issuance (not a reopening) of a new floating rate note, the discount margin determined at auction will be equal to the spread. The interest accrual rate used for this floating rate note on the issue date is 0.215022819% (index rate of 0.095022819% plus a spread of 0.120%) and this rate is used for each daily interest accrual over the life of the security for the purposes of this example. [GRAPHIC] [TIFF OMITTED] TR31JY13.010

Example 1: Projected interest payment as of the original issue date. T0 = July 31, 2012.N = 8.TN = July 31, 2014.r = 0.095022819%.s = 0.120%.m = 0.120%.

As of the issue date the latest 13-week bill, auctioned at least two days prior, has the following information:

Table 1--13-Week Bill Auction Data--------------------------------------------------------------------------------------------------------------------------------------------------------

Auction Auction high

Auction date Issue date Maturity date clearing price rate Index rate--------------------------------------------------------------------------------------------------------------------------------------------------------7/23/2012.......................................................... 7/26/2012 10/25/2012 99.975986 0.095% 0.095022819%--------------------------------------------------------------------------------------------------------------------------------------------------------

[GRAPHIC] [TIFF OMITTED] TR31JY13.011

Computing the Projected Cash Flows

The following table presents the future interest payment dates and the number of days between them.

Table 2--Payment Dates------------------------------------------------------------------------

Dates Days between dates------------------------------------------------------------------------Issue Date: T0 = 7/31/2012........................1st Interest Date: T1 = 10/31/2012................ T1 - T0 = 922nd Interest Date: T2 = 1/31/2013................. T2 - T1 = 923rd Interest Date: T3 = 4/30/2013................. T3 - T2 = 894th Interest Date: T4 = 7/31/2013................. T4 - T3 = 925th Interest Date: T5 = 10/31/2013................ T5 - T4 = 926th Interest Date: T6 = 1/31/2014................. T6 - T5 = 927th Interest Date: T7 = 4/30/2014................. T7 - T6 = 898th Interest & Maturity Dates: T8 = 7/31/2014..... T8 - T7 = 92------------------------------------------------------------------------

Using the spread s = 0.120%, and the fixed index rate of r = 0.095022819% applicable to the issue date (7/31/2012), the first and seventh projected interest payments are computed as follows: IP1 = 92x[100xmax(0.00095022819 + 0.00120,0)/360]IP1 = 92x0.000597286 = 0.054950312 IP7 = 89x[100xmax(0.00095022819 + 0.00120,0)/360]IP7 = 89x0.000597286 = 0.053158454

The following table shows all projected interest payments as of the issue date.

Table 3--Projected Interest Payments------------------------------------------------------------------------

i Dates IPi------------------------------------------------------------------------1....................................... 10/31/2012 0.0549503122....................................... 1/31/2013 0.0549503123....................................... 4/30/2013 0.0531584544....................................... 7/31/2013 0.0549503125....................................... 10/31/2013 0.0549503126....................................... 1/31/2014 0.0549503127....................................... 4/30/2014 0.0531584548....................................... 7/31/2014 0.054950312------------------------------------------------------------------------

Example 2: Projected interest payment as of the reopening issue date (intermediate values, including rates in percentage terms, are rounded to nine decimal places).

This example demonstrates the calculations required to determine the interest payment due when the reopened floating rate note is issued. This example also demonstrates the need to calculate accrued interest at the time of a floating rate reopening auction. Since this is a reopening of an original issue from 31 days prior, Table 5 as shown in the example is used for accrued interest calculations. For a two-year floating rate note originally auctioned on July 25, 2012 with an original issue date of July 31, 2012, reopened by an auction on August 30, 2012 and issued on August 31, 2012, with a maturity date of July 31, 2014, calculate the quarterly interest payments (IPI) per 100. T-1 is the dated date if the reopening occurs before the first interest payment date, or otherwise the latest interest payment date prior to the new issue date. T-1 = July 31, 2012.T0 = August 31, 2012.N = 8.TN = July 31, 2014.r = 0.105027876%.s = 0.120%.m = 0.100%.

The following table shows the past results for the 13-week bill auction.

Table 4--13-Week Bill Auction Data----------------------------------------------------------------------------------------------------------------

Auction Auction high Index rate

Auction date Issue date Maturity date clearing price rate (percent) (percent)----------------------------------------------------------------------------------------------------------------7/23/2012....................... 7/26/2012 10/25/2012 99.975986 0.095 0.0950228197/30/2012....................... 8/2/2012 11/1/2012 99.972194 0.110 0.1100305958/6/2012........................ 8/9/2012 11/8/2012 99.974722 0.100 0.1000252848/13/2012....................... 8/16/2012 11/15/2012 99.972194 0.110 0.1100305958/20/2012....................... 8/23/2012 11/23/2012 99.973167 0.105 0.1050281838/27/2012....................... 8/30/2012 11/29/2012 99.973458 0.105 0.105027876----------------------------------------------------------------------------------------------------------------

[GRAPHIC] [TIFF OMITTED] TR31JY13.012

The following table shows the index rates applicable for the accrued interest.

Table 5--Applicable Index Rate----------------------------------------------------------------------------------------------------------------

Applicable floating rate

Number of days -------------------------------

Accrual starts Accrual ends in accrual Index rate

period Auction date (percent)----------------------------------------------------------------------------------------------------------------7/31/2012....................................... 7/31/2012 1 7/23/2012 0.0950228198/1/2012........................................ 8/6/2012 6 7/30/2012 0.1100305958/7/2012........................................ 8/13/2012 7 8/6/2012 0.1000252848/14/2012....................................... 8/20/2012 7 8/13/2012 0.1100305958/21/2012....................................... 8/27/2012 7 8/20/2012 0.1050281838/28/2012....................................... 8/30/2012 3 8/27/2012 0.105027876----------------------------------------------------------------------------------------------------------------

Computing the accrued interest

The accrued interest as of 8/31/2012 for a $100 par value is: AI = 1 x 100 x max (0.00095022819 + 0.00120,0)/360+ 6 x 100 x max (0.00110030595 + 0.00120,0)/360+ 7 x 100 x max (0.00100025284 + 0.00120,0)/360+ 7 x 100 x max (0.00110030595 + 0.00120,0)/360+ 7 x 100 x max (0.00105028183 + 0.00120,0)/360+ 3 x 100 x max (0.00105027876 + 0.00120,0)/360 AI = 1 x 0.000597286+ 6 x 0.000638974+ 7 x 0.000611181+ 7 x 0.000638974+ 7 x 0.000625078+ 3 x 0.000625077 AI = 0.000597286 + 0.003833844 + 0.004278267 + 0.004472818 + 0.004375546

+ 0.001875231 AI = 0.019432992 = $0.019433

The following table presents the future interest payment dates and the number of days between them.

Table 6--Payment Dates------------------------------------------------------------------------

Dates Days between dates------------------------------------------------------------------------Original Issue Date: T-1 = 7/31/2012..............New Issue Date: T0 = 8/31/2012.................... T0 - T-1 = 311st Interest Date: T1 = 10/31/2012................ T1 - T0 = 612nd Interest Date: T2 = 1/31/2013................. T2 - T1 = 923rd Interest Date: T3 = 4/30/2013................. T3 - T2 = 894th Interest Date: T4 = 7/31/2013................. T4 - T3 = 925th Interest Date: T5 = 10/31/2013................ T5 - T4 = 926th Interest Date: T6 = 1/31/2014................. T6 - T5 = 927th Interest Date: T7 = 4/30/2014................. T7 - T6 = 898th Interest & Maturity Dates: T8 = 7/31/2014..... T8 - T7 = 92------------------------------------------------------------------------

Using the original spread s = 0.120% (obtained on 7/25/2012), and the fixed index rate of r = 0.105027876% applicable to the new issue date (8/31/2012), the first and eighth projected interest payments are computed as follows: IP1 = 0.019432992 + 61 x [100 x max (0.00105027876 +

0.00120,0)/360]IP1 = 0.019432992 + 61 x 0.000625077IP1 = 0.019432992 + 0.038129697 = 0.057562689 and IP8 = 92 x [100 x max (0.00105027876 + 0.00120,0)/360]IP8 = 92 x 0.000625077 = 0.057507084

The following table shows all projected interest payments as of the new issue date.

Table 7--Projected Interest Payments------------------------------------------------------------------------

i Dates IPi------------------------------------------------------------------------1....................................... 10/31/2012 0.0575626892....................................... 1/31/2013 0.0575070843....................................... 4/30/2013 0.0556318534....................................... 7/31/2013 0.0575070845....................................... 10/31/2013 0.0575070846....................................... 1/31/2014 0.0575070847....................................... 4/30/2014 0.0556318538....................................... 7/31/2014 0.057507084------------------------------------------------------------------------ Definitions for Newly Issued Floating Rate Notes with an Issue Date that

Occurs after the Dated Date PD = the price that includes accrued interest from the dated date to the

issue date per $100 par value as of the issue date.AI = the accrued interest per $100 par value as of the issue date.PC = the price without accrued interest per $100 par value as of the

issue date.T-1 = the dated date.T0 = the issue date.N = the total number of remaining quarterly interest payments as of the

new issue date. i and k = indexes that identify the sequence of interest payment dates.j = an index that identifies days between the dated date and the issue

date.Ti = the ith quarterly future interest payment date.Ti - Ti-1 = the number of days between the

interest payment date Ti and the preceding interest

payment date.TN = the maturity date.rj's = the effective index rates for days between the dated date and the

issue date.r = the index rate applicable to the issue date.s = the spread.m = the discount margin.

E. Pricing and accrued interest for new issue floating rate notes with an issue date that occurs after the dated date Formula:[GRAPHIC] [TIFF OMITTED] TR26SE13.513 [GRAPHIC] [TIFF OMITTED] TR26SE13.514 Example:

The purpose of this example is to demonstrate how a floating rate note can have a price without accrued interest of less than $100 par value when the issue date occurs after the dated date. An original issue two-year floating rate note is auctioned on December 29, 2011, with a dated date of December 31, 2011, an issue date of January 3, 2012, and a maturity date of December 31, 2013.Definitions: Dated date = 12/31/2011.Issue date = 1/3/2012.Maturity date = 12/31/2013.Spread = 1.000% at auction.Discount margin = 1.000%.

As of the issue date the latest 13-week bill, auctioned at least two days prior, has the following information:

Table 1--13-WEEK BILL AUCTION DATA--------------------------------------------------------------------------------------------------------------------------------------------------------

Auction Auction high

Auction date Issue date Maturity date clearing price rate Index rate--------------------------------------------------------------------------------------------------------------------------------------------------------12/27/2011......................................................... 12/29/2011 3/29/2012 99.993681 0.025% 0.025001580%-------------------------------------------------------------------------------------------------------------------------------------------------------- [GRAPHIC] [TIFF OMITTED] TR31JY13.014

The following table shows the index rates applicable for the accrued interest.

Table 2--Applicable Index Rate----------------------------------------------------------------------------------------------------------------

Number of days Applicable floating rate

Accrual starts Accrual ends in accrual ---------------------------------

period Auction date Index rate----------------------------------------------------------------------------------------------------------------12/31/2011.................................. 1/2/2012 3 12/27/2011 0.025001580%----------------------------------------------------------------------------------------------------------------

Computing the accrued interest

The accrued interest as of the new issue date (1/3/2012) for a $100 par value is: AI = 3 x 100 x max (0.00025001580 + 0.01000,0)/360 AI = 3 x 0.002847227 AI = 0.008541681 = $0.008542

Computing the Projected Cash Flows

The following table presents the future interest payment dates and the number of days between them.

Table 3--Payment Dates------------------------------------------------------------------------

Dates Days between dates------------------------------------------------------------------------Dated Date: = T-1 = 12/31/2011....................Issue Date: T0 = 1/3/2012......................... T0 - T-1 = 31st Interest Date: T1 = 3/31/2012................. T1 - T0 = 882nd Interest Date: T2 = 6/30/2012................. T2 - T1 = 913rd Interest Date: T3 = 9/30/2012................. T3 - T2 = 924th Interest Date: T4 = 12/31/2012................ T4 - T3 = 925th Interest Date: T5 = 3/31/2013................. T5 - T4 = 906th Interest Date: T6 = 6/30/2013................. T6 - T5 = 917th Interest Date: T7 = 9/30/2013................. T7 - T6 = 928th Interest & Maturity Dates: T8 = 12/31/2013.... T8 - T7 = 92------------------------------------------------------------------------ Let ai = 100 x max(r + s, 0)/360 and Ai = ai x (Ti - Ti-1) + 100 x

1{i=8{time}

ai represents the daily projected interest, for a $100 par value, that will accrue between the future interest payment dates Ti-1 and Ti, where i = 1,2,...,8. ai's are computed using the spread s = 1.000% obtained at the auction, and the fixed index rate of r = 0.025001580% applicable to the issue date (1/3/2012). For example: a1 = 100 x max(0.00025001580 + 0.01000,0)/360 = 0.002847227

Ai represents the projected cash flow the floating rate note holder will receive, less accrued interest, for a $100 par value, at the future interest payment date Ti, where i = 1,2,...,8. Ti - Ti-1 is the number of days between the future interest payment dates Ti-1 and Ti. To account for the payback of the par value, the variable 1{i=8{time} takes the value 1 if the payment date is the maturity date, or 0 otherwise. For example: A1 = 88 x 0.002847227 = 0.250555976 and A8 = 92 x 0.002847227 + 100 = 100.261944884 Let Bi = 1 + (r + m) x (Ti - Ti-1)/360

Bi represents the projected compound factor between the future dates Ti-1 and Ti, where i = 1,2,...,8. All Bi's are computed using the discount margin m = 1.000% (equals the spread obtained at the auction), and the fixed index rate of r = 0.025001580% applicable to the issue date (1/3/2012). For example: B3 = 1 + (0.00025001580 + 0.01000) x 92/360 = 1.002619448

The following table shows the projected daily accrued interests for $100 par value (ai 's), cash flows at interest payment dates (Ai 's), and the compound factors between payment dates (Bi's).

Table 4--Projected Cash Flows and Compound Factors----------------------------------------------------------------------------------------------------------------

i ai Ai Bi----------------------------------------------------------------------------------------------------------------1.................................... 0.002847227 0.250555976 1.0025055592.................................... 0.002847227 0.259097657 1.0025909763.................................... 0.002847227 0.261944884 1.0026194484.................................... 0.002847227 0.261944884 1.0026194485.................................... 0.002847227 0.256250430 1.0025625046.................................... 0.002847227 0.259097657 1.0025909767.................................... 0.002847227 0.261944884 1.0026194488.................................... 0.002847227 100.261944884 1.002619448----------------------------------------------------------------------------------------------------------------

Computing the price

The price with accrued interest is computed as follows: [GRAPHIC] [TIFF OMITTED] TR31JY13.015

V. Computation of Adjusted Values and Payment Amounts for Stripped

Inflation-Protected Interest Components

Note: Valuing an interest component stripped from an inflation-protected security at its adjusted value enables this interest component to be interchangeable (fungible) with other interest components that have the same maturity date, regardless of the underlying inflation-protected security from which the interest components were stripped. The adjusted value provides for fungibility of these various interest components when buying, selling, or transferring them or when reconstituting an inflation-protected security.Definitions: c = C/100 = the regular annual interest rate, payable semiannually, e.g., .03625 (the decimal equivalent of a 3\5/8\% interest rate)Par = par amount of the security to be strippedRef CPIIssueDate = reference CPI for the original issue date (or dated date, when the dated date is different from the original issue date) of the underlying (unstripped) securityRef CPIDate = reference CPI for the maturity date of the interest componentAV = adjusted value of the interest componentPA = payment amount at maturity by Treasury Formulas: AV = Par(C/2)(100/Ref CPIIssueDate) (rounded to 2 decimals with no intermediate rounding)PA = AV(Ref CPIDate/100) (rounded to 2 decimals with no intermediate rounding) Example: A 10-year inflation-protected note paying 3\7/8\% interest was issued on January 15, 1999, with the second interest payment on January 15, 2000. The Ref CPI of January 15, 1999 (Ref CPIIssueDate) was 164.00000, and the Ref CPI on January 15, 2000 (Ref CPIDate) was 168.24516. Calculate the adjusted value and the payment amount at maturity of the interest component. Definitions: c = .03875Par = $1,000,000Ref CPIIssueDate = 164.00000Ref CPIDate = 168.24516 Resolution: For a par amount of $1 million, the adjusted value of each stripped interest component was $1,000,000(.03875/2)(100/164.00000), or $11,814.02 (no intermediate rounding).For an interest component that matured on January 15, 2000, the payment amount was $11,814.02 (168.24516/100), or $19,876.52 (no intermediate rounding).

VI. Computation of Purchase Price, Discount Rate, and Investment Rate

(Coupon-Equivalent Yield) for Treasury Bills

A. Conversion of the discount rate to a purchase price for Treasury bills of all maturities: Formula: P = 100 (1 - dr / 360). Where: d = discount rate, in decimals.r = number of days remaining to maturity.P = price per 100 (dollars). Example:

(1) P = 100 [1 - (.07610)(90) / 360].(2) P = 100 (1 - .019025).(3) P = 100 (.980975).(4) P = 98.097500.

Note: Purchase prices per $100 are rounded to six decimal places, using normal rounding procedures.

B. Computation of purchase prices and discount amounts based on price per $100, for Treasury bills of all maturities:

1. To determine the purchase price of any bill, divide the par amount by 100 and multiply the resulting quotient by the price per $100. Example:

To compute the purchase price of a $10,000 13-week bill sold at a price of $98.098000 per $100, divide the par amount ($10,000) by 100 to obtain the multiple (100). That multiple times 98.098000 results in a purchase price of $9,809.80.

2. To determine the discount amount for any bill, subtract the purchase price from the par amount of the bill. Example:

For a $10,000 bill with a purchase price of $9,809.80, the discount amount would be $190.20, or $10,000 - $9,809.80.

C. Conversion of prices to discount rates for Treasury bills of all maturities: Formula:[GRAPHIC] [TIFF OMITTED] TR02SE04.009 Where: P = price per 100 (dollars).d = discount rate.r = number of days remaining to maturity. Example:

For a 26-week bill issued December 30, 1982, due June 30, 1983, with a price of $95.934567, solve for the discount rate (d). Definitions: P = 95.934567.r = 182 (December 30, 1982, to June 30, 1983). Resolution:[GRAPHIC] [TIFF OMITTED] TR02SE04.010 (2) d = [.04065433 x 1.978021978].(3) d = .080415158.(4) d = 8.042%.

Note: Prior to April 18, 1983, we sold all bills in price-basis auctions, in which discount rates calculated from prices were rounded to three places, using normal rounding procedures. Since that time, we have sold bills only on a discount rate basis.

D. Calculation of investment rate (coupon-equivalent yield) for Treasury bills:

1. For bills of not more than one half-year to maturity: Formula:[GRAPHIC] [TIFF OMITTED] TR02SE04.011 Where: i = investment rate, in decimals. P = price per 100 (dollars).r = number of days remaining to maturity.y = number of days in year following the issue date; normally 365 but, if the year following the issue date includes February 29, then y is 366. Example:

For a cash management bill issued June 1, 1990, due June 21, 1990, with a price of $99.559444 (computed from a discount rate of 7.930%), solve for the investment rate (i). Definitions: P = 99.559444.r = 20 (June 1, 1990, to June 21, 1990).y = 365. Resolution:[GRAPHIC] [TIFF OMITTED] TR02SE04.012 (2) i = [.004425 x 18.25].(3) i = .080756.(4) i = 8.076%.

2. For bills of more than one half-year to maturity: Formula: P [1 + (r - y/2)(i/y)] (1 + i/2) = 100.

This formula must be solved by using the quadratic equation, which is: ax \2\ + bx + c = 0.

Therefore, rewriting the bill formula in the quadratic equation form gives:[GRAPHIC] [TIFF OMITTED] TR02SE04.013 and solving for ``i'' produces:[GRAPHIC] [TIFF OMITTED] TR02SE04.014 Where: i = investment rate in decimals.b = r/y.a = (r/2y) - .25.c = (P-100)/P.P = price per 100 (dollars).r = number of days remaining to maturity.y = number of days in year following the issue date; normally 365, but if the year following the issue date includes February 29, then y is 366. Example:

For a 52-week bill issued June 7, 1990, due June 6, 1991, with a price of $92.265000 (computed from a discount rate of 7.65%), solve for the investment rate (i). Definitions: r = 364 (June 7, 1990, to June 6, 1991).y = 365.P = 92.265000.b = 364 / 365, or .997260274.a = (364 / 730) - .25, or .248630137.c = (92.265 - 100) / 92.265, or -.083834607. Resolution:[GRAPHIC] [TIFF OMITTED] TR02SE04.015 (3) i = (-.997260274 + 1.038221216) / .497260274.(4) i = .040960942 / .497260274.(5) i = .082373244 or(6) i = 8.237%. [69 FR 45202, July 28, 2004, as amended at 69 FR 52967, Aug. 30, 2004; 69 FR 53622, Sept. 2, 2004; 73 FR 14939, Mar. 20, 2008; 78 FR 46428 and 46430, July 31, 2013; 78 FR 50335, Aug. 19, 2013; 78 FR 52857, Aug. 27, 2013]

Editorial Note: At 78 FR 59228-59230, Sept. 26, 2013, appendix B to part 356 was amended; however, portions of the amendment could not be incorporated due to inaccurate amendatory instructions.

Sec. Appendix C to Part 356--Investment Considerations

I. Inflation-Protected Securities

A. Principal and Interest Variability

An investment in securities with principal or interest determined by reference to an inflation index involves factors not associated with an investment in a non-indexed security. Such factors include the possibility that:

The inflation index may be subject to significant changes,

changes in the index may or may not correlate to changes in interest rates generally or with changes in other indices,

the resulting interest may be greater or less than that payable on other securities of similar maturities, and

in the event of sustained deflation, the amount of the semiannual interest payments, the inflation-adjusted principal of the security, and the value of stripped components will decrease. However, if at maturity the inflation-adjusted principal is less than a security's par amount, we will pay an additional amount so that the additional amount plus the inflation-adjusted principal equals the par amount. Regardless of whether or not we pay such an additional amount, we will always base interest payments on the inflation-adjusted principal as of the interest payment date. If a security has been stripped, we will pay any such additional amount at maturity to holders of principal components only. (See Sec. 356.30.)

B. Trading in the Secondary Market

The Treasury securities market is the largest and most liquid securities market in the world. The market for Treasury inflation-protected securities, however, may not be as active or liquid as the market for Treasury non-indexed securities. In addition, Treasury inflation-protected securities may not be as widely traded or as well understood as Treasury non-indexed securities. Lesser liquidity and fewer market participants may result in larger spreads between bid and asked prices for inflation-protected securities than the bid-asked spreads for non-indexed securities with the same time to maturity. Larger bid-asked spreads normally result in higher transaction costs and/or lower overall returns. The liquidity of an inflation-protected security may be enhanced over time as we issue additional amounts or more entities participate in the market.

C. Tax Considerations

Treasury inflation-protected securities and the stripped interest and principal components of these securities are subject to specific tax rules provided by Treasury regulations issued under sections 1275(d) and 1286 of the Internal Revenue Code of 1986, as amended.

D. Indexing Issues

While the Consumer Price Index (``CPI'') measures changes in prices for goods and services, movements in the CPI that have occurred in the past do not necessarily indicate changes that may occur in the future.

The calculation of the index ratio incorporates an approximate three-month lag, which may have an impact on the trading price of the securities, particularly during periods of significant, rapid changes in the index.

The CPI is reported by the Bureau of Labor Statistics, a bureau within the Department of Labor. The Bureau of Labor Statistics operates independently of Treasury and, therefore, we have no control over the determination, calculation, or publication of the index. For a discussion of how we will apply the CPI in various situations, see appendix B, section I, paragraph B of this part. In addition, for a discussion of actions that we would take in the event the CPI is: discontinued; in the judgment of the Secretary, fundamentally altered in a manner materially adverse to the interests of an investor in the security; or, in the judgment of the Secretary, altered by legislation or Executive Order in a manner materially adverse to the interests of an investor in the security, see appendix B, section I, paragraph B.4 of this part.

II. Floating Rate Notes

A. Interest Variability

An investment in securities with interest determined by reference to a 13-week Treasury bill index involves risks not associated with an investment in a fixed interest rate security. Such risks include the possibility that:

Changes in the index may or may not correlate to changes in interest rates generally or with changes in other indexes;

any given interest payment may be more or less than the amount paid on prior interest payment dates;

the resulting interest payments may be greater or less than those payable on other securities of similar maturities, and

in the event of sustained falling interest rates, the amount of the quarterly interest payments will decrease.

B. Trading in the Secondary Market

The Treasury securities market is the largest and most liquid securities market in the world. The market for Treasury floating rate notes, however, may not be as active or liquid as the market for Treasury non-indexed securities or Treasury inflation-protected securities. In addition, Treasury floating rate notes may not be as widely traded or as well understood as these other types of Treasury marketable securities. Prices for floating rate notes may not fluctuate in reaction to interest rate movements in the same manner as other Treasury securities. Lesser liquidity and fewer market participants may result in larger spreads between bid and asked prices for Treasury floating rate notes than the bid-asked spreads for other Treasury marketable securities with the same time to maturity. Larger bid-asked spreads normally result in higher transaction costs and/or lower overall returns. The liquidity of a Treasury floating rate note may be enhanced over time as we issue additional amounts or more entities participate in the market.

C. Tax Considerations

Treasury floating rate notes are subject to specific tax rules provided by Treasury regulations issued under section 1275(d) of the Internal Revenue Code of 1986, as amended.

D. Indexing Issues

The Bureau of the Fiscal Service publishes the High Rate immediately following a 13-week bill auction as part of the auction results. The 13-week bill is generally auctioned once per week. Treasury retains the flexibility to increase or decrease the frequency of 13-week bill auctions, which would affect the frequency of index rate resets. The High Rate is subject to various interest rate and market environments over which Treasury has no control. For a discussion of actions that Treasury would take in the event auctions of 13-week bills are discontinued or delayed, see appendix B, section I, paragraph C.4 of this part. [69 FR 45202, July 28, 2004, as amended at 78 FR 46428 and 46444, July 31, 2013]

Sec. Appendix D to Part 356--Description of the Indexes

I. Consumer Price Index

The Consumer Price Index (``CPI'') for purposes of inflation-protected securities is the non-seasonally adjusted U.S. City Average All Items Consumer Price Index for All Urban Consumers. It is published monthly by the Bureau of Labor Statistics (BLS), a bureau within the Department of Labor. The CPI is a measure of the average change in consumer prices over time in a fixed market basket of goods and services. This market basket includes food, clothing, shelter, fuels, transportation, charges for doctors' and dentists' services, and drugs.

In calculating the index, price changes for the various items are averaged together with weights that represent their importance in the spending of urban households in the United States. The BLS periodically updates the contents of the market basket of goods and services, and the weights assigned to the various items, to take into account changes in consumer expenditure patterns.

The CPI is expressed in relative terms in relation to a time base reference period for which the level is set at 100. For example, if the CPI for the 1982-84 reference period is 100.0, an increase of 16.5 percent from that period would be shown as 116.5. The CPI for a particular month is released and published during the following month. From time to time, the CPI is rebased to a more recent base reference period. We provide the base reference period for a particular inflation-protected security on the auction announcement for that security.

Further details about the CPI may be obtained by contacting the BLS.

II. Floating Rate Note Index

The floating rate note index is the 13-week Treasury bill auction High Rate (stop out rate), and converted to the simple-interest money market yield computed on an actual/360 basis. [69 FR 45202, July 28, 2004, as amended at 78 FR 46444, July 31, 2013]