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The top three rows of the card are called zone punches, [3] and so numeric character data which may contain overpunches is called zoned decimal. In IBM terminology, the low-order four bits of a byte in storage are called the digit , and the high-order four bits are the zone . [ 4 ]
The interpretation numbers come from the Financial Accounting Board's Original Pronouncements as amended 2008/2009 Edition, volume 3. Also, consult this volume for detailed listing of amendments, deletions, and other changes to the individual interpretations prior to 2009 (when the Accounting Standards Codification was issued.)
The three primary goals of the codification are "simplify user access by codifying all authoritative U.S. GAAP in one spot, ensure that the codification content accurately represented authoritative U.S. GAAP as of July 1, 2009, and to create a codification research system that is up-to-date for the released results of standard-setting activity."
The Financial Accounting Standards Board (FASB) publishes and maintains the Accounting Standards Codification (ASC), which is the single source of authoritative nongovernmental U.S. GAAP. [2] The FASB published U.S. GAAP in Extensible Business Reporting Language (XBRL) beginning in 2008.
1: Disclosure of Foreign Currency Translation Information: December 1973: Superseded by FAS 8 & FAS 52 2: Accounting for Research and Development Costs: October 1974: 3: Reporting Accounting Changes in Interim Financial Statements: March 1975: Replaced by SFAS No. 154 4: Reporting Gains and Losses from Extinguishment of Debt: March 1975 ...
Decimal: The standard Hindu–Arabic numeral system using base ten. Binary: The base-two numeral system used by computers, with digits 0 and 1. Ternary: The base-three numeral system with 0, 1, and 2 as digits. Quaternary: The base-four numeral system with 0, 1, 2, and 3 as digits.
As 100=10 2, these are two decimal digits. 121: Number expressible with two undecimal digits. 125: Number expressible with three quinary digits. 128: Using as 128=2 7. [clarification needed] 144: Number expressible with two duodecimal digits. 169: Number expressible with two tridecimal digits. 185
2.3434e−6 = 2.3434 × 10 −6 = 2.3434 × 0.000001 = 0.0000023434 The advantage of this scheme is that by using the exponent we can get a much wider range of numbers, even if the number of digits in the significand, or the "numeric precision", is much smaller than the range.