Number#
Sections#
Resources#
https://www.eng.auburn.edu/~nelson/courses/elec5200_6200/ELEC5200_6200 Chapter 3 Float.pdf
[ y ]
02-09-2016Brandon Olver. “Using the Euclidean algorithm to find solutions to linear Diophantine equations - Ex 1”.
Terms#
[ w ] Accuracy and Precision
[ w ] Addition, Pythagorean
[ w ] Algorism
[ w ] Approximation Error
[ w ] Arbitrary-Precision Arithmetic
[ w ] Arithmetic Underflow
[ w ] Balanced Ternary
[ w ] Base
[ w ] Block Floating-Point
[ w ] Coprocessor
[ w ] Decimal Floating-Point Arithmetic
[ w ] Decimal Representation
[ w ] Decimal Separator
[ w ] Divisor Sum Identities
[ w ] Dynamic Range
[ w ] Exponent Bias
[ w ] Extended Precision
[ w ] False Precision
[ w ] Fixed-Point Arithmetic
[ w ] Floating-Point Arithmetic
[ w ] Floating-Point Error Mitigation
[ w ] Floating-Point Operations Per Second (FLOPS)
[ w ] Floating-Point Unit (FLU)
[ w ] Guard Digit
[ w ] Half-Precision Floating-Point
[ w ] IEEE 754
[ w ] Interval Arithmetic
[ w ] Logarithmic Number System
[ w ] Machine Epsilon
[ w ] Mantissa
[ w ] Modular Exponentiation
[ w ] Nonstandard Positional Numeral System
[ w ] Normal Number
[ w ] Normalized Number [ numeral systems ]
[ w ] Numeral System
[ w ] Octuple-Precision Floating-Point
[ w ] Offset Binary
[ w ] Optimal Radix Choice
[ w ] Positional Numeral System
[ w ] Precision
[ w ] Propagation of Uncertainty
[ w ] Pythagorean Addition
[ w ] Quadruple-Precision Floating-Point
[ w ] Radix
[ w ] Repeating Decimal
[ w ] Roman Numerals
[ w ] Rounding
[ w ] Roundoff Error
[ w ] Scientific Notation
[ w ] Sign-Value Notation
[ w ] Signed Number Representations
[ w ] Signed-Digit Representation
[ w ] Significand
[ w ] Significant Figures
[ w ] Single-Precision Floating-Point
[ w ] Square Root Algorithm
[ w ] Subnormal Number
[ w ] Ternary Numeral System
[ w ] Unit in the Last Place