Mathematics, 14.09.2019 05:30 eddie2468
Finite precision, floating point, machine precision, denornal you bought a really old, cheap calculator from a shady character behind the student union. let's pretend it can only store numbers in 2-significant figure, base-10, floating point form d. d x 100-5 where each d is a base-10 (decimal) integer between 0-9. assume the first d in the mantissa must always be non- zero, unless the d in the exponent is o in which case the number becomes "denormal" (then the first d in the mantissa is forced to be zero). (a) how would this calculator represent the following numbers? i. 62.954 ii. 0.0004896 iii. 0.93 iv. 0.28 (b) what is machine precision (e) for this calculator? (c) what is the largest positive number that can be stored? (d) what is the smallest positive number that can be stored which is i. not denormal ii. denormal?
Answers: 2
Mathematics, 21.06.2019 21:20, KennyMckormic
The radius of the circle below intersects the unit circle at (3/5,4/5). what is the approximate value of theta? 0.6 radians 1.0 radians 36.9 degrees 53.1 degrees
Answers: 3
Mathematics, 22.06.2019 04:00, misstaejailicious200
Create a varationof radical symbol y=a a (x-h)+k function graph the parent function with all 4 varations question: how did each variable change affect the graph? use (desmos) graphing to graph the it
Answers: 2
Finite precision, floating point, machine precision, denornal you bought a really old, cheap calcula...
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