Question
- How close is the value of the frac of the largest normalized number to 1? In other words, how close is M to 2?
- How close is the value of the frac of the largest normalized number to 1? In other words, how close is M to 2? Yet another way of phrasing this question would be to ask: what is the value of (epsilon) in this expression 1 <= M <= 2 - ? Express your answer as a fractional decimal number (i.e., a real number R)
- Give an example of a real number that would overflow if we were trying to represent it using this 6-bit IEEE-like floating-point representation. Then convert this real number into a 6-bit IEEE-like floating-point representation and clearly indicate that it overflows.
H - What is the range (not contiguous) of fractional decimal numbers that can be represented using this 6-bit IEEE-like floating-point representation?
J - Give an example of a fractional decimal numbers that cannot be represented using this 6-bit IEEE-like floating-point representation, but is within the range of representable values, which you expressed as your answer to Q2 h. above.
please answer all
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