The number 8/7 = 1.14285714285714 ... obviously has no exact representation in any decimal floating point system (beta = 10) with finite precision t. Is there a finite floating point system (i.e., some finite integer base beta and precision t) in which this number does have an exact representation? If yes, then describe such a system. Answer the same question for the irrational number pi.

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codiepienagoya codiepienagoya · Answer 1 · 2020-09-21T11:27:28+02:00

Answer:

The answer to this question can be defined as follows:

Step-by-step explanation:

In the first point:

Yes, the Finite Floating Point Structures are considered Where [tex]\beta = 7[/tex]

[tex]\to \frac{8}{7}= (1.1)_7[/tex]

[tex]\bold{= 1 \times 7^0 + 1 \times 7^{-1}}\\\\[/tex]

In the second point:

There is no device with a finite floating-point since the right side is

This equality never happens, then, with the rational numbers ([tex]\alpha_i[/tex] and [tex]\beta[/tex] is rational).