If a . b . c , d are rationals and x is irrational number, then prove

Eden Solomon

Eden Solomon

Answered question

2022-06-15

If a . b . c , d are rationals and x is irrational number, then prove that a x + b c x + d is usually a irrational number. When do exceptions occur?

Answer & Explanation

robegarj

robegarj

Beginner2022-06-16Added 24 answers

The criterion is the following: If a d b c 0 and x Q then
y := a x + b c x + d
is irrational as well, but if a d b c = 0 then y is rational, or undefined.
Proof. Assume c 0. Then c x + d is irrational, hence 0, and we may write
y = a c a d b c c ( c x + d )   .
If a d b c 0 then the last fraction, and therewith y, is irrational. If a d b c = 0 then y = a c is rational.
The case c = 0 is even simpler: If d = 0 as well then y is undefined. If d 0 then a d b c 0 means a 0. Therefore
y = a d x + b d
is irrational if a d b c 0, and is = b d , if a d b c = 0.

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