Prove that 6+√5 is irrational.
Answers
Answered by
10
6+√5 is an irrational number because it could not be written in the p/q form or if an irrational number is added with a rational number it results in irrational number
salonikumarisingh:
naa
Answered by
31
prove 6+√5is a irrational nos
Let us assume, to the contrary, that 6+√5 is irrational.
So we can find two integers numbers p and q(≠0), in the following way,
6+√5 = p/q [where p and q are co-prime]
Rearranging,
√5 = p/q - √6
√5 = [p - √6q]/q
But [p - √6q]/q is a rational nos
By fact √5 is a rational nos
our assumption is wrong
6+√5 is irrational nos
hope this will help u if u like my ans please mark brainly
Similar questions
English,
7 months ago
Biology,
7 months ago
Social Sciences,
7 months ago
Math,
1 year ago
Environmental Sciences,
1 year ago