Prove that √7-√5 is an irrational number
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Let us prove that √5 is an irrational no by contradiction
Let us assume that √5 is a rational no
√5=p/q where p and q are integers, coprimes and q isn't equal to 0
√5q=p
Squaring on both sides
5q^2=p^2
It means p^2 is a multiple of 5
then p is also a multiple of 5
p=5r(let r be some integer)
Squaring on both sides
p^2=25r^2
We know that p^2=5q^2
5q^2=25r^2
q^2=25r^2/5
q^2=5r^2
It means q^2 is a multiple of 5
q is also a multiple of 5
But it contradicts tht p and q are co primes
So our assumption that √5 is rational is wrong
So √5 is irrational
In the same way by putting √7 in the place of √5 we can prove that √7 is irrational
Hope is answer helps you!!
Let us prove that √5 is an irrational no by contradiction
Let us assume that √5 is a rational no
√5=p/q where p and q are integers, coprimes and q isn't equal to 0
√5q=p
Squaring on both sides
5q^2=p^2
It means p^2 is a multiple of 5
then p is also a multiple of 5
p=5r(let r be some integer)
Squaring on both sides
p^2=25r^2
We know that p^2=5q^2
5q^2=25r^2
q^2=25r^2/5
q^2=5r^2
It means q^2 is a multiple of 5
q is also a multiple of 5
But it contradicts tht p and q are co primes
So our assumption that √5 is rational is wrong
So √5 is irrational
In the same way by putting √7 in the place of √5 we can prove that √7 is irrational
Hope is answer helps you!!
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