Prove that√2+√3+√5+√7 is irrational number
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Answer:
- Let's take that ✓2 is a rational number where √2 = p/q and are in their lowest terms.
p^2= 2q^2
p^2 is a multiple of 2
hence, p is a multiple of 2
let P= 2m
(2m)^2 = (√2q)^2
4m^2 = 2q^2
2m^2= q^2
q^2 is a multiple of 2
q is a multiple of 2
it is against our assumptions and hence it is proved that √2 is irrational.
Let's take that ✓3 is a rational number where √3 = p/q and are in their lowest terms.
p^2= 3q^2
p^2 is a multiple of 3
hence, p is a multiple of 3
let P= 2m
(3m)^2 = (√3q)^2
9m^2 = 3q^2
3m^2= q^2
q^2 is a multiple of 3
q is a multiple of 3
it is against our assumptions and hence it is proved that √3 is irrational.
- Let's take that ✓5 is a rational number where √5 = p/q and are in their lowest terms.
p^2= 5q^2
p^2 is a multiple of 5
hence, p is a multiple of 5
let P= 5m
(5m)^2 = (√5q)^2
25m^2 = 5q^2
5m^2= q^2
q^2 is a multiple of 5
q is a multiple of 5
it is against our assumptions and hence it is proved that √5 is irrational.
- Let's take that ✓7 is a rational number where √7 = p/q and are in their lowest terms.
p^2= 7q^2
p^2 is a multiple of 7
hence, p is a multiple of 7
let P= 7m
(7m)^2 = (√7q)^2
49m^2 = 7q^2
7m^2= q^2
q^2 is a multiple of 7
q is a multiple of 7
it is against our assumptions and hence it is proved that √7 is irrational.
Above it is clearly proved that √2 , √3 , √5 and √7 are irrational.
"The sum of irrational numbers will always be irrational. "
hence it is proved that the sum of √2 , √3 , √5 and √7 will be an irrational number.
hope it helps!
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