Question 1
Prove that √5 is irrational.
Question 1
Prove that √5 is irrational.
Let's take √5 as rational number.
We can write √5=ab such that,
a and b are integers, b≠0 and there are no factors common to a and b.
Multiply by "b" on both sides we get;
b√5=a
To remove root, squaring on both sides, we get,
5b2=a2 … (i)
That means, 5 is a factor of a2.
For any prime number p which is a factor a2 then it will be the factor of 'a' also.
So, 5 is a factor of 'a'. ------(ii)
Hence, we can write a = 5c for some integer 'c'.
Putting value of 'a' in equation (i) we get,
5b2=(5c)2
5b2=25c2
Divide by 5; we get,
b2=5c2
It means 5 is a factor of b2
Thus, 5 is a factor of b. ---(iii)
From (ii) and (iii), we can say that 5 is the factor of both 'a' and 'b'.
This contradicts our theory, as we stated that a and b have no factors in common
Thus, our assumption that √5 is rational is wrong.
Hence √5 is not a rational number, it is irrational.
Let's take √5 as rational number.
We can write √5=ab such that,
a and b are integers, b≠0 and there are no factors common to a and b.
Multiply by "b" on both sides we get;
b√5=a
To remove root, squaring on both sides, we get,
5b2=a2 … (i)
That means, 5 is a factor of a2.
For any prime number p which is a factor a2 then it will be the factor of 'a' also.
So, 5 is a factor of 'a'. ------(ii)
Hence, we can write a = 5c for some integer 'c'.
Putting value of 'a' in equation (i) we get,
5b2=(5c)2
5b2=25c2
Divide by 5; we get,
b2=5c2
It means 5 is a factor of b2
Thus, 5 is a factor of b. ---(iii)
From (ii) and (iii), we can say that 5 is the factor of both 'a' and 'b'.
This contradicts our theory, as we stated that a and b have no factors in common
Thus, our assumption that √5 is rational is wrong.
Hence √5 is not a rational number, it is irrational.
