Answer: Rational, irrational and irrational.
Explanation:
According to the question, We have to prove that 2√7 is irrational.
Let us assume 2√7 is a rational number.
Then, by the property of rational number both 2 and √7 must be rational.
Since, we know that 2 is a rational number( because it is an integer).
Now, Let √7 is also a rational number so that √7=a/b where b≠0 and a and b are distinct numbers.
√7=a/b⇒√7a=b⇒[tex]7b^2=a^2[/tex] ----------(1) (by squaring both sides)
⇒7 is a multiple of [tex]a^2[/tex] ⇒ 7 is a multiple of a. --------(2)
So, we can write a=7k, where k is any number.
From equation (1) [tex]7b^2=(7k)^2\implies b^2=7k^2\implies 7[/tex] is a multiple of [tex]b^2[/tex]⇒7 is a multiple of b ----------(3)
From equation (1) and (2) 7 is multiple of both a and b.
⇒a and b can not be distinct. Therefore, our assumption is wrong and √7 is a irrational number⇒2√7 is a irrational number.
