show that 7-√5 is irrational given that √5 is irrational
Answers
Answer:
By taking the square root you will get the answer.
Step-by-step explanation:
Hope it helps you
Answer:
7-√5 is irrational. The proof is given below
Step-by-step explanation:
1st Method
Let us assume, to the contrary, that 7-√5 is rational
That is, we can find Coprime a and b (b≠ 0) such that
7-√5 = a/b
Therefore, 7 - a/b = √5
Rearranging this equation √5 = (7b -a)/b
since a and b are integers,so (7b -a)/b is an rational.
And so √5 is rational
But this contradicts the fact that √5 is irrational.
This contradiction has arisen because of our incorrect assumption that 7-√5 is rational.
Therefore we can conclude that 7-√5 is irrational.
2nd Method :
We have the sum or difference of one rational and one irrational number is also an irrational number.
Here 7-√5 have 7 is rational number and √5 is irrational number
Therefore 7-√5 is also irrational number.