prove that square root 29 is irrational
Answers
Step-by-step explanation:
It is not possible to break 29 into two such factors which, on squaring, give 29. It can be approximately written as a square of 5.385, which is a non-recurring and non-terminating decimal number. ... Yes, there is, both are prime numbers and are not perfect squares. So √29 is an irrational number.
Answer:
The square root of a number is the number that gets multiplied to itself to give the original number. The square root of 29 is 5.38516480713.so its irrational
Step-by-step explanation:
It is not possible to break 29 into two such factors which, on squaring, give 29.
It can be approximately written as a square of 5.385, which is a non-recurring and non-terminating decimal number.
This shows that it is not a perfect square, which also proves that the square root of 29 is an irrational number. & both are prime numbers and are not perfect squares. So √29 is an irrational number.