how many lies between square of 25 and 26
Answers
Answer:
The answer is below
Step-by-step explanation:
Since non-perfect square numbers between n^2and\ \left(n+1\right)^2\ are\ 2nn
2
and (n+1)
2
are 2n
Here, n = 25
Therefore, non-perfect square numbers between 25 and 26 = 2n = 2 x 25 = 50
Answer:
(i) Since, non-perfect square numbers between n^2\ and\ \left(n+1\right)^{2\ }are\ 2nn
2
and (n+1)
2
are 2n
Here, n = 12
Therefore, non-perfect square numbers between 12 and 13 = 2n = 2 x 12 = 24
(ii) Since non-perfect square numbers between n^2and\ \left(n+1\right)^2\ are\ 2nn
2
and (n+1)
2
are 2n
Here, n = 25
Therefore, non-perfect square numbers between 25 and 26 = 2n = 2 x 25 = 50
(iii) Since, non-perfect square numbers between n^2and\left(n+1\right)^2are\ 2nn
2
and(n+1)
2
are 2n
here, n = 99
Therefore, non-perfect square numbers between 99 and 100 = 2n = 2 x 99 = 198