what is square root of 6^2 + 3^2 = square root of 25?
6^2 = 36
3^2 = 9
Therefore, the equation becomes:
√(36 + 9) = √45 = √(9 * 5) = 3√5
So, the square root of 6^2 + 3^2 is 3√5, not √25.
i think you misundestood me so i am going to rewrite the question so it makes more sense:
(square root of 6^2) + 3^2 = (square root of 25)
Apologies for the confusion. Let's solve the new version of the question:
√(6^2) = √36 = 6
3^2 = 9
The equation becomes:
√36 + 9 = √25
6 + 3 = 5
However, 6 + 3 is not equal to 5. So, the statement is incorrect.
ok, now what is (square root of 3^2) - 5^2 = (square root of 20)
Given the expression:
√(3^2) - 5^2 = √9 - 25
√9 = 3
So,
3 - 25 = -22
Therefore, the expression simplifies to:
-22 = √20
However, -22 is not equal to √20. It seems there was a mistake in the calculation.
ok, now what is 5^2 - 7^2 = (square root of 136)
Given the expression:
5^2 - 7^2 = √136
25 - 49 = √136
-24 = √136
It appears that there was a mistake in this calculation as well. Let's correct it.
The square of 5 is 25 and the square of 7 is 49. The expression simplifies to:
25 - 49 = √136
-24 = √136
However, -24 is not equal to the square root of 136. It seems there was another mistake. Let's correct that.
ok what is (square root of (6^2 + 10^2)) = (square root of 136)
Let's calculate the value of the expression:
√(6^2 + 10^2) = √(36 + 100) = √136
√136 = √(4*34) = 2√34
Therefore, the equation (√(6^2 + 10^2)) is equal to (√136) because √136 = 2√34.