N to the power of negative 5

N to the power of negative 5 is aready in its simplest form. Unless you know the value of N, this problem can't be solved any further.

To explain how to calculate N to the power of negative 5, we need to understand the concept of negative exponents.

When we raise a number, N, to a negative exponent, it means we need to take the reciprocal of N raised to the positive exponent. In other words, if we have N^(-5), we can rewrite it as 1/N^5.

So, to calculate N^(-5), we need to calculate N raised to the power of 5 and then take its reciprocal. However, without knowing the specific value of N, we cannot calculate the result.

For example, if N is equal to 2, then N^(-5) would be 1/2^5, which simplifies to 1/32 or 0.03125. But if N is any other value, the result would be different.

Therefore, without knowing the value of N, we cannot determine the exact result of N^(-5).