How do you express as a product
log N^x-6
If you mean
log N^(x-6) = (x-6) log N
log N^x - 6 = log N^x + log 10^-6 = log (N^x * 10^-6)
Not sure just what you're after
thanks
To express log N^x-6 as a product, we can use the properties of logarithms. Specifically, we can use the power rule of logarithms, which states that log base b of M^n is equivalent to n times log base b of M.
Applying this rule, we can express log N^x-6 as a product:
log N^x-6 = (x-6) * log N
Therefore, log N^x-6 can be expressed as the product of (x-6) and log N.