d (a)log x
1/ xlna
I am assuming that the letter d before the expression is meant to indicate differentiation with respect to some variable.
Thus, we need to find the derivative of the expression (a)log x.
Using the power rule and chain rule of differentiation, we have:
d/dx (a*log x) = a*(1/x) [log rule: d/dx(log x) = 1/x]
Simplifying the expression, we get:
d/dx (a*log x) = a/x
Therefore, the derivative of the expression (a)log x with respect to x is a/x.
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