Question

How do you differentiate `y= log _a x`?

Answer 1

`y' = 1/(xln a)`

Explanation:

the easiest way is to shift the base to e

so `y = log_a x = (log_e x)/(log_e a)` {small demo of what that is so is set out below}

thusly

`y' = 1/x *1/(log_e a) = 1/(xln a)`

the demo

`y = log_a x implies a^y = x` by definition

so we choose to use natural logs because they work so well with calculus

`ln a^y = ln x`

`y ln a = ln x`

`y = ( ln x)/(ln a)`