Question

What is the derivative of `5^(-1/x)`?

Answer 1

Use logarithmic differentiation to obtain the answer:
`dy/dx = ln(5)5^(-1/x)/x^2`

Explanation:

Let `y = 5^(-1/x)`

Use the natural logarithm on both sides:

`ln(y) = ln(5^(-1/x))`

On the right, use the property `ln(a^b) = (b)ln(a)`:

`ln(y) = (-1/x)ln(5) = -ln(5)/x`

Differentiate both sides:

`(d(ln(y)))/dx = (d(-ln(5)/x))/dx`

`1/ydy/dx = ln(5)/x^2`

Multiply both sides by y:

`dy/dx = ln(5)y/x^2`

Substitute `5^(-1/x)` for y:

`dy/dx = ln(5)5^(-1/x)/x^2`