Question

How do you find the equation of the tangent line to the graph of `y=ln(x*e^x)` at x=1?

Answer 1

Take the derivative of your function, then set `x=1`

Explanation:

`y' = (e^x+xe^x)/(xe^x)=(x+1)/x`

Plug in `x=1`

`((1)+1)/(1) = 2`

This is the slope of your tangent line.

Now we need a y-coordinate for our equation - lets go get it.

`y=ln(1*e^1) = lne = 1`

Use point-slope formula or whatever you're comfortable with:

`y-y_1 = m(x-x_1)`

`y-1=2(x-1)`

`y=2x-1 ->`Your tangent line equation.