Question

What is the equation of the normal line of `f(x)=xe^x` at `x=3`?

Answer 1

`y-3e^3=-1/{4e^3}(x-3)`

Explanation:

Substituting `x=3` in the given function, we get y-coordinate of point is obtained as follows

`y=f(3)=3e^3`

Differentiating given function w.r.t. `x`, the slope of tangent `dy/dx` is

`dy/dx=f'(x)`

`=d/dx(xe^x)`

`=xe^x+e^x`

hence the slope of tangent at `x=3` is

`=f'(3)`

`=3e^3+e^3`

`=4e^3`

hence the slope `m` of normal at the same point `x=3` is given as

`m=-1/{f'(3)}`

`=-1/{4e^3}`

Now, the equation of normal at the point `(3, 3e^3)` & having slope `m=-1/{4e^3}` is given as follows

`y-3e^3=-1/{4e^3}(x-3)`