Question

How do you find the equation of the line tangent to `y=(x^2)(e^3x)` at the point where x=1/3?

Answer 1

Equation of tangent is `27y-9e^3x+2e^3=0`

Explanation:

As `y=(x^2)(e^3x)=e^3x^3` hence at `x=1/3`, `y=e^3(1/3)^3=e^3/27` i.e. curve passes through `(1/3,e^3/27)`.

Now `(dy)/(dx)=3e^3x^2` and hence as it gives the slope of the tangent at `(x,y)`,

slope is `3e^3(1/3)^2` or `e^3/3`

Hence equation of line passing through `(1/3,e^3/27)` and slope `e^3/3` is

`(y-e^3/27)=e^3/3(x-1/3)` or

`27y-e^3=9e^3x-3e^3` or

`27y-9e^3x+2e^3=0`