Question

How do you use the first and second derivatives to sketch `y = e^(1-2x)`?

Answer 1

See argument below.

Explanation:

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

`dy/dx = d/dx e^(1-2x)`

Apply chain rule

`dy/dx = e^(1-2x) * d/dx (1-2x)`

Apply power rule

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

Similarly, `(d^2y)/dx^2 = +4e^(1-2x)`

For extrema points of `y, dy/dx =0`

However, in this case, `-2 e^(1-2x) <0 forall x in RR`

Consider, `lim_(x->+oo) -2 e^(1-2x) =0 and lim_(x->+oo) e^(1-2x) =0`

Also consider, `(d^2y)/dx^2 =+4e^(1-2x) >0 forall x in RR`

Hence, it seems reasonable to deduce that `y` tends to its minimum value of `0` as `x` tends to `+oo`

This helps us visualise the graph of `y` below.

The other important point we need for the graph is at `x=0`

Here, `y = e^(1-0) = e`

We see the point `(0,e)` on the graph below.

graph{e^(1-2x) [-5.69, 5.406, -1.722, 3.827]}