Question

Suppose `g` is a function whose derivative is `g'(x)=3x^2+1` Is `g` increasing, decreasing, or neither at `x=0`?

Answer 1

Increasing

Explanation:

`g'(x)=3x^2+1>0` , `AA` `x` `in` `RR` so `g` is increasing in `RR` and so is at `x_0=0`

Another approach,

`g'(x)=3x^2+1` `<=>`

`(g(x))'=(x^3+x)'` `<=>`

`g`, `x^3+x` are continuous in `RR` and they have equal derivatives, therefore there is `c` `in` `RR` with

`g(x)=x^3+x+c`,
`c` `in` `RR`

Supposed `x_1`,`x_2` `in` `RR` with `x_1<` `x_2` `(1)`

`x_1<` `x_2` `=>` `x_1^3<` `x_2^3` `=>` `x_1^3+c<` `x_2^3+c` `(2)`

From `(1)+(2)`

`x_1^3+x_1+c<` `x_2^3+x_2+c` `<=>`

`g(x_1)<` `g(x_2)` `->` `g` increasing in `RR` and so at `x_0=0` `in` `RR`