Question

How do you find the taylor series of `1 1x^2`?

Answer 1

The Taylor series basically hands us back `11x^2` ...

Explanation:

The Taylor series for `f(x)` about `0` is:

`f(0)+(f'(0))/(1!)x+(f''(0))/(2!)x^2+...`

For `f(x) = 11x^2`, we have

`f'(x) = 22x, f''(x) = 22, f'''(x) = 0,...`

So

`f(0) = 0`, `f'(0) = 0`, `f''(0) = 22`, `f'''(0) = 0`, ...

and the Taylor series is:

`f(0)+(f'(0))/(1!)x+(f''(0))/(2!)x^2+(f'''(0))/(3!)x^3+...`

`=0+0/(1!)x+22/(2!)x^2+0/(3!)x^3+...`

`=11x^2`