Question

How do you find the power series for `f(x)=1/(1-x^2)` and determine its radius of convergence?

Answer 1

`1/(1-x^2) = sum_(n=0)^oo (x^2)^n = 1 + x^2 + x^4 + x^6 + x^8 + cdots`

`-1 < x < 1`

Explanation:

We know that the power series for `1/(1-x)` is:

`1/(1-x) = sum_(n=0)^oo x^n = 1 + x + x^2 + x^3 + x^4 +cdots`

So, we can just plug in `x^2` for `x` to get our new power series:

`1/(1-x^2) = sum_(n=0)^oo (x^2)^n = 1 + x^2 + x^4 + x^6 + x^8 + cdots`

We can find our radius of convergence with the geometric series test. Since this sum is in the form `sumar^n`, we can use the rule that `|r| < 1`.

`|x^2| < 1`

`x^2 < 1`

`-1 < x < 1`

This is our interval. Now to check the endpoints, and then we'll be finished.

`sum_(n=0)^oo((-1)^2)^n = sum_(n=0)^oo1^n = 1+1+1+1+cdots`

`sum_(n=0)^oo(1^2)^n = sum_(n=0)^oo1^n = 1+1+1+1+...`

Both of these sums diverge, so our interval is:

`-1 < x < 1`

Final Answer