Guest Session: 1 Question Remaining. Create Account to save progress.
Login
Power Seriesmedium
0:00.0

Using the binomial series for (1+x)r=∑n=0∞(rn)xn(1+x)^r = \sum_{n=0}^{\infty} \binom{r}{n} x^n(1+x)r=∑n=0∞​(nr​)xn, where (rn)=r(r−1)⋯(r−n+1)n!\binom{r}{n} = \frac{r(r-1)\cdots(r-n+1)}{n!}(nr​)=n!r(r−1)⋯(r−n+1)​, find the first three nonzero terms of the Maclaurin series for f(x)=1+x3f(x) = \sqrt[3]{1+x}f(x)=31+x​ on its interval of convergence.