- #1
iceman713
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Hey, here's is my problem as the exam states it:
A) Write out the first four non-zero terms of the Maclaurin Series for F(x) = (1+X^{7})^{-4} Give all of the coefficients in exact form, simplified as much as possible.
B) Find the exact value of the 21st order derivative of F(x) = (1+X^{7})^{-4} evaluated at x=0
I can not figure out an efficient(or simple) way to find the expansion of the given function. At first I tried using the known series 1/(1-X) = \sum X^{n}
I replaced X in the equality with -X^7 to get \sum (-1)^{n}X^{7n}
After this though, I'm lost. Apparently I'm not allowed to just multiply the general term by 1/(1+X^7)^3. So I've no idea what to do. :(
Hopefully the solution to A simplifies the solution to B
A) Write out the first four non-zero terms of the Maclaurin Series for F(x) = (1+X^{7})^{-4} Give all of the coefficients in exact form, simplified as much as possible.
B) Find the exact value of the 21st order derivative of F(x) = (1+X^{7})^{-4} evaluated at x=0
I can not figure out an efficient(or simple) way to find the expansion of the given function. At first I tried using the known series 1/(1-X) = \sum X^{n}
I replaced X in the equality with -X^7 to get \sum (-1)^{n}X^{7n}
After this though, I'm lost. Apparently I'm not allowed to just multiply the general term by 1/(1+X^7)^3. So I've no idea what to do. :(
Hopefully the solution to A simplifies the solution to B
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