This reply to some student got deleted, so I'm reposting it.
Cos(pi/4 + h) =
Cos(pi/4)Cos(h) - Sin(pi/4)Sin(h) =
1/sqrt(2)[1 - h - h^2/2 + h^3/6 + h^4/24 - h^5/120 - h^6/720 + ...]
Note that the way students like you are asked to solve this and similar problems is usually not the way people like me solve such problems.
It is a good exercise to plug in the function in the formula for Taylor expansions and do the differentiations and try to obtain the general formula for the n-the term.
However, such derivations can be tedious and it's easy to make mistakes. That's why sooner or later you will be required to know the series expansions of the standard functions like sin(x) cos(x) exp(x) etc. Then you can quickly derive series expansions without repeatedly differentiating functions.
Also, note that computer algebra systems do not use Taylor's formula to derive Taylor series at all! They utilize the expansions for standard functions plus some clever tricks.
In fact, if you ask a comuter algebra system to find the n-th derivative at some point, it will actually derive the n-th order term in the Taylor expansion around that point and extract the derivative that way. The number of computations required for that are of order Log(n). This means that computing the millionth derivative of some complicated function at some given point requires no more than a few dozen of operations.
Thanks, Count, I deleted your response in error, trying to get rid of all those question marks.
Thanks for reposting.
k thank you very much. so far i found the derviative for f(x)=cos(x) so i found f'(x)=-sin(x) , f''(x)=-cos(x) , f'''(x)=sin(x) and on...then i plugged in pie/4 into each for x. for i got f(pie/4)=.707, f'(pie/4)=-.707...and on...then i put it in a formula of
cos(x)=f(pie/4)/0factorial *(x-pie/4)^) and on...is this correct...i am following the formula from the book
Yes, if you just use the standard formula for the Taylor expansion you will also find the same formula. In my notation: x---> pi/4 + h, so that the powers of x - pi/4 are powers of h. And 0.707..= 1/sqrt(2), of course :)
Note in Count Iblis the term 2^(-1/2). Is that .707? Note how his signs alternate each second term ( 1 --++--++..).
Yes, if you follow the book, it will work out.
Reposting was not difficult, I could recover the posting by using the back button of my browser :)
so wut i am doing right now is that the answer? nd thanks so much for all your help
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