Taylor series

gourish · 2014-05-27 18:52:51

hi i am interested in learning Taylor series but i still haven't come across integration to a good depth can i still learn it and can anybody help me learn it because i didn't get any good sites to learn it from....

P.S. i don't even know when is the Taylor series used... i am just curious to learn about it

Agnishom · 2014-05-27 19:41:48

http://www.mathsisfun.com/algebra/taylor-series.html

How can calculators find the sines and cosines for all reals? It is done through the taylor series. This is one example of an usage.

gourish · 2014-05-27 19:59:45

can i apply it to find the sum of sines where the angles are in Arithmetic progression? i mean i don't even know how to find the sum of such series by any method.... so the Taylor series can be helpful (if it can be used..)

Agnishom · 2014-05-27 20:08:41

I do not think you can apply it to find the sum of sines in an AP. You can post your problem however.

gourish · 2014-05-27 20:17:30

i posted my problem on the forum please help me find the answer for it.... it's bugging me from a long time...

bobbym · 2014-05-27 22:00:42

The Taylor series is the ultimate in osculating polynomials. Now who can say I ain't got no jargon in me?

gourish · 2014-05-28 02:11:21

osculating polynomials? can you elaborate please

bobbym · 2014-05-28 03:00:18

The osculating polynomials to quote Scheid not only match a given function at the specified value but also match the derivatives of the function at the specified points.

The Taylor polynomial for a given x0 is required to match the function and its first n derivatives. It is an osculating polynomial.

Agnishom · 2014-05-28 03:15:09

I've found a nice video tutorial on it.

Why do you want to bite the newbie?

bobbym · 2014-05-28 06:26:50

Bite? That is what an osculating polynomial is. Most people studying math only want the definition and the theorem, sometimes maybe the derivation.

ShivamS · 2014-05-28 07:45:19

We don't here about osculating polynomials until graduate courses.

bobbym · 2014-05-28 07:46:12

They are rarely covered even in numerical analysis.

ShivamS · 2014-05-28 07:48:59

I recall them coming up in a talk with a professor some time back and he mentioned they cover it in some graduate level course. I don't remember the details though.

A very good tutorial for Taylor Series is http://tutorial.math.lamar.edu/Classes/ … eries.aspx
or http://www.sosmath.com/calculus/tayser/ … ser01.html or http://www.math.hmc.edu/calculus/tutorials/taylors_thm/

Last edited by ShivamS (2014-05-28 07:49:21)

bobbym · 2014-05-28 07:57:44

One typical use is the problem of the railroad track.

ShivamS · 2014-05-28 08:05:11

That does not involve that polynomial?

bobbym · 2014-05-28 08:14:15

I am not following you.

ShivamS · 2014-05-28 08:15:24

bobbym wrote:

One typical use is the problem of the railroad track.

Use of what?

bobbym · 2014-05-28 08:19:58

The osculating polynomials.

ShivamS · 2014-05-28 08:36:49

ShivamS wrote:

That does not involve that polynomial?

I am not sure you can't use it to make the problem simpler, but you can solve it without that.

bobbym · 2014-05-28 08:51:01

Because the train must not derail on the curves the fit must not only take into account the collocation points it must fit the points of the first derivative too. this requires an osculating polynomial. All this is comes from the Scheid book.

gourish · 2014-05-28 20:11:32

well i need the Taylor series only for basic applications....

bobbym · 2014-05-28 20:16:59

The Taylor series is the backbone of numerical analysis and indeed all numerics. You can derive Newton;s method, Euler's, Runge Kutta and many others. Basically all it does is replace a function at a specific point with a big osculating polynomial. Why is this advantageous/ because since the time of newton we know everything about polynomials. The desire to replace all other functions with them is strong.

gourish · 2014-05-28 20:20:35

well... is there a function which cannot be expressed in the form of polynomials...

bobbym · 2014-05-28 20:26:11

There may be! I have never encountered one yet.

You probably like polynomials. Think of power series as "generalized" polynomials. Since (almost) all functions you encounter have a Taylor series, all functions can be thought of as "generalized" polynomials!

gourish · 2014-05-28 20:29:47

well i am stuck with my post on sum of sines with angles in A.P. i still didn't get to prove it can you help me on that?

Math Is Fun Forum

#1 2014-05-27 18:52:51

Taylor series

#2 2014-05-27 19:41:48

Re: Taylor series

#3 2014-05-27 19:59:45

Re: Taylor series

#4 2014-05-27 20:08:41

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#5 2014-05-27 20:17:30

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#6 2014-05-27 22:00:42

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#7 2014-05-28 02:11:21

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#8 2014-05-28 03:00:18

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#9 2014-05-28 03:15:09

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