Taylor Definition and 878 Threads

In mathematics, the Taylor series of a function is an infinite sum of terms that are expressed in terms of the function's derivatives at a single point. For most common functions, the function and the sum of its Taylor series are equal near this point. Taylor's series are named after Brook Taylor, who introduced them in 1715.
If zero is the point where the derivatives are considered, a Taylor series is also called a Maclaurin series, after Colin Maclaurin, who made extensive use of this special case of Taylor series in the 18th century.
The partial sum formed by the first n + 1 terms of a Taylor series is a polynomial of degree n that is called the nth Taylor polynomial of the function. Taylor polynomials are approximations of a function, which become generally better as n increases. Taylor's theorem gives quantitative estimates on the error introduced by the use of such approximations. If the Taylor series of a function is convergent, its sum is the limit of the infinite sequence of the Taylor polynomials. A function may differ from the sum of its Taylor series, even if its Taylor series is convergent. A function is analytic at a point x if it is equal to the sum of its Taylor series in some open interval (or open disk in the complex plane) containing x. This implies that the function is analytic at every point of the interval (or disk).

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  1. binbagsss

    Taylor Expansion/Equilibrium/Dependence of variables

    Okay the question is, after just attaining an expression for a second-order Taylor series expansion of the Coulomb potential Vc about an arbitrary value r = a, call this *,. to use this to attain an expression for V(x1,x2,x3) with the values of a determined by the equillibrium values of x1 , x2...
  2. F

    MHB Taylor Series Expansion of $e^{-(q+s)^2}$

    Use taylor series to show that the infinite series from n=0 of $$\frac{s^n}{n!}\frac{d^n}{dq^n}(e^{-q^2})=e^{-(q+s)^2}$$
  3. M

    Calculate 2nd order Taylor polynomial of a given function

    Homework Statement . Let ##f:\mathbb R^2 \to \mathbb R## / ##f \in C^2##, ##f(0,0)=0## and ##\nabla f(0,0)=(0,1)## ##Df(0,0)=\begin{pmatrix} 1 & 1\\ 1 & 2\\ \end{pmatrix}## Let ##g:\mathbb...
  4. T

    The book: Spacetime Physics (Taylor - Wheeler) - missing solutions

    Hi I have buyed the book Spacetime physics - Introduction to Special Relativity; Second Edition. It is a great book, although I am currently only at second chapter. There are exercises with solutions in this book. The problem is, there are solutions only to odd numbered exercises. Can I...
  5. A

    Tenth taylor polynomial for sinx

    Homework Statement So, we are supposed to find the tenth taylor polynomial of sinx. On wolfram, I get a final term with x^11 at the end. How does that make sense?! According to the formula, n=10 so the maximum degree should be 10... Homework Equations Taylor polynomial formula. The...
  6. L

    Complex Analysis - Taylor series of 1/(1+exp(z))

    Homework Statement Compute the first four terms of the Taylor series of \frac{1}{1+e^{z}} at z_{0} = 0 and give it's radius of convergence. Homework Equations e^{z} = \sum\frac{z^{n}}{n!} = 1 + z +\frac{z^{2}}{2!} + \frac{z^{3}}{3!} + o(z^{3}) \frac{1}{1+w} =...
  7. I

    Taylor Series, Binomial Series, Third Order Optics

    Homework Statement Show that if cosΦ is replaced by its third-degree Taylor polynomial in Equation 2, then Equation 1 becomes Equation 4 for third-order optics. [Hint: Use the first two terms in the binomial series for ℓ^{-1}_o and ℓ^{-1}_i. Also, use Φ ≈ sinΦ.] Homework Equations Sorry that...
  8. X

    Taylor Series Help: Determine Real Number

    Homework Statement Determine the real number to which the series \sum^{∞}_{k=1} (2-e)^k/2^k(k!) Homework Equations I know that e^x = the series of x^k / k The Attempt at a Solution I would assume to sub in 2-e for x, but then that takes away the x.
  9. X

    Use Taylor Series To Evaluate

    1. Homework Statement [/b] use taylor series to evaluate lim x -> 0 of \frac{ln(x)}{(x-1)}[b] Homework Equations I know that -ln (1-x) taylor polynomial and that of ln (1+x) The Attempt at a Solution Using the basics that I know I would assume I would just make ln (1+x) = ln (x)...
  10. X

    Why Does the Taylor Polynomial of Ln(x) Alternate in Sign?

    I need help understanding why the ln (x) taylor polynomial is (x-1)-1/2(x-1)^2... + etc. I cannot grasp the concept..
  11. J

    Taylor series for a complex function

    Homework Statement Find the 5 jet of the following function at z=0: f(z) = \frac{sinhz}{1+exp(z^3)} Homework Equations \frac{1}{1-z}=\sum_{n=0}^\infty z^n where z=-exp(z^3) The Attempt at a Solution I have tried to multiply the series for sinhz by the series for \frac{1}{1-(-exp(z^3))} but...
  12. F

    Alternating Series estimation theorem vs taylor remainder

    Homework Statement Let Tn(x) be the degree n polynomial of the function sin x at a=0. Suppose you approx f(x) by Tn(x) if abs(x)<=1, how many terms are need (what is n) to obtain an error less than 1/120 Homework Equations Rn(x)=M(x-a)^(n+1)/(n+1)! sin(x)=sum from 0 to ∞ of...
  13. H

    Where Can I Find Information on Testing the Convergence of Taylor Series?

    Homework Statement Where does the Taylor series converge? [You do not need to find the Taylor Series itself] f(x)=... I have a few of these, so I'm mainly curious about how to do this in general. The Attempt at a Solution I haven't really made an attempt yet. If I were to make an...
  14. Feodalherren

    Taylor series integration of cosx -1 / x

    Homework Statement ∫((cosX)-1)/x dx Homework Equations Taylor Series The Attempt at a Solution My approach was basically to to split the integral into two more manageable parts which gave me ∫(cosX/x)dx - ∫(1/x)dx The solutions manual did it completely differently and...
  15. E

    Taylor Series for Complex Variables

    Homework Statement Obtain the Taylor series ez=e Ʃ(z-1)n/n! for 0\leq(n)<\infty, (|z-1|<\infty) for the function f(z)=ez by (ii) writing ez=ez-1e. Homework Equations Taylor series: f(z) = Ʃ(1/2\pi/i ∫(f(z)/(z-z0)n+1dz)(z-z0)n The Attempt at a Solution The first part of this...
  16. E

    Taylor Polynomial Problem: What is f´(1)?

    Hi, I would really appreciate it if someone can help me with the following problem, regarding a taylor polynomial: A 2nd degree taylor polynomial to the function f around x = 1, is given by: T_2(x) = x + x^2 Question: What is f´(1) ? Answer: 3 (Btw: the question is from a multiple...
  17. U

    Taylor Expansion on Determinant

    Homework Statement Show by direct expansion that: det (I + εA) = 1 + εTr(A) + O(ε2) Homework Equations f(x) = f(a) + (x-a)f'(a) + (1/2)(x-a)2f''(a) + ... The Attempt at a Solution Does the question mean Taylor expansion when they say 'direct expansion'? I'm kind of stuck on...
  18. V

    How Do I Transform Coefficients in a Taylor Series Differential Equation?

    So, I have this DE which is 2nd order, w/ variable coefficients, it goes; xy''+(x-5)y'+(x^2-4)y=0 revolving around x_0=4. I know there's a singular point at 0 and I assume to use a summation y(x)=[∞,Ʃ,n=0] a_n(x-x_0)^n pardon me I don't know how to type the summation symbol, but that's...
  19. K

    John Taylor Classical Mechanics Chapter 5, Problem 29

    John Taylor "Classical Mechanics" Chapter 5, Problem 29 Homework Statement An undamped oscillator has period t(0)=1 second. When weak damping is added, it is found that the amplitude of oscillation drops by 50 percent in one period r1. (the period of the damped oscillations defined as time...
  20. F

    Approximating Distance with a Second-Degree Taylor Polynomial

    Homework Statement A car is moving with speed 10m/s and acceleration 1 m/s^2 at the given instant. Using a second-degree Taylor polynomial, estimate how far the car moves in the next second. Homework Equations The Attempt at a Solution I don't get how you're supposed to apply...
  21. Z

    How Do You Calculate the Taylor Expansion of e^(2-x)?

    Homework Statement Find e^{2-x} using taylor/mclaurin expansionHomework Equations e^1 = \sum_{n=0}^\inf \frac{1}{n!} e^x = \sum_{n=0}^\inf \frac{x^n}{n!} The Attempt at a Solution Can I just do: e^{1+1-x} [\sum_{n=0}^\inf \frac{1}{n!}*\sum_{n=0}^\inf \frac{1}{n!} *...
  22. Z

    JasonWhat is the Taylor series for ln(x+2) about x = 0?

    Homework Statement Using power series, expand ln(x + 2) about a = 0 (Taylor series) Homework EquationsThe Attempt at a Solution Is this appropriate? ln(x+2) = ln((x+1)+1) x' = x+1 ln(x'+1) = \sum_{n=0}^{\inf} \frac{(-1)^n}{n+1}(x')^{n+1} or ln(x+2) = ln(\frac{x}{2}+1) x' =...
  23. M

    Expanding Inhomogeneous Poisson Processes Using Taylor Series

    I'm at the end of a very long Poisson Processes question, involving inhomogeneous Poisson Processes. I just need to be able to expand the following expression to be able to complete the question. exp[{(sin ∏h)/∏} -h] Would anyone please be able to provide some help, with steps please!
  24. R

    Taylor Expansion of f+df About x?

    How would one expand f+df about x? I'm messing something up in the process and can't seem to resolve it lol
  25. K

    John Taylor Classical Mechanics Chapter 3, Problem 7

    John Taylor "Classical Mechanics" Chapter 3, Problem 7 1. Homework Statement [/b] The first couple of minutes of the launch of a space shuttle can be described very roughly as follows: The initial mass is 2x10^6kg, the final mass (after 2 min) is about 1x10^6 kg, the average exhaust speed is...
  26. mnb96

    Question on Taylor expansion of first order

    Hello, according to my textbook, the Taylor expansion of first order of a scalar function f(t) having continuous 2nd order derivative is supposed be: f(t) = f(0) + f'(0)t + \frac{1}{2}f''(t^*)t^2 for some t^* such that 0\leq t^* \leq 1 Quite frankly, I have never seen such a formulation...
  27. B

    How Does Taylor's Mechanics Address Rocket Momentum with Changing Mass?

    Hello, I am reading section 3.2, concerning the analyzation of a moving rocket with a changing mass. (I couldn't find a preview of the book in google books, so hopefully someone out there has this textbook.) Here is an except from the book, but be warned that I am adding notes in brackets...
  28. TheFerruccio

    How do I find the Taylor Series of ##\frac{q}{\sqrt{1+x}}## around x = 0?

    This is rather embarrassing, because I should have known how to do this for years. Question: Compute the Taylor Series of ##\frac{q}{\sqrt{1+x}}## about x = 0. Attempt at Solution: Term-wise, I have gotten... ##f(0)+f'(0)+f''(0)+... =...
  29. D

    Determinants and taylor expansion

    I'm doing a proof, and near the last step I want to write the expression, \frac{d}{dt} \det{A(t)} = \lim_{\epsilon \to 0} \frac{\det{(A+\epsilon \frac{dA}{dt})} - \det{A}}{\epsilon} which produces the right answer, so I believe that it may be correct. This looks very much like a Taylor...
  30. C

    The resulting webpage title could be: Simplifying Limits with Taylor Series

    Homework Statement \lim_{x \to 0}[\frac{\sin(\tan(x))-\tan(\sin(x))}{x^7}]Homework Equations \sin(x)=x-\frac{x^3}{3!}+\frac{x^5}{5!}-\frac{x^7}{7!} + ... \tan(x)=x+\frac{x^3}{3}+\frac{2x^5}{15}+\frac{17x^7}{215}+ ...The Attempt at a Solution I have an idea of how to do this by replacing...
  31. Y

    Nth Derivatives and Taylor Polynomials

    Homework Statement Show that if f^{(n)}(x_0) and g^{(n)}(x_0) exist and \lim_{x \rightarrow x_0} \frac{f(x)-g(x)}{(x-x_0)^n} = 0 then f^{(r)}(x_0) = g^{(r)}(x_0), 0 \leq r \leq n . Homework Equations If f is differentiable then \lim_{x \rightarrow x_0}\frac{f(x)-T_n(x)}{(x-x_0)^n}=0 ...
  32. K

    John Taylor Classical Mechanics Chapter 1 Problem 46

    Homework Statement Problem 27 Experiment needed first: The hallmark of inertial ref. frames is that any object subject to 0 net force travels in straight line at a constant speed. Consider the following experiment: I am standing on the ground (which we shall take to be an inertial frame)...
  33. C

    Taylor Series: Simple Homework Statement, Find 1st & 2nd Terms

    Homework Statement "Determine the first two non-vanishing terms in the Taylor series of \frac{1-\cos(x)}{x^2} about x = 0 using the definition of the Taylor series (i.e. compute the derivatives of the function)." So I know how compute the Taylor series about x=0; it involves finding f(0)...
  34. Fernando Revilla

    MHB Verification of Limit Using Taylor Expansion: x-ln(1+x)/x^2 = 1/2

    I quote a question from Yahoo! Answers I have given a link to the topic there so the OP can see my response.
  35. R

    About Taylor & Wheeler 3-1 practice problem

    Hi, I'm an amateur italian physics addict, so please sorry for my english, eventually. I'm reading carefully the Taylor & Wheeler 2nd edition, and I'm trying to do all the problems before jumping to the next chapter. Practice problem 3-1, page 78: let's talk about point b. Here we have two...
  36. K

    John Taylor Classical Mechanics Chapter 1 Problem 22

    Homework Statement The two vectors a and b lie in the xy plane and make angles (alpha and beta) with the x axis. a. by evaluating a dot b in two ways prove the well known trig identity cos(alpha-beta)=cosalphacosbeta +sinalphasinbeta Homework Equations adotb=abcostheta=axbx+ayby The...
  37. K

    John Taylor Classical Mechanics Chapter 3, Problem 1

    John Taylor "Classical Mechanics" Chapter 3, Problem 1 Homework Statement Consider a gun of mass M (when unloaded) that fires a shell of mass m with muzzle speed v. (shell's speed relative to gun is v). Assuming gun is completely free to recoil (no ext. forces on gun or shell), use...
  38. F

    Indeterminate forms of Taylor series

    Can someone please explain how the taylor series would work if x, the given value from the function, is equal to a, the value at which you expand the function? For example, let's take 1/(1-x) as an example. The taylor series for this with a=0 is Ʃ(n from 0 to infinity) x^n. But if we let...
  39. O

    What should i do after using Taylor series?

    Homework Statement The first equation on the uploaded paper converts to the last equation.Homework Equations when i substitute ln (1-u)=-u-(1/2)(u^2) into the first equation, i can get the first term in (3rd equation). but the second term of the 3rd equation ?The Attempt at a Solution I tried...
  40. C

    Functional or regular (partial) taylor series in Field theory

    When expanding a function (for example the determinant of the space-time metric g) as a functional of a perturbation from the flat metric ##h_{\mu \nu}##, i.e. ##g_{\mu \nu} = \eta_{\mu \nu} + h_{\mu \nu} ## i would think that the thing to do is to recognize that ##g_{\mu \nu}## and thus also...
  41. S

    MHB Taylor series: Changing point of differentiation

    Continuing from http://www.mathhelpboards.com/f10/taylor-series-x-%3D-1-arctan-x-5056/: The discussion in that thread gave rise to a general question to me: Does not the point of differentiation change when one makes the substitution h = x -a? I like Serena affirmed this "conjecture but...
  42. D

    Classical Mechanics : Taylor or Morin?

    My requirements are : - Text should be at an undergrad level (I will be starting my 2nd year soon). - Should contain a large number of solved examples, but not many questions (I would like the questions to be of good quality though, so that I don't have to choose which questions to...
  43. S

    MHB Taylor series at x = 1: arctan(x)

    Hey forum. Is there any way one can take advantage of the Maclaurin series of \arctan (x) to obtain the Taylor series of \arctan (x) at x = 1? I attempted to obtain the series in the suggested manner but to no avail. We have \arctan (x) = \sum_{n=0}^\infty \frac { f^{(n)}(1) }{n!} (x - 1)^n...
  44. DeusAbscondus

    MHB How to use Taylor series to represent any well-behaved f(x)

    Does one assess $x$ at $x=0$ for the entire series? (If so, wouldn't that have the effect of "zeroing" all the co-efficients when one computes?) only raising the value of $k$ by $1$ at each iteration? and thereby raising the order of derivative at each...
  45. DeusAbscondus

    MHB What Does Sigma Notation Tell Us About Evaluating e^x?

    Hi folks, If $e^x= \Sigma_{k=0}^\infty \frac{x^k}{k!}$ what do I evaluate $x$ at? How does the sigma notation tell me what to do with $x$? $$e^x= \Sigma_{k=0}^\infty \frac{x^k}{k!}\ = 1+x+\frac{x^2}{2!}+\frac{x^3}{3!}+\frac{x^4}{4!} ... \text {ad infinitum}$$ Sorry, I just realized my error...
  46. A

    Taylor expansion at infinity of x/1+e^(1/x)

    I have some problems finding Taylor's expansion at infinity of f(x) = \frac{x}{1+e^{\frac{1}{x}}} I tried to find Taylor's expansion at 0 of : g(u) = \frac{1}{u} \cdot \frac{1}{1+e^u} \hspace{10 mm} \mbox{ where } \hspace{10 mm} u = 1/x in order to then use the known expansion of...
  47. fluidistic

    How Does Taylor Expansion in Thermodynamics Prove a Stability Condition?

    Homework Statement I'm asked to show that the relation ##S(U+\Delta U, V+ \Delta V , n )+S(U-\Delta U, V- \Delta V , n ) \leq 2 S(U,V,n)## implies that ##\frac{\partial ^2 S}{\partial U ^2 } \frac{\partial ^2 S}{\partial V ^2}- \left ( \frac{\partial ^2 S }{\partial U \partial V} \right ) \geq...
  48. Petrus

    MHB Calculate Taylor Series of f^{(18)}(0)

    Calculate f^{(18)}(0) if f(x)=x^2 \ln(1+9x) if we start with ln(1+9x) and ignore x^2 we can calculate that f'(x)= \frac{9}{1+9x} <=> f'(0)=9 f''(x)= \frac{9^2}{(1+9x)^2} <=> f'(0)=9^2 . . . f^{n}(x)= \frac{9^n}{(1+9x)^n} <=> f'(0)=9^n how does it work after? Don't we have to use product rule...
  49. Petrus

    MHB Tackling Taylor Series with f(x)=sin(x^3)

    Hello MHB, I am working with Taylor series pretty new for me, I am working with a problem from my book f(x)=\sin(x^3), find f^{(15)}(0). I know that \sin(x) = 1-\frac{x^3}{3!}+\frac{x^5}{5!}-\frac{x^7}{7!}...Rest How does this work now =S? Regards, |\pi\rangle
  50. P

    Taylor Expansion where the derivatives are undefined?

    Homework Statement Expand x/(x-1) at a=1 The book already gives the expansion but it doesn't explain the process. The expansion it gives is: x/(x-1) = (1+x-1)/(x-1) = (x-1)^(-1) + 1 Homework Equations The Attempt at a Solution I've already solved for the Mclaurin expansion for the same...
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