Rewriting rational function in the form of partial fractions is often useful when calculating integrals.

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Simple partial fractions questions with fractions in the numerator.

$$ \dfrac{1}{\left(x+1\right)\left(2x+1\right)}$$ Using the cover up rule, I received the answer of $$\dfrac{\dfrac{1}{2}}{2x+1}-\frac{1}{x+1}$$ or $$\dfrac{1}{2(2x+1)}-\frac{1}{x+1}$$ Answer ...
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0answers
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Reciprocals of theta functions

I've spent the last few months with partial fraction expansions, and thought to create a function with simple poles over a lattice of zeros, like that of any of the Jacobi theta functions... but I ...
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3answers
39 views

How to Decompose into Partial Fractions?

I need to decompose (1/((s - 2)^(2) + 1^(2))) into partial fractions, but I am not sure how exactly. Here are my attempts: Attempt 1 (1/((s - 2)^(2) + 1^(2))) = (A/(s - 2)) + (B/(s - 2)^(2)) + ...
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5answers
119 views

Partial fraction of $\frac 1{x^6+1}$

Can someone please help me find the partial fraction of $$1\over{x^6+1}$$ ? I know the general method of how to find the partial fraction of functions but this seems a special case to me..
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2answers
79 views

Integral of $\int \frac{x+1}{(x^2+x+1)^2}dx$

I'm currently learning Calculus II and I have the following integral: Integal of $\large{\int \frac{x+1}{(x^2+x+1)^2}dx}$ I've tried with partial fractions but it led nowhere, I've tried with ...
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2answers
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The partial fraction decomposition of $\dfrac{x}{x^3-1}$

I was trying to decompose $\dfrac{x}{x^3-1}$ into Partial Fractions. I tried the following: $$\dfrac{x}{(x-1)(x^2+x+1)}=\dfrac{A}{(x-1)}+\dfrac{B}{(x^2+x+1)}$$ $$\Longrightarrow A(x^2+x+1)+B(x-1)=x$$ ...
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How do I find $\frac {x^3}{x(x-3)}$ partial fractions?

How do I find $\frac {x^3}{x(x-3)}$ partial fractions? And in general, when the degree of the numerator is higher than the denominator's? Thanks in advance for your assistance!
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Partial fraction decomposition of $\frac{x-1}{x^3+x^2}$

Why the partial fraction expansion of $\frac{x-1}{x^3+x^2}$ is $$\frac{A}{x} + \frac{B}{x^2} + \frac{C}{x+1}$$ if I only have that $x^3 + x^2$ is the same as $x^2(x + 1)$?
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3answers
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Partial fraction decomposition of $ \frac{\pi}{\sin \pi z}$

i want to prove the partial fraction decomposition: \begin{align}\frac{\pi}{\sin \pi z} = \frac{1}{z} + 2z\sum\limits _{n=1} ^{\infty} \frac{(-1)^n}{z^2-n^2} \end{align} wit the help of the partial ...
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1answer
20 views

Partial Fraction, numerator with a higher degree

I've been posed with the following question: $\int^3_1(x^2\div (2x+1)) dx$ I was able to determine via long division that: $x^2\div (2x+1)$ = $\frac12x-(\frac12x\div(2x+1))$ however, I can't ...
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1answer
26 views

Partial Fraction for rigorous understanding [ref. request]

I know usual techniques in partial fractions such as the ones described in Wiki. But I don't understand how this process works in a precise manner. I've seen in some complex analysis textbooks, ...
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2answers
61 views

Inverse Laplace Transform of $\dfrac{6s -19}{s^2 - 6s + 13}$.

I am trying to figure out the inverse laplace transform of $\dfrac{6s -19}{s^2 - 6s + 13}$. Looking at my table of Laplace Transforms in my textbook, it seems that either I must break up this fraction ...
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2answers
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Integration of fractions and cancellation

How come $$\int\frac{3}{6+3x}\mathrm{d}x=\mathrm{ln}(2+x)+C$$ and not $\ \mathrm{ln}(6+3x)+C$ ? I understand you can cancel the fraction but why should this make a difference? I've tried searching ...
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1answer
34 views

Finding the partial fraction decomposition of $\frac{4s^2 - 5s + 2}{s^2(s^2 +9)}$

I am trying to find the partial fraction decomposition of $\dfrac{4s^2 - 5s + 2}{s^2(s^2 +9)}$ into something of the form $A\dfrac{1}{s} + B\dfrac{1}{s^2} + C\dfrac{1}{s^2+9} + D\dfrac{s}{s^2 + 9}$. ...
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2answers
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Is this a valid partial fraction decomposition?

Write $\dfrac{4x+1}{x^2 - x - 2}$ using partial fractions. $$ \frac{4x+1}{x^2 - x - 2} = \frac{4x+1}{(x+1)(x+2)} = \frac{A}{x+1} + \frac{B}{x-2} = \frac{A(x-2)+B(x+1)}{(x+1)(x-2)}$$ ...
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1answer
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Partial Fraction Using the Long Method

I've been trying to express $$\frac{x^2-13}{x^3-7x+6}$$ as a partial fraction, and, so far I have arrived at $$x^2-13=A(x-2)(x+3)+B(x-1)(x+3)+C(x-1)(x-2)$$. From this onwards, I substituted different ...
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1answer
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Possible division by zero when repeatedly factoring and canceling (x-r) and evaluating the resulting polynomial at x=r…

The following proof is from 'Two Proofs of the Existence and Uniqueness of the Partial Fraction Decomposition', page 4. Lemma 2.1. Let $h(x), g(x) \in R[x]$ (real polynomials), $k$ a positive ...
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2answers
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How can I integrate $\int \frac{dx}{(1+x^2)(2+x)}$ using partial fraction?

I did this: $$ \frac{1}{(1+x^2)(2+x)} = \frac{A}{1+x^2} + \frac{B}{2+x} \Rightarrow 2A+B+Ax+ Bx^2 = 1 $$ but I do not know what to do next. Every help will be appreciated.
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3answers
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how to resolve this integral using partial fractions

I cannot solve this, please help me and explain me! $$\int \frac {2x-3} {x(2x+1)(2x-1)}\text{d}x$$ EDIT: I get this far $$ \frac {2x-3} {x(2x+1)(2x-1)} = \frac{A}{x} + ...
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3answers
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Decomposition into partial fractions to compute an integral

I'm having problems with: $$\int_{-\infty}^{\infty}\frac{x^4+1}{x^6+1}dx$$ I was thinking: $\frac{x^4+1}{x^6+1}$ is an even function and the interval $(-\infty,\infty)$ is symmetric about 0, we ...
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2answers
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partial fraction decomposition braindead

decompose $\frac{x^2-2x+3}{(x-1)^2(x^2+4)}$ the way my teacher wants us to solve is by substitution values for x, I set it up like this: (after setting the variables to the common denominator and ...
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1answer
26 views

Inversion of $z$-transform using partial fraction decomposition

I want to inverse a $z$-transform of this general form $$X(z) = \frac{b_0 + b_1z^{-1}+\cdots+b_Mz^{-M}}{a_0 + a_1z^{-1}+\cdots+a_Nz^{-N}}$$ where $M$ < $N$. In order to do this, I use partial ...
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1answer
25 views

Question in regard to solving for inverse laplace transform

I am having some confusion when it comes to solving for the inverse laplace transform. ( We are allowed the tables with the common values by the way). Il give an example. Take, ...
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4answers
391 views

How to solve certain types of integrals

I'm asking for a walk through of integrals in the form: $$\int \frac{a(x)}{b(x)}\,dx$$ where both $a(x)$ and $b(x)$ are polynomials in their lowest terms. For instance $$\int ...
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2answers
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Getting Partial Fraction Decomposition Wrong

So I have done this solution: But it's wrong according to technology. I fail to see any error I've made in this solution, do you guys have any idea what's wrong?
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1answer
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Show that the following expansion is valid for first $n$ terms

The question is as follows, I've gone ahead and attempted as much as I could of it twice, however the final answer that I'm receiving does not match. I'm omitting the partial fractions steps; if ...
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1answer
25 views

Simplification imaginary fractions

In an exercise, a partial fraction expansion has to be done. I have no problem with that, but one of the last steps includes a simplification as follows: \begin{equation*} \left( -\frac 12 - \frac 16 ...
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3answers
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Evaluate the integral $\int \frac{dx}{x^3 + 2x^2 + 2x}$ of a rational function

Evaluate $$\int \frac{dx}{x^3 + 2x^2 + 2x}.$$ I have no idea how to approach this. I know how to solve rational functions with numerator as highest degree polynomial using division and remainder. ...
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1answer
30 views

Values tried for partial fraction decomposition

I'll explain my question with the following example from wikipedia. Suppose, we have a function: $$ f(x)=\frac{1}{x^2+2x-3} $$ Here, the denominator splits into two distinct linear factors: $$ ...
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1answer
27 views

Partial fraction question with squared

How could one apply partial fraction decomposition to $$\left(\frac{s}{s^2+4}\right)^2$$ I tried to separate by doing $$\frac{A}{s^2+4} + \frac{B}{s^2+4}$$ and I got strange solution $A+B=0$ and ...
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1answer
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partial fractions specific question

so i thought i knew about partial fractions, but apparently i don't. i have the answer to a partial fraction but i can't figure out how you get to that answer. the value is $$ X(z) = Z*(Z+2)/(Z-1)^2 ...
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1answer
34 views

Proof using partial fractions

I have to prove this formula: $$\int \! \frac{1}{(x^2+\beta ^2)^{k+1}} \, \mathrm{d}x=\frac{1}{2k\beta ^2}\frac{x}{(x^2 +\beta^2)^k}+\frac{2k-1}{2k\beta^2}\int \! \frac{1}{(x^2+\beta ^2)^k} \, ...
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Problem with partial fractions

I have this integral: \begin{equation*} \int \! \frac{x-1}{(x+1)(x^2+9)} \, \mathrm{d}x. \end{equation*} I already split the denominator into two factors. Now, when I do partial fraction ...
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7answers
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How can I solve the improper integral $\int_{1}^\infty {dx \over {(x+1)(x+2)}}$

$$\int_{1}^\infty {dx \over {(x+1)(x+2)}}$$ I have the indefinite integral solved for: $$\ln(x+1)-\ln(x+2) + C$$ But I don't know how to finish with $[1, \infty]$.
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3answers
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How can I solve the integral $ \int {1 \over {x(x+1)(x-2)}}dx$ using partial fractions?

$$ \int {1 \over {x(x+1)(x-2)}}dx$$ $$ \int {A \over x}+{B \over x+1}+{C \over x-2}dx $$ I then simplified out and got: $$1= x^2(A+B+C) +x(C-2B-A) -2A$$ $$A+B+C=0$$ $$C-2B-A=0$$ $$A=-{1 \over 2}$$ ...
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3answers
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How do I know when to use partial fractions or long divison with this integral? $ \int {{x^4+1} \over {x(x^2+1)^2}} dx$

$$ \int {{x^4+1} \over {x(x^2+1)^2}} dx$$ Is there a method to determine which way is better?
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1answer
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Having Trouble finding a simplified power series representation.

Partial fractions seemed the most efficient route to take. However, I am having trouble at the end.
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1answer
207 views

Partial fractions - different results when done in steps than not

We have: $\frac 1 {(1-x)(1+x)(1-2x)}$ If I do the partial fractions straight: $\frac 1 {(1-x)(1+x)(1-2x)}= \frac a {1-x} + \frac b {1+x} + \frac c {1-2x}$ I get: $a=-\frac 12, b = \frac 1 6, c=\frac ...
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I having trouble using partial fractions.

For the integral below I have to use partial fractions, however I am at a lost on how to do so. $$\int\frac{dt}{t^2-t-20}$$ The farthest I have gotten to is factoring the denominator to $(t+5)(t-4)$. ...
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2answers
19 views

Equating Coefficients in Partial fractions

I'm having a hard time figuring out A, B, and C for this problem. $$ \frac{8}{y^{3} - 4y} $$ All I've got so far is $$ \frac{A}{y} + \frac{B}{(y+2)} + \frac{C}{(y-2)} $$ $$ 8 = A(y+2)(y-2) + ...
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0answers
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Series for $\sin(z) / \sin(\pi z)$

${\sin(z) \over \sin(\pi z)} = 1/\pi + {z \over \pi} \sum_{n \in {\bf Z} \setminus \{0\}} {(-1)^n \sin(n) \over n(z-n)}$ First I apply Mittag-Leffler's theorem, to see that the RHS is a mereomorphic ...
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1answer
20 views

Decomposing partial fraction with a denominator negative quadratic expression $-x^2$

${5x+4\over -x^2-x+2}$ My solution: ${5x+4\over -x^2-x+2}$ $= {5x+4\over -(x-1)(x+2)}$ $= {A\over (x-1)} + {B\over (x+2)}$ $= {3\over -(x-1)} + {2\over -(x+2)}$ $= -{3\over x-1} -{2\over x+2}$ ...
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1answer
22 views

Finding the partial fraction of $x+21/2(2x+3)(3x-2)$

$x+21 / 2(2x+3)(3x-2)$ The 2 in the denominator represents a problem for me: $x+21 / 2(2x+3)(3x-2) = A / 2(2x+3) * B / 2(3x-2)$ $x+21 = A(2)(3x-2) + B(2x+3)$
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52 views

Partial fractions expansion problem $\frac{x^3-1}{4x^3-x}$

I want to calculate integral of the fraction, but first how to find the partial fraction expansion of $\frac{x^3-1}{4x^3-x}$. How to expand denominator? I am a bit lost here.
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182 views

Global and local maxima in a weighted sum of logarithms of linear functionals?

Is is possible to describe, and locate efficiently, the maxima of the function below in the parameters $\mathbf{x}$ $$\sum_{i} p_i \log( N + \sum_j x_j[B_j +(A_j-B_j)\delta_{ij} + min(A_j,B_j) ]) ...
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1answer
35 views

Recursive formula for partial fraction decomposition of a specific kind of fractions

I need to make a partial fraction decomposition of the following fraction : $$ \frac{1}{(x-a)^2(x-b)^2(x-c)^2(x-d)^2(x-e)} $$ The problem is that Wolfram doesn't give any answer : ...
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1answer
30 views

Partial Fractions and Complex Integral

I have $\int_{C}\frac{e^z}{z^2 + a^2}$ where $a>0$ and $C$ is a positively oriented simple closed contour containing the circle $|z|=1$. I start with $$\frac{1}{z^2 + a^2} = ...
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1answer
131 views

Where to find an algorithm for decomposing rational functions into elementary fractions?

Specifically I need to decompose $\frac1{(1-x)(1-x^n)^2}$ into $\frac{f(x)}{(1-x)^3}+\frac{g(x)}{1-x^n\vphantom{()^2}}+\frac{h(x)}{(1-x^n)^2}$ where $f(x)$, $g(x)$, $h(x)$ are polynomials. Surely ...
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2answers
158 views

$\int_0^\infty \frac{x^2}{(x^2-4)(x^2-9)}\,\text dx$

I am trying to compute the following contour integration but am quite stuck I have to evaluate it analytically, by extending it to the complex plane and solving an appropriate integral involving a ...
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1answer
27 views

How to Break Down Stairs

I have a fraction and I want to break down stairs. $$ F(z) = \frac{1 - 1.37 z^{-1} + 37 z^{-2}}{1 - z^{-1} + 0.6 z^{-2}} $$ I want it in form of $$ F(z) = A_{0} + \frac{1}{B_{1} z + \frac{1}{A_{1} ...