What is Integration by parts: Definition and 437 Discussions
In calculus, and more generally in mathematical analysis, integration by parts or partial integration is a process that finds the integral of a product of functions in terms of the integral of the product of their derivative and antiderivative. It is frequently used to transform the antiderivative of a product of functions into an antiderivative for which a solution can be more easily found. The rule can be thought of as an integral version of the product rule of differentiation.
The integration by parts formula states:
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v
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d
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u
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∫
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{\displaystyle {\begin{aligned}\int _{a}^{b}u(x)v'(x)\,dx&={\Big [}u(x)v(x){\Big ]}_{a}^{b}-\int _{a}^{b}u'(x)v(x)\,dx\\[6pt]&=u(b)v(b)-u(a)v(a)-\int _{a}^{b}u'(x)v(x)\,dx.\end{aligned}}}
Or, letting
u
=
u
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x
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{\displaystyle u=u(x)}
and
d
u
=
u
′
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x
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d
x
{\displaystyle du=u'(x)\,dx}
while
v
=
v
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x
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{\displaystyle v=v(x)}
and
d
v
=
v
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x
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d
x
{\displaystyle dv=v'(x)dx}
, the formula can be written more compactly:
∫
u
d
v
=
u
v
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∫
v
d
u
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{\displaystyle \int u\,dv\ =\ uv-\int v\,du.}
Mathematician Brook Taylor discovered integration by parts, first publishing the idea in 1715. More general formulations of integration by parts exist for the Riemann–Stieltjes and Lebesgue–Stieltjes integrals. The discrete analogue for sequences is called summation by parts.
View More On Wikipedia.org
The integration by parts formula states:
∫
a
b
u
(
x
)
v
′
(
x
)
d
x
=
[
u
(
x
)
v
(
x
)
]
a
b
−
∫
a
b
u
′
(
x
)
v
(
x
)
d
x
=
u
(
b
)
v
(
b
)
−
u
(
a
)
v
(
a
)
−
∫
a
b
u
′
(
x
)
v
(
x
)
d
x
.
{\displaystyle {\begin{aligned}\int _{a}^{b}u(x)v'(x)\,dx&={\Big [}u(x)v(x){\Big ]}_{a}^{b}-\int _{a}^{b}u'(x)v(x)\,dx\\[6pt]&=u(b)v(b)-u(a)v(a)-\int _{a}^{b}u'(x)v(x)\,dx.\end{aligned}}}
Or, letting
u
=
u
(
x
)
{\displaystyle u=u(x)}
and
d
u
=
u
′
(
x
)
d
x
{\displaystyle du=u'(x)\,dx}
while
v
=
v
(
x
)
{\displaystyle v=v(x)}
and
d
v
=
v
′
(
x
)
d
x
{\displaystyle dv=v'(x)dx}
, the formula can be written more compactly:
∫
u
d
v
=
u
v
−
∫
v
d
u
.
{\displaystyle \int u\,dv\ =\ uv-\int v\,du.}
Mathematician Brook Taylor discovered integration by parts, first publishing the idea in 1715. More general formulations of integration by parts exist for the Riemann–Stieltjes and Lebesgue–Stieltjes integrals. The discrete analogue for sequences is called summation by parts.
View More On Wikipedia.org
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Solving Integration by Parts with a Reduction Formula
Homework Statement Use integration by parts to prove the reduction formula: http://img214.imageshack.us/img214/1234/24206074.jpg Homework Equations The Attempt at a Solution what confuses me about this question is that its not in the form sqrt(a2 + x2) but its in ^n instead of...- Slimsta
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Struggling with Homework
Homework Statement Here is a question I'm struggling with. I encountered it in a paper, and although a solution is provided I'm not so sure I understand where they're coming from. Homework Equations \int_{r_1}^{r_2} \overline{v}\frac{1}{r}\frac{d}{dr}(r\frac{du}{dr})rdr where...- the_dialogue
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- Forum: Calculus and Beyond Homework Help
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Integration by parts help just the beginning part for this one
Homework Statement intergral from pi to 0. of (sin(3t)dt)^4 The Attempt at a Solution okay so i know how to do this but when i tried substitution putting 3t=u and (1/3)du= dt i always came with the the wrong coefficient at the end with the answer and so i would multiply it...- camboguy
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts - Choice of variables
Homework Statement I'm getting different results when choosing my u & dv for Integration by Parts on the following integral: \int 2x^3 e^x^2 dx (Note, the exponent on 'e' is x^2) This yields the correct solution: u = x^2 dv = 2x e^x^2 dx du = 2xdx v = e^x^2 However, I have tried using...- takarin
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts with sin and ln(x)
Homework Statement The method to use to integrate the function is up to us. The choices are: 1) U-substitution 2)Integration by Parts 3)Trigonometric integrals 4)Trigonometric substitution 5)Partial fraction Homework Equations According to me, the best way to do it is to use...- Ayesh
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- Forum: Calculus and Beyond Homework Help
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Integration By Parts: Volume - help
Homework Statement Use the method of cylindrical shells to find the volume generated by rotating the region R bounded by the curves y=e1.6 x, y=e−1.6 x and x=0.6 about the y-axis. Homework Equations V=$\displaystyle \Large \int _a^c 2pix (yt - yb) dx$ The Attempt at a Solution...- Slimsta
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- Forum: Calculus and Beyond Homework Help
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How Do You Solve Integrals Using Integration By Parts?
Homework Statement 1.$\int x^ne^xdx$ 2.$\int \sin ^nxdx$ Homework Equations $ \displaystyle \Large \int fg dx = fg - \int gf' dx$ The Attempt at a Solution 1. f=xn g'=ex g=ex f'=nxn-1 then just plug it in the formula? i tried but i don't get the right answer.. 2. i have...- Slimsta
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- Forum: Calculus and Beyond Homework Help
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What is the Integration by Parts Method for Solving Integrals?
Homework Statement \int\frac{x^3}{\sqrt{1-x^2}}dx I have to use integration by parts on the above integral. Homework Equations The Attempt at a Solution u=x^3 du=3x^2dx dv=\frac{1}{\sqrt{1-x^2}}dx v=arcsin (x) =x^3arcsin (x)-3\int\ x^2arcsin (x)dx u=arcsin (x)...- 3.141592654
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Integration by parts of a function
the function is c = 15te-.2t the goal is to integrate it from t = 0 to t = 3 so to set up the integral i took out the 15 first so i got: 15 * integral from 0 to 3 of t*e-.2t i set u = t and so du = dt dv = e-.2tdt so v= -5e-.2t so following the integration by parts formula i got...- apiwowar
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- Replies: 8
- Forum: Calculus and Beyond Homework Help
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Integrate xarctan(x^2)dx: Steps & Solution
the problem is find the integral of xarctan(x^2)dx i set w = x^2, so 1/2dw = xdx then i plug that into the integral to get the integral of 1/2arctan(w)dw so i let u = arctan(w) and dv = dw so du = dw/(1+w^2) and v = w so then the integral of udv = uv - integral of vdu so...- apiwowar
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- Replies: 1
- Forum: Calculus and Beyond Homework Help
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Integration by Parts substitution
Homework Statement \int\arctan(4t)dt Homework Equations The Attempt at a Solution \int\arctan(4t)dt = t\arctan(4t) -4 \int \frac{t}{1+16t^2}dt I'm stuck at this point. I think I need to make a substitution for the denominator, but I'm not sure how to go about doing so.- revolve
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- Replies: 3
- Forum: Calculus and Beyond Homework Help
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Simple integration by parts problem
Homework Statement \int \ln(2x+1)dx Homework EquationsThe Attempt at a Solution u = \ln (2x +1) du = \frac{2}{2x+1} dv = dx v = x xln(2x+1) - \int \frac {2x}{2x+1}dx I'm not sure how to proceed. Do I separate the fraction in the integrand or do long division? I think I separate the...- revolve
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- Replies: 4
- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Solving \int \frac{x^3e^{x^2}}{(x^2+1)^2}
Homework Statement \int \frac{x^3e^{x^2}}{(x^2+1)^2} The Attempt at a Solution Well, this problem is hard, so I thought to use u = x3ex2 so du = x2ex2(3+2x2) dx and dv = (x2+1)-2 then v = -2(x2+1)-1 Please check v though to make sure my algebra is right. so then using the by parts formula...- Zhalfirin88
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- Replies: 4
- Forum: Calculus and Beyond Homework Help
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Integration by parts, can you do this?
I've seen this formula stated and used, ( in a stanford university video lecture) \int \frac{dA}{dt}B\ dt = - \int \frac{dB}{dt}A\ dt with the condition that you don't vary the end points. but i don't understand how you can just remove the AB term from the right hand side, and I've...- earlofwessex
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- Replies: 6
- Forum: Calculus
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Integrate by Parts: Solving \int \ln (x^2 + 1) \, dx
Homework Statement Find or evaluate the integral using substitution first, then using integration by parts. \int \ln (x^2 + 1) \, dx The Attempt at a Solution Let \: u = x^2 + 1 du = 2x \, dx dx = \pm \frac{du}{2 \sqrt{u - 1}} Then \int \ln (x^2 + 1) \, dx = \pm...- GunnaSix
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- Replies: 2
- Forum: Calculus and Beyond Homework Help
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Area of the region bounded between two curves with integration by parts
Homework Statement Find the area bounded between the two curves y=34ln(x) and y=xln(x) Homework Equations Integration by parts: \intudv= uv-\intvdu The Attempt at a Solution First I found the intersection points of the two equation to set the upper and lower bounds. The lower...- maladroit
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts separately
Homework Statement Integrate: -\frac{2}{\theta} \int^{\infty}_0 y e^{-2y/\theta} dy + \frac{2}{\theta} \int^{\infty}_0 y e^{-y/\theta}dy Homework Equations The Attempt at a Solution Let u = y/theta; y=u*theta; dy = du*theta, which becomes -2 \int^{\infty}_0 u \theta e^{-2u}...- cse63146
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- Replies: 3
- Forum: Calculus and Beyond Homework Help
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Can we use integration by parts for improper integrals?
What's up with this \int_{-\infty}^\infty \sin{x}\frac{1}{x}dx=\pi Now I try integration by parts \int_{-\infty}^\infty \sin{x}\frac{1}{x}dx=[-\cos{x}\frac{1}{x}]_{-\infty}^\infty-\int_{-\infty}^\infty \cos{x}\frac{1}{x^2}dx = -\int_{-\infty}^\infty \cos{x}\frac{1}{x^2}dx = \infty...- daudaudaudau
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- Replies: 13
- Forum: Calculus
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Integrate e^(-theta)cos(2theta): Get Help Now!
Homework Statement Evaluate the integral (e^-theta) cos(2theta) I got this as my answer e^(-theta)-sin(2theta)+cos(2theta)e^(-theta)+C But it was wrong All help is appreciated.- addmeup
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- Replies: 8
- Forum: Calculus and Beyond Homework Help
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Integration by Parts guidelines
I've been trying to find this online, but I haven't been able to find any site that really explains it: when performing integration by parts, is there some rule or set of guidelines to determine which part of the equation is u and which is dv?- greenverve
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- Forum: General Math
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Solve Integral Using Integration by Parts
Hello :smile: I was hoping someone could help me with this integral. Homework Statement I=\int{(x^2sin(5x^3-3))}dx Homework Equations \int{(u.\frac{dv}{dx})}dx=[uv]-\int{(v.\frac{du}{dx})}dx \frac{dy}{dx}=\frac{dy}{du}.\frac{du}{dx} 3a. The first attempt at a solution...- Matty R
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- Forum: Calculus and Beyond Homework Help
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Integration by parts involving exponentials and logarithms
Homework Statement Using integration by parts, integrate: (1/x^2)(lnx) dx with the limits e and 1 Homework Equations [uv]to the limits a b - the integral of (v)(du/dx) dx (sorry, don't know how to write out equations properly on a computer) The Attempt at a Solution I've...- xllx
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Name for integration by parts shortcut
Hi all. I've recently learned a shortcut for integration by parts, but don't know what it's called or where it comes from. The trick is to find \lambda such that f'' = \lambda f and \mu such that g'' = \mu g, providing both are constants and \lambda\neq\mu. Then \intf(x)g(x)dx =...- PhantomOort
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- Forum: Calculus
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How can substitution make integration by parts easier?
\int x^3cos(x^2)dx -\frac{1}{2}x^2sin(x^2)+\frac{3}{2}\int xsin(x^2)dx -\frac{1}{2}x^2sin(x^2)+\frac{3}{4}cos(x^2)-\frac{3}{4}\int \frac{cos(x^2)}{x} the last integral- nameVoid
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Quick question on integration by parts
Homework Statement I'm following an example in the textbook that states: http://img24.imageshack.us/img24/1672/33686252.jpg I was just wondering what happened to the 2 out the front, I would have been more inclined to think this would be the next step...- t_n_p
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- Forum: Calculus and Beyond Homework Help
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How do you know when to use integration by parts on a problem?
This a techniques of integration question, and I'm wondering how do you know when to use integration by parts on a problem? My book says this bout the Integration by parts procedure. If f(x) is a product of a power of x and transcendental function then we try integration by parts. Can... -
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Integration by parts conceptual problem
1. Suppose : f(1) = 2, f(4) =7 , f'(1)=5, f'(4) = 3 and f"(x) is continuous. Find the value of: \int_{1}^{4} xf''(x)dx Homework Equations IBP formula \int u(x)dv = u(x)v(x) - \int v(x) du The Attempt at a Solution I re-wrote the IBP formula from...- evsong
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- Forum: Calculus and Beyond Homework Help
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Integration by parts problem.
Homework Statement Let F(b) be the exact area under the graph of y = x2*e-x between x=0 and x=b for b>0. Find the formula for F(b).Homework Equations int(uv')= uv - int(vdu)The Attempt at a Solution u = x2 and dv = e-x, thus u'=2xdx and v=-e-x. y= -x2*e-x - -2*integral(xe-x). = -x2*e-x...- CandyApples
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- Forum: Calculus and Beyond Homework Help
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Conceptual problem with integration by parts.
Why is it that whenever we encounter a question which can be solved by integration by parts, we get half the function? I mean, suppose a differentiated f(x)g(x) yielded {f'(x) g(x)dx + f(x)g'(x)dx}, then why do we get only {f'(x) g(x)dx} to extract the original function (f(x)g(x)) from? -
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Why Do I Struggle to Choose the Correct u and dv in Integration by Parts?
Find http://img214.imageshack.us/img214/4186/problemm.png Homework Equations udv=uv-ƒvduThe Attempt at a Solution lndx=dv (1/X)=v u=x^2+2 du= 2x^2 I looked in the solutions manual and I don't get, why do I keep picking the wrong u & dv?Can someone please show an example on how to pick the...- pillar
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Verify Formula for $\int x^{n} sin x dx$
Homework Statement \int\frac{t^{2}}{\sqrt{2+3t}} Use integration by parts to verify the formula: \int x^{n} sin x dx = -x^{n} cos x + n\int x^{n-1} cos x dx Homework Equations The Attempt at a Solution For the first one, I attached the picture of my work on paper, as it...- clairez93
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- Replies: 2
- Forum: Calculus and Beyond Homework Help
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How can I solve this integration by parts problem for the function x^2/(e^x+1)?
Homework Statement I=\int{\frac{x^2}{e^x+1}dx} The Attempt at a Solution I tried integration by parts but that didn't work because it just became more complicated in the end. I=x^2ln(e^x+1)-2\int{xln(e^x+1)dx} Then, \int{xln(e^x+1)dx}=xln(e^x+1)-\int{\frac{x}{e^x+1}dx} It...- Mentallic
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts of Inverse Tangent
Homework Statement I must evaluate the indefinite integral: \int x \arctan{x} dx Homework Equations I am using the following format to perform the integration: \int u dv = uv - \int v du The Attempt at a Solution I have tried working the problem substituting x in for u and arctan...- James98765
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- Forum: Calculus and Beyond Homework Help
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Infinite series by integration by parts
Hi, I wonder if this hypothesis is true: Let f_n be an arbitrarily chosen n'th anti-derivative of the function f_0. Similarly, let g_n be the n'th derivative of the function g_0. Now, \int^b_a f_0 g_0 \rm{d}x=[f_1g_0]^b_a-\int^b_a f_1g_1 \rm{d}x=[f_1g_0-f_2g_1+...]^b_a+(-1)^n \int^b_a...- disregardthat
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- Forum: General Math
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Integration By Parts: Need help with a step
Integration By Parts: Need help with a step... Evaluate the integral: \int ln(2x + 1)dx I worked it out up until: Xln(2x + 1) - \int 2x/(2x + 1) dx Then the next step throws me off. I attached a scan from the solutions manual and circled the part that confused me. Could somebody...- daviddee305
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- Forum: Calculus and Beyond Homework Help
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Integration by parts involving partial derivatives
Homework Statement \int x \frac {\partial f} {\partial x} dx where f=f(x,t) Homework Equations \int u \, dv = uv - \int v \, du The Attempt at a Solution u = x so du = dx and dv = \frac {\partial f} {\partial x} dx so v = \int \frac {\partial f} {\partial x}...- tjkubo
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- Replies: 6
- Forum: Calculus and Beyond Homework Help
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Integration by Parts with Power Reduction - Confirming Solution
Homework Statement I(xsin^2x,x) (1/2)I(x(1-cos2x),x) (1/2)I(x,x)-(1/2)I(xcos2x,x) x^2/4-(1/2)I(xcos2x,x) u=x du=dx dv=cos2x v=sin2x/2 x^2/4-xsin2x/4+I(sin2x,x)/4 x^2/4-xsin2x/4-cos2x/8+C book is showing a diffrent solution from integrating by parts before power reduction can somone...- nameVoid
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- Replies: 1
- Forum: Calculus and Beyond Homework Help
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Use double integrals to show result of integration by parts
Homework Statement Let F(x) and G(x) be the antiderivatives of f(x) and g(x) on [a,b]. using multiple integration, show that the integral from a to b of f(x)G(x)dx = F(b)G(b)-F(a)G(a) - the integral from a to b of g(y)F(y)dy To do so, consider the double integral of a suitable function...- theneedtoknow
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- Replies: 8
- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Solving for u and v in cos(2x) and cosx(2x)
Homework Statement Homework Statement The Attempt at a Solution u= cos(2x) = > du= -2 sin(2x) dv=cosx(2x) =>v= 1/2 sin(2x) ?- nameVoid
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- Replies: 2
- Forum: Calculus and Beyond Homework Help
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Integrating by Parts: Solve e^(-x)cos x dx
Homework Statement I have attempted and failed solving the following integration: Integrate : e^(-x) cos x dx Homework Equations I tried using the integration by parts rule: uv - (integral) v (du/dx) dx The Attempt at a Solution I let u = e^(-x) and dv/dx = cos x...- Shaybay92
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- Replies: 4
- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Solving the Integral of Sqrt(x) * ln(x) with Limits 1 to 5
Homework Statement integral limit 1 to 5 integral of sqrt x * lnx dx a = 1 b= 5 Homework Equations The Attempt at a Solution 2 x (-1 + 2 Log[x]) ------------------ 8 11.99604193 but its not right- intelli
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- Replies: 5
- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Int: x*arctan(x) dx
Because of circumstance (my desire to graduate in 5 years or less), I've been forced to attempt Calc 2 in 2 months time online over the summer. About 75% of it is going smoothly (compared with 105% or so of Calc 1). Homework Statement I'm to solve the indefinite integral: \int x *...- MathHawk
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- Replies: 3
- Forum: Calculus and Beyond Homework Help
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Alternative to Integration by Parts?
Hey all! I was recently refreshing my memory of integration by parts via some personal reading when I thought, there must be a better way. Integration by parts (while creative in that it integrates the entire product rule) feels very arbitrary to what it's attempting to calculate (at least... -
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Integration by Parts Problem (Natural Log)
Homework Statement [Intgrl]ln(x^(2)+4)dxHomework Equations [Intgrl]udv=uv-[Intgrl]vduThe Attempt at a Solution [Intgrl]ln(x^(2)+4)dx, u=ln(x^(2)+4), du=(2x/x^(2)+4), dv=dx, v=x xln(x^(2)+4)-[Intgrl](2x^(2)/(x^(2)+4))dx- abel216
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- Forum: Calculus and Beyond Homework Help
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Integration by Parts: Find Integrals | 65 Characters
Formula for integration by parts: \int f(x)dx = \int u dv = uv - \int v du Use integration by parts to find the following integrals: a) \int x e^{1-x} dx b) \int_1^4 \frac {ln \sqrt x} {\sqrt x} dx c) \int_{-2}^1 (2x+1)(x+3)^{3/2} dx d) \int x^3 \sqrt{3x^2+2} dx Answers in back of the...- aleao
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- Replies: 17
- Forum: Calculus and Beyond Homework Help
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Integration by Parts of x^5cos(x^3)
Homework Statement \int x^5cos(x^3) dx Homework Equations \int uv' = uv - \int u'v The Attempt at a Solution \int x^5cos(x^3) dx \frac{(x^5)*(sin(x^3)}{(3x^2)} - \int\frac{5x^4*sin(x^3)}{(3x^2)} dx \frac{(x^3)*sin(x^3)}{3} - \int\frac{(5x^2)*sin(x^3)}{(3)} dx...- fallen186
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- Replies: 4
- Forum: Calculus and Beyond Homework Help
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Help With Integration by Parts
I have a couple questions about a certain problem on http://www.math.ucdavis.edu/~kouba/CalcTwoDIRECTORY/intbypartssoldirectory/IntByPartsSol3.html#SOLUTION%2016 On number 18... 1) What is the logic behind separating x^7 into x^4 x^3 2) In the translation from dv to v, how did x^3... -
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Integration by Parts: Q6 - (-(0-0)), Q3 Explained
Homework Statement In question 6, where does the -(0-0) part come from. The instructor did this for another question, question number 3 as well except in the other question the resulting value was a non-zero one and thus affected the answer.. any help appericiated...- a.a
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- Replies: 2
- Forum: Calculus and Beyond Homework Help
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Integration by Parts of a Double Integral
Homework Statement ∫∫xy(x^2+y^2)^(1/2)dydx over the range 0 to 1 for both x and y. Homework Equations I believe that it requires integration by parts. Any help would be greatly appreciated.- ChabbaBings
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- Replies: 1
- Forum: Calculus and Beyond Homework Help
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Improper Integrals with u sub and integration by parts ?
Homework Statement The integral from 1 to infinity of (lnx)/(x) dx Homework Equations U substitution and integration by parts The Attempt at a Solution Cant decide what to use as my "u" . . can anyone help with this part ? -Jay J-- Jay J
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- Replies: 3
- Forum: Calculus and Beyond Homework Help