Questions tagged [indefinite-integrals]

Question about finding the primitives of a given function, whether or not elementary.

The indefinite integral is defined as a set of all functions $F$ such that $F' = f$. Each member of the set is called an antiderivative. For example, $$\int f(x) dx = \lbrace F(x): F'(x) = f(x) \rbrace$$ also commonly denoted as $$F(x) + C.$$

If $F'(z) = f(z)$ then we denote

$$\int f(z) \; dz = F(z)$$

and call $F(z)$ a primitive of $f(z)$, also called an antiderivative. This result, while taught early in elementary calculus courses, is actually a very deep result connecting the purely algebraic indefinite integral and the purely analytic (or geometric) definite integral.

Since the derivative of a constant is zero, any constant may be added to an antiderivative and will still correspond to the same integral. Another way of stating this is that the antiderivative is a nonunique inverse of the derivative. For this reason, indefinite integrals are often written in the form $$\int f(z)\;dz=F(z)+C$$

where $C$ is an arbitrary constant known as the constant of integration.

It may happen that there is no elementary function$^1$ such that $$\int f(z) \; dz = F(z)$$ In such case, we define a new function which is not elementary but still satisfies our definition. For example, there is no elementary function $F$ such that $F'(z) = \displaystyle \frac{e^z}{z}$. However, if we define

$$\int \frac{e^z}{z} dz = C + \log z + \int_0^z \frac{e^t-1}{t} dt$$

we can readily check that $F' = f$.

$^1$: A function built up of a finite combination of constant functions, field operations (addition, multiplication, division, and root extractions - the elementary operations) and algebraic, exponential, and logarithmic functions and their inverses under repeated compositions. See also.

Source: Wolfram Mathworld

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Indefinite integral of a rational function problem...

Edit: Corrected my question. If we have a rational function in general case: $$f(x)=\frac{1}{(x^2+a^2)^n}$$ And we denote its integral as: $$I_n=\int \frac{dx}{(x^2+a^2)^n}$$ For $n=1$ we have the integral in the lists: $$\int…
A6SE
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Problem related to expressing the area through an integral, I do not understand the given solution

Let there be a function $g:(0, \infty) \to \mathbb{R}$, $g(x) = \frac{1}{x}$, and $S:[1,\infty)\to[0,\infty)$, the area of the domain delimited by $g$'s graph, the $Ox$ axis and the straight lines parallel with $Oy$, which go through the points $A$…
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Evaluate $\int{(2008 x^{2009}+2009x^{2007})}\cos(2008x) dx$

$$\int{(2008 x^{2009}+2009x^{2007})}\cos(2008x) dx$$ I tried to integrate the second term by parts and also the first.None of the terms seems to cancel out.I don't know why by parts is not working.Any other method possible? Only hints will suffice!
user220382
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How to find integral of the form $e^xf(x)$?

I always face trouble with these type of integrals. I need to find $$\int{e^x \frac{x(\cos x -\sin x)-\sin x}{x^2}}dx$$ My problem would be solved if can express $f(x)$ like $g(x)+g'(x)$ but identifying $g(x)$ by trial and error method is sometimes…
user220382
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Trouble understanding solving integrals like linear equations

I know that some integrals on solving by parts end up with the same integral on the right side, and then the integral is assumed to be $I$ or some variable, and then linearly solved. For example, $$I = \int e^x \cos x \ dx$$ $$u = e^x,\ dv = \cos…
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I cannot solve the integration

Please help me to solve the integration below: $$\int (e^{x - 1/x})(1+1/x^2) \mathrm dx$$
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What is the indefinite integration of zero?

I seem to think that it should be zero as well because being a constant zero can be taken outside the integral and whatever be the answer of the remaining constant integration it is finite. However my textbook implies that it is the arbitrary…
user295619
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How to solve: $\int \frac{dx}{2x^2 + 9x+ 9\sqrt{x^2+ 3x+ 2}}\; ?$

Integrate: $$\int \frac{dx}{(2x^2 + 9x+ 9)\sqrt{x^2+ 3x+ 2}}$$ Could anyone tell me how to do it? I've broken the term under root into two linear factors; but then don't know how to proceed. Could anyone please help me? I don't want complete…
user142971
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Using partial fraction techniques to work out following intergrals

Hello I am studying for a mock test that is coming up, a question very similar to this one will be on this test, I have no idea how to complete this type of question, I have been given some vague notes about how I should turn it into a arctan…
Stephen
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Integrating $\int\frac{xe^{2x}}{(1+2x)^2} dx$

I need help in integrating $$\int \frac{x e^{2x}}{(1+2x)^2} dx$$ I used integration by parts to where $u=xe^{2x}$ and $dv=\frac{1}{(1+2x)^2}$ to obtain $$=\frac{-1}{2(1+2x)}\left[e^{2x}+2xe^{2x}\right] + \frac{1}{2}\int…
mopy
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How to integrate ${x^3}/(x^2+1)^{3/2}$?

How to integrate $$\frac{x^3}{(x^2+1)^{3/2}}\ \text{?}$$ I tried substituting $x^2+1$ as t, but it's not working
user220382
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How to solve this indefinite integral with $\arctan$?

$$\int \frac{(x^2-1)\;\text{d}x}{(x^4+3x^2+1) \tan^{-1}{\left(\frac{x^2+1}{x}\right)}}$$ We should divide numerator and denominator by $ x^2 $ and put $z=x+\frac{1}{x}$ but I'm still not getting the answer. Please help!
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Help me understand integration with restrictions

So, for example, we have the integral: $$I = \int{\sqrt{1+\sin x}}dx$$ and using the WA method, we solve it like this: Can you please explain me the last step, why does the solution change due to restricted values? And how do I change it step by…
A6SE
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Finding the integral of the type $\frac{px+q}{ax^2 +bx + c}$

The textbook says, to find the integral of the type $\dfrac{px+q}{ax^2 +bx + c}$, where $p,q,a,b,c$ are constants, we are to find real numbers $A$ and $B$ such that $$px+q = A \dfrac{d}{dx} (ax^2 + bx + c) + B => A(2ax+b) + B.$$ Now to…
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Integral $\int\frac{dx}{(x^3-1)^2}$

Please help. I do not know what to do. You can just show the direction where to go and I continue. Here it is: $$\int\frac{dx}{(x^3-1)^2}$$