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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How should I integrate $\cos^{2018}(x)/\sin^{2018}(x)+\cos^{2018}(x)$?

I am working on a kind of tricky integral problem that I found online. $$\int \frac{\cos^{2018}(x)}{\sin^{2018}(x)+\cos^{2018}(x)}dx$$ I tried substitution which changed it to $$ \cos^{2018}(x) \ \to \sin^{2018}\left(x+\frac\pi2\right) $$ but after…
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Help on indefinite integral

I want to solve this integral: $$ \int \frac{dx}{x+\sqrt{x^2+x+1}} $$ I converted the quadratic equation into a full squere and got this $$ \int \frac{dx}{x+\sqrt{(x+\frac{1}{2})^2+\frac{3}{4}}} $$ then I put x+1/2 = t and got $$ \int…
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Problem with the indefinite integral $\int{\frac{\sqrt{{{b}^{2}}{{x}^{2}}-{{a}^{2}}}}{{{x}^{2}}}dx}$

I tried using a substitution $x=\frac{a}{b}\sec \theta $ to solve $$\int{\frac{\sqrt{{{b}^{2}}{{x}^{2}}-{{a}^{2}}}}{{{x}^{2}}}dx}$$ Obviously, $dx=\frac{a}{b}\sec \theta \tan \theta d\theta $. In other…
Arianna
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Is there a simple proof that functions of the form $f(x)^{g(x)}$ in general don't have integrals in standard functions?

My attempt: Proof by contradiction: Restriction: for any function $h(x)$ inside $g(x)$, and for any function $j(x)$ inside $f(x)$, $j(x)$ or $f(x)$ may not be inverse functions of $h(x)$ or $g(x)$. $$f(x)^{g(x)}=e^{g(x)\ln(f(x))}\rightarrow\int…
Zuter_242
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What is $g$ for which this is true!

For what $g\equiv g(r,q)$ such that following is true: $$ \int_0^\infty r^{2n-1}g(r,q)dr=\frac{\Gamma(qn+1)}{n^2}. $$ The function $g$ should be independent of $n$. It can only have $r$ and $q$.
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Indefinite integral of $\int \frac {\cosh^{-1} (x/a) \, \mathrm d x} {x^2}$

Spiegel's "Mathematical Handbook of Formulas and Tables" (Schaum, 1968), item $14.655$ gives: $$\int \frac {\cosh^{-1} (x/a) \, \mathrm d x} {x^2} = \dfrac {-\cosh^{-1} (x/a) } x \mp \dfrac 1 a \ln \left({\dfrac {a + \sqrt {x^2 + a^2} }…
Prime Mover
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Calculate $\int\frac{\ln^2(a+bx)}{x^n}dx$

I know the solve the integral $$\int\frac{\ln(a+bx)}{x^n}dx$$ by the integration by parts method. I'm interested to solve the given integral $$\int\frac{\ln^2(a+bx)}{x^n}dx$$ by the parts method Thanks for help.
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Indefinite Integral of $1 / \sqrt {a x^2 + b x + c}$ with respect to $x$

I need to check whether my evaluation of $\displaystyle \int \dfrac {\mathrm d x} {\sqrt {a x^2 + b x + c} }$ is correct. This is what I have evaluated. First we note that the integral is defined only when $a x^2 + b x + c > 0$, so it will be…
Prime Mover
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How to solve this integral easily: $\int \frac{x\cdot \sqrt[3]{x+2}}{x+\sqrt[3]{x+2}} dx$

I am trying to solve this integral $$\int\frac{x\cdot \sqrt[3]{x+2}}{x+\sqrt[3]{x+2}} dx$$ I can do it by brute force (means using a substitution then long division and then substitutions again) but it's too long (suspiciously long solution). Is…
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How to solve the integral $\int \frac{1}{x^{8}\left(1+x^{2}\right)} \ \mathrm{d} x$?

I encountered a very difficult problem, to calculate the answer of this formula: $$ \int \frac{1}{x^{8}\left(1+x^{2}\right)} \ \mathrm{d} x $$ Can you help me to find out how it solved?
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Feynman on indefinite integral?

Consider: $$ \int \frac{ \ln (t-1)}{t} dt$$ And then, $$ I( \alpha) = \int \frac{ \ln [\alpha (t-1)] }{t} dt$$ D.w.r.t. $\alpha$ $$ \frac{dI}{d \alpha} = \int \frac{ 1}{ \alpha t} dt$$ $$ \frac{dI}{d \alpha} = \frac{1}{\alpha} \ln t +C…
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Does this strange integral make sense? Does it have a reasonable solution?

Is this integral reasonable? If so, does anyone have an recommended solution methods. Most of my training is in physics, so I treat derivatives as ratios of differentials sometimes, and that is how I came across this integral, but I'm not sure if it…
Stoby
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The solution of the indefinite integral contains an error (I know correct answer), but I cannot find it

There is an exercise on indefinite integral in some infinitesimal calculus book: $$ \int \sqrt{x^{2} +1} \cdot dx $$ The solution uses the first substitution x = sinh u and after some transformations the book gets the result: $$ \frac{1}{2} \cdot…
RandomB
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Find $\int \frac{x}{\sin^2x-3}dx$

I started like this \begin{align*} \int \frac{x}{\sin^2x-3}dx & =\int \frac{x\sec^2x}{\tan^2x-3\sec^2x}dx\\ & =-\int \frac{x\sec^2x}{2\tan^2x+3}dx\\ & = -\left [ \frac {x\tan^{-1}\left (\frac {\sqrt {2}\tan x}{\sqrt {3}}\right)}{\sqrt {6}}-\int …
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Finding $\int \ln\ln x\ dx$

Find $\int \ln\ln x\,\mathrm dx$. I tried$$\int \ln\ln x\,\mathrm dx=x\ln\ln x -\int \frac{1}{\ln x}\,\mathrm dx\\=x\ln x\ln x-\sqrt{x}{\ln x}-\int \frac{1}{(\ln x)^2}\,\mathrm dx$$ It seems more and more difficult. And I tried substitution, i.e.…
fractal
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