How do you integrate $\int 3 \cdot \frac{{(csc (t))}^{2}}{cot (t)} d t$ $int 3 * (csc(t))^2/cot(t) dt$ ?

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How do you integrate $\int 3 \cdot \frac{{(csc (t))}^{2}}{cot (t)} d t$ $int 3 * (csc(t))^2/cot(t) dt$ ?

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Answer 1 · 2016-03-23T19:33:01

Use a $u$ $u$ -substitution to get $- 3 ln | cot (t) | + C$ $-3lnabs(cot(t))+C$ .

Explanation:

First, note that because $3$ $3$ is a constant, we can pull it out of the integral to simplify:
$3 \int \frac{{csc}^{2} (t)}{cot (t)} d t$ $3int(csc^2(t))/cot(t)dt$

Now - and this is the most important part - notice that the derivative of $cot (t)$ $cot(t)$ is $- {csc}^{2} (t)$ $-csc^2(t)$ . Because we have a function and its derivative present in the same integral, we can apply a $u$ $u$ substitution like this:
$u = cot (t)$ $u=cot(t)$
$\frac{d u}{d t} = - {csc}^{2} (t)$ $(du)/dt=-csc^2(t)$
$d u = - {csc}^{2} (t) d t$ $du=-csc^2(t)dt$

We can convert the positive ${csc}^{2} (t)$ $csc^2(t)$ to a negative like this:
$- 3 \int \frac{- {csc}^{2} (t)}{cot (t)} d t$ $-3int(-csc^2(t))/cot(t)dt$

And apply the substitution:
$- 3 \int \frac{d u}{u}$ $-3int(du)/u$

We know that $\int \frac{d u}{u} = ln | u | + C$ $int(du)/u=lnabs(u)+C$ , so evaluating the integral is done. We just need to reverse substitute (put the answer back in terms of $t$ $t$ ) and attach that $- 3$ $-3$ to the result. Since $u = cot (t)$ $u=cot(t)$ , we can say:
$- 3 (ln | u | + C) = - 3 ln | cot (t) | + C$ $-3(lnabs(u)+C)=-3lnabs(cot(t))+C$

And that's all.

Answer 2 · 2016-03-23T19:44:59

Explanation:

$3 \int \frac{{csc}^{2} t}{cot t} d t =$ $3 int csc^2 t/cot t dt=$
$= 3 \int (\frac{1}{{sin}^{2} t}) \cdot (\frac{1}{\frac{cos t}{sin t}}) d t$ $=3 int (1/sin^2 t)*(1/(cos t/sin t))dt$
$= 3 \int \frac{d t}{sin t \cdot cos t}$ $=3 int dt/(sin t *cos t)$

Remember that
$sin 2 t = 2 sin t \cdot cos t$ $sin 2t =2sint*cost$

So
$= 3 \int \frac{d t}{(\frac{1}{2}) sin 2 t}$ $=3int dt/((1/2)sin 2t)$
$= 6 \int csc 2 t \cdot d t$ $=6int csc 2t*dt$

As we can find in a table of integrals
(for instance Table of integrals containing Csc (ax) in SOS Math ):

$\int csc a x \cdot d x = \frac{1}{a} ln | csc a x - cot a x | = ln ∣ ∣ tan (\frac{a x}{2}) ∣ ∣$ $int csc ax*dx=1/aln|cscax-cotax|=ln|tan ((ax)/2)|$

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How do you integrate $\int 3 \cdot \frac{{(csc (t))}^{2}}{cot (t)} d t$ $int 3 * (csc(t))^2/cot(t) dt$ ?

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