$\int \frac{x^{2} d x}{\sqrt{4 - 9 x^{2}}}$ $\int(x^2dx)/(\sqrt(4-9x^2))$ ?

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$\int \frac{x^{2} d x}{\sqrt{4 - 9 x^{2}}}$ $\int(x^2dx)/(\sqrt(4-9x^2))$ ?

I know it involves trigonometric substitution, and that
$\sqrt{a^{2} - x^{2}}$ $\sqrt(a^2-x^2)$ form with $x = a sin θ$ $x=a\sin\theta$ ( $- \frac{π}{2} \leq θ \leq \frac{π}{2}$ $-\pi/2\le\theta\le\pi/2$ , $1 - {sin}^{2} x = {cos}^{2} x$ $1-\sin^2x=\cos^2x$ )

However, I am stuck at the substitution part here.
I know that $x = \frac{2}{3} sin θ$ $x=2/3\sin\theta$ , $\thereforea=2/3$ , but not what to do afterwards.

Would it be $dx=2/3\cos\theta$ ?

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Answer 1 · 2018-04-13T06:07:49

$int(x^2dx)/sqrt(4-9x^2)=2/27(arcsin(3/2x)-(3xsqrt(4-9x^2))/4)+C$

Explanation:

For an integral involving the root $sqrt(a^2-b^2x^2),$ we may use the substitution

$x=a/bsintheta$

So, here, $a=2, b=3, x=2/3sintheta, dx=2/3costhetad theta$

Thus, we have

$(2/3)^2(2/3)int(sin^2thetacostheta)/sqrt(4-4sin^2theta)d theta$

$(4/9)(cancel2/3)(1/cancel2)int(sin^2thetacostheta)/sqrt(1-sin^2theta)d theta$

$1-sin^2theta=cos^2theta,$ so

$4/27int(sin^2thetacostheta)/sqrt(cos^2theta)d theta$

$4/27int(sin^2thetacancel(costheta))/cancel(costheta)d theta$

Recalling that $sin^2theta=1/2(1-cos2theta)$ ,

$4/27intsin^2thetad theta=4/27(1/2)int(1-cos2theta)d theta$

$2/27(theta-1/2sin2theta)+C$

We need things in terms of $x.$

Since $x=2/3sintheta, sintheta=3/2x, theta=arcsin(3/2x)$

Furthermore, recall that $1/2sin2theta=sinthetacostheta$ . We'll need to find the cosine using a quick sketch. Since $sintheta=(3x)/2,$ we label the opposite and hypotenuse as follows, realizing that the adjacent side will be the radical originally found in the integral:

enter image source here

We see $costheta=sqrt(4-9x^2)/2, 1/2sin2theta=(3/2x)sqrt(4-9x^2)/2=(3xsqrt(4-9x^2))/4$

Thus,

$int(x^2dx)/sqrt(4-9x^2)=2/27(arcsin(3/2x)-(3xsqrt(4-9x^2))/4)+C$

Answer 2 · 2018-04-13T09:38:42

$"Sometimes it is better to avoid"color(red)" trigonometric substitution"$ $"and think about"color(blue)" another substitution "$ that led us to known formula.
$(1)int1/sqrt(a^2-x^2)dx=sin^-1(x/a)+c$

Explanation:

$color(red)((2)intsqrt(a^2-x^2)dx=x/2sqrt(a^2- x^2)+a^2/2sin^-1(x/a)+c$

Here,

$I=intx^2/sqrt(4-9x^2)dx$

Let, $3x=t=>3dx=dt=>dx=1/3dt,and9x^2=t^2=>x^2=t^2/9$

$:.I=int((t^2/9))/sqrt(4-t^2)1/3dt$

$=1/27intt^2/sqrt(4-t^2)dt$

$=-1/27[int(-t^2)/sqrt(4-t^2)dt]$

$=-1/27[int(4-t^2-4)/sqrt(4-t^2)dt]$

$=-1/27[int(4-t^2)/sqrt(4-t^2)dt-int4/sqrt(4-t^2)dt]$

$=-1/27[intsqrt(4-t^2)dt-4int1/sqrt(4-t^2)dt]$

$=-1/27[intsqrt(2^2-t^2)dt-4int1/sqrt(2^2-t^2)dt]toApply(1)& (2)$

$=-1/27[t/2sqrt(2^2-t^2)+2^2/2sin^-1(t/2)-4sin^-1(t/2)]+c$

$=-1/27[t/2sqrt(4-t^2)+2sin^-1(t/2)-4sin^-1(t/2)]+c$

$=-1/27[t/2sqrt(4-t^2)-2sin^-1(t/2)]+c$

$=1/27[2sin^-1(t/2)-t/2sqrt(4-t^2)]+c$

Subst. back, $..tot=3x,t^2=9x^2$

$=1/27[2sin^-1((3x)/2)-(3x)/2sqrt(4-9x^2)]+c$

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$\int \frac{x^{2} d x}{\sqrt{4 - 9 x^{2}}}$ $\int(x^2dx)/(\sqrt(4-9x^2))$ ?

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Explanation:

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