What is the antiderivative of $arcsin(x)$ ?

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Answer 1 · 2016-02-12T03:53:56

$intarcsin(x)dx = xarcsin(x) + sqrt(1-x^2) + C$

We will be using several techniques to evaluate the given integral.

First, we use substitution :

Let $t = arcsin(x) => sin(t) = x$
Then $dx = cos(t)dt$

Making the substitution, we have

$int arcsin(x)dx = int tcos(t)dt$

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Let $u = t$ and $dv = cos(t)dt$
Then $du = dt$ and $v = sin(t)$

Applying the integration by parts formula $intudv = uv - intvdu$

$inttcos(t)dt = tsin(t) - intsin(t)dt$

$=tsin(t) - (-cos(t)) + C$

$=tsin(t)+cos(t)+C$

Finally, we substitute $x$ back in. To see why $cos(t) = sqrt(1-x^2)$ try drawing a right triangle in which $sin(t) = x$ .

$intarcsin(x)dx = xarcsin(x)+sqrt(1-x^2)+C$

What is the antiderivative of arcsin(x)arcsin(x)?