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Find the area of the region bounded by the courses y = sin^-1(x/6), y = 0, and x = 6 obtained by integrating with respect to y. Your work must include the definite integral and the antiderivative.

User Amirlazarovich
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1 Answer

17 votes
17 votes
Given

The equation is given


y=sin^(-1)((x)/(6))

y=0 and x=6.

Required

To determine the area of region bounded by courses of the equation given.

Step-by-step explanation
\begin{gathered} y=sin^(-1)((x)/(6))\Rightarrow\Rightarrow siny=(x)/(6) \\ 6siny=x \end{gathered}
x=6,y=0

Therefore


\begin{gathered} 6siny=6 \\ siny=1 \\ y=(\pi)/(2) \end{gathered}
\begin{gathered} 6siny=0 \\ siny=0 \\ y=0,\pi \end{gathered}

Now integrate the equation.


\int_0^{(\pi)/(2)}(6-6siny)dy=(6y+6cosy)_0^{(\pi)/(2)}
((6\pi)/(2)+6cos(\pi)/(2))-(6*0+6cos0)=3\pi-6Answer

Hence the area of region bounded by the courses is


3\pi-6

User Mxhiu
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