Find the area enclosed by the parabola 4y=3x2 and the line 2y=3x+12
Find the area enclosed by the parabola 4y=3x2 and the line 2y=3x+12
Solution and Explanation
The area enclosed between the parabola,4y=3x2,and the line,2y=3x+12,is
represented by the shaded area OBAO as
The points of intersection of the given curves are A(–2,3)and(4,12).
We draw AC and BD perpendicular to x-axis.
∴Area OBAO=Area CDBA–(Area ODBO+Area OACO)
=
\[\int_{-2}^{1} \frac12(3x+12) \,dx\]\[-\int_{-2}^{1} \frac{3x^2}{4} \,dx\]=\(\frac12\)[\(\frac{3x^2}{2}\)+12x]4-2-\(\frac34\)[x3/3]4-2
=\(\frac12\)[24+48-6+24]-\(\frac14\)[64+8]
=\(\frac12\)[90]-\(\frac14\)72]
=45-18
=27units.
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