
To find point of intersection, eliminate y from both the equation, we get
x2+3x−4=0
⇒(x+4)(x−1)=0
x=−4,x=1
Area =(∫013⋅x⋅dx+∫124−x2⋅dx)×2
=(3(23x23)01+(2x4−x2+2sin−12x)12)×2
=(3(32)+2⋅2π−(23+3π))×2
=(32−23+32π)×2
=(231+32π)×2=31+34π sq. units