Given: y2≤4x,x<4, (x−3)(x−4)xy(x−1)(x−2)>0
Case - I: y>0
⇒(x−3)(x−4)x(x−1)(x−2)>0

⇒x∈(0,1)∪(2,3)...(i)
Case – II : y<0
(x−3)(x−4)x(x−1)(x−2)<0

⇒x∈(1,2)∪(3,4)...(ii)

So, the required area is given by,
A=∫044xdx {Take the mirror image of strips in the first quadrant to find the area}
⇒A=2∫04xdx
⇒A=2⋅32[x23]04
⇒A=2⋅32(423)
⇒A=2×32×8
⇒A=332