Given: y=4x−x2and3y=(x−4)2
⇒4x−x2=3(x−4)2
⇒12x−3x2=x2+16−8x
⇒4x2−20x+16=0
⇒x2−5x+4=0
⇒(x−4)(x−1)=0
⇒x=4,1
⇒y=0,3
So, the intersection points are (4,0)and(1,3).

Area =∫14[(4x−x2)−3(x−4)2]dx
Area =∣24x2−3x3−9(x−4)3∣14
=∣(264−364−24+31−927)∣
=(27−21)=6