The maximum area (in sq. units) of a rectangle having its base on the x-axis and its other two vertices on the parabola, y = 12 - x2 such that the rectangle lies inside the parabola, is

Question

The maximum area (in sq. units) of a rectangle having its base on the x-axis and its other two vertices on the parabola, y = 12 - x2 such that the rectangle lies inside the parabola, is (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Given, the equation of parabola is. x2 = 12 - y

Area of the rectangle = (2t) (12 - t2) A =24t -2t3 (dA/dt) 24 -6t2 Put (dA/dt) = 0 ⇒ 24 -6t2 =0 ⇒ t=± 2

At t = 2. area is maximum= 24 (2) -2(2)3 =48 -16 =32sq. units

Q. The maximum area (in sq. units) of a rectangle having its base on the x-axis and its other two vertices on the parabola, y=12−x2 such that the rectangle lies inside the parabola, is

Given, the equation of parabola is. x2=12−y Area of the rectangle =(2t)(12−t2) A=24t−2t3 dtdA​24−6t2 Put dtdA​=0 ⇒24−6t2=0 ⇒t=±2 At t=2. area is maximum=24(2)−2(2)3 =48−16=32sq. units

Q. The maximum area (in sq. units) of a rectangle having its base on the x-axis and its other two vertices on the parabola, $y = 12 - x^{2}$ such that the rectangle lies inside the parabola, is