The area of region bounded by curves `x^(2)-2y=0` and `y=8` is equal to
(A) `(64)/(3)` sq.units
(B) `(128)/(3)` sq.units
(C) `(32)/(3)` sq.units
(D) `(256)/(3)` sq.units

The area of the region bounded by the curves y^(2)=8x and y = x (in sq unit) is

The area of the region bounded by the curves x^(2)+y^(2)=8 and y^(2)=2x( in sq. unit ) is

The area bounded by the curves y=sqrt(x),2y+3=x, and x -axis in the 1 st quadrant is (A) 18 sq.units (B) (27)/(4) sq.units (C) (4)/(3) sq.units (D) 9 sq.units

The area bounded by the curves y=x^(2) and y=(2)/((1+x^(2))) is (pi-(2)/(3)) sq.unit (B)(pi+(2)/(3)) sq.unit (C) (pi+(4)/(3)) sq.unit (D) none of these

If the area bounded by the curves y=x-x^(2) and line y=mx is equal to (9)/(2) sq.units,then m may be

The area of the region bounded by the curves y=|x-1| and y=3-|x| is (A) 6 sq. units (B) 2 sq. units (C) 3 sq. units (D) 4 sq. units

The area bounded by the curve y=x^3 , x-axis and two ordinates x=1 and x=2 is equal to (A) 15/2 sq. units (B) 15/4 sq. units (C) 17/2 sq. units (D) 17/4 sq. units

The area of the plane region bounded by the curve x = y^(2)-2 and the line y = - x is (in sq units)

The area of the closed figure bounded by y=(x^(2))/(2)-2x+2 and the tangents to it at (1,(1)/(2)) and (4,2) is (A) (9)/(8) sq.unit (B) (3)/(8) sq.units (C) (3)/(2) sq.units (D) (9)/(4) sq.units