Show that the area enclosed between `y^(2)=4ax` and `y=mx` is `(8)/(3)(a^(2))/(m^(3))` sq units.

Show that the area enclosed by the curves x^(2)=4by and y=mx is (8)/(3)b^(2)m^(3) sq units.

Find the area enclosed between y=x^(2)-5x and y=4-2x

The area enclosed between the curves y^2=x and y=|x| is

Show that the area enclosed by y^(2)=4ax and its latus rectum is (8a^(2))/(3) sq units.

Show that the area enclosed between the curves y = x and y=x^(3) is (1)/(2) sq unit.

Find the area enclosed between the curves y=4x^(2) and y=x^(2)+3

Show that the area enclosed between the curve y^(2)=12(x+3) and y^(2)=20(5-x) is 64sqrt((5)/(3))

Find the area enclosed between the curves y^(2)=2x,y=4x-1

Show that the area included between the parabolas y^2 = 4a(x + a) and y^2 = 4b(b - x) is 8/3 sqrt(ab) (a+b).

The area enclosed between the curves y=ax^(2) and x=ay^(2)(a gt 0) is 1 sq.unit. Then a =