Show that the area of the loop of the curve `y^2=x^2(1-x)` is `8/15`.

The area of the loop of the curve a y^2=x^2(a-x) is

The area of the loop of the curve a y^2=x^2(a-x) is 4a^2s qdotu n i t s (b) (8a^2)/(15)s qdotu n i t s (16 a^2)/9s qdotu n i t s (d) None of these

The area of the loop of the curve x^(2)+(y-1)y^(2)=0 is equal to :

The area bounded by the loop of the curve 4y^2=x^2(4-x^2) is given by (1) 7/3 (2) 8/3 (3) 11/3 (4) 16/3

Find the area enclosed by the loop of the curve y^2=(x-1)(x-2)^2 .

The area of the loop formed by y ^(2) =x(1-x ^(3)) dx is:

The area enclosed by the curve y^2 +x^4=x^2 is

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

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

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