The area between the curve `y=2x^(4)-x^(2)`, the x-axis, and the ordinates of the two minima of the curve is

The area between the curve y=2x^4-x^2, the axis, and the ordinates of the two minima of the curve is 11/60 sq. units (b) 7/120 sq. units 1/30 sq. units (d) 7/90 sq. units

The area between the curves y=sqrt(x),y=x^(2) is

Calculate the area bounded by the curve y=x(3-x)^2 the x-axis and the ordinates of the maximum and minimum points of the curve.

The area between the curve xy=a^(2),x=a,x=4a and X-axis is

(i) Find the area bounded by x^(2)+y^(2)-2x=0 and y = sin'(pix)/(2) in the upper half of the circle. (ii) Find the area bounded by the curve y = 2x^(4)-x^(2) , x-axis and the two ordinates cooreponding to the the minima to the function. (iii) Find area of the curve y^(2) = (7-x)(5+x) above x-axis and between the ordinates x = - 5 and x = 1 .

Find the area enclosed between the curve y = x^(2) , the axis and the ordinates x = 1 and x=2 .

The area bounded by the curve y=4x-x^2 and the x -axis is:

Find the area between the curve y=x and y=x^2

The angle between the curves y=x^2 and y=4-x^2 is

Show that the area between the curve y=ce^(2x) , the x-axis and any two ordinates is proportional to the difference between the ordinates, c being constant.