Show that the area' bounded by the curve `y = ce^x (c> 0),` the x-axis and two ordinates is proportional to the difference between the ordinates.

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.

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.

Find the area bounded by the curve y^(2) = 4x the x-axis and the ordinate at x=4

The area bounded by the curve y=x |x| , x -axis and the ordinates x=-1 & x=1 is:

Find the area bounded by the curve y=3x, the x-axis and the ordinate x=1 and x=2

Area bounded by the curve y=x^3 the x-axis and the ordinates x=-2 and x=1 is

Area bounded by the curve y = x ^(2), the x-axis and the ordinates x =-2 and x =1 is :

The area bounded by the curve y= x|x| , x-axis and the ordinates x =-1 and x=1 is

Find the area bounded by the curve y = 3x + 2, x-axis and ordinate x=-1 and x=1.