The area between `x = y^(2)` and x = 4 is divided into two equal parts by the line x = a find the value of a.

The region enclsoed by the circle x^2+y^2=a^2 is divided into two segments by the line x=(a)/(2) . Find the area of the minor segment .

The region enclosed by the circle x^(2)+y^(2)=a^(2) is divided into two sgmwnts by the line x=h. Find the area of the smaller segment.

The area between x^2=4-y and the lines y=0,y=3 is :

If line 3x-a y-1=0 is parallel to the line (a+2)x-y+3=0 then find the value of adot

Find the area bounded by the x-axis, part of the curve y=(1-8/(x^2)) , and the ordinates at x=2a n dx=4. If the ordinate at x=a divides the area into two equal parts, then find adot

Find the area between the line y=x+1 and the curve y=x^(2)-1

If the line x+y=a touches the parabola y=x-x^2, then find the value of adot

Find the area under the curve y = x^(2) above x-axis between the lines x = 6 and x = 4.