The value of the parameter a such that the area bounded by `y=a^(2)x^(2)+ax+1,` coordinate axes, and the line x=1 attains its least value is equal to

Value of the parameter ' a ' such that the area bounded by y=a^2x^2+a x+1, coordinate axes and the line x=1, attains its least value, is equal to a. -1/4 b. -1/2 c. -3/4 d. -1

The value of a such that the area bounded by the curve y=x^(2)+2ax+3a^(2) , the coordinate axes and the line x=1 . The coordinate axes and the line x=1 . Attains its least value is equal to

The value of positive real parameter 'a' such that area of region blunded by parabolas y=x -ax ^(2), ay = x ^(2) attains its maximum value is equal to :

The area bounded by the curve y=f(x) the coordinate axes and the line x = t is given by te^(t) then f(x) =

The area bounded by the coordinate axes and the curve sqrt(x) + sqrt(y) = 1 , is

The area bounded by the curve y = x(x - 1)^2, the y-axis and the line y = 2 is

If the area bounded by the parabola y=2-x^(2) and the line y=-x is (k)/(2) sq. units, then the value of 2k is equal to

The area bounded by y=(x^(2)-x)^(2) with the x - axis, between its two relative minima, is A sq, units, the value of 15A is equal to

The area bounded by the curve y=x^(2)(x-1)^(2) with the x - axis is k sq. units. Then the value of 60 k is equal to

The area of the region bounded by the circle x^(2)+y^(2)=1 and the line x+y=1 is :