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 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 bounded by the curve y={x} with the x-axis from x=pi to x=3.8 is ((pi)/(2)-a)(b-pi) sq. units, then the value of b-a is equal to (where {.} denotes the fractional part function)

The area bounded by the curve y={x} with the x-axis from x=pi to x=3.8 is ((pi)/(2)-a)(b-pi) sq. units, then the value of b-a is equal to (where {.} denotes the fractional part function)

The area (in sq. units) bounded by y = 2 - |x - 2| and the x-axis is

The area (in sq. units) bounded by y = 2 - |x - 2| and the x-axis is

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 x-axis, and the ordinates of the two minima of the curve is

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 bounded by the parabola y=x^(2)+x+1, its tangent at P(1, 3), line x=-1 and the x - axis is A sq units. Then, the value of 6A is equal to