If line `T_1` touches the curve `8y=(x-2)^2` at (-6,8) and line `T_2` touches the curve `y=x+3/x` at (1,4), then

IF the lines y=-4x+b are tangents to the curve y=1/x , then b=

If the line y=4x-5 touches the curve y^2 = a x^3 +b at point (2, 3) then show that 7a +2b=0.

The area bounded by the curve y^(2)=8x and the line x=2 is

Find the area bounded by the curve y=2x-x^2 and the line y=-x .

The line (x)/(a)+(y)/(b)=1 touches the curve y=be^(-x//a) at the point

The slope of the tangent to a curve y=f(x) at (x,f(x)) is 2x+1. If the curve passes through the point (1,2) then the area of the region bounded by the curve, the x-axis and the line x=1 is

Area enclosed between the curve y=x^(2) and the line y = x is

If the line y= 4x-5 touches the curve y^2 = ax^3 + b , at the point (2,3) find a and b.

Area enclosed between the curve y^2(2a-x)=x^3 and line x=2a above X-axis is