Consider two curves `C_1:y =1/x` and `C_2.y=lnx` on the `xy` plane. Let `D_1`, denotes the region surrounded by `C_1,C_2` and the line `x = 1` and `D_2` denotes the region surrounded by `C_1, C_2` and the line `x=a`, Find the value of `a`

Consider two curves C_(1):y=(1)/(x) and C_(2):y=1nx on the xy plane Let D_(1) denotes the region surrounded by C_(1),C_(2), and the line x=1 and D_(2) denotes the region surrounded by C_(1),C_(2) and the line x=a. If D_(1)=D_(2), then the sum of logarithm of possible value of a is

The area of the region bounded by the curve C :y=(x+1)/(x^(2)+1) nad the line y=1 , is

Find the area of the region bounded by the curve (y-1)^2=4(x+1) and the line y= x-1

Consider the two curves C_(1);y^(2)=4x,C_(2)x^(2)+y^(2)-6x+1=0 then :

Consider the curve C_(1):x^(2)-y^(2)=1 and C_(2):y^(2)=4x then ,The number of lines which are normal to C_(2) and tangent to C_(1) is

Consider the curve C_(1):x^(2)-y^(2)=1 and C_(2):y^(2)=4x then The point of intersection of directrix of the curve C_(2) with C_(1)

Consider the curves C_(1) = y - 4x + x^(2) = 0 and C_(2) = y - x^(2) + x = 0 The raio in which the line y = x divide the area of the region bounded by the curves C_(1) = 0 and C_(2) = 0 is