Consider the curves ` C_1 : x=0,C_2 :y =0, C_3 y =x^(2) +1, C_4 :y=2 ,C_5 : x =1`
The area bounded by the curves `C_3 and C_4` (in square units )

Consider the curves C_1 : x=0,C_2 :y =0, C_3 y =x^(2) +1, C_4 :y=2 ,C_5 : x =1 The area bounded by the curves C_1 ,C_3 and C_4 and which lies to the right of C_1 is ( in square units )-

Consider the curves C_1 : x=0,C_2 :y =0, C_3 y =x^(2) +1, C_4 :y=2 ,C_5 : x =1 the area enclosed between the curves C_1 ,C_2 ,C_3 and c_5 is ( in square units ) -

Find the area bounded by the curves x+2|y|=1 and x=0 .

Consider the two curves C_1:y^2=4x,C^2:x^2-y^2-6x+1=0. Then.

Consider two curves C_1: y=1/x a n dC_2: y=logx on the x y plane. Let D_1 denotes the region surrounded by C_1,C_2, and the line x=1a n dD_2 denotes the region surrounded by C_1,C_2 and the line x=adot If D_1=D_2, then the sum of logarithm of possible value of a is _____________

The area (in square unit) of the region bounded by the curves y=x^(3) and y=2x^(2) is-

The area bounded by the curve 2y^(2) -3x =0 (in square units ) y-axis and the two horizontals y=1 and y= 4 is-

Find the area of the region bounded by the curves 2y^(2)=x, 3y^(2)=x+1, y=0 .

Two curves C_(1)equiv[f(y)]^(2//3)+[f(x)]^(1//3)=0 and C_(2)equiv[f(y)]^(2//3)+[f(x)]^(2//3)=12, satisfying the relation "(x-y)f(x+y)-(x+y)f(x-y)=4xy(x^(2)-y^(2)) The area bounded by the curve C_(1) and C_(2) is

A curve C passes through (2,0) and the slope at (x , y) as ((x+1)^2+(y-3))/(x+1)dot Find the equation of the curve. Find the area bounded by curve and x-axis in the fourth quadrant.