Consider the two curves `C_1` ; `y^2 = 4x`, `C_2` : `x^2 + y^2 - 6x + 1 = 0` then :

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

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

Consider two curves C1:y^2=4x; C2=x^2+y^2-6x+1=0. Then, a. C1 and C2 touch each other at one point b. C1 and C2 touch each other exactly at two point c. C1 and C2 intersect(but do not touch) at exactly two point d. C1 and C2 neither intersect nor touch each other

Let C_(1) and C_(2) be the circles x^(2) + y^(2) - 2x - 2y - 2 = 0 and x^(2) + y^(2) - 6x - 6y + 14 = 0 respectively. If P and Q are points of intersection of these circles, then the area (in sq. units ) of the quadrilateral PC_(1) QC_(2) is :

IF the tangent at (1,7) to the curve x ^(2) = y-6 touches the circle x^(2) + y^(2) + 16x + 12 y + c=0, then the value of c is

Consider the two curves C_(1):y=1+cos x and C_(2): y=1 + cos (x-alpha)" for "alpha in (0,(pi)/(2))," where "x in [0,pi]. Also the area of the figure bounded by the curves C_(1),C_(2), and x=0 is same as that of the figure bounded by C_(2),y=1, and x=pi . The value of alpha is