Let T be the triangle with vertices `(0,0),(0,c^(2))` and `(c,c^(2))` and let R be the region between `y=cx` and `y=x^(2)`, where `c lt 0`, then

Let T be the triangle with vertices (0,0), (0,c^2 )and (c, c^2) and let R be the region between y=cx and y = x^2 where c > 0 then

Let C be the centroid of the triangle with vertices (3, -1) (1, 3) and ( 2, 4). Let P be the point of intersection of the lines x+3y-1=0 and 3x-y+1=0 . Then the line passing through the points C and P also passes through the point :

Let ABC is a triangle whose vertices are A(1, –1), B(0, 2), C(x', y') and area of triangleABC is 5 and C(x', y') lie on 3x + y – 4lambda = 0 , then

If alpha and beta (alpha lt beta) are the roots of the equation x^(2) + bx + c = 0 , where c lt 0 lt b , then

If (-2,\ 1) is the centroid of the triangle having its vertices at (x ,\ 0),\ (5,\ -2),\ (-8,\ y), then x ,\ y satisfy the relation 3x+8y=0 (b) 3x-8y=0 (c) 8x+3y=0 (d) 8x=3y

Let A,B,C be angles of triangles with vertex A -= (4,-1) and internal angular bisectors of angles B and C be x - 1 = 0 and x - y - 1 = 0 respectively. If A,B,C are angles of triangle at vertices A,B,C respectively then cot ((B)/(2))cot .((C)/(2)) =

Let A(−4,0) , B(4,0) & C(x,y) be points on the circle x^2 + y^2 = 16 such that the number of points for which the area of the triangle whose vertices are A, B and C is a positive integer, is N then the value of [N/7] is, where [⋅] represents greatest integer function.

If ax^(2)+bx+c=0andbx^(2)+cx+a=0 have a common root then the relation between a,b,c is

Let C_1C_2 be the graphs of the functions y=x^2 and y=2x , respectively, where 0lt=xlt=1. Let C_3 be the graph of a function y=f(x), where 0lt=xlt=1, f(0) =0. For a point P on C_1, let the lines through P , parallel to the axis, meet C_2 and C_3 at Q and R , respectively (see Figure). If for every position of P(onC_1), the areas of the shaded regions OPQ and ORP are equal, determine the function f(x)

Let A B C be a triangle. Let A be the point (1,2),y=x be the perpendicular bisector of A B , and x-2y+1=0 be the angle bisector of /_C . If the equation of B C is given by a x+b y-5=0 , then the value of a+b is (a) 1 (b) 2 (c) 3 (d) 4