Statement-I `(S_1)`: If `A(x_1, y_1), B(x_2, y_2), C(x_3, y_3)` are non-collinear points. Then, every point (x, y) in the plane of `triangleABC`, can be expressed in the form `((kx_1+lx_2+mx_3)/(k+l+m), (ky_1+ly_2+my_3)/(k+l+m))`
Statement-II `(S_2)` The condition for coplanarity of four A(a), B(b), C(c), D(d) is that there exists scalars l, m, n, p not all zeros such that `la+mb+nc+pd=0` where `l+m+n+p=0`.

A(x_(1),y_(1)),B(x_(2),y_(2)) and C(x_(3),y_(3)) are three non-collinear points in cartesian plane. Number of parallelograms that can be drawn with these three points as vertices is

If A(x_1, y_1), B (x_2, y_2) and C (x_3, y_3) are the vertices of a DeltaABC and (x, y) be a point on the internal bisector of angle A , then prove that : b|(x,y,1),(x_1, y_1, 1), (x_2, y_2, 1)|+c|(x, y,1), (x_1, y_1, 1), (x_3, y_3, 1)|=0 where AC = b and AB=c .

Statement -1 : If veca and vecb are non- collinear vectors, then points having position vectors x_(1) vec(a) + y_(1) vec(b) , x_(2)vec(a)+ y_(2) vec(b) and x_(3) veca + y_(3) vecb are collinear if |(x_(1),x_(2),x_(3)),(y_(1),y_(2),y_(3)),(1,1,1)|=0 Statement -2: Three points with position vectors veca, vecb , vec c are collinear iff there exist scalars x, y, z not all zero such that x vec a + y vec b + z vec c = vec 0, " where " x+y+z=0.

If the image of the point (1,2,3) in the plane x+2y=0 is (h,k,l) then l=

If (h, r) is the foot of the perpendicular from (x_1, y_1) to lx+my+n=0 , prove that : (x_1-h)/l, = (y_1 - r)/m, = (lx_1 + my_1 +n)/(l^2 + m^2)

If x_1 , x_2, x_3 as well as y_1, y_2, y_3 are in A.P., then the points (x_1, y_1), (x_2, y_2), (x_3, y_3) are (A) concyclic (B) collinear (C) three vertices of a parallelogram (D) none of these

The line y=mx+1 is a tangent to the curve y^2=4x if the value of m is (A) 1 (B) 2 (C) 3 (D) 1/2 .

If the point P(x,y) is equidistant from A(5,1) and B(-1,5), then 5x=y(b)x=5y(c)3x=2y(d)2x=3y

if |[2a,x_1,y_1],[2b,x_2,y_2],[2c,x_3,y_3]|=(abc)/2!=0 then the area of the triangle whose vertices are (x_1/a,y_1/a),(x_2/b,y_2/b),(x_3/c,y_3/c) is (A) (1/4)abc (B) (1/8)abc (C) 1/4 (D) 1/8