A parallelogram ABCD is shown in figure.

`{:(,"Column I",,,"Column II"),((A),"Equation of side AB",,(P),2y+x=2),((B),"Equation of side BC",,(Q),2y-x=2),((C),"Equation of side CD",,(R),2y+x=-2),((D),"Equation of side DA",,(S),2y-x=-2),(,,,(T),y+2x=2):}`

Consider a A B C is which side A Ba n dA C are perpendicular to x-y-4=0a n d2x-y-5=0, respectively. Vertex A is (-2,3) and the circumcenter of A B C is (3/2,5/2)dot The equation of line in column I is of the form a x+b y+c=0 , where a , b , c in Idot Match it with the corresponding value of c in column I I Column I|Column II Equation of the perpendicular bisector of side B A |p. -1 Equation of the perpendicular bisector of side A C |q. 1 Equation of side A C |r. -16 Equation of the median through A |s. -4

The equation x-y=4 and x^(2)+4xy+y^(2)=0 represent the sides of

In a triangle ABC, side AB has equation 2x+3y=29 and side AC has equation x+2y=16. ft the midpoint of BC is 5,6) then find the equation of BC.

The equation of the circumcircle of the triangle,the equation of whose sides are y=x,y=2x,y=3x+2, is

Consider the parabola y^2=12 x Column I, Column II Equation of tangent can be, p. 2x+y-6=0 Equation of normal can be, q. 3x-y+1=0 Equation of chord of contact w.r.t. any point on the directrix can be, r. x-2y-12=0 Equation of chord which subtends right angle at the vertex can be, s. 2x-y-36=0

Consider the parabola y^2=12 x Column I, Column II Equation of tangent can be, p. 2x+y-6=0 Equation of normal can be, q. 3x-y+1=0 Equation of chord of contact w.r.t. any point on the directrix can be, r. x-2y-12=0 Equation of chord which subtends right angle at the vertex can be, s. 2x-y-36=0

Consider the parabola y^2=12 x Column I, Column II Equation of tangent can be, p. 2x+y-6=0 Equation of normal can be, q. 3x-y+1=0 Equation of chord of contact w.r.t. any point on the directrix can be, r. x-2y-12=0 Equation of chord which subtends right angle at the vertex can be, s. 2x-y-36=0

The equation x-y=4 and x^2+4xy+y^2=0 represent the sides of

The equation x-y=4 and x^2+4xy+y^2=0 represent the sides of