Two sides of a triangle are `2x-y=0` and `x+y=3`. If its centroid is (2,3) then, prove its third is `5x-y-9=0`

Two sides of a triangle are 2x+y=0 and x-y+2= 0. If its orthocentre is (2,3), the third side is 8x+5y-10=0 .

If two sides of a triangle lie along 3x^(2)-xy-2y^(2)=0 and its orthocentre is (2,1) then equation to third side is

If two sides of triangle are given by x^(2)-xy-6y^(2)=0 and the centroid is ((11)/(3),-1) then equation of third side is

If 8x^(2)-14xy+5y^(2)=0 represents two sides of a triangle and centriod of the triangle is (2, 2) then midpoint of third side is

If two sides of a triangle lie along 3x^2 - 5xy + 2y^2 = 0 and its orthocentre is (2, 1) then show that equation to the third side is 10x + 5y - 21 = 0.

The equation of the base of an equilateral triangle is 12 x + 5y-65=0. If one of its verices is (2,3) then the length of the side is