If algebraic sum of distances of a variables line from points A (3,0), B (0, 3) and C(-3,-3) is zero,then the line passes through the fixed point

If the algebraic sum of the distances of a variable line from the points (2,0),(0,2), and (-2,-2) is zero,then the line passes through the fixed point.(a) (-1,-1)(b)(0,0)(c)(1,1)(d)(2,2)

If the algebraic sum of the distances of a variable line from the points (2,0),(0,2), and (-2,-2) is zero, then the line passes through the fixed point. (a) (-1,-1) (b) (0,0) (c) (1,1) (d) (2,2)

If the algebraic sum of the distances of a variable line from the points (2,0),(0,2), and (-2,-2) is zero, then the line passes through the fixed point. (a) (-1,-1) (b) (0,0) (c) (1,1) (d) (2,2)

If the algebraic sum of the distances from the points (2,0), (0, 2) and (1, 1) to a variable line be zero then the line passes through the fixed point.

If a+b+c=0 then the line 3ax+by+2c=0 passes through the fixed point

If the algebraic sum of the perpendiculars from the points (2,0),(0,2),(1,1) to a variable be zero,then prove that the line passes through a fixed-point whose coordinates are (1,1)

If 3a+2b+4c=0 then the lines ax+by+c=0 pass through the fixed point

If 3a+2b+4c=0 then the lines ax+by+c=0 pass through the fixed point