Prove that the line `x(a+2b) + y (a-3b)=a-b` passes through a fixed point for different values of `a and b`. Also find the fixed point.

Show that the lines represented by x(a+3b)+y(2a-b)=5a+b pass through a fixed point for different values of a and b .

Show that the straight lines given by x(a+2b)+y(a+3b)=a for different values of a and b pass through a fixed point.

Show that the straight lines given by x(a+2b)+y(a+3b)=a for different values of a and b pass through a fixed point.

If a ,\ b , c are in A.P., then the line a x+b y+c=0 passes through a fixed point. write the coordinates of that point.

Prove that the equation represent a family of lines which pass through a fixed point. Also find the fixed point : (i) (gamma-1) x+gammay=1-3gamma

the lines (p+2q)x+(p-3q)y=p-q for different values of p&q passes trough the fixed point is:

The fix point through which the line x(a + 2b) + y(a + 3b) = a + b always passes for all values of a and b , is-

If 3a + 2b + 6c = 0 the family of straight lines ax+by = c = 0 passes through a fixed point . Find the coordinates of fixed point .

Prove that the equation represent a family of lines which pass through a fixed point. Also find the fixed point : (ii) gammax+y=4

If 4a^2+c^2=b^2-4a c , then the variable line a x+b y+c=0 always passes through two fixed points. The coordinates of the fixed points can be (a) (-2,-1) (b) (2,-1) (c) (-2,1) (d) (2,1)