Show that the straight line `x(a+2b)+y(a+3b)=(a+b)` for different values of a and b passes through the fixed point . Find that 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.

The lines x(a+2b)+y(a+3b)=a+b for different values of a , b passing through a fixed point is :

The lines (a+2b)x+(a-3b)y=a-b for different values of a and b pass through the fixed point, whose coordinates are

Show that the straight lines given by (2+k)x+(1+k)y=5+7k for different values of k pass through a fixed point.Also, find that point.

Show that the straight lines x(a+2b)+y(a+3b)=a+b of a and b pass through a fixed point.Find the coordinates of the fixed point.

If a,b,c are in harmonic progression,then the straight line (((x)/(a)))+((y)/(b))+((l)/(c))=0 always passes through a fixed point.Find that point.

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.

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

If a and b are two arbitrary constants,then prove that the straight ine (a-2b)x+(a+3b)y+3a+4b=0 will pass through a fixed point.Find that point.