if `a` and `b` are two arbitrary constant , then the straight line `(a-2b)x+(a+3b)y+3a+4b=0` will pass through :

12.If a and b are two arbitrary constants,then the straight line (a-2b)x+(a+3b)y+3a+4b=0 will pass through (A)(-1,-2) (B) (1,2) (C) (-2,-3) (D) (2,3)

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.

k is a nonzero constant.If k=(a+b)/(ab) then the straight line (x)/(a)+(y)/(b)=1 passes through the point

If a + 2b + 3c = 0 " then " a/3+(2b)/3+c=0 and comparing with line ax + by + c, we get x = 1/3 & y = 2/ 3 so there will be a point (1/3,2/3) from where each of the lines of the form ax + by + c = 0 will pass for the given relation between a,b,c . We can say if there exists a linear relation between a,b,c then the family of straight lines of the form of ax + by +c pass through a fixed point . If a , b, c are consecutive odd integers then the line ax + by + c = 0 will pass through

If a and b are parameters, then each line of the family of lines x(a+2b)+y(a-3b)=a-b passes through the point whose distance from origin is : (A) 3/5 (B) sqrt(13)/5 (C) sqrt(11)/5 (D) 4/5

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.

The straight line 4x + 3y =12 passes through-

If a,b,c in GP then the line a^(2)x+b^(2)y+ac=0 always passes through the fixed point

For all the values of 'a' and 'b',the lines (a+2b)x+(a-b)y+(a+5b)=0 passes through the point