The lines ax + by + c = 0, where 3a + 2b + 4c= 0, are concurrent at the point

If the lines ax + by + c = 0, bx + cy + a = 0 and cx + ay + b = 0 be concurrent, then:

If the lines x+ 3y -9=0 , 4x+ by -2 =0, and 2x -y-4 =0 are concurrent, then the equation of the lines passing through the point (b,0) and concurrent with the given lines, is

Show that the lines x-y=6,4x-3y=20 and 6x+5y+8=0 are concurrent.Also find the point of concurrence.

If the lines a x+2y+1=0,b x+3y+1=0a n dc x+4y+1=0 are concurrent, then a ,b ,c are in

The straight lines x+2y-9=0,3x+5y-5=0 , and a x+b y-1=0 are concurrent, if the straight line 35 x-22 y+1=0 passes through the point (a , b) (b) (b ,a) (-a ,-b) (d) none of these

Show that lines 3x-4y+5=0,7x-8y+5=0 and 4x+5y-45=0 are concurrrent.Find their point of concurrence.

For the equation ax^(2) +by^(2) + 2hxy + 2gx + 2fy + c =0 where a ne 0 , to represent a circle, the condition will be

If a, b,c are in G.P. and ax^2 + 2bx + c = 0 and px^2 + 2qx + r = 0 have common roots then verify that pb^2 - 2qba + ra^2 = 0