Find the value of `m` so that lines `y=x+1, 2x+y=16 and y=mx-4` may be concurrent.

Find the value of m so that the lines 3x+y+2=0, 2x-y+3=0 and x+my-3=0 may be concurrent.

Find the value of m so that the lines 3x+y+2=0, 2x-y+3=0 and x+my-3=0 may be concurrent.

Find the value of m so that the straight lines y=x+1, y=2 (x+1) and y=mx+3 are concurrent.

The least positive value of t so that the lines x=t+a,y+16=0 and y=ax are concurrent is

For what value of m are the three lines y=x+1, y=2(x+1) and y=mx+3 concurrent ?

Find the value of p, so that three lines 3x + y = 2, px + 2y-3=0 and 2x-y=3 are concurrent.

The least positive value of t so that the lines x = t+alpha, y+16 = 0 and y = alphax are concurrent is

Find the value of p if the lines 3x+4y=5, 2x+3y=4, px+4y=6 are concurrent.

If the three straight lines y = 3x- 1, 2y = x + 3 and 3y - 4 = mx are concurrent, then find the value of m.