The lines `x+y-1=0,(m-1)x+(m^2-7)y-5=0,` and `(m-2)x+(2m-5)y=0` are concurrent for three values of `m` concurrent for no value of `m` parallel for one value of `m` parallel for two value of `m`

The lines x+y-1=0,(m-1)x+(m^2-7)y-5=0, and (m-2)x+(2m-5)y=0 are a.) concurrent for three values of m b.) concurrent for no value of m c.) parallel for one value of m d.) parallel for two value of m

The lines x+y-1=0,(m-1)x+(m^2-7)y-5=0, and (m-2)x+(2m-5)y=0 are a.) concurrent for three values of m b.) concurrent for no value of m c.) parallel for one value of m d.) parallel for two value of m

The lines x+y-1=0,(m-1)x+(m^(2)-7)y-5=0and(m-2)x+(2m-5)y=0 are -

The lines x+y-1=0,(m-1)x+(m^(2)-7)y-5=0 and (m-2)x+(2m-5)y=0 are concurrent for three values of m concurrent for one value of m concurrent for no value of m parallel for m=3.

The lines x+y-1=0,(m-1)x+(m^2-7)y-5=0, and (m-2)x+(2m-5)y=0 are a) concurrent for three values of m b) concurrent for one value of m c) concurrent for no value of m d) parallel for m=3.

The lines x+y-1=0,(m-1)x+(m^2-7)y-5=0, and (m-2)x+(2m-5)y=0 are (a)concurrent for three values of m (b)concurrent for one value of m (c)concurrent for no value of m (d)parallel for m=3.

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

If the line x=a+m,y=-2 and y=mx are concurrent,then least value of |a| is

If the line x=a+m, y=-2 and y=mx are concurrent, then least value of absa is