If equation `x^2-(2+m)x+1(m^2-4m+4)=0` has coincident roots then (A) `m=0, m=1` (B) `m=0, m=2` (C) `m=2/3, m=6` (D) `m=2/3, m=1`

Similar Questions

Explore conceptually related problems

If the equation x^(2)-(2+m)x+(m2-4m+4)=0 has coincident roots,then

If the equation x^2-(2 + m)x + (m2-4m +4) = 0 has coincident roots, then

If the equation x^(2)-(2+m)x+(m^(2)-4m+4)=0 in x has equal roots, then the values of m are

If the equation x^(2) - (2 + m) x + (m^(2) - 4m + 4) = 0 in x has equal roots, then the values of m are

If both roots of the equation x^2-(m+1)x+(m+4)=0 are negative then m equals

If both roots of the equation x^(2)-(m+1)x+(m+4)=0 are negative then m equals

If m in Z and the equation m x^(2) + (2m - 1) x + (m - 2) = 0 has rational roots, then m is of the form

If the given equation: |x^(2)-2x-2|=m has two solutions,then a.m in[4,oo) b.m in(-1,) c.m in(4,oo)uu{0} d.m=0