Let `A={x|x^2 + (m - 1)x -2(m +1)=0, x in R}, {B = {x|(m-1)x^2 + mx + 1 = 0, x in R}` Number of values of m such that `AuuB` has exactly 3 distinct elements, is

`(c )` Case I : When `Q` is a quadratic equation
`D_(P)=(m+3)^(2)` and `D_(Q)=(m-2)^(2)`
roots of `1^(st)` equation are `2`, `-(m+1)`
roots of `2^(nd)` equation are `-1`, `(1)/(1-m)`,
For exactly there elements in `P uu Q` two of the roots must be same
So we have following possibilities ltbr. `2=-(m+1)impliesm=-3`
`2=(1)/(1-m)impliesm=1//2`
`-m-1=-1impliesm=0`
`-(m+1)=(1)/(1-m)implies1-m^(2)=-1impliesm=+-sqrt(2)`
`(1)/(1-m)=-1impliesm=2`
Case II : Now if `m=1`, then `Q` becomes linear
roots of `Q` as `x=-1`
roots of `P` are `2` and `-2`
`implies3` elements in common
`:.` all permissible values of `m` are `{-3,(1)/(2),sqrt(2),-sqrt(2),2,0,1}`