If a,b respectively be the number of solutions and sum of solutions of `|(2x)/(x-1)|-|x| = (x^(2))/(|x-1|)`, then

Let a and b be the number of solutions and sum of solutions of (2x)/(x-1)-|x|=(x^(2))/(|x-1|) respectively,then a=3( b )b=1b=2(d)a=2

Let a and b be the number of solutions and sum of solutions of (2x)/(x-1)-|x|=(x^2)/(|x-1|) respectively, then a=3 (b) b=1 (c) b=2 (d) a=2

The solution of equation: |(x)/(x-1)|+|x|=(x^(2))/(|x-1|)

Total number of real solutions of |(x)/(x-1)|+|x|=|(x^(2))/(x-1)| is equal to

Find the number of solutions of the equation sin x=x^(2)+x+1

Find the number of solutions of equation (2x-3)2^(x)=1

If solution of the equation |(x)/(x-1)|+|x|=(x^(2))/(|x-1|) is (a,oo)uu{b} then 3a+b is

Number of solution(s) of equation |x^(2)-1|=" "(x)/(x-1), is-

Number of solution of x^(2)+x+|x|+1<=0 is

Number of solutions of the equations |2x^(2)+x-1|=|x^(2)+4x+1|