|(x)/(x-1)|+|x|=(x^(2))/(|x-1|)...

|(x)/(x-1)|+|x|=(x^(2))/(|x-1|)

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

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

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

Solve the equation |x/(x-1)|+|x|=x^2/|x-1|

Solve the equation |x/(x-1)|+|x|=x^2/|x-1|

Solve the equation |x/(x-1)|+|x|=x^2/|x-1|

For real x, the equation |x/(x-1)|+|x|=x^2/(|x-1|) has

If (x^(3)+x^(2)+x+1)/(x^(3)-x^(2)+x-1)=(x^(2)+x+1)/(x^(2)-x+1), then the number of real value of x satisfying are

Show that (x^(3)+x^(2)+x+1)/(x^(3)-x^(2)+x-1)=(x^(2)+x+1)/(x^(2)-x+1) is not possible for any x varepsilon R.

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