This question is based on the concept of graph. Therefore, the correct option is C, shows the solution set of [tex]\dfrac{x-1}{1-x}<0[/tex].
Given that:
[tex]\dfrac{x-1}{1-x}<0[/tex]
We need to determined the solution set of given expression.
According to the question,
From the given expression i.e. [tex]\dfrac{x-1}{1-x}<0[/tex] is observed that,
For the existence of function denominator is not equal to zero. That is, x is not equal to 1. Because at x =1, denominator equal to zero and function is not defined.
Thus, in the solution set of [tex]\dfrac{x-1}{1-x}<0[/tex] excluding one, at every real number is function is defined.
Therefore, the correct option is C, shows the solution set of [tex]\dfrac{x-1}{1-x}<0[/tex].
For more details, prefer this link:
https://brainly.com/question/11988499
