Answer:
For the quantity less than one, all the x-values smaller than 4
For the quantity greater than one, all the x-values larger than 4
the value 4 cannot be used at all.
Step-by-step explanation:
According to the description, the quantity in question can be represented by the fraction:
[tex]\frac{x}{x-4}[/tex]
Notice that since the binomial (x - 4) is in the denominator, in order to prevent a case with undefined quotient, x - 4 cannot be zero, and that is x cannot be 4.
Notice as well that in the case that x is larger than 4, the binomial (x-4) is a positive number, and in the case that x is less than 4, the binomial (x - 4) is a negative number.
Which values result in the quantity greater than one?
We need to solve for x in the inequality:
[tex]\frac{x}{x-4} >1[/tex]
So, if x > 4 then we can proceed as follows:
[tex]\frac{x}{x-4} >1\\x>x-4\\0>-4[/tex]
which is a true statement, when x > 4
If x < 4 then:
[tex]\frac{x}{x-4} >1\\x<x-4\\0<-4[/tex]
where we have used that (x-4) is negative, so multiplying by it would flip the direction of the inequality. As we see, this case results in an absurd , so it is not possible for x < 4 to render the quantity under study larger than one.
We study similarly the case for the quantity in question being smaller than one considering x > 4:
[tex]\frac{x}{x-4} <1\\x<x-4\\0<-4[/tex]
and we arrive at an absurd. so the quantity cannot be smaller than 1 if x is larger than 4
Now for x smaller than 4:
[tex]\frac{x}{x-4} <1\\x>x-4\\0>-4[/tex]
we arrive at a true statement. So it is possible to get the quantity in question smaller that one if x is less than 4.
