Answer:
The denominator of the fraction y = 12.
Step-by-step explanation:
Given that Point X is at [tex]$ \frac{2}{3} $[/tex] of a number line. And that the distance between point X and 0 is the same as Y and 0.
Also, it is known that the numerator of Y = 8.
Let us assume [tex]$ Y = \frac{8}{a} $[/tex], where 'a' is the denominator of the fraction Y.
Since, they are equidistant from 0, we can write:
[tex]$ d(0, X) = d(Y, 0) $[/tex]
[tex]$ \implies |X - 0| = |Y - 0| $[/tex]
[tex]$ \implies |X| = |Y|$[/tex]
[tex]$ \implies \frac{2}{3} = \frac{8}{a} $[/tex]
Solving for 'a',
[tex]$ a = \frac{8. 3}{2} = \frac{24}{2} = \textbf{12} $[/tex]
Therefore, the denominator of the fraction is 12.
NOTE: The fraction [tex]$ \frac{2}{3} $[/tex] = [tex]$ \frac{8}{12} $[/tex]
[tex]$ \frac{2. 4}{3. 4} = \frac{8}{12} = \frac{2}{3} $[/tex]
So, 2/3 was multiplied by a factor of 4. We could have arrived at 12, in this way as well,
