Answer: [tex]8\ miles[/tex]
Step-by-step explanation:
We know that the formula for the distance is:
[tex]d=V*t[/tex]
Where "V" is speed and "t" is time.
Let be:
[tex]t_1[/tex]: time of her trip from her home to the library.
[tex]t_2[/tex]: time of her trip from the library to her home.
[tex]V_1[/tex]: speed on her trip from her home to the library.
[tex]V_2[/tex]: speed on her trip from the library to her home
We can identify that:
[tex]t_1=20\ min=\frac{(20\ min)(1\ h)}{60\ min}=\frac{1}{3}\ h\\\\V_1=V_2+8\ mph\\\\t_2=30\ min=\frac{(30\ min)(1\ h)}{60\ min}=\frac{1}{2}\ h[/tex]
Since the distance she rode on the both trips are equal:
[tex]V_1*t_1=V_2*t_2\\\\(V_2+8)(\frac{1}{3})=(V_2)(\frac{1}{2})[/tex]
Solving for [tex]V_2[/tex], we get:
[tex]2(V_2+8)(\frac{1}{3})=3(V_2)\\\\2V_2+16=3V_2\\\\V_2=16\ mph[/tex]
Therefore, the distance for her home to the library is:
[tex]d=(16\ mph)(\frac{1}{2}\ h)\\\\d=8\ miles[/tex]
