The answer is:
It will took 0.375 hours for Ava and Kelly to be 3/4 miles apart.
To calculate how long after they start they will be 3/4 miles apart, we need to write two equations.
So, writing the equations, we have:
Calculations for Ava:
We have the following information,
[tex]v_{Ava}=6mph[/tex]
Then, writing the equation,
[tex]x_{Ava}=x_{o}+v_{Ava}*t[/tex]
[tex]x_{Ava}=x_{o}+v_{6mph}*t[/tex]
Calculations for Kelly:
We have the following information,
[tex]v_{Kelly}=8mph[/tex]
We need to calculate when Kelly will be 3/4 miles apart of Ava, so, it's position will be the Ava's position plus 3/4 miles.
Then, writing the equation,
[tex]x_{Ava}+0.75miles=x_{o}+v_{Kelly}*t[/tex]
[tex]x_{Ava}+0.75miles=x_{o}+v_{8mph}*t[/tex]
Now, substituting Ava's speed into the second equation, we have:
[tex]x_{o}+6mph*t+0.75miles=x_{o}+8mph*t[/tex]
[tex]6mph*t+0.75miles=+8mph*t[/tex]
[tex]8mph*t-6mph*t=0.75miles[/tex]
[tex]2mph*t=0.75miles[/tex]
[tex]t=\frac{0.75miles}{2mph}=0.375hours[/tex]
Hence, we have that it will took 0.375 hours for Ava and Kelly to be 3/4 miles apart.
Have a nice day!
Answer:
So what the other guy said in minutes was 22.5 minutes
Step-by-step explanation:
