Question

Beth had planned to run an average of 6 miles per hour in a race. She had a very good race and ran at an average speed of 7 mile per hour, finishing 10 minutes sooner than she would if she had averaged 6 miles per hour. How long was the race?

Answer 1

`7` miles

Explanation:

`s = d/t`

speed = distance / time

`d/t = 6 mi//h`

here, `d` is the total distance of the race

and `t` is the time, in hours, that Beth would have taken, if she ran at `6 mi//h`.

`1h = 60m`
she ran `10` minutes sooner than planned, so the time taken for her to run was `t - 1/6`. (where `t` is in hours)

when she ran for `10` minutes less than planned, her speed was `7 mi//h`.

`d/(t-1/6) = 7 mi//h`

this gives the two equations, `d/t = 6` and `d/(t-1/6) = 7`

you can solve both by isolating distance `d:`

`d/t = 6`

`d = 6t`

`d/(t-1/6) = 7`

`d = 7(t - 1/6)`

`d = 6t, d = 7(t - 7/6)`

this means that `6t = 7(t - 1/6)`.

using this, you can solve for time `t:`

`6t = 7(t - 1/6)`

`6t = 7t - 7/6`

`t - 7/6 = 6t - 6t = 0`

`t = 7/6 h` (or `7h` `10m`)

then `t` can be substituted into the speed equation:

`d/t = 6`

`d = 6t`

`d = 6 * 7/6`

`= 7/1`

`= 7`

the distance of the race is `7` miles.