SAT: Questions

Be careful: you can't just take the average of the two speeds, because Caroline will travel longer at the slower speed than she will at the faster speed. When you see a rate problem, you know you'll need to use the distance formula, which is distance = rate x time. The formula has three terms, and so if you know two of them, you can solve for the third term. Here, we're asked for Caroline's average speed, which means we're looking for the rate. So if we can figure out how far she traveled (distance) and how long she traveled (time), we can figure out the average speed (rate) at which she traveled.

rate

=

100  miles  25 12  hours

=

100

miles

×

12 25  hours

=	1200  miles  25  hours

=

48

miles per hour

So how far did she travel? She went 50 miles one way and 50

miles the other way. So she went a total of 100 miles. How long

did her trip take? This is the tough part, because we have to

use the distance formula to calculate the time each leg of her trip

took.

Since distance

=

rate

×

time, the time each leg of her trip took

is equal to the distance traveled divided by her rate of speed. In

other words, since distance

=

rate

×

time, time

=

distance   rate

.

Since we know the distance of each leg of Caroline's trip, and we

know her speed, we can calculate the time each leg of her trip

took.

On the way to her mother's house, Caroline drives 50 miles at 40

miles per hour, so she drives for

50 40

=

5 4

hours. On the way back,

she drives 50 miles at 60 miles per hour, so she drives for

50 60

=

5 6

hours. So it takes her

5 4

hours

+

5 6

hours

=

15 12

hours

+

10 12

hours

=

25 12

hours.

Now we have her distance (100 miles) and her time,

25 12

hours,

and so we can plug these into the distance formula to

calculate her rate.

Again, distance

=

rate

×

time, and so rate

=

distance   time

.

So Caroline's average speed is: