On his way to Florida Jason drove 300 miles in 5 hours If he continues to drive at this rate how far will he drive in the next 4 hours?

A.20
B.60
C.150
D.240
D?

Kris jogs 17 miles in 3 weeks. If he continues to jog at the same rate how many miles will he jog during the next 9 weeks?
A.175
B.153
C.63
D.51
D?

Both are right.

Well the florida one is b

To get the answer, we need to find the rate at which Jason drives. We can do this by dividing the distance he drove by the time it took him to drive it.

For the first question, to find the rate at which Jason drove, we divide the distance (300 miles) by the time (5 hours):

Rate = Distance / Time
Rate = 300 miles / 5 hours
Rate = 60 miles per hour

Now that we know the rate at which Jason drives (60 miles per hour), we can find how far he will drive in the next 4 hours by multiplying the rate by the time:

Distance = Rate * Time
Distance = 60 miles per hour * 4 hours
Distance = 240 miles

Therefore, the answer to the first question is D. Jason will drive 240 miles in the next 4 hours.

For the second question, we follow the same steps. To find the rate at which Kris jogs, we divide the distance he jogs (17 miles) by the time it takes him to jog it (3 weeks):

Rate = Distance / Time
Rate = 17 miles / 3 weeks
Rate = 5.67 miles per week

Now that we know the rate at which Kris jogs (5.67 miles per week), we can find how many miles he will jog during the next 9 weeks by multiplying the rate by the time:

Distance = Rate * Time
Distance = 5.67 miles per week * 9 weeks
Distance = 51.03 miles

Therefore, the answer to the second question is D. Kris will jog approximately 51 miles during the next 9 weeks.