To determine the time interval during which Kristen traveled 1.5 miles, we need to break down the components of his run.
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Jogging for 5 minutes:
- We need the speed for this part to know how far he traveled.
- Let's denote his jogging speed as \( S_1 \) (in miles per minute).
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Faster constant pace for 7 minutes:
- We'll denote this speed as \( S_2 \) (in miles per minute), which is faster than \( S_1 \).
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Rest for 4 minutes:
- During this time, he does not travel any distance.
Let's assume some hypothetical speeds for illustration, since the exact speeds aren’t provided:
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If we assume Kristen jogs at a speed of 5 minutes per mile (12 mph) during the first segment, then his distance for those 5 minutes is: \[ \text{Distance} = \text{Speed} \times \text{Time} = \frac{1 \text{ mile}}{5 \text{ minutes}} \times 5 \text{ minutes} = 1 \text{ mile} \]
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If during the faster pace (7 minutes), he runs at 3 minutes per mile (20 mph), then: \[ \text{Distance} = \frac{1 \text{ mile}}{3 \text{ minutes}} \times 7 \text{ minutes} \approx 2.33 \text{ miles} \]
In this example, he travels 1 mile during the jog and then covers another 2.33 miles during the faster run. He reaches the 1.5-mile mark sometime during these segments.
To find the exact time interval:
- In the first 5 minutes, he hasn’t reached 1.5 miles yet (only 1 mile).
- In the next 7 minutes, he reaches:
- At the end of 5 minutes: 1 mile.
- After the first minute of the fast pace (6 minutes total): \(1 + \frac{1}{3} = 1.33\) miles.
- After another 6 minutes (up to 12 minutes): \(1 + 2.33 = 3.33\) miles.
Now, how far does he need to run from the 5-minute mark to reach 1.5 miles?
He needs an additional \(0.5\) miles after reaching 1 mile. At the faster pace (3 minutes per mile), it will take: \[ \text{Time} = \text{Distance} \times \text{Rate} = 0.5 \times 3 = 1.5 \text{ minutes} \] So, he will reach 1.5 miles at: \[ 5 \text{ minutes} + 1.5 \text{ minutes} = 6.5 \text{ minutes} \text{ during the faster pace}. \]
Thus, Kristen travels 1.5 miles from: \[ 5 < \text{time} < 6.5 \text{ minutes}. \]
In conclusion, to express Kristen's travel interval in other words, he traveled 1.5 miles during the time interval of 5 minutes to 6.5 minutes.
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