To determine how long the second part of the trip will take, we first need to calculate how far Herman and his dad travel in the first 2 hours and then find out how far they have left to go.
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Distance traveled in the first 2 hours: \[ \text{Distance} = \text{Speed} \times \text{Time} = 60 \text{ miles per hour} \times 2 \text{ hours} = 120 \text{ miles} \]
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Total distance to the tournament: \[ \text{Total distance} = 210 \text{ miles} \]
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Distance remaining after 2 hours: \[ \text{Remaining distance} = \text{Total distance} - \text{Distance traveled} = 210 \text{ miles} - 120 \text{ miles} = 90 \text{ miles} \]
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Time to complete the second part of the trip: To find out how long it will take to travel the remaining 90 miles at a speed of 60 miles per hour, we use the formula: \[ \text{Time} = \frac{\text{Distance}}{\text{Speed}} = \frac{90 \text{ miles}}{60 \text{ miles per hour}} = 1.5 \text{ hours} \]
So, the second part of the trip will take 1.5 hours.
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