QuestionMay 6, 2025

An icicle has a volume of 3,769.91mm^3 If the icicle drips at a rate of 75mm^3 per minute, how long will it take the icicle to completely melt? In 5 minutes, the icicle will lose 375mm^3 of volume. How much volume is left after 10 minutes? take for the icicle to completely melt? Round d to the nearest tenth. square : 750 cubic millimeters 2,769,91 cubic millimeters 3,019.92 cubic millimeters

An icicle has a volume of 3,769.91mm^3 If the icicle drips at a rate of 75mm^3 per minute, how long will it take the icicle to completely melt? In 5 minutes, the icicle will lose 375mm^3 of volume. How much volume is left after 10 minutes? take for the icicle to completely melt? Round d to the nearest tenth. square : 750 cubic millimeters 2,769,91 cubic millimeters 3,019.92 cubic millimeters
An icicle has a volume of 3,769.91mm^3 If the icicle drips at a rate of 75mm^3 per minute, how long will it take the icicle to completely melt? In 5 minutes, the icicle will lose 375mm^3 of volume. How much volume is left after 10 minutes? take for the icicle to completely melt? Round d to the nearest tenth. square : 750 cubic millimeters 2,769,91 cubic millimeters 3,019.92 cubic millimeters

Solution
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Answer

50.9 minutes Explanation 1. Calculate the volume lost per minute The icicle drips at a rate of 75 \, mm^3 per minute. 2. Calculate the total time to melt Use the formula: \text{Time} = \frac{\text{Total Volume}}{\text{Drip Rate}} \text{Time} = \frac{3769.91 \, mm^3}{75 \, mm^3/\text{minute}} 3. Perform the division \text{Time} = 50.93213 \approx 50.9 minutes (rounded to the nearest tenth) 4. Calculate the volume left after 10 minutes Volume lost in 10 minutes: 75 \, mm^3/\text{minute} \times 10 \, \text{minutes} = 750 \, mm^3 Remaining volume: 3769.91 \, mm^3 - 750 \, mm^3 = 3019.91 \, mm^3

Explanation

1. Calculate the volume lost per minute<br /> The icicle drips at a rate of $75 \, mm^3$ per minute.<br /><br />2. Calculate the total time to melt<br /> Use the formula: $\text{Time} = \frac{\text{Total Volume}}{\text{Drip Rate}}$<br /> $\text{Time} = \frac{3769.91 \, mm^3}{75 \, mm^3/\text{minute}}$<br /><br />3. Perform the division<br /> $\text{Time} = 50.93213 \approx 50.9$ minutes (rounded to the nearest tenth)<br /><br />4. Calculate the volume left after 10 minutes<br /> Volume lost in 10 minutes: $75 \, mm^3/\text{minute} \times 10 \, \text{minutes} = 750 \, mm^3$<br /> Remaining volume: $3769.91 \, mm^3 - 750 \, mm^3 = 3019.91 \, mm^3$
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