Time

A 100-meter sprint is a very fast event, usually lasting only a few seconds.

• An hour or a minute would be far too long.
• The best unit for this quick action is seconds (s).

We are going from a larger unit (minutes) to a smaller one (seconds), so we multiply.
Since 1 minute = 60 seconds:$$\begin{aligned}[t]2 \, \text{min} &= 2 \times 60 \, \text{s} \\ &= 120 \, \text{s}\end{aligned}$$So, 2 minutes is 120 seconds.

We are going from a smaller unit (seconds) to a larger one (minutes), so we divide.
Since 1 minute = 60 seconds:$$\begin{aligned}[t]120 \div 60 &= 2 \\ 120 \, \text{s} &= 2 \, \text{min}\end{aligned}$$So, 120 seconds is 2 minutes.

To convert a PM time to 24-hour format, you add 12 to the hour.$$\begin{aligned}[t]6:15 \, \text{PM} &= 12 \, \text{h} + 6 \, \text{h} + 15 \, \text{min} \\ &= 18 \, \text{h} + 15 \, \text{min} \\ &= 18:15\end{aligned}$$So, 6:15 PM becomes 18:15.

Let’s follow the steps to read the time:

• Hour Hand: The short hand has passed the 7 but has not yet reached the 8. Therefore, the hour is 7.
• Minute Hand: The long hand has passed the 2.
  • The 2 represents \(2 \times 5 = 10\) minutes.
  • It is pointing 2 small tick marks past the 2.
  • We add the minutes together:$$\begin{aligned}10 \,\text{minutes} + 2 \,\text{minutes} = 12 \,\text{minutes}\end{aligned}$$
• Combine and add AM/PM: Since it is morning, the time is 7:12 AM.

• Step 1 (Add minutes): \(30 \, \text{min} + 45 \, \text{min} = 75 \, \text{min}\).
• Step 2 (Regroup minutes): 75 minutes is more than 1 hour. We can regroup it: \(75 \, \text{min} = 60 \, \text{min} + 15 \, \text{min} = 1 \, \text{h} \, 15 \, \text{min}\).
• Step 3 (Add hours): Add the original hours, then add the extra hour from regrouping: \(2 \, \text{h} + 1 \, \text{h} = 3 \, \text{h}\), then \(3 \, \text{h} + 1 \, \text{h} = 4 \, \text{h}\).
• Combine: The total duration is 4 hours and 15 minutes.

$$\begin{aligned} & 2 \, \text{h} \, 30 \, \text{min} \\ + \, & 1 \, \text{h} \, 45 \, \text{min} \\ \hline & 3 \, \text{h} \, 75 \, \text{min} \\ = \, & 3 \, \text{h} + (1 \, \text{h} + 15 \, \text{min}) \\ = \, & 4 \, \text{h} \, 15 \, \text{min}\end{aligned}$$

• Step 1 (Subtract minutes): We cannot subtract 45 from 15, so we need to regroup.
• Step 2 (Regroup): Borrow 1 hour from the 4 hours, leaving 3 hours. Add those 60 minutes to the 15 minutes: \(15 + 60 = 75\) minutes. Our starting time is now 3 hours and 75 minutes.
• Step 3 (Subtract minutes now): \(75 \, \text{min} - 45 \, \text{min} = 30 \, \text{min}\).
• Step 4 (Subtract hours): \(3 \, \text{h} - 1 \, \text{h} = 2 \, \text{h}\).
• You have 2 hours and 30 minutes left.

$$\begin{aligned}4 \, \text{h} \, 15 \, \text{min} - 1 \, \text{h} \, 45 \, \text{min}&= 3 \, \text{h} \, (60 + 15) \, \text{min} - 1 \, \text{h} \, 45 \, \text{min} \\ &= 3 \, \text{h} \, 75 \, \text{min} - 1 \, \text{h} \, 45 \, \text{min} \\ &= (3 - 1) \, \text{h} + (75 - 45) \, \text{min} \\ &= 2 \, \text{h} \, 30 \, \text{min}\end{aligned}$$

Analysis: The word altogether tells us to find a total, so we need to add.$$\begin{aligned} & 3 \, \text{h} \, 30 \, \text{min} \\ + \, & 2 \, \text{h} \, 15 \, \text{min} \\ \hline & 5 \, \text{h} \, 45 \, \text{min}\end{aligned}$$You spent 5 hours and 45 minutes in total.

Analysis: To find the duration between a start time and an end time, we subtract.$$\begin{aligned} & 13 \, \text{h} \, 30 \, \text{min} \\ - \, & 11 \, \text{h} \, 20 \, \text{min} \\ \hline & 2 \, \text{h} \, 10 \, \text{min}\end{aligned}$$The train trip takes 2 hours and 10 minutes.

Analysis: The action (making one nem) is repeated 20 times. For repeated addition of the same amount, we multiply.$$\begin{aligned}20 \times 2 \, \text{minutes} &= 40 \, \text{minutes}\end{aligned}$$It will take Hugo 40 minutes to prepare all the nems.

Analysis: We are splitting a total amount of time (1 hour) into equal groups (4 minutes each) to see how many groups we can make. This requires division. First, we must convert all units to be the same.

• Step 1: Convert. 1 hour = 60 minutes.
• Step 2: Divide.

$$\begin{aligned}60 \, \text{minutes} \div 4 \, \text{minutes per exercise} &= 15 \, \text{exercises}\end{aligned}$$You can do 15 exercises in 1 hour.

Analysis: We are finding how many equal groups of 3 minutes fit into a total of 36 minutes. This is a division problem.$$\begin{aligned}36 \, \text{minutes} \div 3 \, \text{minutes per test} &= 12 \, \text{tests}\end{aligned}$$The teacher can grade 12 tests.

Louis XIII started being king in 1610.

Julius Caesar was born in 100 BC.