# Two secretaries each have 300 letters to type. one can type 15 letters an hour, while the second can do 13 letters an hour. at the time the first typist finishes the job, how many more letters does the second typist have to finish?

**Question: Two secretaries each have 300 letters to type. one can type 15 letters an hour, while the second can do 13 letters an hour. at the time the first typist finishes the job, how many more letters does the second typist have to finish?**

In today's professional environment, efficiency and time management are key. Let's consider a scenario involving two secretaries with a significant workload. Each secretary has 300 letters to type. The first secretary types at a speed of 15 letters per hour, while the second types slightly slower at 13 letters per hour.

To determine when the first typist will finish and how many letters the second typist will have left, we need to calculate the time it will take for the first secretary to complete all 300 letters. By dividing the total number of letters (300) by the number of letters typed per hour (15), we find that it will take the first secretary 20 hours to finish the task.

Now, let's turn our attention to the second secretary. In those same 20 hours, at a rate of 13 letters per hour, the second secretary will have typed 260 letters (20 hours * 13 letters per hour). This leaves them with 40 letters remaining (300 total - 260 typed).

In conclusion, once the first secretary has finished typing all 300 letters, the second secretary will still have 40 letters to type to complete their workload. This simple mathematical problem highlights the importance of pacing and productivity in any clerical or administrative role.

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