Respuesta :
Answer:
It'll take the robot 8 minutes to complete one task
7.5 tasks will be completed in one hour
Step-by-step explanation:
Total time to complete 5 tasks is 2/3hr (40 minutes)
Time it takes to complete one task = 40 ÷ 5 = 8 minutes
Since the robot completes one task in 8 minutes, x tasks will be completed in 60 minutes.
x = 60 ÷ 8 = 7.5 tasks
Answer:
A. 8 minutes; B. 7.5 tasks in one hour; C. It takes the robot about [tex] \\ \frac{2}{15}\;hour[/tex] or about 0.1333 hour to complete one task or 13.33% of one hour.
Step-by-step explanation:
Part A
Two thirds hours is
[tex] \\ \frac{2}{3}*60 = 40\;min[/tex]
We know that each task takes the same amount of time. So, 40min can be divided by 5:
[tex] \\ \frac{40}{5} = 8\;min[/tex]
Thus, each task takes 8 min to be completed. Then, it takes the robot 8 minutes to complete one task.
Part B
The robot can complete 5 tasks in 40 minutes, how many tasks can the robot complete in 60 minutes or one hour?
There are 20 minutes ahead to complete one hour. In the next 8 minutes, the robot can complete one task. There are still 12 minutes ahead. In the next 8 minutes, the robot completes another task. There is still 4 minutes ahead to complete the hour, but in 4 minutes the robot can complete half of the task because it takes 8 minutes for a complete task. Therefore, the robot can complete 5 tasks + 2 tasks + 0.5 task = 7.5 tasks in one hour or 60 minutes.
We can obtain the same answer using proportions. That is, if 5 tasks are completed in 40 minutes, how many of them will be completed in one hour or 60 minutes.
Then
[tex] \\ \frac{5\;tasks}{40\;min} = \frac{x}{60\;min}[/tex]
[tex] \\ \frac{5\;tasks}{40\;min}*60\;min = x[/tex]
[tex] \\ x = \frac{5\;tasks*60\;min}{40\;min}[/tex]
[tex] \\ x = \frac{300\;tasks}{40} = 7.5\;tasks[/tex]
Part C (A)
From part A, we already know that the robot can complete a task in 8 minutes, which is a fraction of one hour. What is this fraction? In one hour we have 60 minutes, then
[tex] \\ 8\;min*\frac{1\;hour}{60\;min} = 1\;hour*\frac{8}{60} = 1\;hour*\frac{4}{30} = 1\;hour*\frac{2}{15} = 0.1333333....\;hours \approx 0.1333\;hours[/tex].
Therefore, it takes the robot about [tex] \\ \frac{2}{15}\;hour[/tex] or 0.1333 hour to complete one task (rounding to four decimal places) or 13.33% of one hour.
