Workkeys Applied Mathematics Level 4 Answers
0 of 5 Questions completed
Questions:
Information
You have already completed the quiz before. Hence you can not start it again.
Quiz is loading…
You must sign in or sign up to start the quiz.
You must first complete the following:
Quiz complete. Results are being recorded.
0 of 5 Questions answered correctly
Your time:
Time has elapsed
You have reached 0 of 0 point(s), (0)
Earned Point(s): 0 of 0, (0)
0 Essay(s) Pending (Possible Point(s): 0)
Categories
- Not categorized 0%
-
Question 1 of 5
Tina completed \(\frac{3}{8}\) of the project in \(2 \frac{1}{2}\) weeks. If she continues progressing at the same rate, how many more days will she need to bring the project to completion? Round your answer to the nearest whole number.
-
Question 2 of 5
Compute the volume of the cylinder shown below in cubic inches. Round your answer to the nearest tenth. There are 16.39 cubic centimeters (cm3) in 1 cubic inch (in3).
Volume of a cylinder ≈ 3.14 × (radius)2 × height
-
Question 3 of 5
GrassLoppers Incorporated has 5 employees dedicated to cutting grass. The fastest employee is able to mow one acre in 30 minutes; the 3 average employees are each able to mow one acre in 45 minutes; and the slowest employee is able to mow one acre in 60 minutes. How many acres can this team of 5 employees mow in one hour?
-
Question 4 of 5
An online database company offers two plans. Plan A costs $9 per month plus $0.006 per transaction. Plan B costs $39 per month plus $0.002 per transaction. If you anticipate having 12,000 transactions per month, what will be the expected average unit transaction cost (as defined below) if you select the plan that provides the lowest cost for your situation?
\( \text{Average Unit Transaction Cost}\)
\(= \dfrac{\text{Total Cost Per Month}}{\text{Transactions Per Month}}\)
-
Question 5 of 5
The illustration below shows the dimensions of the existing cone-shaped container. A new cone-shaped container needs to be designed such that its volume is twice that of the existing container's volume. Its radius will need to be increased to meet the new volume requirement, but the height of the new container will remain the same (12 cm). What will be the radius of the new container? Round to the nearest tenth.
\(V_{\text{cone}} ≈ \dfrac{3.14 × r^2 × h}{3}\)
(Where \(r\) is the radius and \(h\) is the height.)
- 1
- 2
- 3
- 4
- 5
- Current
- Correct
- Incorrect
Workkeys Applied Mathematics Level 4 Answers
Source: https://workkeyspracticetest.com/quizzes/applied-math-level-7/
Posted by: fordthisis1996.blogspot.com
0 Response to "Workkeys Applied Mathematics Level 4 Answers"
Post a Comment