# Dimensional Analysis Practice Dimensional analysis is a systematic method of problems solving. The approach is based on including complete units with all

Dimensional Analysis Practice

Dimensional analysis is a systematic method of problems solving. The approach is based on including
complete units with all numbers in a problem and performing the same arithmetic steps with the units that
you perform with numbers associated with them. Below are some examples that illustrate how to use
dimensional analysis. Follow these examples to learn the common pattern apparent in applying this
approach
Steps to solving Dimensional Analysis problems:
1.
What are your starting and ending units?
2. Develop a unit plan.
3. Select appropriate conversion factors.
4. Cancel units and check.
5. Do math on calculator by multiplying all numbers on the top, then multiplying all numbers on the
bottom, and finally dividing the top number by the bottom number.
See the examples below for how to use these steps.
1. What units would the answer be in?
1 mile X 5280 ft x 12 inches = XX
1 mile 1 foot
2. An automobile travels at an average speed of 50 km per hour. How long will it take
for the car to travel 850 km?
Solution:
Determine what units are given
.
850 km given
Answer to be in hours how long will it take?”
• Average speed of 50 km per hour can be rewritten as 50 km = 1 hour
• Possible conversion factors (written as a fraction)
50 km
or 1 hour
1 hour
50 km
Given quantity X conversion factor(s) = sought quantity
XX
XX
hours
3. How many seconds are there in 3 years? (Assume a non-leap year!)
Solution:
Determine what units are given:
xx
Determine your conversion factor(s). Use simple easy ones!
XX
Now set up your probleml! Remember this includes numbers as well as units
XX XX
XX
XX
XX
х
х
х
х
XX
XX
XX
XX
XX
XX
XX