Imperial systems in measuring systems
Imperial conversions
The imperial system is used in Britain and some other Commonwealth countries. That’s why it’s sometimes also known as the British imperial system. The imperial system is not based on the number of 10, unlike the metric system. In this lesson we’re going to learn how to convert between different imperial units.
Foot to inches
What is 1 foot? How many inches in a foot is there? A foot is equalled to 12 inches on the imperial system. Each inch is equalled to 2.54 centimeters if you’re more familiar with the metric system. If you’re converting feet to inches, remember to multiply the number of inches by 12. If you’re converting inches to feet, you’ll have to divide by 12 to get to the corresponding number of feet.
Yard to feet
How many foot in a yard is there? 1 yard is equalled to 3 feet. Again, if you’re more familiar with the metric system, each yard is equalled to 0.9144 meters. When you’re converting yard to feet, multiply the number of yards by 3 to get the total feet. On the other hand, you’ll have to divide by 3 in order to convert feet to yards.
Mile to yards
How many yards in a mile is there? 1 mile is the equivalent of 1760 yards. In metric terms, that’s 1.6093 kilometers. For each mile that you’re converting into yards, you’ll have to multiply by 1760. If you’re trying to change yards into miles, then divide it by 1760 to get the equivalent miles.
Here’s a summary imperial conversion table of the above information for your reference.
Example questions
Question 1
Converting the imperial units
1a) 43 ft =_____ yd
Since we know that 1 yard equals 3 feet, we’ll have to divide 43 by 3 in order to find the equivalent yards.
$43 ft \bullet \frac{1 yd}{3 ft} = 14.33yd$
1b) 530 in =____ mi
When you’ve got inches and you want to turn it into miles, work back through the different unit conversions in order to find your answer. First, we can convert 530 inches into feet. Therefore, we’ll have to divide 530 by 12. We’ll then convert the feet to yards. This means we’ll have to divide the number we get by 3 in order to get yards. Lastly, convert the yards that we get to miles. To do this, we’ll have to divide by 1760 yards.
In other words, we can write the following:
$530 in \bullet \frac{1 ft}{12 in} \bullet \frac{1 yd}{3 ft} \bullet \frac{1 mi}{1760 yd} = 14.72 mi$
1c) 50 yd =____ mi
Checking back to the reference chart, we know that 1760 yards equals 1 mile. Therefore, we’ll have to divide 50 by 1760 in order to convert our 50 yards into miles.
$50 yd \bullet \frac{1 mi}{1760 yd} = 0.028 mi$
Question 2
Add or subtract different imperial units
2a) 250 in + 345 yd  0.005 mi =____ ft
Convert each unit into feet.
$250 in \bullet \frac{1 ft}{12 in} = 20.3 ft$
$345 yd \bullet \frac{3 ft}{1 yd} = 1035 ft$
$0.004 mi \bullet \frac{1760 yd}{1 mi} \bullet \frac{3 ft}{1 yd} = 26.4 ft$
Plug back into original equation and solve for the length in feet.
$20.3 ft + 1035 ft  26.4 ft = 1029.43 ft$
2b) 0.03 mi + 400 ft  5000 in =____ yd
$0.03 mi \bullet \frac{1760 yd}{1 mi} = 52.8 yd$
$400 ft \bullet \frac{1 yd}{3 ft} = 133.3 yd$
$5000 in \bullet \frac{1 ft}{12 in} \bullet \frac{1 yd}{3 ft} = 138.8 yd$
Plug back into original equation and solve for the length in yard.
$52.8 yd + 133.3 yd  138.8 yd = 47.2 yd$
2c) 0.3 mi  500 ft + 2345 in =____ mi =____ yd =____ ft
$0.3 mi \bullet \frac{1760 yd}{1 mi} = 528 yd$
$500 ft \bullet \frac{1 yd}{3 ft} = 166.7 yd$
$2345 in \bullet \frac{1 ft}{12 in} \bullet \frac{1 yd}{3 ft} = 65.14 yd$
Plug it back into the original equation and solve for answer in yards
$528 yd  166.7 yd + 65.14 yd = 426 yd$
Convert answer to miles and feet.
$426 yd \bullet \frac{1 mi}{1760 yd} = 0.242 mi$
$426 yd \bullet \frac{3 ft}{1 yd} = 1270 ft$
If you wanted to double check your answers, check out this online unit converter dealing with lengths. Here’s also another general unit converter you may find handy.
If you were stuck at any point during this lesson, you may want to go back and review several lessons that build up to this imperial conversion class. Review how to multiply fractions and whole numbers, proper fractions, improper fractions, and decimals. Ratios and rates are also lessons that touches on converting numbers.
Imperial systems in measuring systems
Basic concepts:
 Multiplying fractions and whole numbers
 Multiplying proper fractions
 Multiplying improper fractions and mixed numbers
Related concepts:
 Multiplying decimals
 Ratios
 Rates
Lessons
Notes:
$\cdot$ Mainly used in US and some in Canada
$\cdot$ Not based on number of 10
Lengths
1 foot (ft) = 12 inches (in)
1 yard (yd) = 3 feet (ft)
1 mile (mi) = 1760 yards (yd)

1.
Converting the imperial units

2.
Add or subtract different imperial units