Fractions, Ratios, and Proportions

Fraction and ratio questions are among the most common on the OAR Math Skills Test. The key is not just knowing the rules but executing them quickly without a calculator.

Fraction Operations

Adding and Subtracting Fractions

You must have a common denominator before adding or subtracting:

Same denominator: 3/7 + 2/7 = 5/7

Different denominators — find the LCD (Least Common Denominator):

2/3 + 1/4

• LCD of 3 and 4 = 12
• 2/3 = 8/12
• 1/4 = 3/12
• 8/12 + 3/12 = 11/12

Finding the LCD efficiently:

Multiplying Fractions

Multiply numerators together and denominators together, then simplify:

3/4 × 2/5 = (3 × 2) / (4 × 5) = 6/20 = 3/10

Speed tip: Cross-cancel before multiplying to keep numbers small.

3/4 × 2/5: The 2 and 4 share a factor of 2, so reduce to 3/2 × 1/5 = 3/10

Dividing Fractions

Multiply by the reciprocal (flip the second fraction):

3/4 ÷ 2/5 = 3/4 × 5/2 = 15/8 = 1 7/8

Mixed Numbers

Convert to improper fractions before performing operations:

2 1/3 × 1 1/2 = 7/3 × 3/2 = 21/6 = 7/2 = 3 1/2

Common Fraction-Decimal-Percent Conversions

Memorize these — they save enormous time on the OAR:

Ratios

A ratio compares two quantities. Written as a:b, a/b, or "a to b."

Solving Ratio Problems

Example: The ratio of officers to enlisted personnel at a training facility is 2:7. If there are 270 total people, how many are officers?

1. Total parts = 2 + 7 = 9
2. Value per part = 270 ÷ 9 = 30
3. Officers = 2 × 30 = 60

Scaling Ratios

To maintain a ratio when scaling:

• If a recipe calls for 3 cups flour : 2 cups sugar for 12 cookies
• For 36 cookies (3× the batch): 9 cups flour : 6 cups sugar

Proportions

A proportion states that two ratios are equal: a/b = c/d

Cross-Multiplication

The fastest way to solve proportions:

If 3/4 = x/20, then:

• 3 × 20 = 4 × x
• 60 = 4x
• x = 15

Proportion Word Problems

Example: If a ship travels 180 nautical miles in 3 hours, how far will it travel in 5 hours at the same speed?

Set up the proportion: 180/3 = x/5

Cross-multiply: 180 × 5 = 3 × x → 900 = 3x → x = 300 nautical miles

Example: A map scale shows 1 inch = 25 miles. If two bases are 3.5 inches apart on the map, what is the actual distance?

1/25 = 3.5/x → x = 25 × 3.5 = 87.5 miles

Rate Problems as Proportions

Many OAR word problems are proportion problems in disguise: