Types of Ratios

Ratios come in several types, each serving different purposes in mathematics and practical applications:

Part-to-Part Ratio

Compares one part of a whole to another part of the same whole. For example, in a classroom with 15 boys and 10 girls, the part-to-part ratio of boys to girls is 15:10 or simplified to 3:2.

Part-to-Whole Ratio

Compares one part to the total. Using the same classroom example, the part-to-whole ratio of boys to all students is 15:25 or simplified to 3:5. Part-to-whole ratios are closely related to fractions and percentages.

Whole-to-Part Ratio

The inverse of part-to-whole, comparing the total to one part. In our classroom example, the whole-to-part ratio of all students to girls would be 25:10 or 5:2.

Rate

A special type of ratio that compares quantities with different units, such as speed (distance per time) or pricing (cost per unit). For example, traveling 240 miles in 4 hours gives a rate of 60 miles per hour.

Scale

A ratio that relates measurements on a model or drawing to the actual measurements of the object represented. For example, a map with a scale of 1:100,000 means that 1 cm on the map represents 100,000 cm (1 km) in real life.

Multiple-Term Ratio

A ratio that compares three or more quantities. For example, the ratio of ingredients in a recipe might be 2:3:1 for flour, water, and oil.

Real-World Applications of Ratios

Ratios are fundamental tools used across numerous fields and everyday situations:

Cooking and Baking

Recipes rely on ratios to ensure proper balance of ingredients. For example, a basic bread recipe might use a 5:3 ratio of flour to water. When scaling recipes up or down, maintaining these ratios is crucial for successful results.

Finance and Investing

• Asset allocation: Investors use ratios like 60:40 (stocks to bonds) to balance risk and return
• Financial ratios: Price-to-earnings ratio, debt-to-equity ratio, and current ratio help evaluate companies
• Loan-to-value ratio: Used by lenders to assess mortgage risk

Construction and Architecture

Builders use ratios for structural integrity (beam span-to-depth ratios), concrete mixing (cement:sand:aggregate ratios), and architectural design (the golden ratio 1:1.618 for aesthetically pleasing proportions).

Photography and Art

The rule of thirds uses a 1:1:1 division ratio for composition. Aspect ratios like 4:3 or 16:9 define the proportional relationship between width and height of an image.

Chemistry and Pharmacy

Chemical formulas represent the ratio of elements in compounds. Pharmacists use ratio strengths to describe the concentration of active ingredients in medications.

Geography and Cartography

Map scales show the ratio between distances on maps and the corresponding real-world distances.

Health and Fitness

Macro nutrient ratios (carbs:protein:fat), work-to-rest ratios in interval training, and waist-to-height ratio for health risk assessment.

Ratio Formulas and Methods

Simplifying Ratios

To simplify a ratio a:b, divide both values by their greatest common divisor (GCD):

Simplified ratio = (a ÷ GCD):(b ÷ GCD)

Example: To simplify 15:25, find the GCD (5) and divide both numbers: 15÷5 : 25÷5 = 3:5

Finding the Missing Value in a Proportion

When two ratios are equal (a:b = c:d), they form a proportion. To find a missing value:

• If a is missing: a = (b × c) ÷ d
• If b is missing: b = (a × d) ÷ c
• If c is missing: c = (a × d) ÷ b
• If d is missing: d = (b × c) ÷ a

Example: In the proportion 2:3 = x:15, to find x: x = (2 × 15) ÷ 3 = 10

Scaling Ratios

To scale a ratio a:b to a target sum T:

First find the sum of the original ratio: S = a + b

Then calculate the scaling factor: f = T ÷ S

The scaled ratio is: (a × f):(b × f)

Example: To scale 3:5 to a sum of 40: S = 3 + 5 = 8, f = 40 ÷ 8 = 5, Scaled ratio = 3×5 : 5×5 = 15:25

Converting Between Part-to-Part and Part-to-Whole Ratios

From part-to-part (a:b) to part-to-whole:

Part-to-whole for a = a:(a+b)

Part-to-whole for b = b:(a+b)

Example: Convert 3:5 to part-to-whole

For 3: 3:(3+5) = 3:8

For 5: 5:(3+5) = 5:8

From part-to-whole (a:t) to part-to-part:

To convert part-to-whole ratios a:t and b:t to part-to-part: a:b

Example: If men:total is 2:5 and women:total is 3:5, then men:women is 2:3

Dividing a Quantity in a Given Ratio

To divide a quantity Q in the ratio a:b:

First find the sum of the ratio parts: S = a + b

Then calculate the value of one part: P = Q ÷ S

The division is: (a × P) and (b × P)

Example: Divide 80 in the ratio 3:5

S = 3 + 5 = 8, P = 80 ÷ 8 = 10

Division: 3 × 10 = 30 and 5 × 10 = 50