Example: If a class has 12 boys and 18 girls:
• Ratio of boys to girls = \(12:18 = 2:3\) (simplified)
• This means for every 2 boys, there are 3 girls
• Total parts = \(2 + 3 = 5\) parts

Examples:
• Speed: 60 miles per hour (miles/hour)
• Unit price: $3.50 per pound (dollars/pound)
• Rate: 25 pages per day (pages/day)

Form: \(\frac{a}{b} = \frac{c}{d}\)
Cross-multiplication: \(a \times d = b \times c\)
Example: If 3 apples cost $2, then 9 apples cost $6
\(\frac{3 \text{ apples}}{2 \text{ dollars}} = \frac{9 \text{ apples}}{6 \text{ dollars}}\)

Part-to-Part vs. Part-to-Whole:

If ratio is \(a:b\), then:

• First part = \(\frac{a}{a+b} \times \text{total}\)

• Second part = \(\frac{b}{a+b} \times \text{total}\)

If \(\frac{a}{b} = \frac{c}{d}\), then \(a \cdot d = b \cdot c\)

Multiply diagonally across the equal sign to solve for unknowns

\(\text{Distance} = \text{Rate} \times \text{Time}\)

Also: \(\text{Total} = \text{Rate} \times \text{Amount}\)

Example: \(\text{Cost} = \text{Price per unit} \times \text{Number of units}\)

Multiply by conversion factors (as fractions equal to 1):

60 mph = \(60 \frac{\text{miles}}{\text{hour}} \times \frac{1 \text{ hour}}{60 \text{ minutes}} = 1 \frac{\text{mile}}{\text{minute}}\)

Step 1: Understand the ratio

Flour : Sugar = 5 : 2

This means for every 5 cups of flour, we need 2 cups of sugar

Step 2: Find the multiplier

If flour is 15 cups and the ratio part is 5:

Multiplier = \(\frac{15}{5} = 3\)

Step 3: Find sugar amount

Sugar = 2 × multiplier = \(2 \times 3 = 6\) cups

Alternative Method (Cross-Multiplication):

Set up proportion: \(\frac{5}{2} = \frac{15}{x}\)

Cross-multiply: \(5x = 30\)

Solve: \(x = 6\) cups

Answer: 6 cups of sugar

Step 1: Understand the ratio parts

Math : Science = 3 : 5

Total parts = \(3 + 5 = 8\) parts

Step 2: Find value of one part

8 parts = 40 students (total)

1 part = \(\frac{40}{8} = 5\) students

Step 3: Find students who prefer math

Math students = 3 parts = \(3 \times 5 = 15\) students

Verification:

Math: 15 students, Science: 25 students

Total: \(15 + 25 = 40\) ✓

Ratio: \(15:25 = 3:5\) ✓

Answer: 15 students prefer math

Step 1: Find the rate

Rate = \(\frac{\text{Distance}}{\text{Time}} = \frac{180 \text{ miles}}{3 \text{ hours}} = 60 \text{ mph}\)

Step 2: Use the rate to find new distance

Distance = Rate × Time

Distance = \(60 \times 5 = 300\) miles

Alternative: Proportion Method

Set up proportion: \(\frac{180 \text{ miles}}{3 \text{ hours}} = \frac{x \text{ miles}}{5 \text{ hours}}\)

Cross-multiply: \(3x = 900\)

Solve: \(x = 300\) miles

Answer: 300 miles

Step 1: Calculate Store A's unit price

Price per pound = \(\frac{\$8}{5 \text{ pounds}} = \$1.60\) per pound

Step 2: Calculate Store B's unit price

Price per pound = \(\frac{\$5.25}{3 \text{ pounds}} = \$1.75\) per pound

Step 3: Compare unit prices

Store A: $1.60 per pound

Store B: $1.75 per pound

Store A has the lower (better) unit price

Savings Analysis:

Difference per pound: \(\$1.75 - \$1.60 = \$0.15\)

For 10 pounds, Store A saves: \(\$0.15 \times 10 = \$1.50\)

Answer: Store A offers a better unit price ($1.60/lb)

Step 1: Set up the proportion

Scale: 1 inch on map = 25 miles in reality

\(\frac{1 \text{ inch}}{25 \text{ miles}} = \frac{3.5 \text{ inches}}{x \text{ miles}}\)

Step 2: Solve using cross-multiplication

\(1 \times x = 25 \times 3.5\)

\(x = 87.5\) miles

Quick Method:

Multiply map distance by scale factor:

\(3.5 \text{ inches} \times 25 \frac{\text{miles}}{\text{inch}} = 87.5\) miles

Answer: 87.5 miles

Step 1: Find the production rate

Rate = \(\frac{450 \text{ widgets}}{6 \text{ hours}} = 75 \text{ widgets per hour}\)

Step 2: Calculate production for 10 hours

Total widgets = Rate × Time

\(75 \frac{\text{widgets}}{\text{hour}} \times 10 \text{ hours} = 750\) widgets

Proportion Check:

\(\frac{450}{6} = \frac{x}{10}\) → \(6x = 4500\) → \(x = 750\) ✓

Answer: 750 widgets

Step 1: Find total ratio parts

Ratio = 2 : 3 : 5

Total parts = \(2 + 3 + 5 = 10\) parts

Step 2: Find value of one part

10 parts = $600

1 part = \(\frac{600}{10} = \$60\)

Step 3: Find the largest share

The largest ratio part is 5

Largest share = \(5 \times \$60 = \$300\)

Verification:

Person 1: \(2 \times \$60 = \$120\)

Person 2: \(3 \times \$60 = \$180\)

Person 3: \(5 \times \$60 = \$300\)

Total: \(\$120 + \$180 + \$300 = \$600\) ✓

Answer: $300

Part A: Find population density

Density = \(\frac{\text{Population}}{\text{Area}}\)

Density = \(\frac{120,000 \text{ people}}{40 \text{ sq mi}} = 3,000\) people/sq mi

Part B: Find neighboring city's population

Population = Density × Area

Population = \(3,000 \frac{\text{people}}{\text{sq mi}} \times 65 \text{ sq mi}\)

Population = 195,000 people

Proportion Check:

\(\frac{120,000}{40} = \frac{x}{65}\)

Cross-multiply: \(40x = 7,800,000\)

\(x = 195,000\) ✓

Answers:

Density: 3,000 people per square mile

Neighboring city population: 195,000 people

For Ratios

• Simplify ratios to lowest terms
• Identify if part-to-part or part-to-whole
• Sum all parts for total
• Use multiplier method for speed

For Rates

• Find rate first (divide)
• Check units match
• Multiply rate by quantity
• Verify answer makes sense

For Proportions

• Set up with units aligned
• Cross-multiply carefully
• Label all quantities with units
• Check that units cancel properly

General Tips

• Write units with every number
• Double-check which quantity is asked
• Test if answer is reasonable
• Verify calculations