Slide 1

4.1 Ratios, Rates, and Unit Pricing 1 A ratio is a comparison of two quantities by division. Ratios The ratio of a to b can be written as: Example: If there are 12 males and 17 females in a class, then the ratio of males to females is: Simplifying a Ratio Step 1. Write the ratio in fraction notation. Step 2. Simplify if possible. Example 1. Simplify each ratio if possible. a) 12 to 15b) 17 to 51 Answers: Your Turn Problem #1 Simplify each ratio if possible. a) 18 to 36b) 63 to 81

Slide 2

4.1 Ratios, Rates, and Unit Pricing 2 Simplifying a Ratio That Contains Decimals Step 1. Write the ratio in fraction notation. Step 2. Multiply numerator and denominator by a power of 10 to make each a whole number. (It must be the same power of 10 for both.) Stated also as: move the decimal point in the numerator and denominator to the right the same number of places to make each a whole number Step 3. Simplify if possible. Example 2. Simplify each ratio if possible. a) 0.48 to 0.8 b) 0.4 to 5 Answers: Your Turn Problem #2 Simplify each ratio if possible. a) 0.36 to 0.4b) 2.75 to 0.5 Move the decimal point to the right 2 places. Move the decimal point to the right 1 places.

Slide 3

4.1 Ratios, Rates, and Unit Pricing 3 Simplifying a Ratio That Contains Fractions and Mixed Numbers Step 1. Write the ratio in division form. a to b written as a b. Step 2. Perform the division and simplify if possible. Answer: 1. Write as a division problem. 2. Convert mixed numbers to improper fractions. Convert to multiplication and invert 2 nd fraction. Answer: Example 3. Simplify the ratio if possible: Your Turn Problem #3 Simplify the ratio if possible:

Slide 4

4.1 Ratios, Rates, and Unit Pricing 4 Writing a ratio of converted measurement units If a comparison is made between two measurements, it must be written in the same units if possible. For example; if one measurement is in inches and the other in feet, convert the feet to inches. It is usually easier to convert the larger units to the smaller units. Answer: Your Turn Problem #4 Since 4 feet = 48 inches (Since the units are identical, they divide out)

Slide 5

4.1 Ratios, Rates, and Unit Pricing 5 When a ratio is used to compare two different kinds of measure, we call it a rate. Rates Rates are written in fraction notation with the units included. We include the units because they are different and therefore do not divide out. Finding a unit rate Procedure: Finding a Unit Rate Step 1. Write the rate in fraction notation with the units included. Step 2. Divide the numerator by the denominator. Example 5. Find the unit rate. a) 780 miles in 12 hours b) 500 people in 4 days Answers: a) $400 per month b) 420 words per page Your Turn Problem #5 Find the unit rate. a) $3600 in 9 months b) 5040 words on 12 pages

Slide 6

4.1 Ratios, Rates, and Unit Pricing 6 Unit Price A unit price is the ratio of price to the number of units. Example 6. Find the unit price for a 12 oz bottle that sells for $0.75. = $0.06 (round to the hundredths place since we are dealing with money.) Your Turn Problem #6 Find the unit price $3.29 for 16 ounces Answers: $0.21 per ounce The End B.R. 6-4-08