1.2 Commutative and Associative Properties
1.3 Identity and Inverse Properties
2.3 Fractions Equal to Whole Numbers
2.4 Converting Mixed and Improper Fractions
2.5 Adding and Subtracting Fractions with Like Denominators
2.6 Adding and Subtracting Fractions with Unlike Denominators
2.9 Understanding Keep, Change, Flip
3.1 Converting Fractions to Decimals
3.2 Converting Decimals to Fractions
3.3 Converting Integers to Decimals and Fractions
3.7 Understanding Proportional Ratios
3.8 Identifying Proportional Ratios
3.9 Comparing Ratios with Rates and Prices
3.11 Converting Percent to Fraction and Decimal
4.1 Operations and Expressions
4.3 Expressions with Addition and Subtraction
4.4 Expressions with Multiplication and Division
4.5 Expressions with Exponents
4.6 Expressions with Decimals and Fractions
4.10 Understanding Distributive Property
4.11 Using the Distributive Property
4.12 Combining Like Terms with Distributive Property
5.2 The Goal of Solving Equations
5.3 Checking the Answer to an Equation
5.4 Solving Equations with Addition and Subtraction
5.5 Solving Equations with Multiplication
5.6 Solving Equations with Division
5.7 Starting a Two-Step Equation
5.8 Solving Two-Step Equations
5.9 Simplifying and Solving Two-Step Equations
5.11 Translating Math Expressions
5.12 Translating Math Equations
5.13 Strategies for Algebraic Word Problems
6.2 Comparing Integers and Decimals
6.4 Graphing Inequalities on Number Lines
6.5 Writing Inequalities from Number Lines
6.6 Translating Inequalities from Word Problems
6.7 Solving Inequalities with Addition and Subtraction
6.8 Solving Inequalities with Multiplication and Division
6.9 Inequalities with Negative Numbers
6.10 Solving Inequalities with Negative Numbers
6.11 One-Step Inequality Word Problems
6.12 Writing Inequalities Different Ways
6.13 Solving Two-Step Inequalities
Math Basics > Unit 3 Ratios and Percent > Lesson 3.5 Understanding Rates
Click play to watch the video and answer the questions for points!
Complete the ratios by dragging each number to its place. Numbers can be used more than once.
In our last lesson, we learned about ratios. Now we're going to learn about a special type of ratios called rates. Rate is a type of total to total ratio. It describes how one value changes as another value changes. And the two values will be represented with different units of measurement. So as we go through different problems and we work on writing rates to represent them, we will need to pay attention to the units. And we may see units that represent how much time has passed or how far a car has traveled or even how much money something costs. So let's say we're driving along in this car and we want to keep track of how far we've traveled as time has passed on, after 1 hour of driving, the car has traveled 60 miles. After 2 hours of driving, the car has traveled 120 miles. And after 3 hours of driving, the car has traveled 180 miles. So as the time increases, the distance traveled increases. So we have two different values that we're comparing. We're showing that as the time changes, the distance also changes. So we can use a rate to represent this relationship between time and distance. So let's look at the different ways that we can represent rates for that scenario of the car traveling. We can represent it with words. And the words that we typically use to represent rates are “per,” “for,” or “in.” So we could say the cars traveled 60 miles in 1 hour, 120 miles in 2 hours, or 180 miles in 3 hours. And just like we could represent ratios as fractions, we can also represent rates as fractions, which is how we'll normally see them in math. So we could write it as 60 miles over 1 hour, 120 miles over 2 hours, and 180 miles over 3 hours. And notice that we write it with words or as a fraction. We keep the units with the numbers, and that's very important with rates. We always have to keep the unit of measurement with the numbers. So does it matter what order we write those numbers? When we set up our rates, we talked about writing ratios based on how the word problem is presented to us. And sometimes we can refer to the problem to figure out what order to write the numbers in rates. But with some types of measurement, we do write them a certain way. So when we have a rate that involves measurements of time, we place time as the second value. Or if it's a fraction, we place time as the denominator. So we could write it as 120 miles in 2 hours with 2 hours written as the second value, or 120 miles over 2 hours with the 2 hours written as the denominator. So notice where we have our number of hours placed as the second value and as the denominator. It also matters when we're using measurements of money. So when we're writing rates that have money involved, we place that money value as the first value or as the numerator if we have a fraction. So, for example, we could have $5 for eight candies or $5 over eight candies. And either way that we write it, we have to put the dollar amount, the money, as the first number or as the numerator when we have it, as a fraction. So when you're working with rates, pay extra careful attention to the units that you're using and how you're placing measurements of time and money.
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