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Try reviewing these fundamentals first

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Get Started NowStart now and get better math marks!

Get Started Now- Intro Lesson17:32
- Lesson: 1a1:34
- Lesson: 1b1:28
- Lesson: 1c1:35
- Lesson: 22:41
- Lesson: 3a2:52
- Lesson: 3b2:48
- Lesson: 3c3:24
- Lesson: 4a1:46
- Lesson: 4b5:24
- Lesson: 4c3:37

In this section, we are given models of cups and counters and asked to write the expressions represented by these models. We then use the variable x to represent the number of counters in each cup. We were first taught how to write expressions and solve for variables in a previous section. In this section, we are also asked to draw cup and counter models of given expressions. Finally, we are asked to write expressions for given phrases and evaluate the expressions using our variables.

- Introductiona)i) What are variables?
ii) What is an expression?

- 1.Below we have used ponds and tadpoles to model an expression. Write the expression and use the variable x to represent the unknown number of tadpoles in each pond.a)

b)

c)

- 2.Mary bought $s$ packages of stickers, and there are 10 stickers in each package. Write an expression to show how many stickers Mary bought.
- 3.Write an expression for each phrase. Then, evaluate the expression.a)10 pounds lighter than Molly (m), when m=100b)22 years older than Tracy (t), when t = 10.c)17 less than 5 times a number (n), when n = 7
- 4.Evaluate the following expression, if $x = 7$ and $y = 9$a)$6x-y+5$b)$\frac{2}{3}x+\frac{1}{6}y-1$c)$0.5x-0.1+1.3y$

18.

Patterns and Solving Equations

18.1

Patterns

18.2

Evaluating algebraic expressions

18.3

Solving one - step equations: $x + a = b$

18.4

Model and solve one-step linear equations: $ax = b$, $\frac{x}{a} = b$

18.5

Solving two-step linear equations using addition and subtraction: $ax + b = c$

18.6

Solving two-step linear equations using multiplication and division: $\frac{x}{a} + b = c$

18.7

Solving two-step linear equations using distributive property: $\;a\left( {x + b} \right) = c$