Solving equations 8.M.EE.07 “I can solve linear equations using the distributive property and by...
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Transcript of Solving equations 8.M.EE.07 “I can solve linear equations using the distributive property and by...
Solving equations
8.M.EE.07 “I can solve linear equations using the distributive property and by combining like terms.”
The basics
•The Vocabulary: Define
•Variable –
•Coefficient –
•Like Terms –
•Inverse Operations -
3x + 2x = 12
The basics•The Vocabulary:
•Variable - the “placeholder” for what we are trying to solve.
•Coefficient - the number before the variable. Written next to it, it means its being multiplied.
•Like Terms - terms in an equation that have similar qualities.
•Inverse Operations - addition/subtraction and multiplication/division
3x + 2x = 12
DISTRIBUTIVE PROPERTY
Example: 7(3x – 4) = 21x - 28
PRACTICE•On your whiteboard, simplify the
following expressions using the distributive property.
1) 9(x -1)
2) 7(2x - 7)
3) 9(6 - x)
like terms• terms with the same variables and exponents
3x
7x
9
14
x
5
Which of these are like terms?
like terms•Simplify the following expressions by combining like terms.
1) 3x - 4 + 7x + 2
2) 9x - 1 + x
3) x + 2x - 4 + 9
inverse operations•Add/Subtract
•Multiply/Divide
Example 1 :
7x - 14 = 21
Example 2 :
3 + x = 5
2
Solving an equation1. Use Distributive Property and
PEMDAS to simplify each side of the equation.
2. Combine like terms
3. Use inverse operations to isolate the variable on one side of the equation.
Here’s an example:
2(3x - 3) = -12
Putting it all together•Solve the following equations:
1)3x - 4 = 5
2)2(2x + 6) = 16
3)7(x + 1) - 4 = 24
What about this?
•What if there is a variable on both sides of the equation?
•17x - 8 = 14x + 1
Practice
•7x - 4 = x + 2
•9 - x = 2x + 3
•2x + 3(x + 2) = 11
CLOSURE
• Partner Pass - with your seat partner solve the problem below. Each of you completes one step and passes the whiteboard to the other.
2(x + 4) = 14 + x