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Properties Used to Solve Equations Algebraically (Day 1)
Standards: REL. 1 Explain each step in solving a simple equation as following from the equality of numbers asserted at the previous step, starting
from the assumption that the original equation has a solution. Construct a viable argument to justify a solution method. REL.3 Solve linear
equations and inequalities in one variable, including equations with coefficients represented by letters.
Essential Questions: How are the properties of equality used to solve equations? How is finding the solution to an inequality similar to finding the
solution to an equation? How is solving an exponential equation different from solving a linear equation?
In algebra, when we solve equations, we use properties of equality to isolate the variable. In mathematics, it is important to follow
the rules when solving equations, but it is also necessary to justify, or prove that the steps we are following to solve problems are
correct and allowed.
The Properties of Equality
Property General Rule Specific Example
Addition property of equality If a = b, then a + c = b + c. If x = 5, then x + 2 = 5 + 2.
Subtraction property of equality If a = b, then a – c = b – c. If x = 12, then x – 2 = 12 – 2
Multiplication property of equality If a = b, then a x c = b x c. If x = 7, then
Division property of equality If a = b and c ≠ 0, then a ÷ c = b ÷ c. If then
Here a, b and c stand for arbitrary numbers in the rational, real, or complex number systems.
Guided Practice
1. Which property of equality is missing in the steps to solve the equation: -7x + 22 = 50?
Equation Steps
-7x + 22 = 50 Original Equation
-7x = 28
x = -4 Division property of equality
2. Which property of equality is missing in the steps to solve the equation:
Equation Steps
Original Equation
Addition property of equality
-x = 42
x = -42 Division property of equality
The Properties of Equality (Continued)
Property General Rule Specific Example
Reflexive property of equality a = a (A number is always equal to itself.)
Symmetric property of equality If a = b, then b = a. If 5 = x, and x = 5.
Transitive property of equality If a = b and b = c, then a = c. If x = y and y = 2, then x = 2.
Substitution property of equality If a = b, then b may be substituted for a in any expression containing a.
3. Which properties are missing in the steps to solve the equation: 82 = 5 + 7x
Equation Steps
82 = 5 + 7x Original Equation
77 = 7x
11 = x
x = 11
Homework: Identify the property of equality that justifies each missing step or equation in each of the following tables.
1.
Equation Steps
x – 1.2 = 1.9 Original equation
x = 3.1
2.
Equation Steps
5x = 37 Original equation
x = 7.4
3.
Equation Steps
2x + 3 = 15 Original equation
2x = 12
x = 6
4.
Equation Steps
19 = 2x – 7 Original equation
26 = 2x
13 = x
x = 13
Properties Used to Solve Equations Algebraically (Day 2)
The Properties of Operations
Property General Rule Specific Example
( )
Associative property of addition (a + b) + c = a + (b + c) ( )
Commutative property of addition a + b = b + a
Associative property of multiplication (a •b) • c = a • (b • c) ( )
( )
Commutative property of multiplication a • b = b • a
Distributive property of multiplication over addition a • (b + c) = a • b + a • c ( )
Here a, b and c stand for arbitrary numbers in a given number system. The properties of operations apply to the rational number
system, the real number system, and the complex number system.
Remember:
When operations are performed on one side of the equation, the properties of operations are generally followed.
When an operation is performed on both sides of the equation, the properties of equality are generally followed.
If a step being taken can’t be justified, then the step shouldn’t be done.
Guided Practice
3. Which properties are missing in the steps to solve the equation: 76 = 5x – 15 + 2x
Equation Steps
76 = 5x – 15 + 2x Original Equation
76 = 5x + 2x – 15
76 = 7x – 15
91 = 7x
13 = x
x = 13
4. Fill in the missing properties and equation in the steps to solve the equation 5x + 3(x + 4) = 28?
Equation Steps
5x + 3(x + 4) = 28 Original Equation
5x + 3x + 12 = 28
8x + 12 = 28
Subtraction property of equality
X = 2
Homework: Properties of Equality
Identify the property of equality that justifies each missing step or equation in each of the following tables.
1.
Equation Steps
x + (x – 0.6) = 2 Original equation
2x – 0.6 = 2
Addition Property of Equality
x = 1.3
2.
Equation Steps
x + (4x + 32) = 12 Original equation
5x + 32 = 12
5x = –20
Division property of equality
3.
Equation Steps
4(x – 6) = 40 Original equation
x – 6 = 10
x = 16
4.
Equation Steps
1.4 – 0.3x + 0.7x = 9.4
1.4 + 0.4x = 9.4
0.4x = 8
x = 20
Solve each equation that follows. Justify each step in your process using the properties of equality. Be sure to include the properties
of operations, if used.
5. 7x – (4x – 39) = 0 6. 4(3x + 5) = –46co
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