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2.5 Reasoning with properties from Algebra
GEOMETRY
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Goal 1: Using Properties from Algebra – Properties of Equality
In all of the following properties – Let a, b, and c be real numbers
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Properties of Equality
Addition property: If a = b, then a + c = b + c Subtraction property: If a = b, then a - c = b – c Multiplication property: If a = b, then ca = cb Division property: If a = b, then for c 0
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Addition property of equality
This is the property that allows you to add the same number to both sides of an equation. STATEMENT REASON x = 5 given 3 + x = 8 Addition property of equality
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Subtraction property of equality
This is the property that allows you to subtract the same number to both sides of an equation. STATEMENT REASON x = 5 given X - 2 = 3 Subtraction property of equality
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Multiplication Property
This is the property that allows you to multiply the same number to both sides of an equation. STATEMENT REASON x = 5 given 3x = 15 Multiplication property of equality
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Division property of equality
This is the property that allows you to divide the same number to both sides of an equation. STATEMENT REASON x = 5 given Division property of equality
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More Properties of Equality
Reflexive Property: a = a. Symmetric Property: If a = b, then b = a. Transitive Property: If a = b, and b = c, then a = c.
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Reflexive Property: a = a
I know what you are thinking, duh this doesn’t seem too difficult to grasp. Just remember this one, when we begin to prove that triangles are congruent. STATEMENT REASON x = x Reflexive property of equality
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Symmetric Property: a = b so b = a
I know another duh property. Just remember when you get an answer that is a little different than the one you are use to getting. (Do we like To always have x or y on the left side of the equal sign?) For example: 2 – y = 10
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Transitive property of equality
This one is many times confused with substitution property of equality. Remember transitive is like “transit” which means to move. Think of there being 3 bus stops: a, b, and c. If you move from a to b, then from b to c, it would have been the same as moving from a to c directly. STATEMENT REASON mA =43o given mB =43o mA = mB Transitive property of equality
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Substitution Property of Equality
If a = b, then a may be substituted for b in any equation or expression. You have used this many times in algebra. STATEMENT REASON x = 5 3 + x = y given 3 + 5 = y substitution property of equality
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Distributive Property
a(b+c) = ab + ac ab + ac = a(b+c) STATEMENT REASON mA + mA =90o given 2mA =90o Distributive property
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Properties of Congruence
Reflexive object A object A Symmetric If object A object B, then object B object A Transitive If object A object B and object B object C, then object A object C
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