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20 Cards in this Set
- Front
- Back
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Addition Property - (APE) - {Add Prop =}
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If a = b, Then a + c = b + c
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Subtraction Property - (SPE) {Subt Prop =}
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If a = b, then a - c = b - c
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Multiplication Property -(MPE) {Div Prop =}
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If a = b, then a x c = b x c
x = Times |
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Division Property - (DPE) {Div Prop =}
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If a = b and c does not = 0, then a/c = b/c
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Reflexive Property - (Ref =)
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Anything is equal to itself.
a=a |
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Symmetric Property -
( Sym = ) |
If a = b, then b = a
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Transitive Property - ( trans = )
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If a =b and b = c, then a = c
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Substitution Property -
(Subs = ) |
if a = b, then "a" may be replaced with "b" at any time
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Distributive Property - ( Dist = )
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a (b +c) = ab + ac
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Properties of Congruence
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Properties of Congruence
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Reflexive Property -
( Ref ) |
Angle A is congruent to
angle A And angle or segment is congruent to itself |
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Symmetric Property -
( Sym ) |
If Angle A is congruent to angle B, then Angle B is congruent to Angle A
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Transitive Property -
( Trans ) |
If Angle A is congruent to angle B
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Substitution Property -
( Subs ) |
Angle A is congruent to Angle B and Angle C is Congruent to Angle B, then Angle A is congruent to Angle C
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Theorems
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Theorems
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Vertical Angle Theorem
Vert |
If Angle A is vertical to Angle B, Then Angle A is congruent to Angle B
Vert Angles are congruent |
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congruent Supplements Theorem
Supp Thm |
The sum of two angles makes a streight angle (180 degrees)
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Congruent Complements Angles
Comp Thm |
If angle A is complementary to angle B and Angle C is complementary to angle B
Then Angle A is congruent to Angle C |
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Right Angle Congruence Theorem
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All Right Angles are congruent
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Congruent and supplementary Angle Theorem
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If two angle are congruent and supplimentary then each is 90's
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