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Quiz yourself by thinking what should be in each of the black spaces below before clicking on it to display the answer.
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Question
Answer
2 points postulate   Through any two points there is exactly one line  
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Intersection of lines postulate   If 2 distict lines interset, then they intersect in exactly one point  
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Intersection of planes postulate   If two distinct planes intersect then they will intersect in only 1 line  
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Points in a plane postulate   Through any 3 noncollinear point there is exactly one plane  
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Ruler Postulate   Every point on a line can be paired with one real number  
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Segment Addition Postulate   If theree ponts A, B, C are collinear and B is between A and C then AB+BC=AC  
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Protractor Postulate   Every numbder on the protractor can be paired with 1 real number  
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Angle Addition Postulate   If point B is the interior of AOC then m  
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Linear Pair Postulate   If 2 adjacent angles form a straight line they are supplementry  
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Addition property of equality   add the same value to each side  
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Subtraction Property of equality   Subtract the same value to each side  
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Multiplication Property of equality   Multiply the same value to each side  
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Divison property of equality   Divide the same value to each side  
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Reflextive property of equality   a=a b=b 5=5 55=55  
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Symetric property of equality   a= b and b=a fun= math and math=fun  
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Transtive property of equality   If 5x-9=10y and 10y=7x-9 then 5x-9=10y  
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Subsitution property of equality   7x=21 x=3 7*3=21  
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Reflextie property of congruence   --- --- AB AB  
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Transtive property fo congruence   if RA congruent to PU and YU congruent to YU then RA congruent to YU  
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Symetric property of congruence   DO congruent to AT and AT congruent to DO  
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Symetric Property of congruent angles   angle A is congruent to angle B angle B is congruent to angle A  
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Reflextive Property of congruent angles   angle A is congruent to angle A  
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Transtive property of congruent angles   If angle A is Congruent to angle B And angle B is congruent to angle C Then angle A is congruent to angle C  
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Defo of segment congruence   Congruent segments have equal measures  
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Defo of supplementry   Suplmentry angles add up to 180  
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Defo of a bisector   A ray that divides an angle into 2 congruent angles  
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Converse of defo of segment congruence   Segments with the same measure are congruent  
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Distributive property of equality   3(2x-4)= 6x-12  
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Segment Bisector   Is what you use to divide the line  
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Vetrical angles theorm   Vertical angles are congruent  
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Congruent supplements theorm   If 2 angles are supplements of the same angle (add up to 180) thenthey are congruent  
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Congruent complements theorm   If 2 angles are complements of the same angle (add up to 90)the 2 angles are congruent  
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Theorm (discussing right angles)   All right angles are congruent  
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Corresponding angles postulate   If a transversal intersects 2 parellel lines than corresponing angles are congruent  
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Alternate inteior angles theorm   If a transversal intersects 2 parellel lines than alternate interior angles are congruent  
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Same side angles theorm   If a transversal intersects 2 parelled lines then same side interior angles are supplmentry  
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Defo of complementry   Complementry angles add up to 90  
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Converse of the defo of supplementry   If angles add up to 180 then they are supplementry  
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Alternate exterior angles theorm   If a transversal intersects two parellel lines than the two alternate exterior angles are congruent  
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Converse of Corresponding Angles Postulate   If two lines form corresponding angles that are congruent then the two lines are parellel  
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Converse of Alternate Interior Angle Theorm   If two angles form an alternate interior angle then the lines are parellel  
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Converse of Same Side Interior Angle Theorm   If 2 angles form same side interior angles that are supplementry the lines are parellel  
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Converse of Alternate Exterior Angles Theorm   Alternate Exterior angles that are congruent then the two lines are parellel  
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Perpindicular Tranversal Theorm   In a plane, if a line is perpendicular to one or two parellel lines then it is also perpendicular to the other line  
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Parellel Postulate   Through any point on a line there is only one line parellel to the given line  
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Theorm   If two lines are parellel to the same line they are parellel to each other  
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Theorm   If two lines are perpindicular to the same line then they are parellel to each other  
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Theorm   In a plane if two lines are perpindicular to the same line then they are parellel  
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Triangle angle-sum theorm   The sum of the measures of the angles of a triangle is 180  
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