Proof Reasons- Geometry
Definition of a Midpoint
A point B is called a midpoint of a segment AC if B is between A and C and AB=BC
Definition of Congruent Angles
If m<ABC=m<DEF, then <ABC is cong. to <DEF
Definition of an Angle Bisector
If ray EB intersects <DEF, and m<DEB=m<BEF, then ray EB is an angle bisector
Distributive POE
a(b+c)=ab+ac
Right Angle Congruence Theorem
all right angles are congruent
Segment Addition Postulate
if B is between A and C, then AB+BC=AC. If AB+BC=AC then B is between A and C
Angle Addition Postulate
if P is in the interior of <RST, then m<RST=m<RSP+m<PST
Substitution POE
if a=b, and c is not equal to 0, then a can be substituted for b in any equation or expression
Division POE
if a=b, and c is not equal to 0, then a/c=b/c
Addition POE
if a=b, then a+c=b+c
Subtraction POE
if a=b, then a-c=b-c
Multiplication POE
if a=b, then ac=bc
Definition of Perpendicular Lines
if lines AB and CD intersect to form a right angle, then they are perpendicular lines. If AB and CD are perpendicular lines, then they intersect to form a right angle
Definition of supplementary Angles
if m<ABC+m<DEF=180 degrees, then they are supplementary angles. If <ABC and <DEF are supplementary angles, then they sum to 180 degrees
Definition of Complementary Angles
if m<ABC+m<DEF=90 degrees, then they are complementary angles. If <ABC and <DEF are complementary angles, then they sum to 90 degrees
Definition of Right Angles
if m<ABC=90 degrees, then it is a right angle. If <ABC is a right angle, then m<ABC=90 degrees
Definition of a Segment Bisector
if point B is between points A and C, and AB=BC, then B bisects the segment AC
Definition of Congruent Segments
if the length of segment AB=the length of segment BC, then segments AB and BC are congruent
Congruent Complements Theorem
if two angles are complementary to the same angle or to congruent angles, then they are congruent
Congruent Supplements Theorem
if two angles are supplementary to the same angle or to congruent angles, then they are congruent
Linear Pair Postulate
if two angles form a linear pair, then they are supplementary
Reflexive POE
real number: for any real number a, a=a segment length: for any segment AB, AB=AB angle measure: for any angle A, m<A=m<A
Symmetric POE
real number: for any real numbers a and b, it a=b then b=a segment length: for any segments AB and CD, if AB=CD then CD=AB angle measure: for any angles A and B, if m<A=m<B then m<B=m<A
Transitive POE
real numbers: for any real numbers a, b, and c, if a=b and b=c, then a=c segment length: for any segments AB, CD, and EF, if AB=CD and CD=EF, then AB=EF angle measure: for any angles A, B, and C, if m<A=m<B and m<B=m<C, then m<A=m<C
Reflexive POC
segments: for any segment AB, AB is cong. to AB angles: for any angle A, <A is cong. to <A
Symmetric POC
segments: for any segments AB and CD, if AB is cong. to CD, then CD is cong. to AB angles: for any angles A and B, if <A is cong. to <B then <B is cong. to <A
Transitive POC
segments: for any segments AB, CD, and EF, if AB is cong. to CD and CD is cong. to EF, then AB is cong. to EF angles: for any angles A, B, and C if <A is cong. to <B and <B is cong. to <C, then <A is cong. to <C
Vertical Angles Congruence Theorem
vertical angles are congruent
