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Test Topics
Here the stuff that will be covered on the Chapter 2 test...
Definitions
- Everything defined in Chapter 1
- Perpendicular lines (rays, segment)
- Complementary angles
- Supplementary angles
- Opposite rays
- Vertical angles
Theorems
- If two angles are right angles, then they are congruent (Right Angle Theorem)
- If two angle are straight angles, then they are congruent (Straight Angle Theorem)
- If a conditional statement is true, then its contrapositive is also true (you don't need to be able to prove this!!)
- If angles are supplementary to the same angle, then they are congruent
- If angles are supplementary to congruent angles, then they are congruent
- If angles are complementary to the same angle, then they are congruent
- If angles are complementary to congruent angles, then they are congruent
- If the same segment is added to two congruent segments, then the sums are congruent (Addition Property of Congruent Segments - Version 1)
- If the same angle is added to two congruent angles, then the sums are congruent (Addition Property of Congruent Angles - Version 1)
- If congruent segments are added to congruent segments, then the sums are congruent (Addition Property of Congruent Segments - Version 2)
- If congruent angles are added to congruent angles, then the sums are congruent (Addition Property of Congruent Angles - Version 2)
- If a segment (or angle) is subtracted from congruent segments (or angles), then the differences are congruent (Subtraction Property of Congruent Segments (or Angles) - Version 1)
- If congruent segments (or angles) are subtracted from congruent segments (or angles), then the differences are congruent (Subtraction Property of Congruent Segments (or Angles) - Version 2)
- If segments (or angles) are congruent, then their like multiples are congruent (Multiplication Property of Congrent Segments (or Angles))
- If segments (or angles) are congruent, then their like divisions are congruent (Division Property of Congruent Segments (or Angles))
- If angles (or segments) are congruent to the same angle (or segment), then they are congruent to each other (Transitive Property of Congruent Angles (or Segments) - Version 1)
- If angles (or segments) are congruent to congruent angles (or segments), then they are congruent to each other (Transitive Property of Congruent Angles (or Segments) - Version 2)
- Vertical angles are congruent (Vertical Angle Theorem)
Constructions
- Chapter 1 Constructions
- Perpendicular to a line from a point not on the line
- Perpendicular to a line from a point on the line
Types of problems
- True / False / Matching
- Complement / supplement
- Simultaneous equations (including quadratics!)
- Proofs
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