-50 multiple choice questions
-5 open-ended "essay" questions (Honors only)
**Some good practice problems, in addition to the Exam Review worksheet handed out: p. 374: 1-14 (skip 4)**
**Another useful study tool is the Chapters 01, 02, 03, 04, and 05 Posttests in Gradpoint**
Things to study:
-Vocabulary words at the end of Chapter 1-5 (p: 60, 83, 202, 284, 366)
-Perimeter, circumference, area formulas: (section 1.5)
-Distance and midpoint formulas (section 1.6)
-Statement, Converse, Inverse, Contrapositive (p. 83)
-Vertical angles: angles situated in an x-pattern; across from each other; they are congruent.
-Angle Pairs: corresponding, alternate interior, alternate exterior, same-side interior (section 3.1)
-How angle pairs work with parallel lines (section 3.2 and 3.3)
-Slopes parallel lines (the same); slopes of perpendicular lines (opposite reciprocals)
-Algebra review: solving for y to find slope
-Algebra review: given two points, find the line that contains them
-Finding the slope from two points (slope formula)
-Types of triangles: acute, obtuse, right; equilateral, isosceles, scalene (section 4.1)
-Special properties of isosceles and equilateral triangles: (section 4.8)
-Be able to recognize from a picture whether to use SSS, SAS, ASA, or AAS to prove congruency (ch 4)
-What CPCTC means (if the shapes are the same, then the parts are the same)
-Properties of triangles: midsegments, circumcenter, incenter, centroid: see sections 5.1-5.4; see this video: https://www.youtube.com/watch?v=F52IhBihoUs ; also assigned sections on Gradpoint
-Inequalities in triangles: the longest side sits opposite the largest angle and vice versa (section 5.5; Gradpoint)
-Pythagorean theorem and how to simplify square roots: p. 346, or this https://www.youtube.com/watch?v=6QJtWfIiyZo&t=148s