ID: A
Honors Algebra 2 Semester 1 Final Exam STUDY GUIDE 2015 (Chapters 1 - 4)
Answer Section
MULTIPLE CHOICE
1. B
2. B
3. A
4. D
5. B
6. A
7. A
8. C
9. A
10. B
11. A
12. C
SHORT ANSWER
13. maximum: 24
range: y s 24
14. irrational numbers
15. x=lorx=3
9
1
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Honors Algebra 2 Chapter 2 STUDY GUIDE 201 946E SUKE E0 HM; l 2"1 L L
Answer Se tion :E at V m]?
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SHORT ANSWER
. c=1.80d+2.10
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. g(x)=(x4)2+5 -
1
2
3
4. g(x) =~x ' .
Honors Algebra 2 Chapter 4 Lessons 1-8 REVIEW (Graphing and Solving Quadratics)
Answer Section . '
MULTIPLE CHOICE
1. B
2. B
SHORT ANSWER
3.
x) translated down 2 unit(s) and translated to the right 1 unit(s)
4. minimum value: 4
domain: all real numbers
5-3; 5-4 Bisectors in Triangles; Medians and
Altitudes
5-3; 5-4 Bisectors in Triangles; Medians and
Altitudes
Point of concurrency
5-3; 5-4 Bisectors in Triangles; Medians and
Altitudes
Point of concurrency a pt. where 3 or more
lines intersect.
5-3; 5-4
5-6 Inequalities in One Triangle
MA.G.4/MA.G.4.8
Objective: To use inequalities involving Angles and Sides of Triangles
5-6 Inequalities in One Triangle
5-6 Inequalities in One Triangle
5-6 Inequalities in One Triangle
Ex:
Ex:
Compare the
following:
Ex:
C
4-4 Using Corresponding Parts of Congruent
Triangles
Standards: MA.G.4.6
Objectives: To use triangle congruence and corresponding parts of congruent triangles to
prove that parts of triangles are congruent.
4-4 Using Corresponding Parts of Congruent
Trian
5-5 Indirect Proofs
5-5 Indirect Proofs
5-5 Indirect Proofs
5-5 Indirect Proofs
Indirect reasoning
5-5 Indirect Proofs
Indirect reasoning reasoning where
every possibility is considered and then all
but one is eliminated.
5-5 Indirect Proofs
Indirect rea
4-5 Isosceles and Equilateral Triangles
4-5 Isosceles and Equilateral Triangles
Isosceles triangle a
triangle with at least 2
sides congruent.
4-5 Isosceles and Equilateral Triangles
Isosceles triangle a
triangle with at least 2
sides congruent.
4-5 Isosc
1-3 Measuring Segments
1-3 Measuring Segments
1-3 Measuring Segments
Postulate 1-5 Ruler Postulate
1-3 Measuring Segments
Postulate 1-5 Ruler Postulate Every point
on a line can be paired one-to-one with a real
number.
1-3 Measuring Segments
Postulate 1-5
5-1 Midpoints in Triangles
5-1 Midpoints in Triangles
A
C
B
5-1 Midpoints in Triangles
A
N
M
C
B
5-1 Midpoints in Triangles
A
N
M
C
B
5-1 Midpoints in Triangles
A
N
M
C
B
5-1 Midpoints in Triangles
A
MN is called a
midsegment
N
M
C
B
Ex:
Ex:
Ex:
5x = 22.5
3-5 Parallel Lines and Triangles
3-5 Parallel Lines and Triangles
3-5 Parallel Lines and Triangles
<
<
3-5 Parallel Lines and Triangles
<
<
3-5 Parallel Lines and Triangles
<
X
X
<
3-5 Parallel Lines and Triangles
<
X
X
<
3-5 Parallel Lines and Triangles
4-6 Congruence in Right Triangles
4-6 Congruence in Right Triangles
Right triangle -
4-6 Congruence in Right Triangles
Right triangle a triangle with exactly one right
angle.
4-6 Congruence in Right Triangles
Right triangle a triangle with exactly one rig
3-7 Equations of Lines in the Coordinate Plane
3-7 Equations of Lines in the Coordinate Plane
3-7 Equations of Lines in the Coordinate Plane
Ex:
3-7 Equations of Lines in the Coordinate Plane
Ex: Find the slope of the line passing through
the points (4, -
7-2 Similar Polygons
Standards: MA.G.2.3
Objectives: To identify and apply similar polygons
7-2 Similar Polygons
We said that 2 figures are if they have the
same size ( sides) and same shape (<s).
7-2 Similar Polygons
We said that 2 figures are if they ha
3-1 Lines and Angles
3-1 Lines and Angles
Parallel lines -
3-1 Lines and Angles
Parallel lines coplanar lines that do not
intersect.
3-1 Lines and Angles
Parallel lines coplanar lines that do not
intersect.
Ex:
3-1 Lines and Angles
Parallel lines coplanar
2-6 Proving Angles Congruent
2-6 Proving Angles Congruent
Theorem
2-6 Proving Angles Congruent
Theorem a statement or conjecture
that you prove to be true.
2-6 Proving Angles Congruent
Theorem a statement or conjecture
that you prove to be true.
Ex:
Ex:
2-4 Deductive Reasoning
2-4 Deductive Reasoning
We talked about inductive reasoning:
2-4 Deductive Reasoning
We talked about inductive reasoning:
reasoning based on patterns that you
observe. Weather in July pattern was
25+ days of temp. over 90
2-4 Deduc
2-5 Reasoning in Algebra and Geometry
2-5 Reasoning in Algebra and Geometry
2-5 Reasoning in Algebra and Geometry
Ex: 4x = 16
2-5 Reasoning in Algebra and Geometry
Ex: 4x = 16 You would divide by 4 on both
sides.
2-5 Reasoning in Algebra and Geometry
Ex:
2-2 Conditional Statements
2-2 Conditional Statements
Conditional statement -
2-2 Conditional Statements
Conditional statement a statement in
if-then form
2-2 Conditional Statements
Conditional statement a statement in
if-then form
Ex:
2-2 Conditional Sta
2-5 Reasoning in Algebra and Geometry
2-5 Reasoning in Algebra and Geometry
2-5 Reasoning in Algebra and Geometry
Ex: 4x = 16
2-5 Reasoning in Algebra and Geometry
Ex: 4x = 16 You would divide by 4 on both
sides.
2-5 Reasoning in Algebra and Geometry
Ex: