Algebra 2 (2013-2014)
Name: _____________________________
Hour: ________ Date: ____________
Unit 10 (Chapter 12): SEQUENCES AND SERIES
DAY
Mon.
3/31
STANDARD SECTION TOPIC
L2.2.1
12.1
Define and Use
Sequences and Series
PAGE PROBLEMS
798+ 3-15 EOO, 17-29 odd,
33, 37-55 odd, 64, 65
Tues.
4/1
L2.2.1
12.2
Analyze Arithmetic
Sequences: Day 1
806+
Wed.
4/2
L2.2.1
12.2
Analyze Arithmetic
Series: Day 2
807+
Thurs.
4/3
L2.2.1
12.3
Analyze Geometric
Sequences: Day 1
814+
Fri
4/4
L2.2.1
12.3
Analyze Geometric
Series: Day 2
814+
Mon.
4/14
Tues.
4/15
Wed.
4/16
Thurs.
4/17
Review 12.1-12.3
QUIZ 12.1-12.3
L2.2.1
12.4
Find Sums of Infinite
Geometric Series
823+
L2.2.3
12.5
Use Recursive Rules
with Sequences and
Series
No School
830+
L2.2.4
12.5
Use Recursive Rules
with Sequences and
Series
Review Chapter 12
Review Chapter 12
840+
Fri.
4/18
Mon.
4/22
Tues.
4/23
Unit 10 (Chapter 12)
Test
Algebra 2
Unit 8 (CH 12): Sequences and Series
Standard
I Can Statement
Section in
Textbook
L2.2.1
I can recognize and write rules for number sequences.
12.1
L2.2.1
I can recognize and write rules for number series.
12.1
L2.2.1
I can write series using summation notation.
12.1
L2.2.1
I can find the sum of a series and use a formula for the
sum.
12.1
L2.2.1
I can identify arithmetic sequences and series
12.2
L2.2.1
I can write a rule for an arithmetic sequence or series
with only specific information given.
12.2
L2.2.1
I can find the sum of an arithmetic series
12.2
L2.2.1
I can identify geometric sequences and series
12.3
L2.2.1
I can write a rule for a geometric sequence or series with
only specific information given.
12.3
L2.2.1
I can find the sum of a geometric series.
12.3
L2.2.4
I can find the sum (or partial sum) of infinite geometric
series.
12.4
L2.2.4
I can write a repeating decimal as a fraction.
12.4
I can evaluate recursive rules for a given number of
terms in a sequence.
I can write recursive rules for arithmetic and geometric
sequences.
L2.2.3
L2.2.3
L2.2.3
I can find iterates of a function.
Chapter 12 formulas
Arithmetic
an = a1 + (n – 1)d
𝑆𝑛 = 𝑛 (
𝑎1 +𝑎𝑛
2
)
Geometric
S=

a1 1  r n
1 r
𝑎1
1−𝑟
12.5
12.5
a n  a1  r n 1
Sn 
12.5

