The Remainder Theorem " ' (Y) ("MINA bx, Y 'L
ry important interpretation in evaluating polynomial sunctions.
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The remainder obtained in synthetic division has 3 ve
B) division. we have
_f(x) = (.r - a)q(.r) + r with r = 0
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6.3 Geometric Sequences
All of the sequences below are geometric sequences. What do they have in common?
2, 6,18, 54,.
10, 5, 2.5, 1.25,.
2 2
6, 2, , ,.
3 9
Geometric sequences have a first term called t1 or a and a _ _.
This _ _ must always take on value
6.2 Arithmetic Series
When terms of an arithmetic sequence are added, the result is known as an arithmetic
series.
For example:
3, 5, 7, 9, 11 is an arithmetic sequence (first term: _ & common difference: _)
3 + 5 + 7 + 9 + 11 is an arithmetic series (fir
5.8 Special Triangles and Special Angles
All of these questions/examples are NO CALCULATOR!
Method to evaluate trigonometric functions with special triangles:
1. Draw the angle in standard position
2. Determine the reference angle
3. Determine the trig ra
Chapter 6 Sequences and Series
6.1 Arithmetic Sequences
Complete the list:
3, 7, 11, _, _, _
1.25, 1.75, 2.25, _, _, _
4, 1, -2, _, _, _
1 5
,1, , _, _, _
3 3
A sequence is arithmetic if each new term in the sequence is determined by adding a
constant to
6.4 Geometric Series
When terms of an geometric sequence are added, the result is known as a geometric
series.
For example:
5, 10, 20, 40, 80 is a geometric sequence (first term: _ & common ratio: _)
5 + 10 + 20 + 40 + 80 is a geometric series (first term
6.5 Geometric Series Part II To Infinity and Beyond
Record the results from the experiment:
Round 1:
Round 2:
Round 3:
Round 4
Round 5
Round 6
If we continue this process how much paper are each of the friends going to have?
Conclusion(s):
a
a lr
comes f
Trigonometry (Part I) Multiple-choice Review Questions
. 71:
1. Determine the amplitude and period of y = 2 cos[3x 7c)+ 3 .
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Determine the phase shift and vertical displace