Chapter 7 Test
term
a number in a sequence
geometric sequence
a sequence in which new terms are created by multiplying the previous terms by the same value (common ratio) each time
general term
formula that relates each term to its term number or position in the sequence
recursive formula
formula that uses previous term(s) to generate the next term
sequence
ordered list of numbers
arithmetic sequence
sequence in which new terms are created by adding the same value (common difference) each time
Geometric series
the sum of the terms of a geometric sequence
series
the sum of the terms of a sequence
arithmetic series
the sum of the terms of an arithmetic sequence
*recursive formula for a geometric sequence
tn=the nth term a=first term n=term number r=common ratio
*recursive formula of arithmetic sequence
tn=the nth term a=first term n=term number d=common difference
*Write out the first 6 rows of Pascal's triangle
to do this, calculate the sum of pairs of consecutive terms in the previous row
*graph of geometric sequence
when graphed, a geometric sequence represents a discrete exponential function of the form f(n)=arⁿ⁻¹
graph of arithmetic sequence
when graphed, arithmetic sequences represent discrete linear functions (f(n)=dn+t₀) ∴ can be used to model problems that involve increases/decreases at a constant rate
Review questions
→pg.468 #3,4,5,7,8,9,14,15,16,17,18, 19abc,20,22,23 →pg.470 #7
for a binomial expansion of the form (a+b)ⁿ:
-the coefficients in the expansion correspond to the numbers in the nth row of Pascal's triangle -each term of the expansion is comprised of a coefficient, a power of "a", and a power of "b" -the degree of each term (sum of the exponents of "a" and "b") in the expansion is equal to n -the exponents of "a" in the expansion start at "n" and decrease by one down to 0 while the exponents of "b" start at 0 and increase by one up to "n"
