AP Calculus BC Infinite Series and Polynomial
Approximations Study Guide
, Calculate the limit of the ∞, divergent.
sequence and classify it
as "convergent" or
"divergent":
an=(n+1)!/n!
Calculate the limit of the 3/2, convergent.
sequence and classify it
as "convergent" or
"divergent": an=3n^2-
n+4/2n^2+1
Calculate the limit of the 0, convergent.
sequence and classify it
as "convergent" or
"divergent":
an=sin√n/√n
Calculate the limit of the ∞, divergent.
sequence and classify it
as "convergent" or
"divergent":
an=n^3+n^2-n+1/n^2+1
Find the sum of the series. 17/2
∞
Σ(5/(2^n)-
1/3^n) n=0
A ball is dropped from a 2.6 feet
height of 8 feet and
bounces to 80% of it's
previous height with each
bounce. How high does
the ball bounce on the
fifth bounce? (round to
Approximations Study Guide
, Calculate the limit of the ∞, divergent.
sequence and classify it
as "convergent" or
"divergent":
an=(n+1)!/n!
Calculate the limit of the 3/2, convergent.
sequence and classify it
as "convergent" or
"divergent": an=3n^2-
n+4/2n^2+1
Calculate the limit of the 0, convergent.
sequence and classify it
as "convergent" or
"divergent":
an=sin√n/√n
Calculate the limit of the ∞, divergent.
sequence and classify it
as "convergent" or
"divergent":
an=n^3+n^2-n+1/n^2+1
Find the sum of the series. 17/2
∞
Σ(5/(2^n)-
1/3^n) n=0
A ball is dropped from a 2.6 feet
height of 8 feet and
bounces to 80% of it's
previous height with each
bounce. How high does
the ball bounce on the
fifth bounce? (round to
