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Math
Calculus
Precalculus Enhanced with Graphing Utilities (7th Edition)
Chapter 12.1, Problem 100AE
Chapter 12.1, Problem 100AE
BUY
Precalculus Enhanced with Graphing Utilities (7th Edition)
7th Edition
ISBN:
9780134119281
Author: Michael Sullivan, Michael Sullivan III
Publisher:
PEARSON
expand_less
1 Graphs
2 Functions And Their Graphs
3 Linear And Quadratic Functions
4 Polynomial And Rational Functions
5 Exponential And Logarithmic Functions
6 Trigonometric Functions
7 Analytic Trigonometry
8 Applications Of Trigonometric Functions
9 Polar Coordinates; Vectors
10 Analytic Geometry
11 Systems Of Equations And Inequalities
12 Sequences; Induction; The Binomial Theorem
13 Counting And Probability
14 A Preview Of Calculus: The Limit, Derivative, And Integral Of A Function
A Review
B The Limit Of A Sequence; Infinite Series
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12.1 Sequences
12.2 Arithmetic Sequences
12.3 Geometric Sequences; Geometric Series
12.4 Mathematical Induction
12.5 The Binomial Theorem
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Problem 1AYP: For the function f( x )= x1 x , find f( 2 ) and f( 3 ) . (pp.60-63)
Problem 2AYP: True or False A function is a relation between two sets D and R so that each element x in the first...
Problem 3AYP: If 1000 is invested at 4 per annum compounded semiannually, how much is in the account after 2...
Problem 4AYP: How much do you need to invest now at 5 per annum compounded monthly so that in 1 year you will have...
Problem 5AYP
Problem 6AYP: True or False The notation a 5 represents the fifth term of a sequence.
Problem 7AYP: If n0 is an integer, then n!= ________ When n2 .
Problem 8AYP: The sequence a 1 =5 , a n =3 a n1 is an example of a( n ) _____ sequence. (a) alternating(b)...
Problem 9AYP: The notation a 1 + a 2 + a 3 ++ a n = k=1 n a k is an example of ______ notation.
Problem 10AYP: k=1 n k=1+2+3++n = ______. (a) n! (b) n( n+1 ) 2 (c) nk (d) n( n+1 )( 2n+1 ) 6
Problem 11SB: In Problems 11-16, evaluate each factorial expression. 10!
Problem 12SB: In Problems 11-16, evaluate each factorial expression. 9!
Problem 13SB: In Problems 11-16, evaluate each factorial expression. 9! 6!
Problem 14SB: In Problems 11-16, evaluate each factorial expression. 12! 10!
Problem 15SB: In Problems 11-16, evaluate each factorial expression. 3!7! 4!
Problem 16SB: In Problems 11-16, evaluate each factorial expression. 5!8! 3!
Problem 17SB: In Problems 17-28, write down the first five terms of each sequence. { s n }={ n }
Problem 18SB: In Problems 17-28, write down the first five terms of each sequence. { s n }={ n 2 +1 }
Problem 19SB: In Problems 17-28, write down the first five terms of each sequence. { a n }={ n n+2 }
Problem 20SB: In Problems 17-28, write down the first five terms of each sequence. { b n }={ 2n+1 2n }
Problem 21SB: In Problems 17-28, write down the first five terms of each sequence. { c n }={ ( 1 ) n+1 n 2 }
Problem 22SB: In Problems 17-28, write down the first five terms of each sequence. { d n }={ ( 1 ) n1 ( n 2n1 ) }
Problem 23SB: In Problems 17-28, write down the first five terms of each sequence. { s n }={ 2 n 3 n +1 }
Problem 24SB: In Problems 17-28, write down the first five terms of each sequence. { s n }={ ( 4 3 ) n }
Problem 25SB: In Problems 17-28, write down the first five terms of each sequence. { t n }={ ( 1 ) n ( n+1 )( n+2...
Problem 26SB: In Problems 17-28, write down the first five terms of each sequence. { a n }={ 3 n n }
Problem 27SB: In Problems 17-28, write down the first five terms of each sequence. { b n }={ n e n }
Problem 28SB: In Problems 17-28, write down the first five terms of each sequence. { c n }={ n 2 2 n }
Problem 29SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 30SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 31SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 32SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 33SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 34SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 35SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 36SB: In Problems 29-36, the given pattern continues. Write down the nth term of a sequence { a n }...
Problem 37SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =2 ; a n...
Problem 38SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =3 ; a n...
Problem 39SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =2 ; a n...
Problem 40SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =1 ; a n...
Problem 41SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =5 ; a n...
Problem 42SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =2 ; a n...
Problem 43SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =3 ; a n...
Problem 44SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =2 ; a n...
Problem 45SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =1 ; a 2...
Problem 46SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =1 ; a 2...
Problem 47SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =A ; a n...
Problem 48SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 =A ; a n...
Problem 49SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 = 2 ; a n...
Problem 50SB: In Problems 37-50, a sequence is defined recursively. Write down the first five terms. a 1 = 2 ; a n...
Problem 51SB: In Problems 51-60, write out each sum. k=1 n ( k+2 )
Problem 52SB: In Problems 51-60, write out each sum. k=1 n ( 2k+1 )
Problem 53SB: In Problems 51-60, write out each sum. k=1 n k 2 2
Problem 54SB: In Problems 51-60, write out each sum. k=1 n ( k+1 ) 2
Problem 55SB: In Problems 51-60, write out each sum. k=0 n 1 3 k
Problem 56SB: In Problems 51-60, write out each sum. k=0 n ( 3 2 ) k
Problem 57SB: In Problems 51-60, write out each sum. k=0 n1 1 3 k+1
Problem 58SB: In Problems 51-60, write out each sum. k=0 n1 ( 2k+1 )
Problem 59SB: In Problems 51-60, write out each sum. k=2 n ( 1 ) k lnk
Problem 60SB: In Problems 51-60, write out each sum. k=3 n ( 1 ) k+1 2 k
Problem 61SB: In Problems 61-70, express each sum using summation notation. 1+2+3+...+20
Problem 62SB: In Problems 61-70, express each sum using summation notation. 1 3 + 2 3 + 3 3 +...+ 8 3
Problem 63SB: In Problems 61-70, express each sum using summation notation. 1 2 + 2 3 + 3 4 +...+ 13 13+1
Problem 64SB: In Problems 61-70, express each sum using summation notation. 1+3+5+7+...+[ 2( 12 )1 ]
Problem 65SB: In Problems 61-70, express each sum using summation notation. 1 1 3 + 1 9 1 27 +...+ ( 1 ) 6 ( 1 3...
Problem 66SB: In Problems 61-70, express each sum using summation notation. 2 3 4 9 + 8 27 ...+ ( 1 ) 12 ( 2 3 )...
Problem 67SB: In Problems 61-70, express each sum using summation notation. 3+ 3 2 2 + 3 3 3 +...+ 3 n n
Problem 68SB: In Problems 61-70, express each sum using summation notation. 1 e + 2 e 2 + 3 e 3 +...+ n e n
Problem 69SB: In Problems 61-70, express each sum using summation notation. a+( a+d )+( a+2d )+...+( a+nd )
Problem 70SB: In Problems 61-70, express each sum using summation notation. a+ar+a r 2 +...+a r n1
Problem 71SB: In Problems 71-82, find the sum of each sequence. k=1 40 5
Problem 72SB: In Problems 71-82, find the sum of each sequence. k=1 50 8
Problem 73SB: In Problems 71-82, find the sum of each sequence. k=1 40 k
Problem 74SB: In Problems 71-82, find the sum of each sequence. k=1 24 ( k )
Problem 75SB: In Problems 71-82, find the sum of each sequence. k=1 20 ( 5k+3 )
Problem 76SB: In Problems 71-82, find the sum of each sequence. k=1 26 ( 3k7 )
Problem 77SB: In Problems 71-82, find the sum of each sequence. k=1 16 ( k 2 +4 )
Problem 78SB: In Problems 71-82, find the sum of each sequence. k=0 14 ( k 2 4 )
Problem 79SB: In Problems 71-82, find the sum of each sequence. k=10 60 ( 2k )
Problem 80SB: In Problems 71-82, find the sum of each sequence. k=8 40 ( 3k )
Problem 81SB: In Problems 71-82, find the sum of each sequence. k=5 20 k 3
Problem 82SB: In Problems 71-82, find the sum of each sequence. k=4 24 k 3
Problem 83AE
Problem 84AE
Problem 85AE
Problem 86AE
Problem 87AE
Problem 88AE
Problem 89AE
Problem 90AE
Problem 91AE
Problem 92AE
Problem 93AE
Problem 94AE
Problem 95AE
Problem 96AE
Problem 97AE
Problem 98AE
Problem 99AE
Problem 100AE
Problem 101AE
Problem 102AE
Problem 103AE
Problem 104AE
Problem 105AE
Problem 106DW
Problem 107DW
Problem 108RYK: If 2500 is invested at 3 compounded monthly, find the amount that results after a period of 2 years.
Problem 109RYK: Write the complex number 1i in polar form. Express the argument in degrees.
Problem 110RYK: For v=2ij and w=i+2j , find the dot product vw .
Problem 111RYK: Find an equation of the parabola with vertex ( 3,4 ) and focus ( 1,4 ) .
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