Solve the following. a) Find a closed formula for the sequence 6,-12,18,-24,30,-36,

banganX

banganX

Answered question

2021-08-18

Solve the following.
a) Find a closed formula for the sequence 6,12,18,24,30,36,
b) Find the sum k=141k!.

Answer & Explanation

Aamina Herring

Aamina Herring

Skilled2021-08-19Added 85 answers

Step 1
The closed formula for a sequence is used to define the general term of a sequence. For example, the closed formula for the sequence, 1, 4, 9, 16, 25… can be represented by the formula an=n2 .
The summation of a sequence is denoted by the notation, . For example, the sum, x1+x2+xn++xn is denoted by the expression, k=1nxk.
Step 2
Consider the sequence, 6,12,18,24,30,36.
Each term of the sequence, 6,12,18,24,30,36 can be expressed by a general formula as follows.
6=6(1)11
12=6(1)22
18=6(1)33
24=6(1)44
30=6(1)55
36=6(1)66
an=6(1)nn
Hence, the closed formula for the given sequence is an=6n(1)n.
Step 3
Substitute k=1,2,3,4 in the expression, 1k! and add up the resulting terms to evaluate the expression, k=141k!.
k=141k!=11!+12!+13!+14!
Use the formula, nn(n1)(n2)21 to simplify each term of the expression 11!+12!+13!+14!
k=141k!=11!+12!+13!+14!
=11+121+1321+14321
=1

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