Discrete Math On Recurrence. 1. Suppose that a geometric sequence starts with and satisfies the recurrence a_n=ra_{n-1} for every positive integer n.

Nelson Jennings

Nelson Jennings

Answered question

2022-07-15

Discrete Math On Recurrence
1. Suppose that a geometric sequence starts with and satisfies the recurrence a n = r a n 1 for every positive integer n.
a) Show that a n = a 0 r
b) Find the 100th number in the sequence 3,6,12,24,48, … .
I know this is a another recurrence problem but not sure now to start with this one.

Answer & Explanation

slapadabassyc

slapadabassyc

Beginner2022-07-16Added 21 answers

Step 1
a) Note that a n a n 1 = r for all n integer, hence
a n a n 1 a n 1 a n 2 a 1 a 0 = r r r = r n ,
but a n a n 1 a n 1 a n 2 a 1 a 0 = a n a 0 , thus
a n a 0 = r n a n = a 0 r n .
Step 2
b) In this sequence a 0 = 3 and the 100th term is equal a 99 , here r = 2, hence
a 99 = a 0 r = 3 2 99
Therefore, the 100th term is equal to 3 2 99 . If you want, you can compute this.

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