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misurrosne

misurrosne

Answered question

2022-06-07

Prove by Mathematical Induction š‘Ž š‘› < 3 š‘„ ,, if š‘Ž 1 = 3 , š‘„ ā‰„ 2 ,, and š‘Ž š‘› + 1 = 2 ( 2 + š‘Ž š‘› )

Answer & Explanation

Donavan Scott

Donavan Scott

Beginner2022-06-08Added 22 answers

Step 1
You have: a 1 = 3 < 3 x is true since x > 1. Assume a n < 3 x, then a n + 1 = 2 ( 2 + a n ) < 2 ( 2 + 3 x ) = 4 + 6 x . To complete the proof you need to verify that 4 + 6 x < 3 x.
Step 2
This is the same as 4 + 6 x < 9 x 2 . But 4 + 6 x < 3 x + 6 x = 9 x < 9 x 2 . Thus by induction, a n < 3 x for all n.

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