Asked by Devin
Can anyone please show me how 3^n/6^(2n+1) becomes 1/2^n(6^(n+1))= 1/6)/12^n when you divide top and bottom by 3^n?
Thank you and have a great day!
Thank you and have a great day!
Answers
Answered by
Reiny
let's work on the bottom
6^(2n+1)
= 3^(2n+1)* 2^(2n+1)
= 3^n * 3^(n+1) * 2^n * 2^(n+1)
= 3^n * 2^n * 6^(n+1)
now the 3^n would cancel the 3^n on top, leaving you with
1/(2^n * 6^(n+1) )
6^(2n+1)
= 3^(2n+1)* 2^(2n+1)
= 3^n * 3^(n+1) * 2^n * 2^(n+1)
= 3^n * 2^n * 6^(n+1)
now the 3^n would cancel the 3^n on top, leaving you with
1/(2^n * 6^(n+1) )
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