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how to solve tis one: mathematical induction (1 Viewer)

lucifel

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i think he just forgot the nCr's, but otherwise it follows.
 

shafqat

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^ = to the power of
Here's the induction proof:
5^n > 3^n +2^n
Assume 5^k > 3^k +2^k
For k+1, LHS = 5^k+1
= 5.5^k
> 5(3^k + 2^k)
= 5.3^k + 5.2^k
> 3.3^k + 2.2^k
= RHS

The other proof is just through binomial expansion.
 

gman03

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5n+1
= 5 . 5n
> 5 . ( 3n +2n) by induction
= 5 . 3n + 5 . 2n
> 3 . 3n + 2 . 2n
= 3n+1 +2n+1


for n = 2, 32 + 22 = 13 < 25 = 52

Hence, by induction, 5n > 3n +2n is true for n >= 2.

EDIT: A bit too late, it seems
 
Last edited:

Ghost1788

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Cant you just say

5^n = (3 + 2)^n

=3^n + 2^n + 12
therefore

5^n > 3^n + 2^n

Similarly

5^(n+1) = (3 + 2)^(n+1)
=3^(n+1) + 2^(n+1) + 12
therefore

5^(n+1) = 3^(n+1) + 2^(n+1)

By Mathematical Induction

plz correct me if i'm wrong
 

Ghost1788

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yea i just realised this is only applicable for n=2...hmm i am a lost cause i think...
 

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