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Induction question (1 Viewer)

SunnyScience

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Prove 3^n > n^2

Thanks :) (hopefully this posts okay - first time using my phone :))
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SunnyScience

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furthermore,

(1+p)^n > 1 +np for n>1 and p>o

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deswa1

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I don't have time to post a solution but I'll outline my method and maybe someone else can help/you can do it.

1. Prove for n=1
2. Assume true for n=k (3^k>k^2)
3. We need to prove that 3^(k+1)>(k+1)^2. This is the same as proving that 3^(k+1)-(k+1)^2>0
4. Split 3^(k+1) into 3(3^k) and then use the inequality established in step two.
5. Simplify and prove that its greater than zero.
 

Cl324

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so basically you try to make

since is a parabola with coefficient > 1 and its discriminant is <0, the parabola will always be greater than zero
and hence

there are various ways of doing induction equalities, but i think manipulating the original equation to make it look like the second equation is the easiest
 
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SunnyScience

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so basically you try to make

since is a parabola with coefficient > 1 and its discriminant is >0, the parabola will always be greater than zero
and hence

there are various ways of doing induction equalities, but i think manipulating the original equation to make it look like the second equation is the easiest

thanks for that :)
too me a few minutes to work out your steps - but great!
 

kingkong123

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so basically you try to make

since is a parabola with coefficient > 1 and its discriminant is <0, the parabola will always be greater than zero
and hence

the discri

there are various ways of doing induction equalities, but i think manipulating the original equation to make it look like the second equation is the easiest
???

 
Last edited:

IamBread

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so basically you try to make

since is a parabola with coefficient > 1 and its discriminant is <0, the parabola will always be greater than zero
and hence

there are various ways of doing induction equalities, but i think manipulating the original equation to make it look like the second equation is the easiest
The discriminant is >0
 

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