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Induction - inequalitage (1 Viewer)

illin

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Induction - inequalities

Examples:

Show that n ! > 2n for n > 4.
Show that 3n>= 1+2n

What is the best approach when doing these types of questions?
like LHS - RHS > 0, that sort of stuff?

when u get to prove for (k+1)th term, how do u use ur assumption properly to prove the statement.

like for 1.

1.Show true for 1st term

LHS=5! RHS=2^5

LHS>RHS
Therefore statement is true for 1st term

2. Assume true for kth term
k!>2^k

3. Show true for (k+1)th term

(k+1)!>2^(k+1)

k!(k+1)>2.2^k

k!(k+1) - 2.2^k>0
LHS= ...
is this how u do it?
what aboutfor >=? (greater than or equal to)?

cheers
 
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acmilan

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It should really work both ways, either if you move everything to one side or keep them on opposite sides, its up to you
 

Slidey

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Yeah, LHS>RHS is the same as LHS-RHS>0
 

withoutaface

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Working one side only is more advisable because it's easier to follow and HSC markers generally prefer it. ie LHS=stuff>stuff=...=RHS
 

dawso

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withoutaface said:
LHS=stuff>stuff=...=RHS
gotta love that great mathematical jargon we use here....lol
 

Slidey

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withoutaface said:
Working one side only is more advisable because it's easier to follow and HSC markers generally prefer it. ie LHS=stuff>stuff=...=RHS
That's true but for questions such as:

Prove:
(a+b)/2 >= sqrt(ab)

It's far easier to do something like:
LHS-RHS
(a+b)/2-sqrt(ab)
(a-2sqrt(ab)+b)/2
(sqrta-sqrtb)^2/2 >=0
Q.E.D.
 

ngai

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illin said:
Examples:

Show that n ! > 2n for n > 4.
Show that 3n>= 1+2n
dont we just hate using induction for these kind of questions?
what a waste of ink and paper
 

KFunk

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illin said:
Show that 3n>= 1+2n
Call me wrong, but isn't that just trying to show that n ≥ 1 (after subtracting 2n from both sides) given the condition that n is an integer where n is ≥ 1 ? It seems as though it's proven from the outset.
 

LaCe

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But the thing is that we will get questions like this, and we would have to prove it by induction.
I think you may have to use the condition of k is ≥ 1 when u are trying to prove that
3(k+1)≥1+2(k+1)
But how would u approach it? how do u use ur assumption of
3k≥1+2k??
 

withoutaface

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LaCe said:
But the thing is that we will get questions like this, and we would have to prove it by induction.
I think you may have to use the condition of k is ≥ 1 when u are trying to prove that
3(k+1)≥1+2(k+1)
But how would u approach it? how do u use ur assumption of
3k≥1+2k??
3(k+1)=3k+3>2k+3 (since k>0)

QED
 

Slidey

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You basically are.

If 3k≥1+2k, then 3k+3>=4+2k>=3+2k
 

withoutaface

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In lace's post the RHS= 3+2k, I don't get what assumption we're making :confused:
 

LaCe

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the assumption that we make
3k≥1+2k

and then we have to prove for (k+1)th term, which is
3(k+1)3≥1+2(k+1)

[ie.(RHS= 3+2k)]
How do we use the assumption?
 

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