Chef's Quick Brain Teaser, revisited - Contractor UK Bulletin Board

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OwlHoot replied

21 May 2009, 00:27
Brolly old son, you're making a big meal out of this. I think most if not all of us grasped the idea, namely that you were asking for the predecessor number in Chef's sequence based on the recurrence x_(r+1) = x_r * (x_r + 1).
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BrollyBonce replied

20 May 2009, 21:59
Originally posted by BrollyBonce View Post

1. Chef asked what was next in the series 1, 2, 6, 42, 1806, ? The answer appeared later in that thread.

Is it really the case that none of you use the "first try and solve the number on the left to get the formula - the numbers are usually smaller so you can do it quicker and in your head - then use that to determine the number on the right" technique?

That would have had you immediately thinking "What number, when multiplied by [ itself plus one ] gives the result one?"

That should have had bells ringing and got you thinking of the Golden Ratio: the number that is its own reciprocal plus one, of course.

Originally posted by BrollyBonce View Post

2. conned_tractor asked where the series 1, 2, 1.5, 1.666, 1.6, ... converges. There was some controversy about the question, but the answer was a special number known as the Golden Ratio.

With the Golden Ratio implied in the last question, I had presumed this had actually triggered the second question.

Although there are always an infinite number of polynomials for any number sequence, the famous Fibonacci sequence was obviously the relevant factor here (Occam's Razor).

Since the sequence tends toward the Golden Ratio, it seemed obvious that had triggered conned_tractor's question.

Originally posted by BrollyBonce View Post

Those questions are actually related and I thought EO or sasguru or NickFitz or someone would spot the relationship and comment on it. They didn't, so I gave a clue in the form of a question:

3. "In the context of the first question in this thread, what is the significance of the number 0.6180339887498949......"

... it is the number before the first number...

Originally posted by BrollyBonce View Post

That should have prompted someone to say, "Hey, not only is that number rhubarb regarding question 1, it is also rhubarb regarding question 2!"

4. When you have answered question 3 (and not before), why is that number significant to question 2 and, therefore, how are questions 1 and 2 related?

... and it is the muliplicand that requires the Golden Ratio multiplier.

Originally posted by BrollyBonce View Post

Come on you clever people. What is the answer to questions 3 and 4?

It really was that simple.

Originally posted by BrilloPad View Post

I concur. I'll take that gun, if I may.
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BrilloPad replied

18 May 2009, 17:58
Originally posted by SallyAnne View Post

Is there a "hanging oneself" smilie available?

I'll settle for this

HTH
Leave a comment:
expat replied

18 May 2009, 15:16
Originally posted by Bagpuss View Post

<expat's>
which is the same as
<Bagbuss's earlier>

I agree a million percent.

x(n+1) = xn * (xn + 1)

so xn**2 + xn - x(n+1) = 0

when x(n+1) = 1,
xn = [ -1 +/- sqrt(1 + 4) ] /2
positive root = [ -1 + sqrt(5) ] /2 = 0.618 etc

I wasn't going to bother going through with it: the maths is only school-level but the notation is painfully ponderous in plain text.
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Bagpuss replied

18 May 2009, 14:33
Originally posted by expat View Post

They are algebraically identical. However Churchill's shows the rule that is probably in mind to generate the series.

x(n+1) = xn * (xn + 1)

which is the same as

Originally posted by Bagpuss View Post

it should be X(n)=X(n-1)*[X(n-1) +1]
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TimberWolf replied

18 May 2009, 14:21
Originally posted by BrollyBonce View Post

If x1 = x0 * (x0 + 1)

then x0 * (x0 + 1) = x1

Where x1 = 1 calculate x0 and put it in the series.

[1] x1 = (1 + x0)x0, so x0 = ( -1+-sqrt(1-4x1) ) / 2
[2] x1 = (1 + x0)/x0, so x0 = 1/(x1-1)
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EternalOptimist replied

18 May 2009, 12:58
Originally posted by expat View Post

They are algebraically identical. However Churchill's shows the rule that is probably in mind to generate the series.

x(n+1) = xn * (xn + 1)

Ah , but now observe

n = x * (x+1)
n = (x*x) + x

therefore

x * (x+1) = (x*x) +x

therefore

x = sqrt((x*(x+1)-x)

I refer to this as 'The Golden Rivet' (Which, colloquially, is an eight incher)
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expat replied

18 May 2009, 12:45
Originally posted by Churchill View Post

All I can see in question 1 is

x = x * (x + 1);

Originally posted by EternalOptimist View Post

I thought it was

x = (x * x) + x

They are algebraically identical. However Churchill's shows the rule that is probably in mind to generate the series.

x(n+1) = xn * (xn + 1)
Leave a comment:
SallyAnne replied

18 May 2009, 12:41
Is there a "hanging oneself" smilie available?

I'll settle for this
Leave a comment:
ASB replied

18 May 2009, 12:35
Originally posted by BrollyBonce View Post

Another HUGE hint.

What number came BEFORE in the series 1, 2, 6, 42, 1806, ...

I.e., what comes before the '1'?

If you take the obvious solution for the series then yes - and that would then define the series as one of the possible solutions. See OwlHoots link for other solutions that are valid with that sequence.
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Bagpuss replied

18 May 2009, 12:15
Originally posted by DaveB View Post

Told you I was simple

and apparently unable to read ()'s corectly.....

BODMAS mate BODMAS

Originally posted by oracleslave View Post

Where's CUK's self proclaimed maths whiz?

He reads maths books as a hobby so maybe he should be setting the questions

Last edited by Bagpuss; 18 May 2009, 12:19.
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DaveB replied

18 May 2009, 12:13
Originally posted by Bagpuss View Post

0*1 = ?

Told you I was simple

and apparently unable to read ()'s corectly.....
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Bagpuss replied

18 May 2009, 12:12
Originally posted by DaveB View Post

Well to my simple mind, if the formula above was correct then if X1=1 X0 = 0

0*1 = ?
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oracleslave replied

18 May 2009, 12:12
Originally posted by Bagpuss View Post

I thought he already told us that.

Welcome to CUK does GCSE Maths

Where's CUK's self proclaimed maths whiz?
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DaveB replied

18 May 2009, 12:11
Originally posted by BrollyBonce View Post

Another HUGE hint.

What number came BEFORE in the series 1, 2, 6, 42, 1806, ...

I.e., what comes before the '1'?

Well to my simple mind, if the formula above was correct then if X1=1 X0 = 0
Leave a comment: