Title Builder Beta See instructions

Welcome to Title Builder Beta.

This small piece of kit is designed to make building your Quiz, Crossword or Puzzle question more effective. It should make finding your question easier for others and, the easier it is to find, the more likely someone is to answer it!

To build an easy to find question title simply select the paper and quiz, enter the quiz number if relevant and fill in the Publication Date. Once you’re happy click “Build Title” and the information should populate the Title field. Fill in the final required details of your question as you normally would, and click submit.

As this is a Beta we only have a limited number of papers and quizzes listed. If you think your favourite Quiz, Crossword or Puzzle should be listed here don’t hesitate to contact us.

Remember: You do not have to use the title builder - simply enter the title and question as you normally would and click submit!

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Listener Crossword No 4308 Sub-Prime More-Guess Relief By Ruslan

BobHWW | 17:21 Fri 22nd Aug 2014 | Crosswords

44 Answers

A fairly easy solve in contrast to the rather complicated preamble. I haven't tried to work out the title yet!

Farewell Ruslan - you will be missed.

Daily Ex Ditloid

Tls

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Postigod

A very nicely constructed puzzle, so many thanks Ruslan. I agree this was on the simple side as Listener numericals go (yet still very fun). It could have been made more difficult (and still a unique solution, I believe) without the extra hint for 12A (as one has three possible pairs of simultaneous equations for u, v, only one of which has integer solutions).

TheBear69

The proof of the 1st sentence of the preamble is trivial.

Given a positive integer n, let k = n mod 6; n=6m+k for some m.

k=0 => n=6m is never prime
k=2 => n=6m+2=2(3m+1) is prime only if m=0
k=3 => n=6m+3=3(2m+1) is prime only if m=0
k=4 => n=6m+4=2(3m+2) is never prime

So other than 2 and 3 all primes are either 6m+1 or 6m+5 = 6(m+1)-1.
Of course the converse is NOT true; plenty of 6m+1's are not prime (e.g. 25).

British_Olympics

Even more simply, every prime number greater than 3 is odd (so every adjacent number (+1 or -1) has to be divisible by 2) and not divisible by 3 (so one adjacent number must be), therefore one adjacent number is divisible by (2 x 3) = 6.

olichant

Thank you, some very compact suggestions! Which have made me idly wonder if there's any milage for a competition to reduce famous mathematical proofs to a tweet. Other than the obvious "I have discovered a truly wonderful proof, which this tweet is too short to record". (Sorry, a bit off topic perhaps).

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