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!

Paper & Quiz:

Loading data...

Quiz Number:

Publication Date:

Coin combinations

LPP1999 | 19:32 Thu 08th Oct 2009 | Quizzes & Puzzles

19 Answers

How many different ways exist to make a total of seventeen pence?

Eastenders

names of films

Answers

1 to 19 of 19

Best Answer

No best answer has yet been selected by LPP1999. Once a best answer has been selected, it will be shown here.

For more on marking an answer as the "Best Answer", please visit our FAQ.

Postdog

Lots - just gone mad trying to work it out!!

BTW I answered so I could find the question again when someone does say

fordward

6 !!

Postdog

It's more than 6 just doing a combo of 1p and 2p, then you have your 5p and 10p's to account for

vulcan

11.[I think]

Jumbuck

I make it 27 different ways:

16x1p / 14x1p+1x2p / 12x1p+2x2p / 10x1p+3x2p / 8x1p+4x2p / 6x1p+5x2p / 4x1p+6x2p / 2x1p+7x2p / 8x2p

1x5p+...11x1p / 9x1p+1x2p / 7x1p+2x2p / 5x1p+3x2p / 3x1p+4x2p / 1x1p+5x2p

2x5p+...7x1p / 5x1p+1x2p / 3x1p+2x2 p/ 1x1p+3x2p

3x5p+ ...2x1p / 1x2p

1x5p+1x10p+...2x1p / 1x2p

1x10p+...7x1p / 5x1p+1x2p / 3x1p+2x2p / 1x1p+3x2p

Jumbuck

made a mistake, for some reason took 16p instead of 17s so...

1st row: add 1p to each combination - still 9 combos

2nd row: add 1p to each combination - adds one extra combo

=> grand total = 28

dr b

I think it's 102 (assuming you have 10p, 5p, 2p and 1p coins)

Logic: using a 10p coin there are 6 ways:

10-5-2
10-5-1-1
10-2-2-2-1
10-2-2-1-1-1
10-2-1-1-1-1-1
10-1-1-1-1-1-1-1

Now, how many ways can you make 10p, using a 5 p coin? Answer: 4
5-5
5-2-2-1
5-2-1-1-1
5-1-1-1-1-1

For each of these 4 ways there are 6 more ways to get to 17 (see above) so that's 24 more in total.

Finally, how may ways to make 5p? Answer: 3
2-2-1
2-1-1-1
1-1-1-1-1

For each of these 3 ways there are 24 ways to get to 17p (see above) so that's 72 more

72+24+6 = 102.

fordward

quite right forgot to do all the 1ps think i should go to bed!

Postdog

Should have read my first answer....

vulcan

I shouldn't have answered at all ! :-)

Jumbuck

dr b the problem with your reckoning is that it doesn't take into account the interchangeability of individual coins of the same denimination

e.g you are counting (2-1-1-1) + (2-1-1-1) + (2-1-1-1) as being different from (2-2-1) + (2-1-1-1) + (1-1-1-1-1)
whereas they are both 9x1p + 3x2p

fordward

wonder if its an age thing vulcan

vulcan

I fear you're right, fordward, old age is like being punished for a crime you didn't commit.!

Jumbuck

you old codgers, you're wrong if you reckon that everyone else on this thread is a youngster

dr b

Jumbuck, too true, although I like to think of this as a 'salient feature' of my solution rather than a 'problem'. If the order of the coins doesn't matter I make it 26 combos, so we still get to disagree!

dr b

whoops, no, 27 ways. So we concur.

Jumbuck

not quite dr b I upgraded to 28 because (for some reason) I started with 16p, so the updated version is

17x1p / 15x1p+1x2p / 13x1p+2x2p / 11x1p+3x2p / 9x1p+4x2p / 7x1p+5x2p / 5x1p+6x2p / 3x1p+7x2p / 1x1p+8x2p = 9 combos

1x5p+...12x1p / 10x1p+1x2p / 8x1p+2x2p / 6x1p+3x2p / 4x1p+4x2p / 2x1p+5x2p / 6x2p = 7 combos

2x5p+...7x1p / 5x1p+1x2p / 3x1p+2x2 p/ 1x1p+3x2p = 4 combos

3x5p+ ...2x1p / 1x2p = 2 combos

1x5p+1x10p+...2x1p / 1x2p = 2 combos

1x10p+...7x1p / 5x1p+1x2p / 3x1p+2x2p / 1x1p+3x2p = 4 combos

9+7+4+2+2+4 = 28

dr b

yes, I agree.

fordward

well thats nice!

1 to 19 of 19

Do you know the answer?