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wu :: forums    riddles    hard (Moderators: william wu, SMQ, Grimbal, ThudnBlunder, Eigenray, Icarus, towr)    Ingram's Family « Previous topic | Next topic » Pages: 1  Reply Notify of replies Send Topic Print    Author  Topic: Ingram's Family  (Read 1036 times) K Sengupta Senior Riddler     Gender: Posts: 371 Ingram's Family   « on: Feb 3rd, 2006, 9:53pm » Quote Modify I am looking for an Algebraic Solution to the under noted  problem  which I found in a puzzle book.   PROBLEM:   The product of the ages of Ingram’s children is the square of the sum of their ages. Ingram has less than eight children . None of his children are more than 14 years old. All  the ages of his children are different.  All of his children are at least two years old.  All the ages are expressed in  integral number of years. How many children are there? What are their ages? « Last Edit: Feb 10th, 2006, 11:31pm by K Sengupta » IP Logged JocK Uberpuzzler     Gender: Posts: 877 Re: Ingram's Family   « Reply #1 on: Feb 4th, 2006, 1:24am » Quote Modify A straightforward solution based on (8*2)^2 = 2^8 is: seven children aged 4, 2, 2, 2, 2, 2, and 2.     IP Logged solving abstract problems is like sex: it may occasionally have some practical use, but that is not why we do it. xy - y = x5 - y4 - y3 = 20; x>0, y>0. fatball Senior Riddler Can anyone help me think outside the box please?     Gender: Posts: 315 Re: Ingram's Family   « Reply #2 on: Feb 4th, 2006, 11:24am » Quote Modify I have found 5 more solutions: 6 children: 4,4,2,2,2,2 5 children: 12,6,2,2,2 4 children: 4,4,4,4 3 children: 9,9,9 No solution for 2 children or less. IP Logged pex Uberpuzzler     Gender: Posts: 880 Re: Ingram's Family   « Reply #3 on: Feb 4th, 2006, 12:22pm » Quote Modify For what it's worth: 5 children: 2, 2, 4, 4, 4 4 children: 2, 4, 6, 12 4 children: 2, 5, 5, 8 4 children: 3, 3, 6, 6 IP Logged JohanC Senior Riddler     Posts: 460 Re: Ingram's Family   « Reply #4 on: Feb 4th, 2006, 2:11pm » Quote Modify on Feb 4th, 2006, 12:22pm, pex wrote: 4 children: 2, 4, 6, 12 Up till now, you encountered the only answer with all ages different. Maybe that was the original puzzle's intention? IP Logged JocK Uberpuzzler     Gender: Posts: 877 Re: Ingram's Family   « Reply #5 on: Feb 4th, 2006, 5:11pm » Quote Modify on Feb 4th, 2006, 2:11pm, JohanC wrote: Up till now, you encountered the only answer with all ages different. Maybe that was the original puzzle's intention?   Yep, the riddle requires some additional constraint, something like: "the Ingram's have no twins and all children are their own natural children"...   IP Logged solving abstract problems is like sex: it may occasionally have some practical use, but that is not why we do it. xy - y = x5 - y4 - y3 = 20; x>0, y>0. K Sengupta Senior Riddler     Gender: Posts: 371 Re: Ingram's Family   « Reply #6 on: Feb 10th, 2006, 11:32pm » Quote Modify Necessary  amendments incorporated in the problem body. IP Logged Pages: 1  Reply Notify of replies Send Topic Print Forum Jump: ----------------------------- riddles -----------------------------  - easy   - medium => hard   - what am i   - what happened   - microsoft   - cs   - putnam exam (pure math)   - suggestions, help, and FAQ   - general problem-solving / chatting / whatever ----------------------------- general -----------------------------  - guestbook   - truth   - complex analysis   - wanted   - psychology   - chinese « Previous topic | Next topic »

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