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A numerical 'crossword' of a while ago based on 60 and 120 degree triangles..
a sq +/- ab + b sq = c sq. c is theside facing the angle.
It was not known whether 60 or 120 deg.
a b and c are all integers, possibly 6 figures in length. Various values for c were given . The values for a and b had to be obtained.
Ideas on how to soilve would beappreciated. If lengthy, is there a library text book that would inform?
a sq +/- ab + b sq = c sq. c is theside facing the angle.
It was not known whether 60 or 120 deg.
a b and c are all integers, possibly 6 figures in length. Various values for c were given . The values for a and b had to be obtained.
Ideas on how to soilve would beappreciated. If lengthy, is there a library text book that would inform?
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No best answer has yet been selected by Muffet. 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.TeeGee, That is precisely the equation that Muffet has given. Let me explain what I understand Muffet is asking:
For any given value of c there will be an infinite number of possible values for a and b. The problem is that Muffet is only looking for solutions where both a and b are integers and may want answers up to 999999. I initially thought of doing it with a spreadsheet but you would need a huge spreadsheet with 999999 rows. I cannot think of a simpler way yet.
For any given value of c there will be an infinite number of possible values for a and b. The problem is that Muffet is only looking for solutions where both a and b are integers and may want answers up to 999999. I initially thought of doing it with a spreadsheet but you would need a huge spreadsheet with 999999 rows. I cannot think of a simpler way yet.
I think I better understand your question, but not your logic.
Side c is opposite angle C, side a is opposite angle A etc.
If C is either 60 or 120 degrees ( which gives a cos of +-0.5 ) then Muffet's formula is as stated. Surely therefore, for each value of c there will be an finite number of values each for a and b ( these are interchangable ) depending upon C being 60 or 120deg. With C at 60deg incidentally, one set of results is always a=b=c ( eqilateral triangle )
My solution would be to write a small Pascal programme that would test for each given value of c ( from 1 to 999999 ) and each produced value for a and b were indeed integers, using Muffet's formula.
Side c is opposite angle C, side a is opposite angle A etc.
If C is either 60 or 120 degrees ( which gives a cos of +-0.5 ) then Muffet's formula is as stated. Surely therefore, for each value of c there will be an finite number of values each for a and b ( these are interchangable ) depending upon C being 60 or 120deg. With C at 60deg incidentally, one set of results is always a=b=c ( eqilateral triangle )
My solution would be to write a small Pascal programme that would test for each given value of c ( from 1 to 999999 ) and each produced value for a and b were indeed integers, using Muffet's formula.
Many thanks, TeeGee and gen2. This was one of the Listener puzzles. Sadly, I haven't any of the values of c that I can offer to you for experimentation.
Just on the matter of finite or infinite, I would think there must be an infinite number of possible values for a and b in relation to each c, in keeping with the infinite number of possible other angles. Presumably only one combination for each consists of integers.
I hope you'll not have sleepless nights over this!!
Just on the matter of finite or infinite, I would think there must be an infinite number of possible values for a and b in relation to each c, in keeping with the infinite number of possible other angles. Presumably only one combination for each consists of integers.
I hope you'll not have sleepless nights over this!!
`Yes, infinite is the right answer, but there would only be a finite number of integer answers. Values of c from 1 to 50 yield 156 combinations, many of them duplicated of course. ( 6,10,14 : 10, 6,14 : 10,14,6 : 14,6,10 : 14,10,6 for example )
I havn't bothered to search for unique sets yet, but could do if requested.
Night, Night.
I havn't bothered to search for unique sets yet, but could do if requested.
Night, Night.
Fantastic, TeeGee. Just by way of explanation, I've only just become aware of Answerbank. The question of how to solve that particular puzzle has been bugging me for a long time, and I thoughjt I would give it an airing. Glad I did !! I'll see if I can get hold of some of the higher values of c. If so, I'll try again. Thanks for your interest.