[dark_magician_92]

i recently came across this:-

3³+4³+5³=6³

i am curious to know if there are more of this kind i.e. sum of cubes of nos. in arithmetic progression = to cube of some other no.

[Guest]

I put your premise into a spreadsheet

I stopped at 32727 and found no occurrence where three consecutive numbers cubed totaled to a perfect cube, which is what I expected..

[dark_magician_92]

I put your premise into a spreadsheet

I stopped at 32727 and found no occurrence where three consecutive numbers cubed totaled to a perfect cube, which is what I expected..

thats ok, but why take consecutive numbers only? i said AP with a common diff. d , not d=1

[Guest]

Okay then ----

6^3+8^3+10^3=12^3

9^3+12^3+20^3=18^3

12^3+16^3+20^3=24^3

15^3+20^3+25^3=30^3

18^3+24^3+30^3=36^3

That should be enough to find a distinct pattern

Sorry for being lazy and not using superscript.

Edited July 3, 2011 by thoughtfulfellow

[dark_magician_92]

Okay then ----

6^3+8^3+10^3=12^3

9^3+12^3+20^3=18^3

12^3+16^3+20^3=24^3

15^3+20^3+25^3=30^3

18^3+24^3+30^3=36^3

That should be enough to find a distinct pattern

Sorry for being lazy and not using superscript.

1st is correct,

2nd shud have 15 cube (too lazy)

3rd ok,

4th ok,

5th ok,

yes i observe the pattern thanks a lot

Edited July 3, 2011 by dark_magician_92

[Guest]

The general equation for 3³+4³+5³ = 6³ is [k^1/3×3]³+ [k^1/3×4]³+[k^1/3×5]³ = [k^1/3×6]³. Thus, besides 3³+ 4³+5³ = 6³ for k=1, there is 6³+8³+10³ = 12³ for k=2, 9³+12³+15³ = 18³ for k=3, etc.

In addition, there is the general equation [k^1/3×11]³+[k^1/3×12]³+[k^1/3×13]³+[k^1/3×14]³ = [k^1/3×20]³ for 11³+12³+13³+14³ = 20³ for k=1, 22³+24³+26³+28³ = 40³ for k=2, 33³+36³+39³+42³ = 60³ for k=3, etc.

[dark_magician_92]

The general equation for 3³+4³+5³ = 6³ is [k^1/3×3]³+ [k^1/3×4]³+[k^1/3×5]³ = [k^1/3×6]³. Thus, besides 3³+ 4³+5³ = 6³ for k=1, there is 6³+8³+10³ = 12³ for k=2, 9³+12³+15³ = 18³ for k=3, etc.

In addition, there is the general equation [k^1/3×11]³+[k^1/3×12]³+[k^1/3×13]³+[k^1/3×14]³ = [k^1/3×20]³ for 11³+12³+13³+14³ = 20³ for k=1, 22³+24³+26³+28³ = 40³ for k=2, 33³+36³+39³+42³ = 60³ for k=3, etc.

i am giving u a prize