The following pages link to New sums of three cubes (Q3055143):
Displaying 9 items.
- Cracking the problem with 33 (Q2316144) (← links)
- A note on the Diophantine equation \(2^{n-1}(2^{n}-1)=x^3+y^3+z^3\) (Q2631753) (← links)
- A new sequence derived from a combination of cubes with volume \(F_n^3\) (Q2891255) (← links)
- On searching for solutions of the Diophantine equation 𝑥³+𝑦³+𝑧³=𝑛 (Q3127340) (← links)
- New integer representations as the sum of three cubes (Q3433779) (← links)
- The four least solutions in distinct positive integers of the diophantine equation \(s=x^ 3+y^ 3=z^ 3+w^ 3=u^ 3+v^ 3=m^ 3+n^ 3\) (Q3987426) (← links)
- Sums of three cubes (Q4786390) (← links)
- Sums of Three Cubes (Q5187355) (← links)
- An observation concerning the representation of positive integers as a sum of three cubes (Q6158201) (← links)
