SOLUTION: The sum of the 28 consecutive odd, positive integers is a perfect cube. Find the smallest integers in the set.

SOLUTION: The sum of the 28 consecutive odd, positive integers is a perfect cube. Find the smallest integers in the set.

Algebra.Com

Question 321433: The sum of the 28 consecutive odd, positive integers is a perfect cube. Find the smallest integers in the set.
Answer by Alan3354(69443) (Show Source): You can put this solution on YOUR website!
71 - 125 --> 2744 = 14^3

RELATED QUESTIONS
A series of 567 consecutive integers has a sum that is a perfect cube. Find the smallest... (answered by Alan3354)

A series of 567 consecutive integers has a sum that is a perfect cube. Find the smallest... (answered by MathLover1,ikleyn,MathTherapy)

A series of 384 consecutive odd integers has a sum that is a perfect fourth power of a... (answered by ikleyn,greenestamps)

A series of 384 consecutive odd integers has a sum that is a perfect fourth power of a... (answered by MathLover1,ikleyn,greenestamps)

The sum of 36 consecutive odd, positive integers is the greatest perfect cube less than... (answered by ikleyn)

The sum of 99 consecutive odd, positive integers is the greatest perfect cube less than... (answered by ikleyn)

The sum of 3 consecutive odd integers is 27. find the smallest of these... (answered by Alan3354)

What is the smallest set of three consecutive odd integers whose sum is greater than... (answered by josmiceli)

the sum of the square of 2 consecutive odd positive integers is 209. find the... (answered by solver91311)