WEB-REPORT | |||||||||||

Authentication: We declare that the web-report is our own work and does not contain plagiarised material | |||||||||||

Group | 8-15 | ||||||||||

Project Title | SQUARE PEG PROBLEM | ||||||||||

Synopsis | Recently we came across a math article on the Wolfram Alpha website, titled Peg. In the article, the author posted a math question, Which fits better, a round peg in a square hole, or a square peg in a round hole? The author proves that a round peg fits better into a square hole than a square peg fits into a round hole through algebraic methods. Later on, one of us thought of an idea, It is true that in a circle, there will always be infinite numbers of inscribed square. However, does that mean that it will always have at least an inscribed square in any curve? We tried the problem he proposed on our own but we were unable to prove it. |
||||||||||

Link to start page | Click HERE to access web-report | ||||||||||

Special
instructions for evaluator to take note |
Nil | ||||||||||

Team Members (Names & Classes) |
Group Leader: | ||||||||||

TEOH JUN JIE 4S1 | |||||||||||

Group Members: | |||||||||||

FOO SHI HONG 4S1 | |||||||||||

TEOW HUA JUN 4S1 | |||||||||||