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参考文献:
「フェルマーの最終定理」サイモン・シン(新潮社)
https://amzn.to/35g23Hq
中田敦彦のWebコミュニティ「PROGRESS」はこちら
https://www.nakataatsuhiko.com/fanclub-salon
中田敦彦のトークチャンネルはこちら
https://www.youtube.com/channel/UC6kSLiIgAcbXNSxf0JHjy5g
中田敦彦の自伝小説「混沌を泳ぐ」はこちら
https://amzn.to/2Utm3p8
聴くYouTube大学 in Voicyはこちら
https://voicy.jp/channel/1598
中田敦彦プロデュース・カードゲーム「XENO」はこちら
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「XENO」テーマソングはこちら
https://www.tunecore.co.jp/artist/YUKI-TERADA#r580180
「Win Win Wiiin」テーマソングはこちら
https://distrokid.com/hyperfollow/juvenilezinee/let-me-tell-you-now
中田敦彦公式サイトはこちら
https://www.nakataatsuhiko.com/
中田敦彦の妻「福田萌のYouTube -Moe ch.もえチャン- 」はこちら
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#数学 #教育 #授業
25件のコメント
いや、もうおもろすぎて気づいたら30分よ。
なぜか定期的に見たくなる
同じ辺ってことは
x+xにならないか?
式が成立しない
フェルマーの変態エピソードで驚いてたら、オイラーのエピソードで度肝を抜かれて草
あっちゃんの説明の仕方が面白すぎて信じられないくらい頭に入ってくる!数学苦手なのに楽しすぎる動画!!フェルマーの最終定理読みたくなった
息子有能
数学はゲームと寝るのとご飯と漫画とアニメの次に好き
小5には頭が痛くなる問題だーwだけどジョジョとかでも、めっちゃ上手に教えてくれるからマジでこのチャンネルは神!
こんな先生がいたら、授業が楽しかっただろうな。
、。、
1/12/2023.
Depuis le 5 juin 2022 , j'ai redécouvert l'EQUATION UNIVERSELLE cachée de FERMAT.
Zpuissance(N+1) = Xpuissance(N) + Ypuissance(N) avec +1 <= X <= Y< Z < + infini et +2 < N < + infini, tous des nombres entiers positifs.
il y aura TOUJOURS une différence de ""+1"" entre la puissance de Z et celles de X et Y .Par conséquent la conjecture Zpuissanc(N) = Xpuissance(N) + Ypuissance(N) est impossible quelles que soient les puissances jusqu'à l'infini. La démonstration se résout en …4 lignes avec la réfutation de la conjecture comprise, et est du niveau mathématique d'une classe de 4è en France (14 ans) .La solution de l'EQUATION UNIVERSELLE est tellement simple et si courte que personne n'a trouvé l'astuce de départ depuis près de 4 siècles. Consultez d'aitres sites pour de plus complètes explications. Il est IMPOSSIBLE de donner un ou plusieurs exemples chiffrés car l'astuce saute aux yeux et le plus grand CANULAR mathématique de tous les temps et le plus célèbre serait dévoilé immédiatement.
Vous connaissez la fin, à vous de trouver le début comme dans la série policière américaine ""COLUMBO"".
Il est surprenant de voir tous les grands mathématiciens depuis près de 4 siècles, ne pas trouver la solution FACILE. Seul monsieur WILES, a trouvé une solution très difficile mais juste avec des outils mathématiques INCONNUS de FERMAT. Il n'a donc pas trouvé la démonstration FACILE de FERMAT. Mais Monsieur WILES, avec ses 129 pages a fait avancer considérablement la théorie des nombres et on ne peut que le remercier pour ses travaux.
MERCI et BRAVO monsieur WILES.
フェルマーをロジャーに喩えるのめちゃ良いな
この話好きで数ヶ月おきに見に来てしまいます😊
26:40
ガーン!ガシャっ!!!
萌える、、、!!!
この問題でNは存在するわけないだろ
模試で「証明を書くには解答欄が小さすぎる」と書いたら見事0点をもらえました
他人の話しをパクっての動画作りはヤメなさい!
実に見苦しい!
最強のトムブラウン
大学行くまでに理解しておきたい証明
またまた他人のサイトのパクリかよ!
いい加減にしなさいよ!
あっちゃんのyoutube大学の中で1番好き‼️
フェルマーが生きていたら『この程度の問題に300年もかかったのかバカどもが!』って腹抱えて笑ってそう!
コメントを書きたいが
余白が足りない
🎯 Key Takeaways for quick navigation:
00:00 🧠 Introduction to Fermat's Last Theorem
– Introduction to Fermat's Last Theorem and its historical significance.
– Overview of the book "Fermat's Last Theorem" by Simon Singh.
– Explanation of how the theorem intrigued mathematicians for 300 years.
02:24 📜 Understanding Fermat's Last Theorem
– Explanation of the difficulty and significance of Fermat's Last Theorem.
– Brief history of mathematics leading up to Fermat's time.
– Introduction to Pythagoras and the Pythagorean theorem.
06:00 📚 Contributions of Diophantus and Fermat
– Introduction to Diophantus and his work "Arithmetica."
– Overview of Fermat's background as a judge and amateur mathematician.
– Discussion of Fermat's contributions to mathematics, including Pascal's Probability theory.
10:02 🤯 Fermat's Ingenious Approach
– Description of Fermat's unique problem-solving approach and mathematical curiosity.
– Insight into Fermat's exploration of more sophisticated equations beyond existing problems.
– Discussion of Fermat's tendency to leave side notes and his discovery of higher-order versions of the Pythagorean theorem.
14:08 🔍 Discovery of Fermat's Notes
– Narration of how Fermat's son discovered his father's notes on Diophantus' "Arithmetica."
– Discussion of the publication of Fermat's notes and their impact on professional mathematicians.
– Insight into Fermat's reputation as an amateur mathematician with profound mathematical insights.
16:08 ❓ Fermat's Last Theorem as a Conjecture
– Explanation of Fermat's Last Theorem as a conjecture and its empirical validity.
– Comparison of Fermat's Last Theorem to other mathematical conjectures.
– Overview of attempts by mathematicians to prove Fermat's Last Theorem over centuries.
18:39 🌟 Leonhard Euler's Contribution
– Introduction to Leonhard Euler and his exceptional mathematical abilities.
– Discussion of Euler's upbringing and his pivotal role in advancing mathematics.
– Insight into the changing perception of mathematics due to the contributions of figures like Isaac Newton and Euler.
20:33 🧠 Euler's Remarkable Contributions
– Euler, despite losing his vision, continued to make significant contributions to mathematics.
– Despite losing his vision, Euler tackled difficult mathematical problems and made groundbreaking discoveries.
– Euler's perfect memory and ability to perform complex calculations in his head enabled him to continue his work even after going blind.
24:05 🚺 Sophie Germain's Persistence in Mathematics
– Sophie Germain defied societal norms and pursued mathematics despite facing discrimination as a woman.
– Germain's determination led her to use a fake identity to access education and correspond with prominent mathematicians.
– She made significant progress in understanding Fermat's Last Theorem, contributing partial proofs for cases when ( n > 4 ).
25:34 💡 Archimedes' Ingenious Inventions
– Archimedes, an ancient mathematician and inventor, created innovative defense mechanisms for his country, including a powerful stone-throwing machine.
– Despite his contributions, Archimedes faced a tragic end when Syracuse fell to the Roman Empire.
– Archimedes' dedication to his work, even in the face of imminent danger, reflects his passion for mathematics and innovation.
30:53 💻 Impact of Computing on Mathematics
– The invention of computers revolutionized mathematical research by significantly reducing the time needed for complex calculations.
– Mathematicians utilized computers to explore Fermat's Last Theorem for larger values of ( n ), although this approach did not provide a definitive proof.
– The emergence of computational methods prompted mathematicians to reconsider the significance of pure mathematical pursuits like Fermat's Last Theorem in practical contexts.
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これさすがに本人は証明できてなかったんだと思うな