Math without Laughing
Specials
Panther Takahiro Ogata explains the world of intricate mathematics with great earnestness in this unique intellectual entertainment program! Riemann Conjecture, Fermat's Last Theorem, Continuum Hypothesis, Four Color Map Theorem, Galois Theory, abc Conjecture, Probability Theory, P versus NP Problem, Chaos Theory, Poincaré Conjecture, Cryptography Theory, imaginary numbers.... In this 30-minute, gag-free, easy-to-understand series, we will explore these difficult problems and the beautiful and mysterious world of knowledge that has tormented even the most gifted mathematicians.
Math without Laughing • Specials ansehen bei
2 Folgen
- Differential/IntegratedF1
Differential/IntegratedPanther Ogata explains the world of beautiful and mysterious knowledge seriously "Mathematics without laughing" will return in a special special for the first time in a year! The theme this time is the most difficult part of school mathematics: differential and integral. It is said that there is no field in the history of mathematics that has had such an impact on human society. But don’t you think that you’ve failed in math because of that hencholine sign? “Why did mathematicians want to think about differentials and integrals?” “Why is that sign that way?” The story begins with a story that begins with a story that even people in science who are confident in mathematics are surprised at the end. If you look at it, you should be able to "knowledge the depth of mathematics"! - Hodge ConjectureF2
Hodge ConjectureThe "Hodge conjecture" is so difficult that mathematicians flirted, and the explanation itself is tremendously difficult in the first place. " There should be an algebraic cycle that classes the cohomology of the type (p,p) of the non-unsitic projective algebraic manifold (p,p). But Mr. Ogata will do his best this time. Why is this super-turbulent problem a major goal of modern mathematics? The most difficult thing in the history of the show! The image of mathematics should have changed when it was finished.