Math without Laughing
Řada 2
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.
Kde se dívat na Math without Laughing • Řada 2
8 dílů
- Non-Euclidean geometry
D1Non-Euclidean geometry"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is "non-Euclidean geometry." Strange fantasies started by mathematicians in the field of shapes, and they revolutionize mathematics! In ancient Greece, Euclidean geometry was born. The nature of any figure is a great learning to be derived from only five common facts, namely, axioms. For the next two thousand years, geometry was believed to be a perfect absolute truth. But in the 19th century, its status suddenly faltered. The strange fantasies of genius mathematicians who doubt the common sense of two thousand years, and the great transformation of the world of knowledge brought about. We approach the drama of "non-Euclidean geometry" that is not taught at school. - Coratz ForecastD2
Coratz Forecast"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is "Colourt's prediction." Even elementary school students know the contents, but it is a super difficult problem that can not be solved by any genius! “If it is even, if it is divided by two, it is divided by two, and if it is divided by two, it is three times and one is equal to one. If you repeat this calculation, no matter what natural number you start from, you will surely reach one someday.” This prediction was created by the mathematician Corratz. Although it seemed like a simple number of games, there were no mathematicians who were able to prove its correctness. “Don’t put your hands on this problem!” Modern mathematics is out of control!” until the declaration of defeat. However, there are brave mathematicians who continue to challenge the proof. That grieving operation! - 1+1=2D3
1+1=2"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is “1+1=2”. Is 1+1=2 really true? What about the suffering and unexpected endings of mathematicians? Even if it seems obvious, mathematics must be strictly proved. You have to go back to the basics and build up your base. From the 19th century onwards, mathematicians who became aware of this problem, even doubted whether 1+1=2 was correct, and struggled to achieve complete mathematics. But then he discovers a nemaraezable paradox that can be said to be a mathematical crisis. Will mathematics become a completely uneducated discipline? "2 + 3 = 5 proof" by Panther Ogata is also a must-see! - Knot TheoryD4
Knot Theory"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is “Knot Theory”. Does the Creator of the Universe know mathematics? What an exciting mathematical mystery! "Knot theory" is a field of mathematics that categorizes knots made of "strings". How many types of knots cannot be matched in any way if they are deformed without cutting the strings? Research like play that mathematicians have come up with in their minds has made great strides in the 20th century. However, there is an unexpected fact that the theory was related to the laws of the universe! Is mathematics the “invention” of mathematicians? Or did it exist in the universe independently of humanity, and was it only discovered by mathematicians? - Transcendent NumbersD5
Transcendent Numbers"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is “Beyond Numbers.” What is the number of ultra super amazing? The latest research of the 21st century! This time, it is an adventure around the classification of numbers. The classifications taught in schools are irrational, negative numbers, imaginary numbers, etc. But not only are mathematicians still obsessed with classifying numbers, but humans still don’t understand numbers at all! I say. Among them, a huge mystery is the "transcendent number". What is the Ultra Super huge number? Panther Ogata proves the two-thousand-year-old conundrum that "the circumference rate pie is a transcendent number"! " The enchantment hidden in the classification of numbers"! - Kepler Conjecture
D6Kepler Conjecture"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. This time, it's the Kepler-Conjecture. Four hundred years later, what has finally been proven? The drama of the struggle of the geniuses! “When you cram a ball of the same size into an infinite space, whichever way does the gap the smallest and the densest?” At first glance, this problem seems simple. It seems that there is only a way to put the second layer of the ball into the dent of the first layer, but it took four hundred years to prove it mathematically." What is the problem with the super-conundrum that has plagued geniuses for centuries, along with Fermat's Last Theorem? The drama of the struggle to prove - 1+2+3+4+・・・=-1/12D7
1+2+3+4+・・・=-1/12"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is “infinite counting.” He is a mathematician, but he is not strictly bound by it (?) Unsurprisingly, a bold calculation is made! What is the answer to 1+2+3+4+... and all the infinite numbers? If you ask me on the test, the answer is infinite (no answer). However, if you use a theory created by a mathematician, the answer is minus twelve-tenths. Why is this such an unbelievable calculation? Since the mathematicians of history have encountered infinite numbers, they have been puzzled by its strangeness. We also introduce a surprising story that there is a hidden meaning that leads to the natural laws of the universe! - Birch-Swinnerton-Diyer conjectureD8
Birch-Swinnerton-Diyer conjecture"Mathematics without laughing" in which Takahiro Ogata explains the difficult problems of mathematics seriously. The theme is "Birch Swinerton-Diar conjecture." What are the numbers? A super-difficult question approaching. One of the seven major conundrums of modern mathematics is the BSD conjecture. It is also famous for being awarded a million-dollar prize, but it is so difficult that it is so difficult for mathematicians to understand what the problem is in the first place. But this time, I will try my best to introduce you! The keywords are "Rich point" and "elliptic curve". If you listen to that, you may be impressed by why this is an important issue in the mathematics world ... The proof of the highest difficulty of Panther Ogata is also a must-see!