MTL - My Senpai Knows Magic-Chapter 108 run away

If audio player doesn't work, press Reset or reload the page.

When Calvin left St. Donas, he fell three times in a short distance.

Chen Luo, who was about to go out to buy food, saw it, but it was not surprising at all.

Not to mention Calvin, even in modern times, a student who has been educated in modern mathematics since childhood, can't help but doubt his life when he hears Zeno's paradox for the first time.

In the history of the development of physics, there were once four mythical beasts.

These four mythical beasts are Zeno's turtle, Laplace beast, Maxwell's demon, and Schrödinger's cat.

The four mythical beasts correspond to calculus, classical mechanics, the second law of thermodynamics and quantum mechanics respectively.

Among them, Zeno's tortoise space-time dual cultivation can shrink into an inch, the Laplace beast Mingcha Avenue deduces all things, Maxwell's demon manipulates all things to reverse Yin and Yang, and Schrödinger's cat creates a universe that transcends life and death.

These four mythical beasts are both good and evil. They not only bring confusion and trouble to scientists, but also point out the path and direction of science for mankind.

What Chen Luo released today was Zeno's turtle.

One can call it a mathematical problem, one can call it a physical problem, and one can call it a philosophical problem.

Philosophically, it is explained by the nature of motion, and in physics, it is explained by quantum mechanics.

To solve Zeno's turtle mathematically, you must first solve the limit problem.

But for two thousand years, even a great mathematician such as Euler Gauss has not been able to explain the mystery of the limit. Therefore, this unreasonable Zeno's tortoise settled in the physical empire for 2000 years as a mythical beast.

Exactly 2,000 years later, until Leibniz and Newton invented calculus, the limit problem was not solved, but even then, whether it was mathematics, philosophy, or physics, there was still a lot of quarrel over this turtle.

Later, there have been countless explanations for Zeno's paradox. People insist on their own opinions and stick to their own ideas, and no one can convince the other.

Of course, regardless of the outcome, Zeno's paradox, whether it is for the development of mathematics, philosophy, or physics, has played a great role in promoting.

This is not what Chen Luo cares about. What he cares about is that after releasing this turtle, those Gaya scholars should buy standing tickets to return to China overnight, right?

After they leave, his five thousand gold coins, no, seven thousand gold coins, will be in place immediately...

Although 2,000 gold coins is a bit less, considering that this should be Calvin's limit, in the face of an old friend, Chen Luo will just do it...

It's still this way to get money quickly, and Chen Luo even looks forward to Lorraine's return to several countries' scholar groups. After mathematics, physics, chemistry, biology, etc., can be done again...

In the past two days, the three major problems of the Gaya scholars have been stumped, and they have temporarily faded out of people's sight.

Scholars in the city of Apollo are studying Blair's tortoise.

Even ordinary civilians are full of curiosity about this issue.

How could a great great magician not catch up with a turtle? How fast can a tortoise that even a wind-type magician can't catch up with?

Of course, the commoners do not understand, but the scholars in Yapo City are very clear that the root of this problem is not the problem of whether the great magus can't catch up with the turtle, but the problem of how to catch up.

Everyone knows that the great great magus, Lord Achilles will definitely be able to catch up with the turtle, but how did he catch up?

If time and distance can be divided infinitely, how did he accomplish this infinite process?

This seems to be beyond their comprehension.

Some people also began to doubt that the first school of thought originated from Gaya, that time and space cannot actually be divided indefinitely, but this is even more difficult to understand.

If time and space cannot be divided infinitely, is there a minimum unit of time and space?

The scope of the discussion on this issue was far beyond the irrational numbers at that time.

There are even a lot of civilians every day, surrounding the entrance of the Mathematical Association, curiously asking the scholars about the Great Magister and the turtle.

Passing scholars, if there is no urgent matter, will usually explain to them.

A fat pet shop owner stopped a scholar and asked curiously, "How fast is the tortoise even if the great mages of the wind system can't catch up?"

The scholar shook his head and explained patiently: "It's not a question of whether the tortoise runs fast, it's a question of whether time and space can be divided infinitely..."

The owner of the pet shop waved his hand and said, "I don't care if time can be divided, I just want to know, how did that turtle run so fast, and what did it eat to grow up?"

The scholar said helplessly: "This is not the point. Do you think Your Excellency Blair doesn't know if the Great Magister can catch up with the tortoise?"

The owner of the pet store frowned and said, "I don't care about this, just tell me why the turtle crawls so fast, can it fly?"

The scholar was a little impatient, and said, "I said, the Great Magister will definitely be able to catch up with the tortoise!"

"Then what are you studying these two days?" The owner of the pet store rolled his eyes at him and asked, "Why don't you tell me where that Blair is, and I'll ask him what his tortoise ate and how did he grow up? Climb so fast..."

The scholar couldn't help kicking him and said furiously, "Get out!"

Mathematical Society, Calvin is standing at a table, and on the table in front of him is a slow-crawling turtle.

Two days later, he still couldn't figure out the turtle's problem.

Mathematics can answer the time it took for Achilles to catch up with the tortoise, but mathematics cannot explain how he caught up with the tortoise.

This is simply a problem that cannot be explained mathematically.

Calvin was puzzled by the turtle's question, but he was even more curious, what strange thoughts are in the young head of Lord Blair?

Every problem can cause a big earthquake. Is he really the devil sent by the gods to mess up the math world?

Gal hurried in from outside, forgetting to even knock on the door, while leaning against the wall, he panted and said, "Yes, Lord President, Gaya's scholar group, they, they..."

Calvin looked at him and asked, "What happened to them?"

Gal exclaimed: "They ran away!"

Gaya's group of visiting scholars quietly left the city of Yapo last night, without even saying hello.

Calvin was not surprised by this, this matter was within his expectations.

Since Lord Blair released the terrifying tortoise, the Gaya scholars have no way out. If they stay here, they will face the doubts of many scholars, and they cannot solve this problem at all.

Calvin felt that the only people who could explain this problem were Lord Blair and Lord Chen Luo.

At this moment, not only the Gaya scholar, but even Calvin himself was a little flustered.

He found that the power of this turtle was much greater than he expected. Now not only mathematicians, but people from all walks of life are asking him for the answer to this question.

When this problem spreads, the Royal Capital will definitely ask him to give an explanation.

But how did he explain it?

Under the anxiety, Calvin stood up abruptly and said, "Take the gold coins and go to Saint Donas College!"

The credibility of the Mathematical Association and Calvin was trustworthy. The day after the Gaya scholar left, Chen Luo saw the box full of golden coins.

Having learned the lesson from the last time, this time Chen Luo behaved well.

The addition of one variant magic is just the icing on the cake. He can't smash all these gold coins into the magic association, and at least part of it should be kept to support his life.

Teacher Britney's salary is not high, and she can support her by herself.

Isabella was restricted from pocket money by her father, the city owner, because she spent too much money.

The grace of dripping water, when the springs reciprocate, for Isabella's sake, Chen Luo can also support her for a period of time.

These gold coins are enough for the three of them to live the most luxurious life.

Of course, Teacher Britney usually lives frugally, and Chen Luo is not a big spender. In this case, the money can support them for a lifetime.

Calvin hesitated for a long time before looking at Chen Luo and asked carefully, "Mr. Blair, what is going on with that turtle?"

For this question, Chen Luo could not give Calvin an explanation.

Strictly speaking, Zeno's paradox is not a mathematical problem.

Or rather, it's not exactly a math problem.

Mathematically, it can give an answer to this question, but it cannot explain its nature.

The mathematics level of the Divine Grace Continent is too low, and it is too early to give them the concept of the limit.

Chen Luo also does not intend to physically explain ~www.novelbuddy.com~ Although quantum mechanics can explain Zeno's paradox, even if it is quantum mechanics itself, some people doubt its authenticity.

What's more, even classical mechanics has not been established here, and most people will be crazy if they propose the concept of quantum mechanics.

In history, many scientists committed suicide because of this incident.

He didn't give Calvin an answer, firstly because he couldn't give it, and secondly, it was for their own good.

So, Chen Luo looked at Calvin, shrugged helplessly, and said, "I don't know either..."

Calvin stared at him blankly, froze in place for a moment.

Asking questions but not giving answers, what is this? Are the devils digging holes and not filling them?

vertex

Dear, click in and give a good review. The higher the score, the faster the update. It is said that those who give full marks to the new ones have finally found a beautiful wife!

Mobile station new revision upgrade address: , data and bookmarks are synchronized with the computer station, no ads and fresh reading!