MTL - My Senpai Knows Magic-Chapter 107 blair's turtle

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Chen Luo never thought of him as a hero, although people outside call him that.

He helped Lorraine get through it, and it was just a business.

His Majesty the King spent a full 5,000 gold coins for this. Of course, Chen Luo wanted to do things beautifully, so Gaya Scholar, who wanted to run away after pretending to be forced, was forced to stay here for a month by him, polishing everything Sharp.

But these five thousand gold coins are just a reward for keeping those people.

It is not within the scope of the original agreement to further shake the foundation of Gaya's school.

Destroying the foundation of the School of Humanity is tantamount to slapping people in the face, killing people and killing their hearts. This is an endless scene, which Chen Luo usually does not do.

Unless you add money.

Children are always naive, and adults who have a little physical knowledge know that love cannot generate electricity, but gold coins can.

Chen Luo will not expose the old foundation of the Gaya School for the illusory glory of the Loran Kingdom, and the Gaya scholars will never die.

But he can do it for the dream.

His dream is to become the most powerful magician. This great dream needs gold coins to support.

Calvin was not surprised by Chen Luo's words, he thought about it and said, "Your Excellency Blair saved the city of Yapo and saved Loren's honor. On behalf of the Loren Mathematical Association, I will reward Your Excellency Blair with two thousand gold coins. ."

"make a deal."

When he walked out of Saint Donas College, Calvin's expression was still a little dazed.

It wasn't because he felt sorry for the gold coins. Two thousand gold coins were not a small amount for the Yapo City Branch, but if they could turn Roland's defeat into a victory, even multiplying the number of gold coins by ten would be nothing.

What really confused and feared him was Chen Luo's question.

This problem seems to be a mathematical problem, but it is not just a mathematical problem. It involves philosophy, science, and even the nature of time and space...

Calvin could have predicted that the appearance of this problem would have a greater impact on the mathematics community than the appearance of irrational numbers.

Irrational numbers have always existed, it is only due to the negligence of scholars that they have not been discovered until now.

And this problem---will drag countless mathematicians into the abyss of fear, and Gaya, the center of the world's mathematics, will bear the brunt.

Just like the significance of irrational numbers to the Howard family and the number school, this question is mainly aimed at Gaya's school.

As long as Calvin takes that one step forward, the situation of Gaya and Lorraine will be completely reversed.

The trip to Lorraine by the Gaya scholar will become the biggest joke.

But Calvin dared not.

He couldn't predict the consequences of this matter, because this question shook not only the beliefs of the Gaya scholars, but also the scholars of Roland, and even the scholars of the Divine Grace Continent.

Scholars here refer not only to mathematicians, but also to philosophical scholars, scientific scholars…

Calvin returned to the Mathematical Society in a daze, and Audrey handed him a letter resentfully.

This letter was sent from the capital. It said that although the Gaya scholars were blocked in the city of Apo, the Gaya Kingdom was already promoting their visiting scholars sweeping across the mathematics world of the Loran Kingdom.

After all, compared with the small setbacks in the city of Yapo, they achieved a large-scale and overwhelming victory in Loren.

Ignoring this little flaw, Gaya's purpose has actually been achieved.

The small setback in the city of Apollo will not affect the overall victory of Gaya. If there is no accident, the Loren scholars will not be able to lift their heads in front of the Gaya scholars for a long time to come.

Audrey sighed and said with great regret: "If these three problems had arisen earlier, when Gaya had just arrived at Lorraine, they would have been able to stop them... But unfortunately, everything is too late."

"No, it's not too late." A ruthless expression appeared on Calvin's face, and he gritted his teeth: "Since it was Gaya who did it to us first, then------ everyone will go to **** together!"

After the visiting scholar group in Gaya was plagued by those three questions for a whole month, the devil in the mathematics world of the Loren Kingdom had a new move.

After those three questions, there was one more question on the reward wall of the Yapo City Mathematical Association.

This question sounds a bit funny, but the deep meaning contained in the question has caused countless people to think deeply... and even panic.

The first powerhouse of the Gaya Kingdom, the great magister of the wind system, Achilles, how long does it take to catch up with a turtle?

This is the fourth question of Blair the Devil.

Achilles is a well-known powerhouse in the Kingdom of Gaya. He has the realm of a great magus. Almost everyone in the entire Divine Grace Continent knows his name.

Lord Blair's question is described as follows: If there is a tortoise, a distance ahead of the great magister Achilles, how long will it take Achilles to catch up with the tortoise?

This is a simple question that could not be simpler. As long as the speed of the tortoise, the speed of the great magister Achilles, and the distance between the two are given, any mathematician can give the correct answer.

However, Blair the Devil gave them another answer.

No matter how fast the Grand Magister Achilles was, he would never catch up with the turtle.

Because when Achilles catches up to the starting position of the turtle, the tortoise has already moved forward for a certain distance. When Achilles has passed this distance, the tortoise will move forward another distance, and so on. This process can continue indefinitely. Going down, Achilles wants to catch up with the tortoise, then he must reach the starting position of the tortoise, but during this time, the tortoise has already crawled forward for a short distance...

The conclusion is that Achilles, the great magister of the wind system, known for his speed, can never catch up with a slow tortoise.

This conclusion seems very absurd, not to mention the great wind-type magister Achilles, even a three-year-old child can catch up with this turtle and step on its head.

But what they all know, don't the Edwin Prize winners know?

After careful consideration, they discovered the horror of this problem.

The logic of this question is self-consistent.

They can figure out how long it takes Achilles to catch up with the tortoise, but only if they know that Achilles can catch up with the tortoise.

But the problem is, they can't explain how Achilles caught up with the tortoise...

Blair divided the process of Achilles chasing the tortoise into infinite parts, and then the distance between Achilles and the tortoise was infinitely small, and the time required to catch up with this distance was infinitely short.

But even if this period of time is short, it can continue to be divided.

If time and space could be divided like this forever, Achilles would never catch up with the tortoise.

And space and time can be divided infinitely - this is what the Gaya school claims.

The Gaya School believes that time and space can be divided infinitely, which is an important proposition of the Gaya School, and is also the consensus of the mathematical community, the scientific community, and the human beings on the Divine Grace Continent.

To overthrow Blair's conclusion, we must first overthrow the premise that time and space can be divided infinitely, and overthrow the claims of the Gaya School, and rebuild a new world view for Gaya, for Loren, and for all scholars in the Land of Grace.

The continuity of time and space is the consensus of the entire human race. Just imagine, if even it is wrong, then what else is true?

The emergence of this problem made many visiting scholars in Gaya no longer pay attention to the three questions, the problem of Achilles and the turtle, and directly attacked the beliefs of many schools in Gaya. The crisis of ~www.novelbuddy.com~ Obviously, Lord Achilles must be able to catch up with that **** turtle, Devil Blair's conclusion is wrong!

But dare they say Blair is wrong?

They dare not.

If Blair is wrong, the propositions of many Gaya schools are wrong.

This is a paradox!

Tang En looked at the question on the paper, his lips trembled, his face was blue, and he said in a trembling voice, "Devil, he is the real devil!"

[Note: The information in this chapter is quoted from "History of Mathematics Part 1", author: CARL.B.BOYER, translated by Qin Chuanan. 】

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