Plus, if someone can solve these seven math problems more, they can get an extra $10,000 in gold.
Yu established the same title as the one that won the Millennium Prize 200 years after the turn of the millennium.
The Thousand-Year-Old Problem is actually the same mathematical problem of seven subjects. It’s just that the West has one hundred cubic dollars, so it attracted everyone’s attention
Guan Zuo's research is not only a step to Xiaojin, but the research implications are much more meaningful.
That’s why mathematicians are so concerned about it, which makes countless outstanding mathematicians want to solve this same problem.
If you only have a lot of money and a high living standard, then mathematicians won’t be able to spend so much time doing research.
The whole set of problems is about the basic theory of mathematics, such as solving the same problem.
People will have a great development in Numerical Theory 2, and can apply mathematical theory in a better way.
The two numerical questions are: P are exactly the same question. A strange conjecture. Add to guesswork. Can't stand it. Mills Field
Numerical solution to the square. The sick Wei Er shape can be equationed with the same title BSD.
The above problem is thousands of years old. For every shape of this problem, if someone can solve it more than once, it will be equivalent to the one million dollar gold calculated by the Dodg Institute of Mathematics. It is not Re-commissioned, obtained from solving problems
It's very late. What all numerologists are most concerned about is that as long as any one of these seven problems is solved, what will follow
There will definitely be no shortage of various honors, and he will even leave his name on the entire history of mathematics.
Such honors are the key to attracting the efforts of mathematicians. The million-dollar prize is just an incidental thing.
Just like Jiang Cheng was not interested in the pitiful bonus at all, but he still wanted to study this issue.
So many years have passed since the Millennium Prize problem was raised, but only one problem has been solved.
Perelman solved the problem of Poincare Conjecture in 2003.
There are still six puzzles left there, waiting for the mathematician to solve them.
"This problem is very interesting. Needless to say, the results behind it are very interesting. The Millennium Prize problem is very interesting to me. Let me study these problems next."
Jiang Cheng thought for a moment and then interrupted Lucy so that she didn't need to continue.
He has now made a decision, and will focus on the Millennium Prize problem in the next time to see if he can solve these mathematical problems.
The Qian Nian Award question really meets Jiang Cheng's requirements, and it is not unusually difficult and challenging.
Moreover, studying mathematical problems usually takes a lot of time, which is in line with his desire to kill time.
The most important thing is that it is very meaningful to study the millennium grand prize problem, and the millennium grand prize problem is very important to the entire human civilization.
As long as Jiang Cheng can solve the Millennium Prize problem, he will be able to greatly advance the process of human civilization.
The Millennium Prize problem is about mathematics. It is the mathematical problem that mankind needs to solve most now, and mathematics is a very important subject.
You must know that mathematics is called the queen of science. From this point, we can see the importance of mathematics.
Mathematics is the foundation of all natural sciences. Without mathematics, other sciences cannot develop at all.
If human mathematics can improve, other subjects can also benefit a lot.
Countless great theories require mathematical support. This is something that has been proven many times.
Mathematics is so important to a civilization, so Jiang Cheng chose the Millennium Prize problem as the main direction of his next research.
Okay, now that the master has made a decision, I will record the other results for the time being. If the master needs it, you can ask me at any time. Lucy said to Jiang Cheng.
Well, I'll ask you for a few other results if I need to.
Jiang Cheng replied to Lucy casually and then fell into deep thought.
Jiang Cheng didn't particularly care about Lucy's words, because the Millennium Prize issue was enough for him to study for a while.
As long as these few months pass, the Future Mars probe will arrive on Mars.
By then Jiang Cheng will be busy building a Mars base and will have no time to worry about other things.
Jiang Cheng finally no longer needs to continue to be decadent, because he has found his next goal.
These mathematical problems are enough for Jiang Cheng to pass the time. After the Future Mars probe returns the data from Mars, Jiang Cheng can continue to develop related technologies for the Mars base.
This arrangement is just right for Jiang Cheng. He won't feel bored because he has nothing to do, nor will he be too busy to care about the woman accompanying him.
After Jiang Cheng determined his goal, he quickly began to focus on the difficult mathematical problems.
Jiang Cheng had always lived a very leisurely life before, and he had already relaxed.
Now Jiang Cheng has to tighten up his god level, so that he can be in a better state to carry out scientific research work.
Jiang Cheng finally had something to do this time, and he wanted to live a good life in scientific research.
But before studying those mathematical problems, Jiang Cheng must first set a research goal.
There are still six thousand-year problems that have not been solved. Let’s first study which one Jiang Cheng should choose now.
These mathematical problems all involve different fields, and the ideas for solving them are also very different. It is simply impossible to study these six problems at the same time.
Because these problems are very different, each mathematical problem requires a different way of thinking.
Therefore, Jiang Cheng must now choose a mathematical problem and study it in one direction, and then he can be distracted and consider other problems.
Jiang Cheng was really stumped as to which mathematical problem to choose. These problems were all of similar importance, and they were all difficult problems that could promote the development of mathematics as long as they were solved.
Since they were all of similar importance, Jiang Cheng didn't know which issue to start with first.
However, this issue did not bother Jiang Cheng for too long, and soon Jiang Cheng had his own choice.
If these six mathematical problems were all of similar importance, Jiang Cheng decided to choose the most difficult one first.
This choice is quite strange. When faced with this choice, most people will choose the simplest one first.
Doing this can maximize the probability of success, and then slowly increase the difficulty of the challenge.
Unfortunately, Jiang Cheng is not an ordinary person, so he will only choose the most difficult one to do first.
Jiang Cheng always likes to solve the most difficult problems first. Such challenges are more exciting for him, which can be regarded as one of his personal preferences.
If these six mathematical problems are ranked in terms of difficulty, the most difficult problem is the Riemann hypothesis.
(End of chapter)