Chapter 484 (1/2)

Ye Su doesn't have to be decadent now because he has found his next goal.

These mathematical problems are enough for Yesu to pass the time. When the data is sent back by the future Mars probe, Yesu can continue to develop relevant technologies for the Mars base.

Such an arrangement is just right for Ye Su. She will not feel bored because she has nothing to do, nor will she be too busy to attend to the women who accompany her.

After Ye Su determined his goal, he soon began to focus on the difficult mathematical problems.

Before Ye Su had been living a very leisurely life, the whole person had already relaxed.

Now ye Su is going to tighten up her divine level, so that she can have a better state to carry out scientific research.

This time, Ye Su finally has something to do. He should have a good addiction to scientific research.

However, Ye Su had to set a research goal before studying those mathematical problems.

However, there are still six unsolved Millennium problems. Let's first study which one Ye Su should choose now.

It is impossible to study these six problems at the same time.

Because these problems are very different, each mathematical problem needs different ways of thinking.

Therefore, Ye Su must first choose a mathematical problem and concentrate on the research in one direction before he can be distracted to consider other problems.

As long as Su is able to solve a few difficult problems in mathematics, it will be difficult for him to solve them.

Since the importance is almost the same, Ye Su doesn't know which problem to start with.

However, this problem did not let Ye Su tangle for too long, and soon she had her own choice.

If the importance of these six mathematical problems are almost the same, Ye Su decided to choose the most difficult one first.

This is a wonderful choice. Most people will choose the simplest one to do first.

This maximizes the probability of success, and then slowly increases the difficulty of the challenge.

Unfortunately, Ye Su is not an ordinary person, so he only chooses the most difficult one to do first.

Ye Su always likes to solve the most difficult problems first. Such challenges are more exciting for him, which is also a kind of personal preference of him.

If these six mathematical problems are ranked in terms of difficulty, the most difficult problem is Riemann hypothesis.

Therefore, Ye Su's final choice is to solve and prove the Riemann hypothesis.

Riemann hypothesis is a hypothesis put forward by mathematician Riemann in 1859, which is about prime number.

There are special numbers in natural numbers that cannot be expressed as the product of two smaller numbers.

That is to say, such a number cannot be obtained by multiplying two numbers, which is called prime number.