These challenges are like meticulously designed puzzles, each radiating wisdom and pushing the limits of the thinking of passersby.
Li Yi stopped in his tracks, his gaze sweeping over the questions, a smile unconsciously creeping onto his lips.
In the past, he wouldn't even understand the questions.
But now, he has used 1 enhancement point to enhance his math skills to mastery.
Those mathematical problems that he couldn't understand before now seem very simple to him.
He began to examine the first question carefully.
This problem involves advanced number theory and requires ingenious construction and proof. Li Yi's mind raced, his fingers unconsciously gesturing in the air, as if conducting a silent deduction.
Half a minute later, a glint flashed in his eyes as he found the key to solving the problem.
He picked up the chalk next to him and was about to start solving the problem when he heard a soft footstep nearby.
Li Yi looked up and saw a young man dressed in a simple T-shirt and jeans standing not far away, holding a math notebook in his hand, staring at him with an indescribable focused gaze.
"Are you here to solve these problems?" The young man broke the silence first, his voice carrying a hint of barely perceptible excitement.
Li Yi smiled slightly and nodded, "I guess so. These questions are quite interesting."
Upon hearing this, the young man's eyes flashed with shock. He said, "Hello, my name is Lin Hao. I am a graduate student in the Department of Mathematics. I have been pondering these problems for two years and I only have some clues. But I feel that I am still far from solving them."
Li Yi: "Huh? Really? I don't think it's too difficult."
Lin Hao: "??????????"
Seeing that Li Yi didn't seem to be joking, Lin Hao said, "It seems you're quite the expert as well. If you don't mind, we can discuss it together?"
Li Yi: "These questions aren't too difficult, there's not much to discuss, right?"
"Huh???" Lin Hao was stunned and asked, "You think these questions aren't difficult?"
Li Yi nodded and said, "Yes, isn't it simple?"
Lin Hao was speechless.
At that moment, several other classmates passed by and overheard Li Yi's words.
They stopped and chuckled, "This student is quite the braggart."
"Exactly, these questions aren't difficult?"
"If you think it's not difficult, then solve the problem!"
Li Yi shook his head and said, "Alright, I'll start solving the problem now."
Li Yi thought to himself, "You guys are supposed to be top students from Tsinghua University, and all you can do is solve a few math problems?"
What are the difficulties?
Let me explain.
Li Yi picked up the chalk and began to answer the questions.
Lin Hao and the others were also very curious. Could this person really answer the question?
They stood around watching.
Li Yi was in a hurry; he wanted to finish writing as soon as possible so he could visit other colleges at Tsinghua University.
Li Yi held the chalk and wrote very quickly, seemingly without thinking, as he wrote down the solutions to these problems stroke by stroke.
Soon, the problem was solved.
Lin Hao was shocked!
The students watching were all stunned!
"Wow, he actually finished a problem?"
"He's finished writing it, but who knows if it's right or wrong? Maybe he just wrote it randomly?"
"Exactly, didn't you see how fast he wrote down the solution? He didn't even think about it much, it's no wonder it's correct."
No one took it seriously.
Li Yi continued writing the answer to the second question.
He quickly finished answering the second question as well.
This caused quite a stir among the crowd.
They were all astonished and began to discuss it loudly.
Li Yi was speechless. It was just answering a question, why make such a fuss?
Little did he know that these problems were not simple math problems, but rather the nine unsolved mathematical problems in the world today!
These nine unsolved problems cover multiple areas of mathematics, including number theory, algebraic geometry, topology, and the intersection of physics and mathematics. They are:
Goldbach's Conjecture: This is an old and famous problem in number theory that states that any even number greater than 2 can be written as the sum of two prime numbers.
Hodge conjecture: This is an unsolved problem in algebraic geometry that involves the relationship between a specific algebraic cycle and the corresponding geometric objects.
Poincaré conjecture: This is a topological problem concerning three-dimensional manifolds, which states that any simply connected, compact three-dimensional manifold is homeomorphic to a three-dimensional sphere.
The Riemann Hypothesis: This is a famous problem in number theory that concerns the distribution of the nontrivial zeros of the Riemann zeta function, and it has not yet been proven.
Yang-Mills Existence and Mass Gap: This is an important problem in physics and mathematics, involving fundamental properties of gauge field theory, which have yet to be satisfactorily proven mathematically.
Navier-Stokes Existence and Smoothness: This is a fundamental problem in fluid dynamics and remains an important unsolved problem in mathematics.
P to NP problem: This is a fundamental problem in computer science and mathematics that has not yet been fully solved.
Fermat's Last Theorem: This theorem states that for any integer n greater than 2, there do not exist any integers a, b, or c greater than 1 such that an = bn + cn holds. However, please note that this statement is not the original formulation of Fermat's Last Theorem, which is a famous theorem concerning prime powers.
The Birch and Swinnetton-Dale conjecture is a problem in algebraic geometry concerning the relationship between modular forms and elliptic curves, which has not yet been fully proven.
The nine unsolved problems are problems that the world's mathematical community has been unable to solve for many years.
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