问题
To do mathematics is to engage in a dialogue with the universe, seeking answers to questions we may not even know how to ask yet.
A mathematician's work is never done; there are always new questions to explore and new mysteries to uncover.
The interplay between discrete and continuous mathematics is where some of the most interesting problems lie.
The Erdős discrepancy problem fascinated me because it was so simple to state yet so deep in its implications.
Persistence is key in mathematical research; many great results come from looking at the same problem from different angles over and over again.
In mathematics, the art of proposing a question must be held of higher value than solving it.
In mathematics, the art of proposing a question must be held of higher value than solving it.
The goal of mathematics is not to solve problems, but to understand them.
A mathematician's work is never done; there are always new questions to ask and new mysteries to solve.
The power of mathematics comes from its ability to abstract and generalize, turning specific problems into universal truths.
A mathematician's work is never done; there are always more problems to solve.
The essence of mathematics is not just in solving problems but in asking the right questions.
Sometimes the simplest questions lead to the deepest theories.
The most elegant proofs are those that reveal the heart of the problem with clarity.
Every problem in mathematics has a solution; it's just a matter of finding the right path.
The most important thing in mathematics is to ask the right questions.
The progress of mathematics is measured by the number of problems it can solve.
The true value of a mathematician lies in the problems they leave behind.
The most important skill in mathematics is the ability to ask the right questions.
I have always preferred working on concrete problems rather than abstract theories.