The truly correct proof is one that strikes a harmonious balance between strength and flexibility. There are plenty of proofs that are technically correct but are messy and inelegant or counterintuitive. But it's not something you can put into words - explaining why a formula is beautiful is like trying to explain why the stars are beautiful.
Yoko OgawaSolving a problem for which you know thereโs an answer is like climbing a mountain with a guide, along a trail someone else has laid. In mathematics, the truth is somewhere out there in a place no one knows, beyond all the beaten paths. And itโs not always at the top of the mountain. It might be in a crack on the smoothest cliff or somewhere deep in the valley.
Yoko Ogawa