As someone with a Ph.D. in math, I tend to think verbally in as much as I have words attached to the concepts I’m thinking about, but I never go so far as to internally vocalize the steps of the logic I’m following until I’m at the point of actually writing something down.
I think there is another much stronger distinction in mathematical thinking, which is formal vs. informal. This isn’t the same distinction as verbal vs. nonverbal, for instance, formal thinking can involve manipulation of symbols and equations in addition to definitions and theorems, and I often do informal thinking by coming up with pretty explicitly verbal stories for what a theorem or definition means (though pictures are helpful too).
I personally lean heavily towards informal thinking, and I’d say that trying to come up with a story or picture for what each theorem or definition means as you are reading will help you a lot. This can be very hard sometimes. If you open a book or paper and aren’t able to get anywhere when you try do this to the first chapter, it’s a good sign that you are reading something too difficult for your current understanding of that particular field. At a high level of mastery of a particular subject, you can turn informal thinking into proofs and theorems, but the first step is to be able to create stories and pictures out of the theorems, proofs, and definitions you are reading.
As someone with a Ph.D. in math, I tend to think verbally in as much as I have words attached to the concepts I’m thinking about, but I never go so far as to internally vocalize the steps of the logic I’m following until I’m at the point of actually writing something down.
I think there is another much stronger distinction in mathematical thinking, which is formal vs. informal. This isn’t the same distinction as verbal vs. nonverbal, for instance, formal thinking can involve manipulation of symbols and equations in addition to definitions and theorems, and I often do informal thinking by coming up with pretty explicitly verbal stories for what a theorem or definition means (though pictures are helpful too).
I personally lean heavily towards informal thinking, and I’d say that trying to come up with a story or picture for what each theorem or definition means as you are reading will help you a lot. This can be very hard sometimes. If you open a book or paper and aren’t able to get anywhere when you try do this to the first chapter, it’s a good sign that you are reading something too difficult for your current understanding of that particular field. At a high level of mastery of a particular subject, you can turn informal thinking into proofs and theorems, but the first step is to be able to create stories and pictures out of the theorems, proofs, and definitions you are reading.