In general there the core principle of spaced repetition that you don’t put something into the system that you don’t already understand.
When trying to memorize mathematical results make sure that you only add cards when you really have a mental understanding. Using Anki to avoid forgetting basic operations is great. If you however add a bunch of information that’s complex, you will forget it and waste a lot of time.
That’s true if you’re just using spaced repetition to memorize, although I’d add that it’s still often helpful to overlearn definitions and simple results just past the boundaries of your understanding, along the lines of Prof. Ravi Vakil’s advice for potential students:
Here’s a phenomenon I was surprised to find: you’ll go to talks, and hear various words, whose definitions you’re not so sure about. At some point you’ll be able to make a sentence using those words; you won’t know what the words mean, but you’ll know the sentence is correct. You’ll also be able to ask a question using those words. You still won’t know what the words mean, but you’ll know the question is interesting, and you’ll want to know the answer. Then later on, you’ll learn what the words mean more precisely, and your sense of how they fit together will make that learning much easier. The reason for this phenomenon is that mathematics is so rich and infinite that it is impossible to learn it systematically, and if you wait to master one topic before moving on to the next, you’ll never get anywhere. Instead, you’ll have tendrils of knowledge extending far from your comfort zone. Then you can later backfill from these tendrils, and extend your comfort zone; this is much easier to do than learning “forwards”. (Caution: this backfilling is necessary. There can be a temptation to learn lots of fancy words and to use them in fancy sentences without being able to say precisely what you mean. You should feel free to do that, but you should always feel a pang of guilt when you do.)
The second point I’d make is that the spacing effect (distributed practice) works for complex learning goals as well, although it will help if your practice consists of more than rote recall.
If you learn definitions it’s important to sit down and actually understand the definition. If you write a card before you understand it, that will lead to problems.
In general there the core principle of spaced repetition that you don’t put something into the system that you don’t already understand.
When trying to memorize mathematical results make sure that you only add cards when you really have a mental understanding. Using Anki to avoid forgetting basic operations is great. If you however add a bunch of information that’s complex, you will forget it and waste a lot of time.
That’s true if you’re just using spaced repetition to memorize, although I’d add that it’s still often helpful to overlearn definitions and simple results just past the boundaries of your understanding, along the lines of Prof. Ravi Vakil’s advice for potential students:
The second point I’d make is that the spacing effect (distributed practice) works for complex learning goals as well, although it will help if your practice consists of more than rote recall.
If you learn definitions it’s important to sit down and actually understand the definition. If you write a card before you understand it, that will lead to problems.
Yeah, I’m wary of that fact and I’ve learned the downsides of it through experience :)