Similar to What do Algebra and Calculus mean?, what is the difference between a logic and a calculus?
I am learning about the different kinds of logics, and often when I look them up in a different resource, some people call it a logic, others call it a calculus (propositional calculus and propositional logic). Or some calculus is defined as a logical system, like the situation calculus:
The situation calculus is a logic formalism designed for representing and reasoning about dynamical domains.
When do you call something a calculus vs. a logic?
It seems that the definitions of "a logic" and "a calculus" are often circular. A logic is a calculus, and a calculus is a logic. Or a calculus is rules for calculating, while a logic is rules for inference. But in this sense, they're both systems of rules, so maybe they are both just generally "formal systems", and when focusing on inference it's a "logic", and when focusing on calculation it's a "calculus"?
The short answer is, after a few more months of letting this sit, is that in reality there is no difference between algebra, logic, and calculus. They are all just saying "a formal collection of mathematical rules". But each of these words have a history, and so when authors use them, they are mentally invoking that history of the word. Because these words were used in the development of different ideas, the logic/calculus/algebra typically prioritize different ideas.
It is like saying "what is the difference between book and tome"? They both are the exact same thing, you are just highlighting different aspects of it by invoking mental imagery. In the algebra/logic/calculus case, the mental imagery is the history of it's use.