What sorts of algorithms would be used to do this (as in, this is a string, and I want to find the answer):
((5 + (3 + (7 * 2)))  (8 * 9)) / 72
Say someone wrote that in, how could I deal with so many nested parenthesis?

You can use Shunting yard algorithm or Reverse Polish Notation, both of them are using stacks to handle this, wiki said it better than me. From wiki,



James has provided a good answer. Wikipedia has a good article on this as well. If (and I don't recommend this) you wanted to parse that expression directly, given that it seems orderly in that every set of parens has no more than one pair of operands, I think you could approach it like this: parse to the first ")". Then parse back to the previous "(". Evaluate what's inside and replace the whole set with a value. Then repeat recursively until you are done. So in this example, you would first parse "(7 * 2)" and replace it with 14. Then you would get (3 + 14) and replace it with 17. And so on. You can do that with Regex or even .IndexOf and .Substring. I'm going without benefit of checking my syntax here, but something like this:
You'll need to evaluate the resulting expression and loop this until the parens are exhausted and then evaluate that last part of the string. 


Or you can just do this in one line in R:



Yes the algorithm is Shunting yard algorithm but if you want to implement I suggest you python and it's compiler package
You can also evaluate this expression with builtin eval() method



I would use the tools that are available nearly everywhere. So, using lex(flex)/yacc(bison) I would do: e.l
e.y
Build
The above also handles normal operator precedence rules:



What? Nooooo. Unless this is a homework assignment, do not write a parser. There are a hundred parsers out there and they all have one advantage over all the suggestions here: they're already out there. You don't have to write them. 


If the expressions are known to be fullyparenthesized (that is, all possible parentheses are there), then this can easily be done using recursivedescent parsing. Essentially, each expression is either of the form
or of the form
These two cases can be distinguished by their first token, and so a simple recursive descent suffices. I've actually seen this exact problem given out as a way of testing recursive thinking in introductory programming classes. If you don't necessarily have this guarantee, then some form of precedence parsing might be a good idea. Many of the other answers to this question discuss various flavors of algorithms for doing this. 


You could use either a state machine parser (yacc LALR, etc.), or a recursive descent parser. The parser could emit RPN tokens to evaluate or compile later. Or, in an immediate interpreter implementation, a recursive descent parser could calculate subexpressions on the fly as it returns from the leaf tokens, and end up with the result. 


First convert the expression into prefix or postfix form. Then its very easy to evaluate! Example: 


The easiest way to solve this is to implement the Shunting Yard algorithm to convert the expression from infix notation to postfix notation. It's EasywithacapitalE to evaluate a postfix expression. The Shunting Yard algorithm can be implemented in under 30 lines of code. You'll also need to tokenize the input (convert the character string into a sequence of operands, operators, and punctuators), but writing a simple state machine to do that is straightforward. 

