What would happen if you carried out a division problem with a zero but you continued the promlem so it would otherwise be solvable?

That depends if you can rearrange the problem to accommodate the undefined result (like how we carry around "i", for the square root of -1) and resolve it later...or work around the issue. For example in the Taylor series, the derivative shows that you can actually solve the problem when you're technically /0 ... it's continuous and 'bad' terms cancel. http://math.stackexchange.com/questions/792664/taylor-series-of-a-division-by-zero-equation This isn't really basic math though (notice how 0- and 0+ are distinct); if a test asked about this it's probably not looking for a clever answer--it's looking for: "that's undefined".

Following the order of operations, it at any time an attempt to divide by zero occurs, it will cause an error.