0 0 indeterminate why

That's because it doesn't matter. You can pick a equal to anything you want. If you have 0 dollars, and 3 friends, and you distribute those 0 dollars you're feeling generous Clearly, they would each get 0 dollars! If you have 3 dollars and 0 friends, and you Now here's the kicker: What if you have 0 dollars and 0 friends? If you distribute those 0 dollars equally amongst your 0 friends, how much does each of those nonexistent friends get?

Do you see that this question makes no sense either? How could that be? Where would that dollar have come from? Stand your ground, Peter Any number? Or a detour sign? I have not yet seen any proof that this theory cannot work, so as of now I think it is valid. I hope my writing has made sense. If you can think of a way to tear down this theory, I am anxious to hear it.

This causes big problems for math, as he said. Your response is that this isn't what you meant. It says in effect, "The road ahead is washed out. The town beyond it is still there, but you'll have to find another way to reach it. There may be a solution, but you must determine it some other way. For a similar discussion, see: Division by Zero: Indeterminate or Undefined? In other words, can an expression be considered both an indeterminate form AND undefined?

Of course it could be neither -- but is it only ever one or the other? Or are they just indeterminate? Doctor Vogler replied: The phrase "indeterminate form" is used in the context of limits, whereas "undefined" refers to evaluating functions, and "no solution" refers to solving equations or similar problems.

Is this a reasonable or naive thought process? It seems too simple to be true. However, as algebraic expressions, neither is defined. Sign up to join this community. The best answers are voted up and rise to the top.

Stack Overflow for Teams — Collaborate and share knowledge with a private group. Create a free Team What is Teams? Learn more. Asked 2 years ago. Active 2 years ago. In analysis, 0 0 is an indeterminate form. This is not the same thing as saying 0 0 is undefined.

Not every indeterminate form has a limit. Finding the limit of an indeterminate form if it exists is often based on replacing a given function by a different function that has the same limit but is. Consideriamo f x e g x tali che: 0 lim 0 x x f x 0 lim 0 x x g x da cui evidentemente: 0. Examples with detailed solutions on how to deal with indeterminate forms of limits in calculus. Zero to the power of zero, denoted by 0 0, is a mathematical expression with no agreed-upon value.

The most common possibilities are 1 or leaving the expression undefined, with justifications existing for each, depending on context. We have more work to do. Step 2 Since the function is rational, try factoring to find any common factors. Step 1: Take the limit of the function to make sure you have an indeterminate form.