# Indeterminate: the hidden power of 0 divided by 0 | Summary and Q&A

1.6M views
December 2, 2016
by
Mathologer
Indeterminate: the hidden power of 0 divided by 0

## TL;DR

0/0 is an indeterminate form in calculus that requires context and specific conditions to be defined.

## Key Insights

• 🥺 Dividing by 0 leads to incorrect solutions due to the lack of any number that satisfies the equation.
• 👻 The concept of 0/0, while troublesome in its ambiguity, allows for the development of calculus and advanced mathematical concepts.
• 😒 Calculus uses the concept of limits to approach 0/0 and determine precise values for derivatives.

## Transcript

Welcome to another Mathologer video. Today i'll talk about these crazy expressions here. Now in school they tell you that if you don't stay away from these eternal damnation awaits. And that's actually a pretty good rule to pass on to the masses to prevent them from suiciding but if you actually stop there a lot of modern mathematics is not possibl... Read More

### Q: Why are we told to avoid dividing by 0 in mathematics?

Dividing by 0 leads to unsolvable equations because no number can satisfy the equation, resulting in incorrect solutions.

### Q: How does calculus utilize the concept of 0/0?

In calculus, by approaching 0/0 under specific contexts, such as finding the derivative of a function, a precise value can be determined through the concept of limits.

### Q: Can 0/0 be equal to any specific number?

No, 0/0 is an indeterminate form, meaning that without proper context, it is not possible to determine a specific value for it.

### Q: Can we treat infinity as a number in calculus?

In higher levels of calculus, infinity can be treated as a number and equations like 3/0 = infinity are used to represent certain mathematical concepts within specific contexts.

## Summary & Key Takeaways

• Dividing 3 by 0 is not possible because no number satisfies the equation and it results in an incorrect solution.

• The concept of 0/0 brings up different problems as every number satisfies the equation, creating ambiguity.

• Calculus utilizes the context of approaching 0/0 to determine derivatives, allowing for the development of advanced mathematical concepts.