https://www.themathdoctors.org › zero-divided-by-zero-undefined-and-indeterminate

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. Let's look at some examples from each of these different contexts.

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http://5010.mathed.usu.edu › Fall2018 › LPierson › indeterminateandundefined.html

The big difference between undefined and indeterminate is the relationship between zero and infinity. When something is undefined, this means that there are no solutions. However, when something in indeterminate, this means that there are infinitely many solutions to the question.

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We will use a calculator to construct a table of values that will help us determine the limit of a function. We will also see the indeterminate forms 0/0 and 1^inf and discuss the difference...

https://www.reddit.com › ... › comments › qlnxlg › whats_the_difference_between_undefined_and

We use the word "indeterminate" to describe certain types of limit problems. If you have the *constant* 0 divided by the *constant* 0, then that's just undefined and there isn't much to say.

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Undefined vs Indeterminate in Mathematics. In mathematics, term undefined may characterize an object in two circumstances: a pedestrian situation in which an object has not been defined - perhaps, as yet; and a situation in which an object can't in principle be defined meaningfully.

https://math.stackexchange.com › questions › 1401901 › the-difference-between-indeterminate...

When your prof says that $\infty + \infty$ is undefined, what he means is this: If $\lim_{x\to a} f(x) = \infty$ and $\lim_{x\to a} g(x) = \infty$, then $\lim_{x\to a} (f(x) + g(x))$ does not exist (that is, is undefined). In this case, we can be a little more precise and say $\lim_{x\to a} (f(x) + g(x))=\infty$. The very fast and ...

https://www.reddit.com › ... › comments › pgbao0 › whats_the_difference_between_dne_and_undefined

Traditionally, “undefined” is reserved for algebraic expressions when they do not have a value for a given set of values for certain variables (e.g., when a division by zero occurs), whereas “does not exist” is reserved for limits.

http://www.cwladis.com › math301 › indeterminateforms.php

Finding Limits Algebraically: Determinate and Indeterminate Forms. By the end of this lecture, you should be able to recognize which undefined expressions are determinate and which are indeterminate, and you should be able to use this knowledge to solve limit problems by rewriting them algebraically until you obtain a determinate form. In ...