Use the precise definition of infinite limits to prove the fol...

Question

Use the precise definition of infinite limits to prove the following limits.

$\lim_{x \to - 1} \frac{1}{{(x + 1)}^{4}} = \infty$

Accepted Answer

Welcome back, everyone. Consider the function FFX equals 3 divided by X + 3 rates to the 4th. Use the precise definition of infinite limits to prove that the limit of FF X as X approaches -3 equals infinity. Now, how are we going to use the precise definition of infinite limits to prove that limit for FFXX approaches -3? What is this precise definition? Well, recall that given the limit of FF X. As x approaches a. To be equal to infinity. Then if for every n greater than 0, where n is an arbitrarily large positive number. There exists, OK. A valued delta which is greater than 0, where delta is a measure of how close X needs to be to a without being equal to A for FX to exceed any arbitrarily large value n. Then there exists a value delta greater than 0, such that for all X, OK, for all X, if 0 is less than the absolute value of X minus A, which is less than delta, then F of X, OK. Is going to be greater than N OK. Now, by the precise definition of infinite limits, if we can apply this definition to the given function that we have, OK, then we should be able to use it to prove that the limit of FFX as X approaches -3 is equal to infinity by setting a value for a delta in terms of N. So let's go ahead and try to do that. So by applying the definition. Then this tells us that for every n greater than 0, OK, there exists. There exists a value of delta greater than 0 such that. If 0, oops let me clean this up right here, such that if 0 is less than the absolute value of X minus -3 in this case, A would be -3, so that would be X + 3. So it's the absolute value of X + 3 is less than delta, then. Our function 3 divided by X + 3 rays to the 4th is going to be greater than N. Now let's solve the inequality to try to get delta in terms of N, OK? No, by solving the inequality. And remember, we know that the absolute value of X + 3 is less than delta, so at some point we want to show what the absolute value of X 3 is in this inequality. Then if 3 divided by X + 3 rates to the 4th is greater than N, then that means X + 3 races to the 4th is going to be less than 3 divided by N. OK. Now if we take the 4th root of both sides, then we'll get the absolute value of X plus 3 to be equal to be less than the 4th root of 3 divided by N. Now remember, we know that the absolute value of X + 3 is less than delta. OK, so if we let then. Oops, let me fix this here. If we let delta be equal to the 4th root of 3 divided by n to satisfy the condition for every n greater than 0, then. We can let Delta. Be equal to the 4th root of 3 divided by N. This is the value that we need such that if 0 is less than the absolute value of X + 3, which is less than delta. Then FF X. Which is equal to 3 divided by X + 3 to 4th is going to be greater than N. Thus, this is, we've shown by the precise definition of infinite limits that the limit of F of X as X approach is -3 equals infinity. So once we let delta be equal to the 4th root of 3 divided by N. Thanks a lot for watching everyone. I hope this video helped.

Use the precise definition of infinite limits to prove the following limits.

$\lim_{x \to - 1} \frac{1}{{(x + 1)}^{4}} = \infty$

Key Concepts

Infinite Limits

Limit Definition

Polynomial Behavior Near Roots

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