Determine the following limits.

b.

Question

Determine the following limits.b.

\lim_{x \to 3} \frac{x - 3}{x^{4} - 9 x^{2}}

Accepted Answer

Welcome back, everyone. Find the limit. Limit as X approaches 4 of 2 X minus 8 divided by X cubed minus 16 X. And we're given 4 answer choices A 1 divided by 32, B 1 divided by 16, C 1 divided by 64, and D 1 divided by 4. So let's analyze the given limit. It says limit as x approaches 4 of 2 X minus 8. Divided by X cubed minus 16 X. If we try the direct substitution, well, we're going to get 0 in the numerator, right? X equals 4, to multiply it by 4 minus 8 gives us 0, and in the denominator, 4 cubed minus 16 multiplied by 4, this gives us 0 as well. And this is an indeterminate form, so we can simply perform factorization for the numerator and the denominator. For the numerator we can factor out 2, and this leaves us with x minus 4. For the denominator, we have X cubed minus 16 X. So first of all, we can factor out X, which leaves us with X2 minus 16. And from here we can apply the formula for the difference of two squares. Because we have X2 minus 42 in the denominator. So this gives us 2 multiplied by X minus 4 in the numerator, and in the denominator we get X multiplied by X minus 4, multiplied by X + 4 based on the formula. And from here we can see that we have a hole. We can cancel out the common factor X minus 4 on both sides of the given fraction. And the limit becomes limit as X approaches 4 of 2 divided by X multiplied by X plus 4. And once again, let's apply the direct substitution, which gives us 2 divided by 4 multiplied by 4 + 4. Simplifying the result, we get 2 divided by. 4 multiplied by 8, which is 32. And now simplifying, this is 1 divided by 16. Therefore, the correct answer to this problem corresponds to the answer choice B. Thank you for watching.

Determine the following limits.

b. $\lim_{x \to 3} \frac{x - 3}{x^{4} - 9 x^{2}}$

Key Concepts

Limits

Factoring Polynomials

Indeterminate Forms

Watch next