Determine the following limits.

Question

\lim_{x \to 0} \frac{x^{3} - 5 x^{2}}{x^{2}}

Accepted Answer

Welcome back, everyone. Find the limit. Limit as X approaches 0 of 2 X to the power of 4th plus 3X 2 divided by 5X2d. We're given 4 answer choices. A says 5/3, B. 5 halves C 2/5 and D 35. So let's rewrite the limit limit as x approaches 0 of 2 X to the power of 4th plus 3 x 2 divided by 5 x 2. We're going to begin this problem by direct substitution. In the numerator, if we substitute X equals 0, we're going to get 0 + 0. This gives us 0, and in the denominator 5 multiplied by 0 squared, that's 0 as well. So we have an indeterminate form. Whenever we have an indeterminate form, we want to eliminate a potential whole. So let's try factorization. Let's notice that for the numerator we can factor out X2, which gives us 2x2 + 3 as the remaining factor. And in the denominator we have 5 x squared. We can see that we can now cancel out. The X squared and since we have canceled out a potential whole, let's attempt direct substitution once again in the numerator we are going to get 2 multiplied by 0 squared plus 3 and in the denominator we're going to have 5. Now this is going to be a finite number. 0 + 3 is 3. In the denominator we have 5, and since this is now a finite number, we have successfully evaluated the limit. This is 3/5 which corresponds to the answer choice D. Thank you for watching.

Determine the following limits.

$\lim_{x \to 0} \frac{x^{3} - 5 x^{2}}{x^{2}}$

Key Concepts

Limits

Factoring

Indeterminate Forms

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