Determine the following limits.

lim x→∞...

Question

Determine the following limits.

lim x→∞ sin x / e^x

Accepted Answer

Welcome back, everyone. Evaluate the limit as x approaches infinity of the function F of X equals sin 5 x divided by each the power of 5 X, and were given for answer choices A says 0, B5, C5, and D does not exist. So let's write the limit limit as X approaches infinity of F of X, which is sin. Of 5 X. Divided by E to the power of 5 X. Now, for this problem, we simply want to understand what's happening. Well, X is approaching infinity. Let's visualize the graph of the first function of our rational expression, and that first function is sin 5x. As X gets larger and larger, sine simply oscillates, right? We know that it is an odd function. It basically keeps oscillating between -1 and 1. So S X. Keeps increasing signs simply oscillates between -1 and 1. But now, if we visualize. The graph of. It's the power of 5 x while it is an exponential function which keeps increasing infinitely right so basically. When we Try to Visualize this rational function, the numerator keeps oscillating between two finite numbers, -1 and 1. On average, that's pretty much 0, right? And in the denominator, each the power of 5 X is approaching infinity, as X is approaching infinity. So we get a number, a finite number, let's call it F. That number is going to be between -1 and 1 divided by infinity. And we know that whenever we divide a number by infinity, such a limit is going to be equal to 0, right? And therefore, the final answer to this problem corresponds to the answer choice A. Thank you for watching.

Determine the following limits.

lim x→∞ sin x / e^x

Key Concepts

Limits at Infinity

Behavior of Sinusoidal Functions

Exponential Growth

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