Determine the following limits.
lim x→∞ (3 tan^{-1

Question

Determine the following limits.

lim x→∞ (3 tan^-1x + 2)

Accepted Answer

Welcome back, everyone. Evaluate the limit. Limit as X approaches infinity of 7 multiplied by the inverse of 10 X minus 3, and were given for answer choices A 7 pi divided by 2 + 3 B 2 divided by 7 minus 3, C pi divided by 7 + 3, and D 75 divided by 2 minus 3. So let's rewrite the limit. Limit as X approaches infinity, and we're given 7 multiplied by the inverse of 10 X. -3. And now we can rewrite this as a difference of two limits based on the properties of limits. The first one becomes Lim SX approaches infinity. We can factor out the 7 rights. We get 7 multiplied by limit as X approaches infinity of inverse of 10 X. And then we are subtracting limit. As x approaches infinity of 3. Now let's analyze each limit. First of all, we have limit as x approaches infinity of inverse of 10 X. If we recall. The graph of inverse of 10 X. As X approaches infinity. The inverse of 10 approaches pi divided by 2. So this is the first result that we're going to use. And now for the second limit, since it's independent of X, we're going to say that this limit is equal to 3, right, because we're taking the limit of a constant. So now let's substitute the known values. We're going to get 7 multiplied by. Now our limit of the inverse of 10 is going to be equal to pi divided by 2. And then we are subtracting 3. So now simplifying the result, we're going to get 75 divided by 2 minus 3. And if we look at the answer choices, we can see that the correct answer choice corresponds to the answer choice D. Thank you for watching.

Determine the following limits.
lim x→∞ (3 tan^-1x + 2)

Key Concepts

Limits at Infinity

Inverse Tangent Function

Constant Addition in Limits

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