Determine the following limits.
lim x→∞ (3x^12...

Question

Determine the following limits.

lim x→∞ (3x¹² − 9x⁷)

Accepted Answer

Welcome back, everyone. In this problem, we want to find the limit as x approaches infinity of 15 X 11th minus 30 X 9th. A says it's infinity, B negative infinity, C 0, and the D says it's negative 15. Now what do we know about our polynomial function here that can help us to figure out the limit at infinity? Well, the limit of the polynomial function is determined by the behavior of the leading term. In this case, it is 15 x 11th, so the limit as X approaches infinity of this expression is really going to be equal to the limit as x approaches infinity of 15 x 11th. We can break out our constant here to leave this as 15 multiplied by the limit as x approaches infinity of X to the 11th. So now, to solve, we just need to figure out what that limit is for X 11th. How can we solve? Well, recall, OK, that for a positive integer N. OK, a positive integer N. And a polynomial, OK. And a polynomial P of X, OK. Where PF X is in the form A and X to the N plus A and minus 1. Multiplied by x to the n minus 1 plus all the way down to a 2x2 plus a 1 X plus a 0. OK, where a n is not equal to 0. Then according to the theorem for limits at infinity of powers and polynomials, then the limit as X approaches infinity. Of X to the N equals infinity, OK, when N is odd. Now this applies to our problem here because for x 11thn would be equal to 11 thus n is odd. And since 11 is odd, that must mean then that this limit is going to be equal to infinity. Therefore, our limit is infinity. A is the correct answer. Thanks a lot for watching everyone. I hope this video helped.

Determine the following limits.
lim x→∞ (3x¹² − 9x⁷)

Key Concepts

Limits at Infinity

Polynomial Functions

Dominant Term

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