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15 votes
15 votes
Consider the polynomial function q(x)=-2x^8+5x^6-3x^5+50

What is the end behavior of the graph of q?
Choose 1 answer:
(Choice A) As x→∞, q(x)→∞, and as x→−∞, q(x)→∞

(Choice B) As x→∞, q(x)→-∞, and as x→−∞, q(x)→∞

(Choice C) As x→∞, q(x)→-∞, and as x→−∞, q(x)→-∞

(Choice D) As x→∞, q(x)→∞, and as x→−∞, q(x)→-∞

User Westonplatter
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2.6k points

2 Answers

10 votes
10 votes

Final answer:

The end behavior of the graph of q(x) is as x approaches positive or negative infinity, q(x) approaches negative infinity.

Step-by-step explanation:

The end behavior of a polynomial function can be determined by examining the leading term of the polynomial. In this case, the leading term is -2x^8. Since the degree of the leading term is even and the leading coefficient is negative, the end behavior of the graph of q(x) is as follows:

  • As x approaches positive infinity, q(x) approaches negative infinity.
  • As x approaches negative infinity, q(x) also approaches negative infinity.

Therefore, the correct answer is (Choice B) As x→∞, q(x)→-∞, and as x→−∞, q(x)→∞.

User Thomas Bartelmess
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3.6k points
18 votes
18 votes

Answer:

C.

Step-by-step explanation:

Answer A and D are definitely incorrect. Hope this helps Zoey. #Zoeyiscute:)

User Bino Carlos
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3.0k points