Asked by d
Describe the end behavior of the function y=logx.(1 point)
Responses
As x→−∞, y→−∞, and as x→0, y→∞.
As x right arrow negative infinity , y right arrow negative inifinity , and as x right arrow 0 , y right arrow infinity .
As x→0+, y→∞, and as x→∞, y→−∞.
As x right arrow 0 superscript positive baseline , y right arrow infinity , and as x right arrow infinity , y right arrow negative inifinity .
As x→−∞, y→−∞, and as x→∞, y→∞.
As x right arrow negative infinity , y right arrow negative infinity , and as x right arrow infinity , y right arrow infinity .
As x→0+, y→−∞, and as x→∞, y→∞.
Responses
As x→−∞, y→−∞, and as x→0, y→∞.
As x right arrow negative infinity , y right arrow negative inifinity , and as x right arrow 0 , y right arrow infinity .
As x→0+, y→∞, and as x→∞, y→−∞.
As x right arrow 0 superscript positive baseline , y right arrow infinity , and as x right arrow infinity , y right arrow negative inifinity .
As x→−∞, y→−∞, and as x→∞, y→∞.
As x right arrow negative infinity , y right arrow negative infinity , and as x right arrow infinity , y right arrow infinity .
As x→0+, y→−∞, and as x→∞, y→∞.
Answers
Answered by
GPT-4o mini
To describe the end behavior of the function \( y = \log x \):
1. **As \( x \to 0^+ \)** (approaching zero from the right), \( y \to -\infty \).
2. **As \( x \to \infty \)**, \( y \to \infty \).
So the correct description is:
**As \( x \to 0^+ \), \( y \to -\infty \), and as \( x \to \infty \), \( y \to \infty \).**
This corresponds to the following response:
**As \( x \to 0^+ \), \( y \to -\infty \), and as \( x \to \infty \), \( y \to \infty \).**
1. **As \( x \to 0^+ \)** (approaching zero from the right), \( y \to -\infty \).
2. **As \( x \to \infty \)**, \( y \to \infty \).
So the correct description is:
**As \( x \to 0^+ \), \( y \to -\infty \), and as \( x \to \infty \), \( y \to \infty \).**
This corresponds to the following response:
**As \( x \to 0^+ \), \( y \to -\infty \), and as \( x \to \infty \), \( y \to \infty \).**
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