Analyze the graph below to identify the key features of the logarithmic function.

Graph begins in the fourth quadrant near the line x equals 6 and increases rapidly while crossing the ordered pair 7, 0. The graph then begins to increase slowly throughout the first quadrant.

The x‐intercept is y = 7, and the graph approaches a vertical asymptote at y = 6.
The x‐intercept is x = 7, and the graph approaches a vertical asymptote at x = 6.
The x‐intercept is y = −7, and the graph approaches a vertical asymptote at y = −6.
The x‐intercept is x = −7, and the graph approaches a vertical asymptote at x = −6

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Ashraf82 Ashraf82 · Answer 1 · 2019-08-21T13:33:05+02:00

Answer:

The x‐intercept is x = 7, and the graph approaches a vertical asymptote

at x = 6 ⇒ 2nd answer

Step-by-step explanation:

* Lets explain how to solve the problem

- The graph represented a logarithmic function

- The graph begins in the fourth quadrant near the line x equals 6

- The graph increases rapidly while crossing the ordered pair (7, 0)

- The graph then begins to increase slowly throughout the first

quadrant

* Lets solve the problem

∵ The graph cross the x-axis at point (7 , 0)

∵ The x-intercept is the intersection between the graph and the

x-axis at point (x , 0)

∴ The x-intercept is x = 7

- If a curve approaches a line but never cross it, this line is called

asymptote

∵ The graph is near to the line the line x equals 6 but not intersect it

∴ The graph approaches a vertical asymptote at x = 6

* The x‐intercept is x = 7, and the graph approaches a vertical

asymptote at x = 6.

tiffs331 tiffs331 · Answer 2 · 2022-02-04T08:42:44+01:00

tiffs331 tiffs331

Answer:

B) The x‐intercept is x = 7, and the graph approaches a vertical asymptote at x = 6.

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