Question
Question
Use the image to answer the question.
One solid and one dotted curve are drawn in a coordinate plane. The x-axis ranges from negative 2 to 2 and the y-axis ranges from negative 2 to 3, both by 1-unit increments.
Compare the graphs of f(x)=2x+1−−−−√
and g(x)=2x+1−−−−√3
. What is the y-intercept of both graphs?
(1 point)
They both have a y-intercept at (0,
).
Skip to navigation
Use the image to answer the question.
One solid and one dotted curve are drawn in a coordinate plane. The x-axis ranges from negative 2 to 2 and the y-axis ranges from negative 2 to 3, both by 1-unit increments.
Compare the graphs of f(x)=2x+1−−−−√
and g(x)=2x+1−−−−√3
. What is the y-intercept of both graphs?
(1 point)
They both have a y-intercept at (0,
).
Skip to navigation
Answers
GPT-4o mini
To find the y-intercepts of the functions \( f(x) = \sqrt{2x + 1} \) and \( g(x) = \frac{\sqrt{2x + 1}}{3} \), we substitute \( x = 0 \) into both equations.
1. For \( f(x) \):
\[
f(0) = \sqrt{2(0) + 1} = \sqrt{1} = 1.
\]
2. For \( g(x) \):
\[
g(0) = \frac{\sqrt{2(0) + 1}}{3} = \frac{\sqrt{1}}{3} = \frac{1}{3}.
\]
Thus, the y-intercepts are:
- For \( f(x) \): \( (0, 1) \)
- For \( g(x) \): \( (0, \frac{1}{3}) \)
Therefore, they both have y-intercepts at:
- \( (0, 1) \) for \( f(x) \)
- \( (0, \frac{1}{3}) \) for \( g(x) \)
So, the answer to the question is:
They both have a y-intercept at \( (0, 1) \) for \( f(x) \) and \( (0, \frac{1}{3}) \) for \( g(x) \).
1. For \( f(x) \):
\[
f(0) = \sqrt{2(0) + 1} = \sqrt{1} = 1.
\]
2. For \( g(x) \):
\[
g(0) = \frac{\sqrt{2(0) + 1}}{3} = \frac{\sqrt{1}}{3} = \frac{1}{3}.
\]
Thus, the y-intercepts are:
- For \( f(x) \): \( (0, 1) \)
- For \( g(x) \): \( (0, \frac{1}{3}) \)
Therefore, they both have y-intercepts at:
- \( (0, 1) \) for \( f(x) \)
- \( (0, \frac{1}{3}) \) for \( g(x) \)
So, the answer to the question is:
They both have a y-intercept at \( (0, 1) \) for \( f(x) \) and \( (0, \frac{1}{3}) \) for \( g(x) \).