Question
ustin is using graphs to compare the growth rates of g(x)=1.3x
and f(x)=1.3x
. Which statement correctly describes how Austin should do this and what he will observe? (1 point)
Responses
Austin should find where one curve is above the other curve on the graph. The growth rate of g(x)=1.3x
is greater than the growth rate of f(x)=1.3x
between the intersection points of the curve.
Austin should find where one curve is above the other curve on the graph. The growth rate of g left parenthesis x right parenthesis equals 1.3 x is greater than the growth rate of f left parenthesis x right parenthesis equals 1.3 superscript x baseline between the intersection points of the curve.
Austin should compare the steepness of the curves. The growth rate of g(x)=1.3x
will quickly surpass the growth rate of f(x)=1.3x
.
Austin should compare the steepness of the curves. The growth rate of g left parenthesis x right parenthesis equals 1.3 x will quickly surpass the growth rate of f left parenthesis x right parenthesis equals 1.3 superscript x baseline .
Austin should find where one curve is above the other curve on the graph. The growth rate of f(x)=1.3x
is only greater than the growth rate of g(x)=1.3x
to the right of their right-most intersection point.
Austin should find where one curve is above the other curve on the graph. The growth rate of f left parenthesis x right parenthesis equals 1.3 superscript x baseline is only greater than the growth rate of g left parenthesis x right parenthesis equals 1.3 x to the right of their right-most intersection point.
Austin should compare the steepness of the curves. The growth rate of f(x)=1.3x
will quickly surpass the growth rate of g(x)=1.3x
Pick 1 answer even if it makes no sense, pick the one that is MOST right
and f(x)=1.3x
. Which statement correctly describes how Austin should do this and what he will observe? (1 point)
Responses
Austin should find where one curve is above the other curve on the graph. The growth rate of g(x)=1.3x
is greater than the growth rate of f(x)=1.3x
between the intersection points of the curve.
Austin should find where one curve is above the other curve on the graph. The growth rate of g left parenthesis x right parenthesis equals 1.3 x is greater than the growth rate of f left parenthesis x right parenthesis equals 1.3 superscript x baseline between the intersection points of the curve.
Austin should compare the steepness of the curves. The growth rate of g(x)=1.3x
will quickly surpass the growth rate of f(x)=1.3x
.
Austin should compare the steepness of the curves. The growth rate of g left parenthesis x right parenthesis equals 1.3 x will quickly surpass the growth rate of f left parenthesis x right parenthesis equals 1.3 superscript x baseline .
Austin should find where one curve is above the other curve on the graph. The growth rate of f(x)=1.3x
is only greater than the growth rate of g(x)=1.3x
to the right of their right-most intersection point.
Austin should find where one curve is above the other curve on the graph. The growth rate of f left parenthesis x right parenthesis equals 1.3 superscript x baseline is only greater than the growth rate of g left parenthesis x right parenthesis equals 1.3 x to the right of their right-most intersection point.
Austin should compare the steepness of the curves. The growth rate of f(x)=1.3x
will quickly surpass the growth rate of g(x)=1.3x
Pick 1 answer even if it makes no sense, pick the one that is MOST right
Answers
GPT-4o mini
The correct response is:
"Austin should find where one curve is above the other curve on the graph. The growth rate of f(x)=1.3^x is only greater than the growth rate of g(x)=1.3x to the right of their right-most intersection point."
This choice acknowledges that \(f(x) = 1.3^x\) (an exponential function) grows more quickly than \(g(x) = 1.3x\) (a linear function) as \(x\) increases, and it highlights the significance of comparing their positions on the graph.
"Austin should find where one curve is above the other curve on the graph. The growth rate of f(x)=1.3^x is only greater than the growth rate of g(x)=1.3x to the right of their right-most intersection point."
This choice acknowledges that \(f(x) = 1.3^x\) (an exponential function) grows more quickly than \(g(x) = 1.3x\) (a linear function) as \(x\) increases, and it highlights the significance of comparing their positions on the graph.