Question
Use the image to answer the question.
A concave-up, increasing curve is plotted on a coordinate plane where the x-axis ranges from negative 2 to 4 in increments of 2 and the y-axis ranges from 0 to 20 in increments of 5. The curve passes through 3 marked points.
Use the graph to fill in the missing elements of the exponential growth equation.
(1 point)
y=
(
)x
Remaining Attempts : 3
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A concave-up, increasing curve is plotted on a coordinate plane where the x-axis ranges from negative 2 to 4 in increments of 2 and the y-axis ranges from 0 to 20 in increments of 5. The curve passes through 3 marked points.
Use the graph to fill in the missing elements of the exponential growth equation.
(1 point)
y=
(
)x
Remaining Attempts : 3
Skip to navigation
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To fill in the missing elements of the exponential growth equation \( y = a \cdot (b)^x \), I would typically need to analyze the graph and the marked points.
Since I cannot see the image, let's assume you have some information from the graph, like the specific points that the curve passes through. The general format for an exponential growth equation is:
\[
y = a \cdot (b)^x
\]
Where:
- \( a \) is the y-intercept (the value of \( y \) when \( x = 0 \)),
- \( b \) is the growth factor (which determines how rapidly the values of \( y \) increase).
If you can provide numerical values from the graph, such as the coordinates of the marked points, I can help you solve for \( a \) and \( b \).
For instance:
1. If one of the points is (0, 1), then \( a = 1 \).
2. If another point is (2, 4), you can use it to find \( b \) by substituting into the equation.
Please share the specific points from the graph, and I can give you a more precise answer!
Since I cannot see the image, let's assume you have some information from the graph, like the specific points that the curve passes through. The general format for an exponential growth equation is:
\[
y = a \cdot (b)^x
\]
Where:
- \( a \) is the y-intercept (the value of \( y \) when \( x = 0 \)),
- \( b \) is the growth factor (which determines how rapidly the values of \( y \) increase).
If you can provide numerical values from the graph, such as the coordinates of the marked points, I can help you solve for \( a \) and \( b \).
For instance:
1. If one of the points is (0, 1), then \( a = 1 \).
2. If another point is (2, 4), you can use it to find \( b \) by substituting into the equation.
Please share the specific points from the graph, and I can give you a more precise answer!
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