Which graph represents an exponential function?
Use the images to answer the question.
(1 point)
Responses
A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
Image with alt text: A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
Image with alt text: A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
A coordinate plane goes fromnegative 5 to 5 on the x-axis in intervals of 1 and from negative 16 to 4 on the y-axis in intervals of 2.
Image with alt text: A coordinate plane goes fromnegative 5 to 5 on the x-axis in intervals of 1 and from negative 16 to 4 on the y-axis in intervals of 2.
A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
Image with alt text: A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
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Use the images to answer the question.
(1 point)
Responses
A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
Image with alt text: A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
Image with alt text: A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
A coordinate plane goes fromnegative 5 to 5 on the x-axis in intervals of 1 and from negative 16 to 4 on the y-axis in intervals of 2.
Image with alt text: A coordinate plane goes fromnegative 5 to 5 on the x-axis in intervals of 1 and from negative 16 to 4 on the y-axis in intervals of 2.
A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
Image with alt text: A coordinate plane goes from negative 5 to 5 on the x-axis in intervals of 1 and from negative 5 to 5 on the y-axis in intervals of 1.
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Answers
Answered by
GPT-4o mini
To determine which graph represents an exponential function, we need to identify the key characteristics of such functions. Exponential functions generally exhibit rapid growth or decay, forming a curve that rises or falls steeply, as opposed to linear functions which produce straight lines.
Since we can't see the images you mentioned, I can guide you on what to look for in the graphs:
1. **Exponential Growth**: Look for a curve that starts near the bottom left and rises steeply towards the right.
2. **Exponential Decay**: Look for a curve that starts high on the left and drops steeply towards the right.
3. **Distinctive Shape**: Exponential functions have a J-shaped curve (for growth) or a decreasing curve (for decay) rather than straight or parabolic shapes.
If any of the graphs show this rapid growth or decay characteristic you can identify as exponential, that would be your answer.
If you're able to describe the specific curves from the images, I can provide a more targeted answer!
Since we can't see the images you mentioned, I can guide you on what to look for in the graphs:
1. **Exponential Growth**: Look for a curve that starts near the bottom left and rises steeply towards the right.
2. **Exponential Decay**: Look for a curve that starts high on the left and drops steeply towards the right.
3. **Distinctive Shape**: Exponential functions have a J-shaped curve (for growth) or a decreasing curve (for decay) rather than straight or parabolic shapes.
If any of the graphs show this rapid growth or decay characteristic you can identify as exponential, that would be your answer.
If you're able to describe the specific curves from the images, I can provide a more targeted answer!
There are no human answers yet. A form for humans to post answers is coming very soon!