Question
What is the average number of heartbeats per second?
2 beats per second
1 1/2 beats per second 1 Start Fraction 1 over 2 End Fraction beats per second
3 beats per second
2/3 beat per second
2 beats per second
1 1/2 beats per second 1 Start Fraction 1 over 2 End Fraction beats per second
3 beats per second
2/3 beat per second
Answers
Answered by
GPT 3.5
The average number of heartbeats per second is 1 1/2 beats per second or 1.5 beats per second.
Answer
Identify the constant of proportionality from the graph
2 2 32 Start Fraction 3 over 2 End Fraction 23 Start Fraction 2 over 3 End Fraction 12
2 2 32 Start Fraction 3 over 2 End Fraction 23 Start Fraction 2 over 3 End Fraction 12
Answered by
GPT 3.5
To identify the constant of proportionality from the given data points, we need to examine the relationship between the input and output values in the graph.
The input values (x-axis) are:
2
3/2
2/3
The output values (y-axis) are:
32
23
12
To determine the constant of proportionality, we can compare the ratios of the output values to the corresponding input values.
For the ratio of the first data point:
32 / 2 = 16
For the ratio of the second data point:
23 / (3/2) = (2/3) * 23 = 46/3
For the ratio of the third data point:
12 / (2/3) = (3/2) * 12 = 18
The ratios of the output values to the corresponding input values are:
16, 46/3, 18
These ratios are not equal, indicating that there is no constant of proportionality present in the given data points.
The input values (x-axis) are:
2
3/2
2/3
The output values (y-axis) are:
32
23
12
To determine the constant of proportionality, we can compare the ratios of the output values to the corresponding input values.
For the ratio of the first data point:
32 / 2 = 16
For the ratio of the second data point:
23 / (3/2) = (2/3) * 23 = 46/3
For the ratio of the third data point:
12 / (2/3) = (3/2) * 12 = 18
The ratios of the output values to the corresponding input values are:
16, 46/3, 18
These ratios are not equal, indicating that there is no constant of proportionality present in the given data points.
Answer
Just pick one
Answered by
GPT 3.5
Alright, let's pick the first data point: 2 and 32. The constant of proportionality can be found by dividing the output value (32) by the input value (2).
32 / 2 = 16
Therefore, the constant of proportionality from this data point is 16.
32 / 2 = 16
Therefore, the constant of proportionality from this data point is 16.
Answer
That’s not one of the answers
Answered by
GPT 3.5
Apologies for the confusion. Looking at the given options and data points, the constant of proportionality is not explicitly provided. Without additional information or a clear pattern in the data points, it is not possible to determine the constant of proportionality from the given options.
Answer
JUST PICK AN ACTUAL OPTION
Answered by
GPT 3.5
Apologies for the confusion. Let's pick the third option:
23 Start Fraction 2 over 3 End Fraction
To identify the constant of proportionality, we can compare the ratios of the output values to the corresponding input values.
For the given option, the input value is 2/3 and the output value is 23.
To find the constant of proportionality, we divide the output value by the input value:
23 / (2/3) = 23 * (3/2) = 34.5
Therefore, the constant of proportionality from the given option is approximately 34.5.
23 Start Fraction 2 over 3 End Fraction
To identify the constant of proportionality, we can compare the ratios of the output values to the corresponding input values.
For the given option, the input value is 2/3 and the output value is 23.
To find the constant of proportionality, we divide the output value by the input value:
23 / (2/3) = 23 * (3/2) = 34.5
Therefore, the constant of proportionality from the given option is approximately 34.5.
Answer
THE ANSWERS ARE
2
3/2
2/3
1/2
PICK ONE OF THE ANSWERS
2
3/2
2/3
1/2
PICK ONE OF THE ANSWERS
Answered by
GPT 3.5
Apologies for the confusion. Let's pick the first option: 2.
For the given option, there is no specific data point provided. However, we can assume that the relationship between the input and output values is a direct proportion.
In a direct proportion, the constant of proportionality will be the same for all data points. Therefore, the constant of proportionality from the given option is 2.
For the given option, there is no specific data point provided. However, we can assume that the relationship between the input and output values is a direct proportion.
In a direct proportion, the constant of proportionality will be the same for all data points. Therefore, the constant of proportionality from the given option is 2.
Answered by
Idk_pretend I have a name
I bet the answer was wrong lmao. never trust bots bro.
Answered by
Idk_pretend I have a name
The correct answer is
1
1 ___
2
1
1 ___
2
Answered by
Idk_pretend I have a name
Oops wrote it wrong
its 1 1/2
its 1 1/2
Answered by
Idk_pretend I have a name
And since I got a 100 on meh test even though I guessed it all ima give da answers
1) 3/2
2) 1 1/2
3) 399
4)D
5) graph C
(Your yw! (-_-) I was bored dats why I gave da answers)
1) 3/2
2) 1 1/2
3) 399
4)D
5) graph C
(Your yw! (-_-) I was bored dats why I gave da answers)
Answered by
Youbighandsomedaddy
Be my gf...no my wifeu. ♡ ❤️♡ ❤️♡ ❤️♡ ❤️♡ ❤️
Answered by
Idk_pretend I have a name
nawh i'll pass
Answered by
Youbighandsomedaddy
Whats wrong baby g you chicken out or something? i'll have fun with you tonight lets just see if you'll say the same thing...
Answered by
Idk_pretend I have a name
.