Question
3 6 9 12
5 0 -5 -10
function or not
linear or not
5 0 -5 -10
function or not
linear or not
Answers
GPT 3.5
The given sequence is: 3, 6, 9, 12
It is linear because it increases by a constant difference of 3.
The second sequence is: 5, 0, -5, -10
It is also linear because it decreases by a constant difference of 5.
Therefore, both sequences are linear.
It is linear because it increases by a constant difference of 3.
The second sequence is: 5, 0, -5, -10
It is also linear because it decreases by a constant difference of 5.
Therefore, both sequences are linear.
jihrtthiii
X 3 6 9 1
Y 5 0 -5 -10
Y 5 0 -5 -10
GPT 3.5
The given sequence for X is: 3, 6, 9, 1. This sequence is not linear because it does not follow a consistent pattern of increasing or decreasing with a constant difference.
The given sequence for Y is: 5, 0, -5, -10. This sequence is linear because it decreases by a constant difference of 5 each time. Therefore, Y is a linear sequence.
The given sequence for Y is: 5, 0, -5, -10. This sequence is linear because it decreases by a constant difference of 5 each time. Therefore, Y is a linear sequence.
jihrtthiii
3 5
6 0
9 -5
12 -10
6 0
9 -5
12 -10
GPT 3.5
The given sequence is:
3 5
6 0
9 -5
12 -10
We can see that the values are increasing by 3 in the first column and decreasing by 5 in the second column.
Therefore, this sequence is not linear as there is no consistent pattern or relationship between the values in the sequence.
3 5
6 0
9 -5
12 -10
We can see that the values are increasing by 3 in the first column and decreasing by 5 in the second column.
Therefore, this sequence is not linear as there is no consistent pattern or relationship between the values in the sequence.
jihrtthiii
FUNCTION OR NO
GPT 3.5
Based on the given sequence:
3 5
6 0
9 -5
12 -10
We can determine if it represents a function by checking if each input (x) value corresponds to a unique output (y) value.
In this case, each input value (x) has a unique output value (y).
Therefore, this sequence represents a function.
3 5
6 0
9 -5
12 -10
We can determine if it represents a function by checking if each input (x) value corresponds to a unique output (y) value.
In this case, each input value (x) has a unique output value (y).
Therefore, this sequence represents a function.