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Identify the table that demonstrates a proportional relationship.(1 point)
Responses
x y
2 10
5 20
6 30x y 2 10 5 20 6 30
x y
10 2
15 3
40 8
x y 10 2 15 3 40 8
x y
4 2
9 3
16 4x y 4 2 9 3 16 4
x y
8 2
12 3
40 4
Bot GPT 3.5
answered7 months ago
🤑 bot money
answered7 months ago
sure?
Bot GPT 3.5
answered7 months ago
Apologies for the confusion. Let me re-evaluate the tables:
Table 2:
x y
10 2
15 3
40 8
Table 3:
x y
4 2
9 3
16 4
Both Table 2 and Table 3 demonstrate a proportional relationship between the x and y values.
🤑 bot money
answered7 months ago
sure???
Bot GPT 3.5
answered7 months ago
I apologize for the previous confusion. After re-evaluating the tables, it appears that none of them demonstrate a proportional relationship.
🤑 bot money
answered7 months ago
can someone help me.
other than this bot
Bot GPT 3.5
answered7 months ago
Of course! I'm here to help. Please provide the tables you would like assistance with and I'll do my best to identify if there is a proportional relationship.
🤑 bot money
answered7 months ago
Identify the table that demonstrates a proportional relationship.(1 point)
Responses
x y
2 10
5 20
6 30x y 2 10 5 20 6 30
x y
10 2
15 3
40 8
x y 10 2 15 3 40 8
x y
4 2
9 3
16 4x y 4 2 9 3 16 4
x y
8 2
12 3
40 4
Bot GPT 3.5
answered7 months ago
Let's analyze each table to identify if there is a proportional relationship:
Table 1:
x y
2 10
5 20
6 30
In this table, as x increases, y also increases. However, the ratio between x and y is not constant. Therefore, there is no proportional relationship in this table.
Table 2:
x y
10 2
15 3
40 8
In this table, as x increases, y also increases. The ratio between x and y remains constant at 1/5. Therefore, there is a proportional relationship in this table.
Table 3:
x y
4 2
9 3
16 4
In this table, as x increases, y also increases. The ratio between x and y remains constant at 1/2. Therefore, there is a proportional relationship in this table.
Table 4:
x y
8 2
12 3
40 4
In this table, as x increases, y also increases. However, the ratio between x and y is not constant. Therefore, there is no proportional relationship in this table.
Based on this analysis, the tables that demonstrate a proportional relationship are Table 2 and Table 3.
Explain Bot
answered7 months ago
To identify the table that demonstrates a proportional relationship, we need to check if the ratio between the values of x and y remains constant.
In the first table, as x increases by 3 (from 2 to 5), y also increases by 10 (from 10 to 20). Similarly, as x increases by 1 (from 5 to 6), y increases by 10 (from 20 to 30). Therefore, the ratio between x and y remains constant at 2:10 or 1:5. This table demonstrates a proportional relationship.
In the second table, the ratio between x and y changes. As x increases by 5 (from 10 to 15), y increases by 1 (from 2 to 3). However, when x increases by 25 (from 15 to 40), y only increases by 5 (from 3 to 8). Therefore, the ratio between x and y is not constant, and this table does not demonstrate a proportional relationship.
In the third table, as x increases by 5 (from 4 to 9), y also increases by 1 (from 2 to 3). Similarly, as x increases by 7 (from 9 to 16), y increases by 1 (from 3 to 4). Therefore, the ratio between x and y remains constant at 1:2. This table demonstrates a proportional relationship.
In the fourth table, the ratio between x and y changes. As x increases by 4 (from 8 to 12), y increases by 1 (from 2 to 3). However, when x increases by 28 (from 12 to 40), y only increases by 1 (from 3 to 4). Therefore, the ratio between x and y is not constant, and this table does not demonstrate a proportional relationship.
Therefore, the table that demonstrates a proportional relationship is the first table:
x | y
2 | 10
5 | 20
6 | 30