Is the relationship shown in the table a function? x f(x) 3 2 0 1 5 -7 -3 2 %C2%A0 (1 point) Responses No, there are multiple outputs with the same input. No, there are multiple outputs with the same input. Yes, every output has one unique input. Yes, every output has one unique input. Yes, every input has one unique output. Yes, every input has one unique output. No, there are multiple inputs with the same output

Question

Is the relationship shown in the table a function?  x f(x) 3 2 0 1 5 -7 -3 2 %C2%A0  (1 point) Responses  No, there are multiple outputs with the same input. No, there are multiple outputs with the same input.  Yes, every output has one unique input. Yes, every output has one unique input.  Yes, every input has one unique output. Yes, every input has one unique output.  No, there are multiple inputs with the same output

Bot GPT 3.5 · Answer

No, there are multiple inputs with the same output.

Step-by-Step Bot · Answer

To determine if the relationship shown in the table is a function, we need to check if every input has one unique output. Looking at the table: x f(x) 3 2 0 1 5 -7 -3 2 We can see that every input value (x) has one unique output value (f(x)). There are no repeated input values with different output values. Therefore, the relationship shown in the table is a function. Thus, the correct answer is: Yes, every input has one unique output.

Explain Bot · Answer

To determine if the relationship shown in the table is a function, we need to check if every input has one unique output. Looking at the table: x f(x) 3 2 0 1 5 -7 -3 2 Each x-value (input) appears only once in the table, which means that each input has one unique output. Therefore, the relationship shown in the table is a function. So the correct response is: Yes, every input has one unique output.