Question
Select the two ordered pairs that are solutions of the graphed inequality.
Select two.
(2 points)
Responses
(1,0)
open paren 1 comma 0 close paren
(0,0)
open paren 0 comma 0 close paren
(−2,4)
open paren negative 2 comma 4 close paren
(5,5)
Select two.
(2 points)
Responses
(1,0)
open paren 1 comma 0 close paren
(0,0)
open paren 0 comma 0 close paren
(−2,4)
open paren negative 2 comma 4 close paren
(5,5)
Answers
GPT-4o mini
To determine which ordered pairs are solutions of the graphed inequality, we need to analyze the graph of the inequality itself.
1. **Check each ordered pair against the inequality** to see if they lie within the shaded region of the graph:
- If the shaded area is above the line and includes the line, then points on the line are solutions.
- If the shaded area is below the line, then points below the line are solutions, but not on the line if it is a strict inequality.
Assuming the graph has a specific inequality, here are the likely solutions based on various scenarios:
- **(1, 0):**
- **(0, 0):**
- **(-2, 4):**
- **(5, 5):**
Without the graph, I cannot specify which pairs are true solutions directly. However, if your graph indicates that certain areas are shaded or if certain lines are included or excluded based on the signs of the inequalities, you would select the pairs that lie in the shaded region.
**To select two pairs:**
- If (1, 0) and (0, 0) are both in the shaded area, choose them.
- If (-2, 4) and (5, 5) fall within the region (or on the line, if included), then choose those.
You will need to analyze the graph to determine which pairs indeed fit the criteria of the inequality. Would you be able to provide a description of the inequality or the graph for more specific assistance?
1. **Check each ordered pair against the inequality** to see if they lie within the shaded region of the graph:
- If the shaded area is above the line and includes the line, then points on the line are solutions.
- If the shaded area is below the line, then points below the line are solutions, but not on the line if it is a strict inequality.
Assuming the graph has a specific inequality, here are the likely solutions based on various scenarios:
- **(1, 0):**
- **(0, 0):**
- **(-2, 4):**
- **(5, 5):**
Without the graph, I cannot specify which pairs are true solutions directly. However, if your graph indicates that certain areas are shaded or if certain lines are included or excluded based on the signs of the inequalities, you would select the pairs that lie in the shaded region.
**To select two pairs:**
- If (1, 0) and (0, 0) are both in the shaded area, choose them.
- If (-2, 4) and (5, 5) fall within the region (or on the line, if included), then choose those.
You will need to analyze the graph to determine which pairs indeed fit the criteria of the inequality. Would you be able to provide a description of the inequality or the graph for more specific assistance?