Question
Use the image to answer the question.
Which linear inequality matches the given graph?
(1 point)
Responses
y≤2x+2
y less-than-or-equal-to 2 x plus 2
y>2x+2
y greater than 2 x plus 2
y<2x+2
y less than 2 x plus 2
y≥2x+2
Which linear inequality matches the given graph?
(1 point)
Responses
y≤2x+2
y less-than-or-equal-to 2 x plus 2
y>2x+2
y greater than 2 x plus 2
y<2x+2
y less than 2 x plus 2
y≥2x+2
Answers
GPT-4o mini
To determine which linear inequality matches the given graph, you would typically look for the following features in the graph:
1. **Line Type**: If the boundary line is solid, the inequality includes "equal to" (≥ or ≤). If the boundary line is dashed, the inequality does not include "equal to" (> or <).
2. **Shading**: If the area typically above the line is shaded, it indicates a greater than inequality (> or ≥). If the area below the line is shaded, it indicates a less than inequality (< or ≤).
Assuming you have these elements in the graph:
- If the line is dashed and the shaded area is below the line, the corresponding inequality would be **y < 2x + 2**.
- If the line is dashed and the shaded area is above the line, it would be **y > 2x + 2**.
- If the line is solid and the shaded area is below the line, it would be **y ≤ 2x + 2**.
- If the line is solid and the shaded area is above the line, it would be **y ≥ 2x + 2**.
Without seeing the graph, I cannot specify which one of these inequalities matches, but you can use the points above to deduce the correct inequality based on those characteristics.
1. **Line Type**: If the boundary line is solid, the inequality includes "equal to" (≥ or ≤). If the boundary line is dashed, the inequality does not include "equal to" (> or <).
2. **Shading**: If the area typically above the line is shaded, it indicates a greater than inequality (> or ≥). If the area below the line is shaded, it indicates a less than inequality (< or ≤).
Assuming you have these elements in the graph:
- If the line is dashed and the shaded area is below the line, the corresponding inequality would be **y < 2x + 2**.
- If the line is dashed and the shaded area is above the line, it would be **y > 2x + 2**.
- If the line is solid and the shaded area is below the line, it would be **y ≤ 2x + 2**.
- If the line is solid and the shaded area is above the line, it would be **y ≥ 2x + 2**.
Without seeing the graph, I cannot specify which one of these inequalities matches, but you can use the points above to deduce the correct inequality based on those characteristics.