Question
Match the correct equation to the given graph.
- y ≤ -3/4 x + 3
- y < -3/4 x + 3
- y ≥ -3/4 x + 3
- y > -3/4 x + 3
The correct answer is: y ≥ -3/4 x + 3
The graph is a solid line and the portion above the line is shaded.
The inequality symbol that represents the graph is “≥”.
The correct solution for the given coordinate plane is y ≥ -3/4 x + 3
Related Questions to study
Find the point that is NOT part of the given solution set.
In that question, we have to find the point that not part of solution to system of inequalities, to find solution we are giving the points is some point is solution then its must come under shading region on the graph. The look for the point which Not come under the shading region and that will be our answer. If dashed line is there then value is not taken that’s why we use <, > signs not equal sign.
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In that question, we have to find the point that not part of solution to system of inequalities, to find solution we are giving the points is some point is solution then its must come under shading region on the graph. The look for the point which Not come under the shading region and that will be our answer. If dashed line is there then value is not taken that’s why we use <, > signs not equal sign.
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In this question, we have given a function of y which is y > 2x + 3 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
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In this question, we have given a function of y which is y ≥ 2x + 3 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
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In this question, we have given a function of y which is y ≥ 2x + 3 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
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In this question, Here we have to write the standard form of linear inequality. Always remember in inequality at least sign is ≥. And make variable for that also.
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In this question, we have to given inequality on graph and we have to find the which type of line it has. For that always remember, To graph an inequality, treat the <, ≤, >, or ≥ sign as an = sign, and graph the equation. If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph.
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In this question, we have given a function of y which is y ≤ 2x + 3 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
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In this question, we have given a function of y which is y ≤ 2x + 3 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
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In this question, we have given a function of y which is y < 5x +10 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
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In this question, we have given a function of y which is y < 5x +10 and with that we have to find about line. Always remember rule of inequality , We know that If the inequality is < or > line is dashed or if there ≤ or ≥ then the line solid on the graph and if function is along x-axis so its goes horizontally and if function is along y-axis so its goes vertically.
