Which Is The Graph Of The Linear Inequality X – 2Y > –6? On A Coordinate Plane, A Solid Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Above And To The Left Of The Line Is Shaded. On A Coordinate Plane, A Dashed Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Above And To The Left Of The Line Is Shaded. On A Coordinate Plane, A Solid Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Below And To The Right Of The Line Is Shaded. On A Coordinate Plane, A Dashed Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Below And To The Right Of The Line Is Shaded.

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Which Is The Graph Of The Linear Inequality X – 2Y > –6? On A Coordinate Plane, A Solid Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Above And To The Left Of The Line Is Shaded. On A Coordinate Plane, A Dashed Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Above And To The Left Of The Line Is Shaded. On A Coordinate Plane, A Solid Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Below And To The Right Of The Line Is Shaded. On A Coordinate Plane, A Dashed Straight Line Has A Positive Slope And Goes Through (Negative 4, 2) And (4, 4). Everything Below And To The Right Of The Line Is Shaded.. The image shows a linear inequality: To graph the inequality, we first need to graph.

Question 1 Solve 3x + 2y > 6 graphically Chapter 6 Class 11
Question 1 Solve 3x + 2y > 6 graphically Chapter 6 Class 11 from www.teachoo.com

The image also shows a triangle, but it is not relevant to the problem. To graph the inequality, we first need to graph. The image shows a linear inequality:

The Image Shows A Linear Inequality:


To graph the inequality, we first need to graph. The image also shows a triangle, but it is not relevant to the problem. To graph the linear inequality 2y> x − 2, first find the intercepts of the boundary line 2y = x − 2, which are (0,−1) and (2,0).

Draw A Dashed Line Through These Points And Shade.


The graph shows a dashed line passing through points $$ (0, 3)$$(0,3) and $$ (2, 4)$$(2,4), with the region below the line shaded.

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