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Select the system of linear inequalities whose solution is graphed.





Coordinate plane with a system of two linear inequalities. The first is a solid line graphed with a slope of negative one, y-intercept of negative 2, and the region containing the origin is shaded. The second is a dashed vertical line 3 units to the left of the origin, and the region containing the origin is shaded.



x ≥ –3; y ≥ x – 2


x > –3; 5y ≥ –4x – 10


x > –3; y ≥ –x + 1


x > –2; y ≥ –x – 1

Respuesta :

MrsStrong

Answer:

[tex]x>-3 and y\geq -x-2[/tex]

Step-by-step explanation:

The first line has "equal to" because it is solid. It follows the same form as

[tex]y\geq mx+b[/tex]

where m is the slope which is -1 and b is the y-intercept which is -2.

This means the equation is [tex]y\geq -x-2[/tex].

The second line is 3 units to the left of the origin and is dashed so is [tex]x<a[/tex] or [tex]x>a[/tex]. Since it is 3 units and is including the origin (numbers greater than) then the line is [tex]x>-3[/tex]

jalaylak8amwas

Answer:

Is the other one right

Step-by-step explanation:

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