Respuesta :

gmany

[tex]3y\geqx-9\qquad|:3\\\\y\geq\dfrac{1}{3}x-3\\\\3x+y > -3\qquad|-3x\\\\y > -3x-3[/tex]

[tex]\left\{\begin{array}{ccc}y\geq\dfrac{1}{3}x-3\\\\y > -3x-3\end{array}\right[/tex]


[tex]y=\dfrac{1}{3}x-3\\\\for\ x=0\to y=\dfrac{1}{3}(0)-3=-3\to(0,\ -3)\\\\for\ x=3\to y=\dfrac{1}{3}(3)-3=1-3=-2\to(3,\ -2)\\\\y=-3x-3\\\\for\ x=0\to y=-3(0)-3=-3\to(0,\ -3)\\\\for\ x=-1\to y=-3(-1)-3=3-3=0\to(-1,\ 0)[/tex]

[tex]y\geq\dfrac{1}{3}x-3[/tex]

solid line. we shade above the line

[tex]y > -3x-3[/tex]

the dotted line. shadow above the line

Answer in the attachment (the first graph).

Ver imagen gmany
danieltirado

Answer:

The first graph (picture of the graph attached)

Step-by-step explanation:

We have two inequalities:

3y ≥ x-9

3x+y > -3

We have to see which graph represents the solution to these inequalities.

We are going to solve for some values of x:

First inequality 3y ≥ x-9

y ≥ (x-9) / 3

If we give values to x then we solve for y:

x             y

-2            -3.67

0             -3

2              -2.34

4              1-67

With these values, we can graph the first line, which is continuous because the inequality has

And because it is greater or equal to the shaded region is everything up from the line.

The second inequality 3x+y > -3

y > -3 - 3x

x            y

-4           9

-2           3

0            -3

Now we can graph the second inequality which will be a continuous line because it only has >

The shaded region has to be up from the line because it is greater than.

Ver imagen danieltirado

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