Which ordered pairs make both inequalities true? Check all that apply.

y < 5x + 2

y > x + 1

(–3, 2)

(–1, 3)

(0, 2)

(1, 2)

(2, –1)

(2, 2)

To prove if a point satisfies the inequalities,find the point in the point that both inequalities overlap. In the picture, this is colored purple (both pink and blue/purple).

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lisboa lisboa · Answer 2 · 2019-05-24T05:41:48+02:00

Answer:

(1,2) and (2,2) makes true

Step-by-step explanation:

y < 5x + 2

y >=1/2(x) + 1

(–3, 2)

Plug in the ordered pair (x,y) in each inequality

2 < 5(-3) + 2 -----> false

(–1, 3)

3< 5(-1) + 2 --------> false

(0, 2)

2 < 5(0) + 2 -------> false

(1, 2)

2 < 5(1) + 2 ---------> True

2 >=(1/2)1 + 1 ----------->True

(2, –1)

-1 < 5(2) + 2 ---------> True

-1>= (1/2)(2) + 1 -----------> false

(2, 2)

2 < 5(2) + 2 ---------> True

2>= (1/2)(2) + 1 -----------> True

Which ordered pairs make both inequalities true? Check all that apply. y < 5x + 2 y > x + 1 (–3, 2) (–1, 3) (0, 2) (1, 2) (2, –1) (2, 2)

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Which ordered pairs make both inequalities true? Check all that apply.

y < 5x + 2

y > x + 1

(–3, 2)

(–1, 3)

(0, 2)

(1, 2)

(2, –1)

(2, 2)