Respuesta :

carlosego

Answer: F (False)

Step-by-step explanation:

To solve this problem you can apply the proccedure shown below:

 Substitute x=3 and y=8 into the inequality given in the problem, which is:

[tex]y<|x-2|+7[/tex]

Then:

[tex]y<|x-2|+7\\8<|3-2|+7\\8<1+8[/tex]

[tex]8<8[/tex] (This is not true)

The symbol < means "less than" and 8 is not less than 8, therefore, the answer is:

F (False)

zainebamir540

Answer:

F Choice B is correct. The ordered pair (3, 8) is a solution to the inequality   y<|x-2|+7.  

Step-by-step explanation:

We have given an inequality:

y<|x-2|+7

We have to check, Is (3,8) is the solution of inequality or not?

Put y = 8 and x = 3 in the inequality we get,

y<|x-2|+7

8 < I(3)-2I +7

8 < I3-2I +7

8< 1+7

8<8

It is false because 8 is not less then 8.

Therefore, it is false that  (3,8) is the solution of inequality.

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