A pharmacy claims that the average medication costs $32 but it could differ as much as $8. Write and solve an absolute value inequality to determine the range of medication costs at this pharmacy.

A) |x − 32| ≥ 8; The medication costs range from $24 to $40
B)|x − 32| ≥ 8; The medications cost less than $24 or greater than $40.
C) |x − 32| ≤ 8; The medication costs range from $24 to $40
D) |x − 32| ≤8; The medications cost less than $24 or greater than $40.

So,

We can tell that the most expensive medication costs $40 and the cheapest costs $24. Thus, only options A and C are left.

To see which inequality is true, test a value, such as $30, in the equation in option C.

|30 - 32| ≤ 8
|-2| ≤ 8
2 ≤ 8

Option C is correct.

Answer Link

flightbath flightbath · Answer 2 · 2018-11-29T12:43:24+01:00

Answer:

Therefore, Option C is correct that is [tex]|x-32|\leq8|{\text{the medication costs range from $24to $40}[/tex].

Step-by-step explanation:

We have given medication cost $32

Since, we have given as much as 8 so the inequality will maximum goes upto 8.

[tex]|x-32|\leq8[/tex]

Now, we will solve the inequality for x we will get

We will first open the modulus function by its definition we will get

which is |x| is +x and -x

[tex](x-32)\leq8[/tex]

[tex]x=32+8=40[/tex]

[tex]x=40[/tex]

And [tex]-(x-32)\leq8[/tex]

[tex]-x+32=8[/tex]

[tex]x=24[/tex]

Therefore, Option C is correct