Ask Question
10 May, 16:51

A cable company claims that the average household pays $78 a month for a basic cable plan, but it could differ by as much as $20. Write an absolute value inequality to determine the range of basic cable plan costs with this cable company.

+5
Answers (1)
  1. 10 May, 17:08
    0
    The required absolute inequality is |x - 78| ≤ 20.

    Step-by-step explanation:

    Consider the provided information.

    Let $x is monthly charge.

    The monthly charges for a basic cable plan = $78

    it is given that it could differ by as much as $20

    So, the maximum charges can be $78 + $20,

    And, the minimum charges can be $78 - $20,

    The value of x is lies from $78 - $20 to $78 + $20

    Which can be written as:

    78 - 20 ≤ x and x ≤ 78 + 20

    -20 ≤ x - 78 and x - 78 ≤ 20

    Change the sign of inequality if multiplying both side by minus.

    20 ≥ - (x - 78) and x - 78 ≤ 20

    ⇒ |x - 78| ≤ 20

    Thus, the required absolute inequality is |x - 78| ≤ 20.
Know the Answer?
Not Sure About the Answer?
Get an answer to your question ✅ “A cable company claims that the average household pays $78 a month for a basic cable plan, but it could differ by as much as $20. Write an ...” in 📙 Mathematics if there is no answer or all answers are wrong, use a search bar and try to find the answer among similar questions.
Search for Other Answers