Answer:
The range of the distance from A to C is greater than 12.3 feet and less than 32.1 feet.
Step-by-step explanation:
Triangle Inequality Theorem
The measure of any side of a triangle must be less than the sum of the measures of the other two sides.
Given:
Taking AB to be the longest side of the triangle.
The measure of AB must be less than the sum of AC and BC:
⇒ AB < AC + BC
⇒ 22.2 < AC + 9.9
⇒ 22.2 - 9.9 < AC
⇒ 12.3 < AC
⇒ AC > 12.3 ft
Taking AC to be the longest side of the triangle.
The measure of AC must be less than the sum of AB and BC:
⇒ AC < AB + BC
⇒ AC < 22.2 + 9.9
⇒ AC < 32.1 ft
Therefore, the range of the distance from A to C is greater than 12.3 feet and less than 32.1 feet.