The length measurement of the third side of the triangular playground whose two sides are 24 ft and 30 ft long should be more than 6 but less than 54.
<h3>What is triangle inequality theorem?</h3>
Triangle inequality theorem of a triangle says that the sum of the two sides of a triangle is always greater than the third side.
Suppose a, b and c are the three sides of a triangle. Thus according to this theorem,
(a+b)>c
(b+c)>a
(c+a)>b
There is a triangular playground. The measurements of two sides of a triangular playground are 24 feet and 30 feet.
Suppose the length of the measurement of the third side of the triangular playground is <em>c</em> meters.
As the two sides are 24 ft and 30 ft long. Thus, by the triangle inequality theorem,
![24+30 > c\\54 > c](https://tex.z-dn.net/?f=24%2B30%20%3E%20c%5C%5C54%20%3E%20c)
For the sides 24 ft and c ft,
![24+c > 30\\c > 30-24\\c > 6](https://tex.z-dn.net/?f=24%2Bc%20%3E%2030%5C%5Cc%20%3E%2030-24%5C%5Cc%20%3E%206)
Thus, the length measurement of the third side of the triangular playground whose two sides are 24 ft and 30 ft long should be more than 6 but less than 54.
Learn more about the triangle inequality theorem here;
brainly.com/question/26037134