Final Answer:
The perimeter of the five-sided lot with sides measuring 44, 67, 91, 18, and 55 units is 275 units.
Step-by-step explanation:
To find the perimeter of a five-sided lot, you add together the lengths of all five sides. Given the side lengths are 44, 67, 91, 18, and 55 units, add them together:
44 + 67 + 91 + 18 + 55 = 275 units. Therefore, the perimeter of the lot is 275 units.
A perimeter is the total distance around a shape, in this case, a five-sided lot. Each side length contributes to the overall boundary. Adding the individual side lengths together yields the total perimeter of the lot. For this particular lot, the sum of all five sides equates to 275 units.
Understanding the concept of perimeter helps in determining the total distance needed to enclose or border a given shape. In this instance, calculating the sum of the lengths of the sides is crucial to find the perimeter accurately. By adding all the lengths provided, we arrive at the total perimeter of the five-sided lot, which is 275 units.