< To help you cognitively understand the size of a ship with an area of 924,328 square meters and a 0.165 km perimeter, let’s break down the dimensions using two different shapes: a rectangle and a circle. These shapes will give you a general idea of the size, although the real shape of a ship seen from above would be more complex.

Rectangle: Let’s assume a rectangular shape for the ship. If we have a 0.165 km perimeter, that is equal to 165 meters. For a rectangle, the perimeter is given by the formula P = 2l + 2w, where P is the perimeter, l is the length, and w is the width. Let’s assume the length is three times the width: l = 3w

Substitute this into the perimeter equation and solve for the width: 165 = 2(3w) + 2w 165 = 8w w ≈ 20.625 meters

Now find the length: l = 3 * 20.625 ≈ 61.875 meters

Now we have a rectangle with dimensions of approximately 61.875 meters by 20.625 meters. The total area would be 61.875 * 20.625 ≈ 1,275 square meters. Note that this does not match the given area of 924,328 square meters because the actual shape of the ship is more complex than a simple rectangle.

Circle: Now let’s assume a circular shape for the ship. The given circumference is equivalent to the perimeter in this case. The formula for the circumference of a circle is C = 2πr, where...