Question

The area of a rectangular garden is 3366ft^(2). If the width of the garden is 51 feet, what is its length?

Answer 1

To calculate the length of the rectangular garden, divide the area (3366ft^2) by the width (51ft), resulting in a length of 66ft.

Step-by-step explanation:

To find the length of the rectangular garden, we can divide the area of the garden by its width. The area of the garden is given as 3366ft2, and the width is given as 51 feet.

Using the formula for the area of a rectangle (Area = length × width), we can solve for the length by rearranging the formula:

Length = Area / Width

Substituting the given values:

Length = 3366ft2 / 51ft = 66ft

Therefore, the length of the garden is 66 feet.

Answer 2

The length of the rectangular garden is 66 feet, calculated by dividing the given area of the garden, 3366 ft², by the width, which is 51 feet.

Step-by-step explanation:

To find the length of the rectangular garden when the area is given as 3366 ft² and the width is 51 feet, we can use the formula for the area of a rectangle which is Area = length × width. Since we have the area and the width, we can rearrange this formula to solve for the length: length = Area ∕ width.

Using the given values, we get: length = 3366 ft² ∕ 51 ft. When we divide 3366 by 51, we find that the length is 66 feet.

The length of the rectangular garden is therefore 66 feet.