Mack has a field that measures 1 square mile. He is planting corn in a rectangular region of the field that is 34 mile long and 12 mile wide.
Which is the area of the corn crop in Mack's field?
To find the area of the corn crop, we need to multiply the length and width of the rectangular region.
Given:
Length = 34 miles
Width = 12 miles
Area = Length x Width
Substituting the given values:
Area = 34 miles x 12 miles
Calculating the product:
Area = 408 square miles
Therefore, the area of the corn crop in Mack's field is 408 square miles.
To find the area of the corn crop in Mack's field, we need to multiply the length of the rectangular region by its width.
Given that the length is 34 miles and the width is 12 miles, we can use the formula:
Area = Length * Width
Area = 34 miles * 12 miles
Area = 408 square miles
Therefore, the area of the corn crop in Mack's field is 408 square miles.
You need to learn how to write fractions. As always, area = length * width. In this case, that is
3/4 mi * 1/2 mi = 3/8 mi^2