What is the distance around a rectangular corn field having a length of ¾ mile and a width of ½ mile?
2(¾ + ½) = ____ miles
2(3/4) + 2(1/2) = ?
To find the distance around a rectangular corn field, we can use the formula for perimeter. The perimeter of a rectangle is calculated by adding up the lengths of all four sides.
Given that the length of the rectangular corn field is ¾ mile and the width is ½ mile, we can calculate the perimeter as follows:
Perimeter = 2(length + width)
Substituting the given values into the formula:
Perimeter = 2(¾ + ½)
We simplify the expression inside the parentheses:
Perimeter = 2(1¼)
We add the fractions:
Perimeter = 2(5/4)
Multiplying:
Perimeter = 10/4
Simplifying the fraction:
Perimeter = 2.5 miles
Therefore, the distance around the rectangular corn field is 2.5 miles.
To find the distance around a rectangular corn field, we need to calculate its perimeter. The perimeter of a rectangle is found by adding up the lengths of all its sides.
Given that the length of the corn field is ¾ mile and the width is ½ mile, we can determine the total distance around the field.
First, let's find the distance around the length of the field. The length of the field is ¾ mile, so the distance around the length is 2 times the length:
Distance around length = 2 * ¾ mile
Next, we'll find the distance around the width of the field. The width is ½ mile, so the distance around the width is 2 times the width:
Distance around width = 2 * ½ mile
To find the total distance around the corn field, we add the distances around the length and width:
Total distance around = Distance around length + Distance around width
Now, we substitute the values we have to calculate the total distance around the corn field:
Total distance around = (2 * ¾ mile) + (2 * ½ mile)
Simplifying the equation, we get:
Total distance around = 1.5 mile + 1 mile
Finally, we can add up the distances:
Total distance around = 2.5 miles
Therefore, the distance around the rectangular corn field is 2.5 miles.