Area and Perimeter Word Problem Worksheets

Word problems involving area and perimeter can be a great way to challenge students' critical thinking skills and reinforce their understanding of these mathematical concepts. Whether you are a teacher searching for engaging worksheets to supplement your classroom instruction or a parent looking for additional practice for your child, our carefully crafted area and perimeter word problem worksheets are designed to assist students in mastering these fundamental topics.

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  6th Grade Math Word Problems

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What is the area of a rectangular garden that measures 8 meters by 12 meters?

The area of the rectangular garden is 96 square meters. This is calculated by multiplying the length (8 meters) by the width (12 meters) of the garden.

A square field has a perimeter of 36 meters. What is the length of each side?

The length of each side of the square field is 9 meters, as the perimeter is the sum of all four sides, so dividing 36 meters by 4 gives you the length of each side.

A triangular plot of land has a base of 20 feet and a height of 12 feet. What is its area?

The area of a triangle is calculated using the formula: Area = 1/2 * base * height. Substituting the values given, the area of the triangular plot of land with a base of 20 feet and a height of 12 feet is calculated as follows: 1/2 * 20 * 12 = 120 square feet. Hence, the area of the triangular plot of land is 120 square feet.

A rectangular swimming pool has a length of 25 meters and a width of 15 meters. What is its perimeter?

The perimeter of the rectangular swimming pool is 80 meters calculated by adding all sides together (25m + 25m + 15m + 15m).

A circular rug has a diameter of 10 feet. What is its area?

The area of a circular rug with a diameter of 10 feet can be calculated using the formula for the area of a circle, which is A = ?r^2. Since the diameter is 10 feet, the radius (r) is half of that, so r = 5 feet. Plugging this into the formula, the area of the circular rug is A = ?(5)^2 = 25? square feet, or approximately 78.54 square feet.

A square patio has a perimeter of 48 feet. What is the length of each side?

The length of each side of the square patio is 12 feet, as the perimeter of a square is calculated by adding up the lengths of all four sides, so 48 feet divided by 4 sides equals 12 feet per side.

A rectangular room measures 10 feet by 15 feet. What is its perimeter?

The perimeter of the rectangular room is 50 feet, calculated by adding the measurement of all four sides, which are two sides measuring 10 feet each and two sides measuring 15 feet each. So, 10 + 10 + 15 + 15 = 50 feet.

A triangular banner has a base of 6 meters and a height of 9 meters. What is its area?

The area of a triangular banner with a base of 6 meters and a height of 9 meters is 27 square meters. This can be calculated by using the formula for the area of a triangle, which is 1/2 times base times height. In this case, 1/2 * 6 * 9 = 27 square meters.

A rectangular picnic table measures 6 feet by 4 feet. What is its area?

The area of the rectangular picnic table is 24 square feet, calculated by multiplying the length (6 feet) by the width (4 feet).

A circular garden has a radius of 5 meters. What is its perimeter?

The perimeter of the circular garden is equal to the circumference of the circle, which is calculated using the formula 2?r, where r is the radius. With a radius of 5 meters, the perimeter of the garden is 2?(5) = 10? meters, or approximately 31.42 meters.