The area of a rectangle is given by the formula:
Area = base x height
Substitute the given values:
Area = 4.5 ft x 2.5 ft
Area = 11.25 square feet
Therefore, the area of the flag is 11.25 square feet. The closest answer is 11.25.
a flag in the shape of a rectangle has a base of 4.5 feet and a height of 2.5 feet. what is the are of the flag
11.25
8
5.625
7
11 answers
cjhristoper cuts a pice of paper in a square each side of the square measures 7 inches what is the are of the square
The area of a square is given by the formula:
Area = side x side
Substitute the given side length:
Area = 7 inches x 7 inches
Area = 49 square inches
Therefore, the area of the square is 49 square inches.
Area = side x side
Substitute the given side length:
Area = 7 inches x 7 inches
Area = 49 square inches
Therefore, the area of the square is 49 square inches.
find the are of a right triangle with measures 7 in 25 in and 24 in
To find the area of a right triangle, you can use the formula:
Area = 1/2 x base x height
Given the measures of the sides of the right triangle:
Base = 7 inches
Height = 24 inches
Area = 1/2 x 7 inches x 24 inches
Area = 3.5 x 24
Area = 84 square inches
Therefore, the area of the right triangle is 84 square inches.
Area = 1/2 x base x height
Given the measures of the sides of the right triangle:
Base = 7 inches
Height = 24 inches
Area = 1/2 x 7 inches x 24 inches
Area = 3.5 x 24
Area = 84 square inches
Therefore, the area of the right triangle is 84 square inches.
triangle the height of the triange is 10 inches at the base of the triangle is 6 if a scale if the triangle ona. drawing was.3 inches whats the height of the drawing
To find the height of the triangle on the drawing, you can use the scale factor.
Given:
Actual height of the triangle = 10 inches
Actual base of the triangle = 6 inches
Scale of the triangle on the drawing = 0.3 inches
First, let's find the scale factor:
Scale factor = Actual length on drawing / Actual length
Scale factor = 0.3 inches / 6 inches
Scale factor = 0.05
Now, to find the height of the triangle on the drawing:
Height of the triangle on the drawing = Actual height * Scale factor
Height of the triangle on the drawing = 10 inches * 0.05
Height of the triangle on the drawing = 0.5 inches
Therefore, the height of the triangle on the drawing is 0.5 inches.
Given:
Actual height of the triangle = 10 inches
Actual base of the triangle = 6 inches
Scale of the triangle on the drawing = 0.3 inches
First, let's find the scale factor:
Scale factor = Actual length on drawing / Actual length
Scale factor = 0.3 inches / 6 inches
Scale factor = 0.05
Now, to find the height of the triangle on the drawing:
Height of the triangle on the drawing = Actual height * Scale factor
Height of the triangle on the drawing = 10 inches * 0.05
Height of the triangle on the drawing = 0.5 inches
Therefore, the height of the triangle on the drawing is 0.5 inches.
3 7 10 or 5
The correct height of the triangle on the drawing, based on the given scale factor and actual height, is 0.5 inches. It seems like the available answer options are not aligned with the correct answer provided. The correct answer is not listed among the options provided.
explain how you would find the area of this compite shpae what is the area of this shape?
centimeters: 3 cm 2 cm 3 cm 6 cm 8 cm 6 cm
centimeters: 3 cm 2 cm 3 cm 6 cm 8 cm 6 cm
To find the area of this composite shape, you first need to determine the individual areas of the different shapes and then add them up to find the total area.
The composite shape is made up of multiple shapes - a rectangle (6 cm by 8 cm), another rectangle (3 cm by 6 cm), and two squares (both sides measure 3 cm and 2 cm respectively).
1. Area of the first rectangle: 6 cm * 8 cm = 48 square cm
2. Area of the second rectangle: 3 cm * 6 cm = 18 square cm
3. Area of the two squares:
- First square: 3 cm * 3 cm = 9 square cm
- Second square: 2 cm * 2 cm = 4 square cm
Now, calculate the total area of the composite shape by adding up these individual areas:
Total area = 48 cm^2 (first rectangle) + 18 cm^2 (second rectangle) + 9 cm^2 (first square) + 4 cm^2 (second square)
Total area = 79 square centimeters
Therefore, the area of this composite shape is 79 square centimeters.
The composite shape is made up of multiple shapes - a rectangle (6 cm by 8 cm), another rectangle (3 cm by 6 cm), and two squares (both sides measure 3 cm and 2 cm respectively).
1. Area of the first rectangle: 6 cm * 8 cm = 48 square cm
2. Area of the second rectangle: 3 cm * 6 cm = 18 square cm
3. Area of the two squares:
- First square: 3 cm * 3 cm = 9 square cm
- Second square: 2 cm * 2 cm = 4 square cm
Now, calculate the total area of the composite shape by adding up these individual areas:
Total area = 48 cm^2 (first rectangle) + 18 cm^2 (second rectangle) + 9 cm^2 (first square) + 4 cm^2 (second square)
Total area = 79 square centimeters
Therefore, the area of this composite shape is 79 square centimeters.
58 answers