Calculate the area of the parallelogram=
10in/12 in/3ln
15 inches squared
25 inch squared
30 inch squared
36 inch squared
You're welcome! If you have any more questions, feel free to ask.
What about all the answers
I apologize for the confusion. The correct answer is 30 inch squared.
6. What is the area of the composite figure? (6.GM.1) *
85 inches squared
469 inches squared
488 inches squared
602 inches squared
I cannot accurately answer this question without an accompanying image or description of the composite figure. Can you please provide more information?
The rectangle is 17 inches long, 22 inches tall.
The triangle is 19 inches long, 12 inches tall
The area of the composite figure is:
Area of rectangle + Area of triangle
= (17 x 22) + (1/2 x 19 x 12)
= 374 + 114
= 488 inches squared
Therefore, the answer is 488 inches squared.
Thank you 🙏🏼 😊
7. Jaime is finding the area of the hexagon shown. Each side of the hexagon is the same length. Which statement best explains how Jaime can find the area of the hexagon? (6.GM.1)
Hexagon: 4.62 inches long and 8 inches tall
To find the area of a regular hexagon, Jaime can follow these steps:
1. Find the length of one side of the hexagon.
2. Use the formula A = (3√3 / 2) x s^2, where A is the area of the hexagon and s is the length of one side, to calculate the area of the hexagon.
In this case, since each side of the hexagon is the same length, Jaime just needs to find the length of one side.
However, the dimensions provided are for a rectangle, not a hexagon. Without more information, it is not possible to accurately answer this question.
11. A right rectangular prism has a height of 17.5 centimeters. The area * of the base of the prism is 18 square centimeters. What is the volume, in cubic centimeters, of the right rectangular prism? (6.GM.2)
The volume of a right rectangular prism can be found using the formula:
Volume = Base area x Height
In this case, the area of the base is given as 18 square centimeters and the height is given as 17.5 centimeters. So, we can plug these values into the formula to find the volume:
Volume = 18 cm^2 x 17.5 cm
Volume = 315 cm^3
Therefore, the volume of the right rectangular prism is 315 cubic centimeters.
12. The volume of a three-dimensional shape measures the of the figure. (6.GM.2)
The volume of a three-dimensional shape measures the amount of space enclosed by the figure. It is usually measured in cubic units (such as cubic centimeters, cubic inches, or cubic meters).
13. Calculate the surface area. (6.GM.4) *
The 3d rectangle is 10m long, 7m wide, 6m tall
To find the surface area of a rectangular prism (3d rectangle), we need to add up the area of each face.
Area of the top and bottom faces: Length x Width
= 10m x 7m
= 70 sq. m (square meters)
Area of the front and back faces: Height x Width
= 6m x 7m
= 42 sq. m
Area of the left and right faces: Height x Length
= 6m x 10m
= 60 sq. m
Total surface area = (2 x top/bottom area) + (2 x front/back area) + (2 x left/right area)
= (2 x 70 sq. m) + (2 x 42 sq. m) + (2 x 60 sq. m)
= 140 sq. m + 84 sq. m + 120 sq. m
= 344 sq. m
Therefore, the surface area of the rectangular prism is 344 square meters.
14. The net below represents a rectangular prism. What is the surface * area of the rectangular prism? (6.GM.4)
Rectangle: 9 inches long, 3 inches wide, 6 inches tall
The net provided shows three pairs of congruent rectangles:
1. The top and bottom faces, each with dimensions 9 inches by 3 inches.
2. The front and back faces, each with dimensions 6 inches by 3 inches.
3. The left and right faces, each with dimensions 6 inches by 9 inches.
To find the surface area of the rectangular prism, we will need to add up the area of each rectangle.
Surface area = (2 * area of top/bottom face) + (2 * area of front/back face) + (2 * area of left/right face)
Area of top/bottom face = length * width = 9 inches * 3 inches = 27 square inches
Area of front/back face = height * width = 6 inches * 3 inches = 18 square inches
Area of left/right face = height * length = 6 inches * 9 inches = 54 square inches
Surface area = (2 * 27 square inches) + (2 * 18 square inches) + (2 * 54 square inches)
Surface area = (54 square inches) + (36 square inches) + (108 square inches)
Surface area = 198 square inches
Therefore, the surface area of the rectangular prism is 198 square inches.
15. The net below represents a cube. What is the surface area of the cube? (6.GM.4)
Cube: 1.2 cm long, 1.2 cm tall, 1.2 cm wide
The net provided shows six congruent square faces, each with dimensions 1.2 cm by 1.2 cm.
To find the surface area of the cube, we will need to add up the area of each square face.
Surface area = (6 * area of each square face)
Area of each square face = length * width = 1.2 cm * 1.2 cm = 1.44 square cm
Surface area = (6 * 1.44 square cm)
Surface area = 8.64 square cm
Therefore, the surface area of the cube is 8.64 square cm.
16. Calculate the surface area. (6.GM.4)
Triangular prism: 10 inches long, 4 inches wide, 3 inches tall
A triangular prism has two congruent triangular bases and three rectangular faces.
To find the surface area of the triangular prism, we need to find the area of each face and add them together.
Area of one triangular base = (1/2) x base x height
= 0.5 x 4 in x 3 in
= 6 in^2
Since there are two triangular bases, the total area of the bases is 2 x 6 in^2 = 12 in^2
To find the area of each rectangular face, we use the formula: length x width.
Area of one rectangular face = length x width
= 10 in x 3 in
= 30 in^2
Since there are three rectangular faces, the total area of the rectangular faces is 3 x 30 in^2 = 90 in^2.
Now, we can find the total surface area by adding the area of the two triangular bases to the area of the three rectangular faces:
Total surface area = area of bases + area of rectangular faces
= 12 in^2 + 90 in^2
= 102 in^2
Therefore, the surface area of the triangular prism is 102 square inches.
Calculate the surface area. (6.GM.4)
Triangular prism: 5 inches long, 4 inches tall , 3 inches wide
A triangular prism has two congruent triangular bases and three rectangular faces.
To find the surface area of the triangular prism, we need to find the area of each face and add them together.
Area of one triangular base = (1/2) x base x height
= 0.5 x 3 in x 4 in
= 6 in^2
Since there are two triangular bases, the total area of the bases is 2 x 6 in^2 = 12 in^2
To find the area of each rectangular face, we use the formula: length x width.
Area of one rectangular face = length x width
= 5 in x 3 in
= 15 in^2
Since there are three rectangular faces, the total area of the rectangular faces is 3 x 15 in^2 = 45 in^2.
Now, we can find the total surface area by adding the area of the two triangular bases to the area of the three rectangular faces:
Total surface area = area of bases + area of rectangular faces
= 12 in^2 + 45 in^2
= 57 in^2
Therefore, the surface area of the triangular prism is 57 square inches.
17. What is the surface area, in square centimeters, of the tissue box shown below? (6.GM.4)
Triangular prism: 10cm long, 6cm wide, 8cm tall, 10cm across/long
A triangular prism has two congruent triangular bases and three rectangular faces.
To find the surface area of the triangular prism, we need to find the area of each face and add them together.
Area of one triangular base = (1/2) x base x height
= 0.5 x 6 cm x 8 cm
= 24 cm^2
Since there are two triangular bases, the total area of the bases is 2 x 24 cm^2 = 48 cm^2.
To find the area of each rectangular face, we use the formula: length x width.
Area of one rectangular face = length x width
= 10 cm x 6 cm
= 60 cm^2
Since there are three rectangular faces, the total area of the rectangular faces is 3 x 60 cm^2 = 180 cm^2.
Now, we can find the total surface area by adding the area of the two triangular bases to the area of the three rectangular faces:
Total surface area = area of bases + area of rectangular faces
= 48 cm^2 + 180 cm^2
= 228 cm^2
Therefore, the surface area of the triangular prism (tissue box) is 228 square centimeters.