Surface Area of Triangular Prisms Quick Check
3 of 53 of 5 Items
Question
Use the image to answer the question.
An illustration shows a two-dimensional net of a triangular prism with all of its sides open and visible. The net appears as three horizontal parallelograms joined next to each other. All 4 sides of the middle parallelogram are drawn with dashed lines. The width of the parallelograms is 4 centimeters. The length of the middle parallelogram is 12 centimeters. Two right triangles adjoin the middle parallelogram on the top and bottom 12 centimeter sides, with their hypotenuse sides measuring 15 centimeters and the perpendicular sides measuring 9 centimeters. Right angles are shown at the intersection of the perpendicular sides and the base sides of the triangles.
What is the surface area of the triangular prism whose net is shown?
(1 point)
Responses
216 cm2
, , 216 cm squared
252 cm2
252 cm squared
108 cm2
, 108 cm squared
198 cm2
, 198 cm squared
9 answers
Base area = area of the middle parallelogram = length * width = 12 * 4 = 48 cm^2
Lateral area = 2 * (area of one triangle) + 2 * (area of one parallelogram)
Area of one triangle = 1/2 * base * height = 1/2 * 12 * 9 = 54 cm^2
So, area of both triangles = 2 * 54 = 108 cm^2
Area of one parallelogram = length * width = 12 * 4 = 48 cm^2
So, area of two parallelograms = 2 * 48 = 96 cm^2
Now, lateral area = 108 + 96 = 204 cm^2
Surface Area = 2(48) + 204 = 96 + 204 = 300 cm^2
Therefore, the correct answer is 300 cm^2.
Base area = area of the middle parallelogram = length * width = 12 * 4 = 48 cm^2
Lateral area = 2 * (area of one triangle) + 2 * (area of one parallelogram)
Area of one triangle = 1/2 * base * height = 1/2 * 12 * 9 = 54 cm^2
So, area of both triangles = 2 * 54 = 108 cm^2
Area of one parallelogram = length * width = 12 * 4 = 48 cm^2
So, area of two parallelograms = 2 * 48 = 96 cm^2
Now, lateral area = 108 + 96 = 204 cm^2
Surface Area = 2(48) + 204 = 96 + 204 = 300 cm^2
Therefore, the surface area of the triangular prism is 300 cm^2. Thank you for bringing this to my attention.
3 of 53 of 5 Items
Question
Use the image to answer the question.
An illustration shows a two-dimensional net of a triangular prism with all of its sides open and visible. The net appears as three horizontal parallelograms joined next to each other. All 4 sides of the middle parallelogram are drawn with dashed lines. The width of the parallelograms is 4 centimeters. The length of the middle parallelogram is 12 centimeters. Two right triangles adjoin the middle parallelogram on the top and bottom 12 centimeter sides, with their hypotenuse sides measuring 15 centimeters and the perpendicular sides measuring 9 centimeters. Right angles are shown at the intersection of the perpendicular sides and the base sides of the triangles.
What is the surface area of the triangular prism whose net is shown?
(1 point)
Responses
216 cm2
, , 216 cm squared
252 cm2
252 cm squared
108 cm2
, 108 cm squared
198 cm2
, 198 cm squared
PICK ONE OF THOSE ANSWERS AND SHOW WORK
1. Base Area (Middle Parallelogram):
Length = 12 cm
Width = 4 cm
Base Area = Length * Width
= 12 * 4
= 48 cm^2
2. Lateral Area:
- There are two triangles and two parallelograms.
Triangle Area:
Base = 12 cm
Height = 9 cm
Triangle Area = 0.5 * Base * Height
= 0.5 * 12 * 9
= 54 cm^2
Total Triangle Area = 2 * 54
= 108 cm^2
Parallelogram Area:
Area of one parallelogram = Length * Width
= 12 * 4
= 48 cm^2
Total Parallelogram Area = 2 * 48
= 96 cm^2
Lateral Area = Total Triangle Area + Total Parallelogram Area
= 108 + 96
= 204 cm^2
Total Surface Area:
Surface Area = 2 * Base Area + Lateral Area
= 2 * 48 + 204
= 96 + 204
= 300 cm^2
Therefore, the correct answer is 300 cm^2.
Base Area (Middle Parallelogram):
Length = 12 cm
Width = 4 cm
Base Area = Length * Width = 12 * 4 = 48 cm^2
Lateral Area:
Triangles:
Base = 12 cm
Height = 9 cm
Area of one triangle = 0.5 * base * height = 0.5 * 12 * 9 = 54 cm^2
Total area of both triangles = 2 * 54 = 108 cm^2
Parallelograms:
Area of one parallelogram = Length * Width = 12 * 4 = 48 cm^2
Total area of both parallelograms = 2 * 48 = 96 cm^2
Lateral Area = Total triangle area + Total parallelogram area = 108 + 96 = 204 cm^2
Total Surface Area:
Surface Area = 2 * Base Area + Lateral Area = 2 * 48 + 204 = 96 + 204 = 300 cm^2
Therefore, the correct surface area of the triangular prism is 300 cm^2.