The tent below is shaped like a triangular prism. EXPLAIN how you would determine the surface area of the tent to find the amount of fabric needed to make the tent. Remember to describe each face of the triangular prism.
length 8
with 5
height 4
the length of one of the triangle sides 4.75
How many vertices does a triangular prism have?(1 point) Responses 5 5 6 6 8 8 12
How many faces does a cube have?(1 point) Responses 4 4 5 5 6 6 8
What is the surface area of the figure above? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 78 centimeters squared 78 centimeters squared 92 centimeters squared 92 centimeters squared 84 centimeters squared 84 centimeters squared 66 centimeters squared
What is the surface area of the figure above? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 52 centimeters squared 52 centimeters squared 192 centimeters squared 192 centimeters squared 160 centimeters squared 160 centimeters squared 184 centimeters squared
Find the surface area of a cube with the sides measuring 10 feet. Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 100 square feet 100 square feet 1000 square feet 1000 square feet 60 square feet 60 square feet 600 square feet
Stacey needs to buy some cardboard to build a box 10 inches long, 9 inches wide, and 7 inches high. If she purchases 500 square inches of cardboard, how much will be left over? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 446 square inches 446 square inches 54 square inches 54 square inches 426 square inches 426 square inches 406 square inches
A wedge of cheese is shaped like a triangular prism. How much plastic wrap is needed to cover the wedge of cheese? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 287 centimeters squared 287 centimeters squared 330 centimeters squared 330 centimeters squared 810 centimeters squared 810 centimeters squared 240 centimeters squared 240 centimeters squared Skip to navigation
Jordan purchased a piece of fabric that is 18 cm by 18 cm in order to make a tent for her little sister’s dolls. Using the dimensions for the tent shaped like a triangular prism, how much fabric will be left over? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 184 centimeters squared 184 centimeters squared 324 centimeters squared 324 centimeters squared 84 centimeters squared 84 centimeters squared 240 centimeters squared
DO NOT use the answers the bot gave you instead here are the real answers:
6
6
84
184
600
54
330
84
your welcome.
The person above who gave these answers is 100% correct thanks to her/him I got them all correct.
6
6
84
184
600
54
330
84
To determine the surface area of the tent shaped like a triangular prism, we need to calculate the area of each face and then add them together.
1. The two triangular faces have a base of 5 and a height of 4.75. The area of each triangular face would be (1/2) * base * height = (1/2) * 5 * 4.75 = 11.875 square units for each face. Since there are two triangular faces, the total area for the triangular faces would be 11.875 * 2 = 23.75 square units.
2. The three rectangular faces have areas that can be calculated as length * width. The three rectangular faces have dimensions 8x5, 5x4.75, and 8x4.75. The total area for the rectangular faces would be 8*5 + 5*4.75 + 8*4.75 = 40 + 23.75 + 38 = 101.75 square units.
Therefore, the total surface area of the tent would be the sum of the areas of the triangular faces and rectangular faces: 23.75 + 101.75 = 125.5 square units.
A triangular prism has 6 vertices and a cube has 6 faces.
The surface area of the figure above is 84 centimeters squared.
The surface area of the figure above is 160 centimeters squared.
The surface area of a cube with sides measuring 10 feet is 600 square feet.
If Stacey purchases 500 square inches of cardboard to build a box with dimensions 10x9x7 inches, the surface area of the cardboard needed to build the box would be 2(10x9) + 2(10x7) + 2(9x7) = 180 + 140 + 126 = 446 square inches. So, there will be 500 - 446 = 54 square inches left over.
To cover the wedge of cheese shaped like a triangular prism, the plastic wrap needed would be 287 centimeters squared.
If Jordan purchased a piece of fabric measuring 18x18 cm to make a tent, using the dimensions for the tent shaped like a triangular prism, the surface area needed would be 84 centimeters squared, hence there would be 18 - 84 = 6 square centimeters left over.
What is the surface area of the figure above? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 78 centimeters squared 78 centimeters squared 92 centimeters squared 92 centimeters squared 84 centimeters squared 84 centimeters squared 66 centimeters squared.
length 6
with 4
height 3
length for the triangle part 5
What is the surface area of the figure above? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 52 centimeters squared 52 centimeters squared 192 centimeters squared 192 centimeters squared 160 centimeters squared 160 centimeters squared 184 centimeters squared
length 8
with 5
height 4
A wedge of cheese is shaped like a triangular prism. How much plastic wrap is needed to cover the wedge of cheese? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 287 centimeters squared 287 centimeters squared 330 centimeters squared 330 centimeters squared 810 centimeters squared 810 centimeters squared 240 centimeters squared
length 9
with 12
height 5
length for the triangle part 13
Jordan purchased a piece of fabric that is 18 cm by 18 cm in order to make a tent for her little sister’s dolls. Using the dimensions for the tent shaped like a triangular prism, how much fabric will be left over? Georgia Milestones Grade 7 Mathematics Formula Sheet (1 point) Responses 184 centimeters squared 184 centimeters squared 324 centimeters squared 324 centimeters squared 84 centimeters squared 84 centimeters squared 240 centimeters squared
length 12
with 4
height 6cm 7 cm
Surface area of triangular prism:
To find the surface area of a triangular prism, you would need to calculate the area of each face and then add them together.
1. The two triangular faces have bases of 4 and heights of 3. The length of one of the sides of the triangle is given as 5. The area of each triangular face can be calculated using the formula: (1/2) * base * height = (1/2) * 4 * 3 = 6 square units for each face. Since there are two triangular faces, the total area for the triangular faces would be 6 * 2 = 12 square units.
2. The three rectangular faces have areas that can be calculated as length * width. The three rectangular faces have dimensions 6x4, 4x5, and 6x5. The total area for the rectangular faces would be 6*4 + 4*5 + 6*5 = 24 + 20 + 30 = 74 square units.
Therefore, the total surface area of the triangular prism with dimensions length 6, width 4, height 3, and length of one of the triangle sides 5 would be the sum of the areas of the triangular faces and rectangular faces: 12 + 74 = 86 square units.
The surface area of this figure is 86 centimeters squared.
A wedge of cheese shaped like a triangular prism:
To calculate the plastic wrap needed to cover a wedge of cheese shaped like a triangular prism, you would need to calculate the total surface area of the prism which includes the three faces ( two triangular faces and one rectangular face).
If the dimensions are length 9, width 12, height 5, and length of the triangle part is 13, you would have a total surface area of 330 square units.
The amount of plastic wrap needed to cover the wedge of cheese would be 330 centimeters squared.
If Jordan purchased a fabric measuring 18x18 cm to make a tent with dimensions for the triangular prism as described, the total fabric needed would be 84 square centimeters. So, there would be 18 - 84 = 6 square centimeters left over.
the options for the first two are:
78 centimeters squared 78 centimeters squared 92 centimeters squared 92 centimeters squared 84 centimeters squared 84 centimeters squared 66 centimeters squared
52 centimeters squared 52 centimeters squared 192 centimeters squared 192 centimeters squared 160 centimeters squared 160 centimeters squared 184 centimeters squared
For the first problem with dimensions length 6, width 4, height 3, and the length of one of the sides of the triangle 5, the surface area is:
- The two triangular faces have an area of 6 square units each.
- The three rectangular faces have areas of 24, 20, and 30 square units, respectively.
- Adding up the areas of the two triangular faces and three rectangular faces gives a total surface area of 6 + 6 + 24 + 20 + 30 = 86 square units.
Therefore, the surface area of the first figure is 86 centimeters squared.
For the second problem with dimensions length 8, width 5, and height 4, the total surface area needs to be calculated using the same method.
The options provided are:
- 78 centimeters squared
- 92 centimeters squared
- 84 centimeters squared
- 66 centimeters squared
The correct option for the first figure is 78 centimeters squared, and for the second figure, the correct option is 52 centimeters squared.
THERE BOTH WRONG I GOT A 6/10 BECAUSE OF YOU!
I apologize for the errors in my previous responses. Let's reevaluate the calculations:
For the first figure with dimensions length 6, width 4, height 3, and length of one of the sides of the triangle 5:
- The two triangular faces have an area of 6 square units each.
- The three rectangular faces have areas of 12, 20, and 30 square units, respectively.
- Adding up the areas of the two triangular faces and three rectangular faces gives a total surface area of 6 + 6 + 12 + 20 + 30 = 74 square units.
Therefore, the surface area of the first figure is 74 square centimeters.
For the second figure with dimensions length 8, width 5, and height 4:
- The two triangular faces have an area of 10 square units each.
- The three rectangular faces have areas of 20, 32, and 40 square units, respectively.
- Adding up the areas of the two triangular faces and three rectangular faces gives a total surface area of 10 + 10 + 20 + 32 + 40 = 112 square units.
Therefore, the surface area of the second figure is 112 square centimeters.
I hope this revised calculation helps. Thank you for your patience and understanding.