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Use the image to answer the question. An illustration shows two rectangles intersecting, one is oriented horizontally and the o...Question
Use the image to answer the question.
An illustration shows two rectangles intersecting, one is oriented horizontally and the other is oriented vertically. Their dimensions are labeled are they are divided into segments. The dimensions of the horizontal rectangle are as follows: It is divided into four segments. The first segment is labeled 3 inches horizontal and 8 inches vertical. The second segment is labeled 6 inches horizontal. The third segment is the intersection common area and is not labeled. The fourth segment is 6 inches horizontal and 8 inches vertical. The dimensions of the vertical rectangle are as follows: It is divided into three segments. The top segment is labeled 3 inches horizontal and 6 inches vertical. The second segment is the intersection common area and is not labeled. The third segment is labeled 6 inches vertical.
A necklace comes in a jewelry box whose net is shown in this image. What is the surface area of the box?
(1 point)
An illustration shows two rectangles intersecting, one is oriented horizontally and the other is oriented vertically. Their dimensions are labeled are they are divided into segments. The dimensions of the horizontal rectangle are as follows: It is divided into four segments. The first segment is labeled 3 inches horizontal and 8 inches vertical. The second segment is labeled 6 inches horizontal. The third segment is the intersection common area and is not labeled. The fourth segment is 6 inches horizontal and 8 inches vertical. The dimensions of the vertical rectangle are as follows: It is divided into three segments. The top segment is labeled 3 inches horizontal and 6 inches vertical. The second segment is the intersection common area and is not labeled. The third segment is labeled 6 inches vertical.
A necklace comes in a jewelry box whose net is shown in this image. What is the surface area of the box?
(1 point)
Answers
Answered by
GPT 3.5
To find the surface area of the box, we need to calculate the area of each individual rectangle that makes up the net of the box and then add them together.
For the horizontal rectangle:
- First segment: 3 inches x 8 inches = 24 square inches
- Second segment: 6 inches x 4 inches = 24 square inches
- Fourth segment: 6 inches x 8 inches = 48 square inches
Total area for the horizontal rectangle = 24 + 24 + 48 = 96 square inches
For the vertical rectangle:
- Top segment: 3 inches x 6 inches = 18 square inches
- Third segment: 6 inches x 6 inches = 36 square inches
Total area for the vertical rectangle = 18 + 36 = 54 square inches
Now, add the areas of both rectangles together to find the total surface area of the box:
96 square inches + 54 square inches = 150 square inches
Therefore, the surface area of the jewelry box is 150 square inches.
For the horizontal rectangle:
- First segment: 3 inches x 8 inches = 24 square inches
- Second segment: 6 inches x 4 inches = 24 square inches
- Fourth segment: 6 inches x 8 inches = 48 square inches
Total area for the horizontal rectangle = 24 + 24 + 48 = 96 square inches
For the vertical rectangle:
- Top segment: 3 inches x 6 inches = 18 square inches
- Third segment: 6 inches x 6 inches = 36 square inches
Total area for the vertical rectangle = 18 + 36 = 54 square inches
Now, add the areas of both rectangles together to find the total surface area of the box:
96 square inches + 54 square inches = 150 square inches
Therefore, the surface area of the jewelry box is 150 square inches.
Answered by
GPT 3.5
My apologies for the mistake. Let's start over and calculate the correct surface area of the box.
To find the surface area of the box, we need to calculate the individual areas of each face of the box and then add them together.
The net of the box consists of two rectangles - one horizontal and one vertical.
For the horizontal rectangle:
- First segment: 3 inches x 8 inches = 24 square inches
- Second segment: 6 inches x 4 inches = 24 square inches
- Fourth segment: 6 inches x 8 inches = 48 square inches
Total area for the horizontal rectangle = 24 + 24 + 48 = 96 square inches
For the vertical rectangle:
- Top segment: 3 inches x 6 inches = 18 square inches
- Third segment: 6 inches x 6 inches = 36 square inches
Total area for the vertical rectangle = 18 + 36 = 54 square inches
Now, add the areas of both rectangles together to find the total surface area of the box:
96 square inches (horizontal rectangle) + 54 square inches (vertical rectangle) = 150 square inches
Therefore, the correct surface area of the jewelry box is 150 square inches.
To find the surface area of the box, we need to calculate the individual areas of each face of the box and then add them together.
The net of the box consists of two rectangles - one horizontal and one vertical.
For the horizontal rectangle:
- First segment: 3 inches x 8 inches = 24 square inches
- Second segment: 6 inches x 4 inches = 24 square inches
- Fourth segment: 6 inches x 8 inches = 48 square inches
Total area for the horizontal rectangle = 24 + 24 + 48 = 96 square inches
For the vertical rectangle:
- Top segment: 3 inches x 6 inches = 18 square inches
- Third segment: 6 inches x 6 inches = 36 square inches
Total area for the vertical rectangle = 18 + 36 = 54 square inches
Now, add the areas of both rectangles together to find the total surface area of the box:
96 square inches (horizontal rectangle) + 54 square inches (vertical rectangle) = 150 square inches
Therefore, the correct surface area of the jewelry box is 150 square inches.
Answered by
GPT 3.5
I apologize for the mistake in my previous responses. Let's try again to calculate the correct surface area of the box.
To find the surface area of the box, we need to calculate the individual areas of each face of the box and then add them together.
From the description of the net provided in the image, the box has 5 visible faces:
- The top and bottom faces are represented by the horizontal rectangle with the dimensions 6 inches x 8 inches.
- The front and back faces are represented by the vertical rectangle with dimensions 6 inches x 6 inches.
- The left side face is common to both rectangles and has a length of 3 inches.
Calculating the area of each face:
- Top and bottom faces: 6 inches x 8 inches = 48 square inches each (96 total)
- Front and back faces: 6 inches x 6 inches = 36 square inches each (72 total)
- Left side face: 3 inches x 6 inches = 18 square inches
Total surface area of the box:
96 square inches (top and bottom faces) + 72 square inches (front and back faces) + 18 square inches (left side face) = 186 square inches
Therefore, the correct surface area of the jewelry box is 186 square inches. Thank you for your patience.
To find the surface area of the box, we need to calculate the individual areas of each face of the box and then add them together.
From the description of the net provided in the image, the box has 5 visible faces:
- The top and bottom faces are represented by the horizontal rectangle with the dimensions 6 inches x 8 inches.
- The front and back faces are represented by the vertical rectangle with dimensions 6 inches x 6 inches.
- The left side face is common to both rectangles and has a length of 3 inches.
Calculating the area of each face:
- Top and bottom faces: 6 inches x 8 inches = 48 square inches each (96 total)
- Front and back faces: 6 inches x 6 inches = 36 square inches each (72 total)
- Left side face: 3 inches x 6 inches = 18 square inches
Total surface area of the box:
96 square inches (top and bottom faces) + 72 square inches (front and back faces) + 18 square inches (left side face) = 186 square inches
Therefore, the correct surface area of the jewelry box is 186 square inches. Thank you for your patience.
Answered by
GPT 3.5
I apologize for the errors in my previous responses. Let's try to calculate the surface area of the box correctly this time:
To find the surface area of the box, we need to calculate the area of each individual face of the box.
From the description of the net provided in the image, we have the following dimensions:
- Top and bottom faces: 6 inches x 8 inches = 48 square inches each (96 total)
- Front and back faces: 6 inches x 6 inches = 36 square inches each (72 total)
- Left side face: 3 inches x 6 inches = 18 square inches
Now, add the areas of all the faces together to find the total surface area of the box:
96 square inches (top and bottom faces) + 72 square inches (front and back faces) + 18 square inches (left side face) = 186 square inches
Therefore, the correct surface area of the jewelry box is 186 square inches. Thank you for your patience.
To find the surface area of the box, we need to calculate the area of each individual face of the box.
From the description of the net provided in the image, we have the following dimensions:
- Top and bottom faces: 6 inches x 8 inches = 48 square inches each (96 total)
- Front and back faces: 6 inches x 6 inches = 36 square inches each (72 total)
- Left side face: 3 inches x 6 inches = 18 square inches
Now, add the areas of all the faces together to find the total surface area of the box:
96 square inches (top and bottom faces) + 72 square inches (front and back faces) + 18 square inches (left side face) = 186 square inches
Therefore, the correct surface area of the jewelry box is 186 square inches. Thank you for your patience.
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