When finding the surface area of the rectangular pyramid, what dimension will be used to find the height of the triangular sides?(1 point)
m
The height of the triangular sides of a rectangular pyramid is the same as the length from the apex to the center of the base of the pyramid. This dimension can be denoted as "m" in this case.
whats the answer
The dimension used to find the height of the triangular sides of a rectangular pyramid is "m."
When finding the surface area of the rectangular pyramid, what dimension will be used to find the height of the triangular sides?(1 point)
_ m?
The dimension used to find the height of the triangular sides of a rectangular pyramid is denoted by "h".
Use the image to answer the question.
An illustration shows a pyramid with a rectangular base of length 6 meters and width 2 meters. The perpendicular height from the apex to the center of the base is labeled 8.8 meters. The slant height from the apex to the center of the width of the rectangle is labeled 9 meters. Both heights are drawn as dotted lines. The sides that are not visible are shown in dashed lines.
When finding the surface area of the rectangular pyramid, what dimension will be used to find the height of the triangular sides?(1 point)
m
The dimension that will be used to find the height of the triangular sides of the rectangular pyramid is "m," as indicated in the image by the height labeled 9 meters from the apex to the center of the width of the rectangle.
so the answer is 9
???????
Yes, that is correct. The dimension used to find the height of the triangular sides of the rectangular pyramid, as depicted in the image with the labeled height of 9 meters, is 9.
What is the surface area of the figure?
(1 point)
ft.2
To calculate the surface area of a rectangular pyramid, we need to find the areas of the rectangular base and the four triangular sides and then add them up.
First, find the area of the rectangular base:
Area of rectangle = length * width = 6 * 2 = 12 square meters
Next, find the area of each triangular side:
Area of triangle = 0.5 * base * height
For the triangular sides with base 6 meters and height 9 meters:
Area = 0.5 * 6 * 9 = 27 square meters
Since there are four triangular sides, the total area of the four triangular sides is 4 * 27 = 108 square meters
Finally, add the area of the base and the four triangular sides to get the total surface area:
Total surface area = 12 + 108 = 120 square meters
Therefore, the surface area of the given figure is 120 square meters.