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The two nets of a regular right triangular prism are surface area and volume.
just not to confuse you, here is the question more clearer: A prism has a cross section that is a regular hexagon The area of the cross section is 10.4m^2. The volume of the prism is 8.84m^2. Calculate the height of the prism.
B- 12.03 in.
There is insufficient information to give an answer. There is no information to indicate that the pentagon is regular and therefore its area is indeterminate. Consequently, the volume of the prism cannot be determined.
To find the volume of a triangular prism, you need to multiply the area of the base by the height of the prism. The base of this prism is a regular triangle, which has an area of 72√3 cm². So, the volume of the prism will be 720√3 cm³ (72√3 cm² * 10 cm).
Volume is Area of the Base times the Height of the Prism. To find the area of a Regular Pentagon, you use the formula (1/2)*Perimeter*Length of Apothem.
A regular prism.
Volume of a Rectangular Prism The volume of a rectangular prism can be found by the formula: volume=length*width*height
an oblique prism is slanted and a regular prism is not, its right.
To determine how many times greater the volume of a new prism is compared to the original prism, you need to divide the volume of the new prism by the volume of the original prism. This ratio will give you the factor by which the volume has increased. For example, if the new prism has a volume of 120 cubic units and the original prism has a volume of 30 cubic units, the new prism's volume is 4 times greater.
The volume of the prism is three times as much as that of the prism.
To find the volume of a prism, multiply the area of the base by the height of the prism. The volume is typically expressed in cubic units. So, if the prism is in inches, the volume would be in cubic inches.