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Volume of a Cube
Length x Breadth x Height
Volume of a Triangular Prism
(Length x Breadth x Height) divided by 2
Volume of a Square Pyramid
(Length x Breadth x Height) divided by 3
Volume of a Cylinder
(Pi x Radius x Radius x Length)
Volume of a Cone
(Pi x Radius x Radius x Height) divided by 3
Volume of a Sphere
(Pi x Radius x Radius x Radius x 4) divided by 3
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By Austin From Covenant Christian School
What else can I help you with?
Is there a formula for an angle?
no, there is not a general formula for all angles
How are all prisms alike?
They are all pointy on the top.
Are all rectangular prisms cubes?
NO
Is a sphere a prism and why?
No, because if you look at all the other prisms its totally different ....
How are rectangular prisms and pyramids are the same?
they are the same because, they both have rectangular bases. Rectangular prisms are rectangular from the top and bottom (they are flat) while a rectangular pyramid has a point on the top where all of the edges meet. A pyramid has a tip at the top which unables it to stand on the tip while prisms can anyways.
What is the formula for finding the volume of a triangular based prism?
Volume = Area of the base X height of prism. This formula works for all prisms, not just triangular prisms. Area of a triangle = height of triangle X 1/2 X base of triangle.
What is the formula of a prisom?
The formula for finding the volume for all prisms is area of cross section _ length. Also this formula can be used: length by its width by its height (l _ w _ h).
How do you find the volume of a composite solid formed by two or more prisms?
To find the volume of a composite solid formed by two or more prisms, first calculate the volume of each individual prism using the formula ( V = \text{Base Area} \times \text{Height} ). Then, sum the volumes of all the prisms together. Ensure to account for any overlapping sections, if applicable, by subtracting their volume from the total. The final result gives you the total volume of the composite solid.
How do you get the volume of a triangular prism?
Like all prisms you find the area of one of the triangular faces and then multiply by the height.
How is the relationship between formula of volume of a cone and formula of volume of a cylinder related to the relationship between the formula of volume of a pyramid and formula of volume of a prism?
The relationship between the formulas is that in all the radius is cubed.
How are rectangular prisms are alike?
They are all rectangular prisms!
How many rectangular prisms can you make from 140 cubes?
To determine how many rectangular prisms can be made from 140 cubes, we need to consider the volume of the prisms, which is given by the formula ( V = l \times w \times h ) (length × width × height). The task involves finding all combinations of positive integers ( l ), ( w ), and ( h ) such that their product equals 140. The number of distinct rectangular prisms is equal to the number of unique factorizations of 140 into three positive integers, which can vary based on the order of dimensions.
How are cubes dirrerent from other rectangular prisms?
Cubes are a specific type of rectangular prism where all six faces are squares of equal size, meaning all edges have the same length. In contrast, rectangular prisms can have faces that are rectangles of varying dimensions, allowing for a wider range of shapes. While both share the same general properties of having length, width, and height, the uniformity of a cube sets it apart from other rectangular prisms. Thus, all cubes are rectangular prisms, but not all rectangular prisms are cubes.
What does all prisms have in common?
All prisms are 3-D im pretty sure.
Is there a formula for an angle?
no, there is not a general formula for all angles
What attributes do all cylinders and all prisms have in common that not all polyhedral have?
All cylinders and all prisms share the attributes of having two parallel bases connected by rectangular lateral faces. These bases are congruent and can be any polygon for prisms, while cylinders have circular bases. Unlike some other polyhedra, both cylinders and prisms maintain uniform cross-sections along their height, allowing for consistent shape throughout. Additionally, both shapes have a defined volume calculated from their base area and height.
What is true about all prisms?
All prisms contain an equal number of faces,vertices,and edges
