Anshika Arya
National Institute Of Technology (NIT), Hamirpur
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9 Other formulas that you can solve using the same Inputs

Volume of Cone inscribed in a sphere when radius of sphere and cone are given
Volume=((pi*Radius of cone^2*Radius of Sphere)/3)+((pi*Radius of cone*sqrt(Radius of Sphere^2-Radius of cone))/3) GO
Radius of cone inscribed in a sphere for maximum volume of cone in terms of radius of sphere
Radius 1=2*sqrt(2)*Radius of Sphere/3 GO
Volume of Cone circumscribing a sphere such that volume of cone is minimum
Volume=(8*pi*Radius of Sphere^3)/3 GO
Volume of Cone inscribed in a sphere for maximum volume of cone in terms of radius of sphere
Volume=(32*Radius of Sphere^3)/81 GO
Radius of Cone circumscribing a sphere such that volume of cone is minimum
Radius 1=sqrt(2)*Radius of Sphere GO
Altitude of the largest right pyramid with a square base that can be inscribed in a sphere of radius a
Height=4*Radius of Sphere/3 GO
Height of Cone inscribed in a sphere for maximum volume of cone in terms of radius of sphere
Height=4*Radius of Sphere/3 GO
Base length of the largest right pyramid with a square base that can be inscribed in a sphere of radius a
Base=4*Radius of Sphere/3 GO
Height of Cone circumscribing a sphere such that volume of cone is minimum
Height=4*Radius of Sphere GO

11 Other formulas that calculate the same Output

Volume of a Conical Frustum
Volume=(1/3)*pi*Height*(Radius 1^2+Radius 2^2+(Radius 1*Radius 2)) GO
Volume of a Capsule
Volume=pi*(Radius)^2*((4/3)*Radius+Side) GO
Volume of Regular Dodecahedron
Volume=((15+(7*sqrt(5)))*Side^3)/4 GO
Volume of a Circular Cone
Volume=(1/3)*pi*(Radius)^2*Height GO
Volume of Regular Icosahedron
Volume=(5*(3+sqrt(5))*Side^3)/12 GO
Volume of a Circular Cylinder
Volume=pi*(Radius)^2*Height GO
Volume of a Rectangular Prism
Volume=Width*Height*Length GO
Volume of a Hemisphere
Volume=(2/3)*pi*(Radius)^3 GO
Volume of a Pyramid
Volume=(1/3)*Side^2*Height GO
Volume of a Sphere
Volume=(4/3)*pi*(Radius)^3 GO
Volume of a Cube
Volume=Side^3 GO

Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a Formula

Volume=64*(Radius of Sphere^3)/81
More formulas
The Radius R of the inscribed sphere for cube with a side length S GO
Radius of inscribed sphere in a cone when radius and height of cone are known GO
Volume of Cone inscribed in a sphere when radius of sphere and cone are given GO
Radius of cone inscribed in a sphere for maximum volume of cone in terms of radius of sphere GO
Height of Cone inscribed in a sphere for maximum volume of cone in terms of radius of sphere GO
Volume of Cone inscribed in a sphere for maximum volume of cone in terms of radius of sphere GO
Radius of largest right circular cylinder that can be inscribed within a cone when radius of cone is given GO
Height of Largest right circular cylinder that can be inscribed within a cone GO
Volume of Largest right circular cylinder that can be inscribed within a cone GO
Curved Surface Area of Largest right circular cylinder that can be inscribed within a cone GO
Total Surface Area of Largest right circular cylinder that can be inscribed within a cone GO
Altitude of the largest right pyramid with a square base that can be inscribed in a sphere of radius a GO
Base length of the largest right pyramid with a square base that can be inscribed in a sphere of radius a GO
Height of a circular cylinder of maximum convex surface area in a given circular cone GO
Convex Surface Area of a circular cylinder of maximum convex surface area in a given circular cone GO
Diameter of a circular cylinder of maximum convex surface area in a given circular cone GO
Height of Largest right circular cylinder within a cube GO
Radius of Largest right circular cylinder within a cube when side of cube given GO
Volume of Largest right circular cylinder within a cube when side of cube is given GO
Curved Surface Area of Largest right circular cylinder within a cube when side of cube is given GO
Total Surface Area of largest right circular cylinder within a cube GO
Side of Largest Cube that can be inscribed within a right circular cylinder of height h GO
Total Surface Area of Largest Cube that can be inscribed within a right circular cylinder when height of cylinder is given GO
Lateral Surface Area of Largest Cube that can be inscribed within a right circular cylinder when height of cylinder is given GO
Volume of Largest cube that can be inscribed within a right circular cylinder when height of cylinder is given GO

Is a square pyramid a regular polyhedron?

In geometry, a square pyramid is a pyramid having a square base. If the apex is perpendicularly above the center of the square, it is a right square pyramid, and has C4v symmetry. If all edges are equal, it is an equilateral square pyramid, the Johnson solid J1.

Does a pyramid have parallel faces?

Pyramids are also called polyhedra since their faces are polygons. The lateral faces are always triangles with a common vertex. The vertex of a pyramid (the point, the apex) is not in the same plane as the base. All cross sections of a pyramid parallel to the base will be similar to the base.

How to Calculate Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a?

Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a calculator uses Volume=64*(Radius of Sphere^3)/81 to calculate the Volume, Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a is the quantity of three-dimensional space enclosed by a closed surface. Volume and is denoted by V symbol.

How to calculate Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a using this online calculator? To use this online calculator for Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a, enter Radius of Sphere (R) and hit the calculate button. Here is how the Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a calculation can be explained with given input values -> 1365.333 = 64*(12^3)/81.

FAQ

What is Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a?
Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a is the quantity of three-dimensional space enclosed by a closed surface and is represented as V=64*(R^3)/81 or Volume=64*(Radius of Sphere^3)/81. Radius of Sphere is a line segment extending from the center of a circle or sphere to the circumference or bounding surface.
How to calculate Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a?
Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a is the quantity of three-dimensional space enclosed by a closed surface is calculated using Volume=64*(Radius of Sphere^3)/81. To calculate Volume of the largest right pyramid with a square base that can be inscribed in a sphere of radius a, you need Radius of Sphere (R). With our tool, you need to enter the respective value for Radius of Sphere and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate Volume?
In this formula, Volume uses Radius of Sphere. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Volume=pi*(Radius)^2*((4/3)*Radius+Side)
  • Volume=(1/3)*pi*(Radius)^2*Height
  • Volume=pi*(Radius)^2*Height
  • Volume=Side^3
  • Volume=(2/3)*pi*(Radius)^3
  • Volume=(4/3)*pi*(Radius)^3
  • Volume=(1/3)*Side^2*Height
  • Volume=(1/3)*pi*Height*(Radius 1^2+Radius 2^2+(Radius 1*Radius 2))
  • Volume=Width*Height*Length
  • Volume=((15+(7*sqrt(5)))*Side^3)/4
  • Volume=(5*(3+sqrt(5))*Side^3)/12
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