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

Total Surface Area of a Pyramid
Total Surface Area=Side*(Side+sqrt(Side^2+4*(Height)^2)) GO
Area of a Rhombus when side and diagonals are given
Area=(1/2)*(Diagonal A)*(sqrt(4*Side^2-(Diagonal A)^2)) GO
Lateral Surface Area of a Pyramid
Lateral Surface Area=Side*sqrt(Side^2+4*(Height)^2) GO
Surface Area of a Capsule
Surface Area=2*pi*Radius*(2*Radius+Side) GO
Volume of a Capsule
Volume=pi*(Radius)^2*((4/3)*Radius+Side) GO
Area of a Octagon
Area=2*(1+sqrt(2))*(Side)^2 GO
Volume of a Pyramid
Volume=(1/3)*Side^2*Height GO
Area of a Hexagon
Area=(3/2)*sqrt(3)*Side^2 GO
Base Surface Area of a Pyramid
Base Surface Area=Side^2 GO
Surface Area of a Cube
Surface Area=6*Side^2 GO
Volume of a Cube
Volume=Side^3 GO

11 Other formulas that calculate the same Output

Diagonal of a Rectangle when breadth and perimeter are given
Diagonal=sqrt((2*(Breadth)^2)-(Perimeter*Breadth)+((Perimeter)^2/4)) GO
Diagonal of a Rectangle when length and perimeter are given
Diagonal=sqrt((2*(Length)^2)-(Perimeter*Length)+((Perimeter)^2/4)) GO
Diagonal of a Rectangle when breadth and area are given
Diagonal=sqrt(((Area)^2/(Breadth)^2)+(Breadth)^2) GO
Diagonal of a Rectangle when length and area are given
Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2) GO
Diagonal of the rectangle when the radius of the circumscribed circle is given
Diagonal=2*Radius Of Circumscribed Circle GO
Diagonal of a Rectangle when length and breadth are given
Diagonal=sqrt(Length^2+Breadth^2) GO
Diagonal of a Square when perimeter is given
Diagonal=(Perimeter/4)*sqrt(2) GO
Rectangle diagonal in terms of sine of the angle
Diagonal=Length/sin(Theta) GO
Diagonal of a Square when side is given
Diagonal=Side*sqrt(2) GO
Diagonal of a Square when area is given
Diagonal=sqrt(2*Area) GO
Diagonal of a Cube
Diagonal=sqrt(3)*Side GO

The maximum face diagonal length for cubes with a side length S Formula

Diagonal=Side*(sqrt(2))
More formulas
Volume of a Capsule GO
Volume of a Circular Cone GO
Volume of a Circular Cylinder GO
Volume of a Cube GO
Volume of a Hemisphere GO
Volume of a Sphere GO
Volume of a Pyramid GO
Volume of a Conical Frustum GO
Perimeter of a Parallelogram GO
Perimeter of a Rhombus GO
Perimeter of a Cube GO
Perimeter of a Kite GO
Volume of a Rectangular Prism GO
Chord Length when radius and angle are given GO
Chord length when radius and perpendicular distance are given GO
Perimeter Of Sector GO
Diagonal of a Cube GO
Perimeter Of Parallelepiped GO
Volume of Regular Dodecahedron GO
Volume of Regular Icosahedron GO
Volume of Regular Octahedron GO
Volume of Regular Tetrahedron GO
Volume of Cuboid GO
Volume of a general pyramid GO
Volume of a general prism GO
Volume of a triangular prism GO
Perimeter of Regular Polygon GO
Inradius of a Regular Polygon GO
Area of regular polygon with perimeter and inradius GO
Interior angle of regular polygon GO
Length of leading diagonal of cuboid GO
Volume of hollow cylinder GO
Volume of Cone GO
Fourth angle of quadrilateral when three angles are given GO
Number of Diagonals GO
Measure of exterior angle of regular polygon GO
Sum of the interior angles of regular polygon GO
Side of regular inscribed polygon GO
Area of regular polygon with perimeter and circumradius GO
Radius of regular polygon GO
Radius of inscribed sphere inside the cube GO
Area of a regular polygon when inradius is given GO
Area of a regular polygon when circumradius is given GO
Area of a regular polygon when length of side is given GO
Interior angle of a regular polygon when sum of the interior angles are given GO
Apothem of a regular polygon GO
Apothem of a regular polygon when the circumradius is given GO
Circumradius of a regular polygon when the inradius is given GO
Perimeter of a regular polygon when inradius and area are given GO
Perimeter of a regular polygon when circumradius and area are given GO
Perimeter of a regular polygon when circumradius is given GO
Perimeter of a regular polygon when inradius is given GO
Side of a regular polygon when perimeter is given GO
Side of a regular polygon when area is given GO
Lateral edge length of a Right square pyramid when side length and slant height are given GO
Number Of Edges GO
Number Of Faces GO
Number Of Vertices GO
Distance between 2 points in 3D space GO
Distance between 2 points GO
Area of triangle given 3 points GO
Perimeter of Trapezoid GO

How do you know a shape is a cube?

A cube has six equal, square-shaped sides. Cubes also have eight vertices (corners) and twelve edges, all the same length. The angles in a cube are all right angles. Objects that are cube-shaped include building blocks and dice.

How to Calculate The maximum face diagonal length for cubes with a side length S?

The maximum face diagonal length for cubes with a side length S calculator uses Diagonal=Side*(sqrt(2)) to calculate the Diagonal, The maximum face diagonal length for cubes with a side length S is a line segment joining two vertices of a polygon or polyhedron, when those vertices are not on the same edge. Informally, any sloping line is called diagonal. Diagonal and is denoted by d symbol.

How to calculate The maximum face diagonal length for cubes with a side length S using this online calculator? To use this online calculator for The maximum face diagonal length for cubes with a side length S, enter Side (s) and hit the calculate button. Here is how the The maximum face diagonal length for cubes with a side length S calculation can be explained with given input values -> 12.72792 = 9*(sqrt(2)).

FAQ

What is The maximum face diagonal length for cubes with a side length S?
The maximum face diagonal length for cubes with a side length S is a line segment joining two vertices of a polygon or polyhedron, when those vertices are not on the same edge. Informally, any sloping line is called diagonal and is represented as d=s*(sqrt(2)) or Diagonal=Side*(sqrt(2)). The side is an upright or sloping surface of a structure or object that is not the top or bottom and generally not the front or back.
How to calculate The maximum face diagonal length for cubes with a side length S?
The maximum face diagonal length for cubes with a side length S is a line segment joining two vertices of a polygon or polyhedron, when those vertices are not on the same edge. Informally, any sloping line is called diagonal is calculated using Diagonal=Side*(sqrt(2)). To calculate The maximum face diagonal length for cubes with a side length S, you need Side (s). With our tool, you need to enter the respective value for Side 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 Diagonal?
In this formula, Diagonal uses Side. We can use 11 other way(s) to calculate the same, which is/are as follows -
  • Diagonal=Side*sqrt(2)
  • Diagonal=sqrt(Length^2+Breadth^2)
  • Diagonal=sqrt(3)*Side
  • Diagonal=sqrt(((Area)^2/(Breadth)^2)+(Breadth)^2)
  • Diagonal=sqrt(((Area)^2/(Length)^2)+(Length)^2)
  • Diagonal=sqrt((2*(Length)^2)-(Perimeter*Length)+((Perimeter)^2/4))
  • Diagonal=sqrt((2*(Breadth)^2)-(Perimeter*Breadth)+((Perimeter)^2/4))
  • Diagonal=sqrt(2*Area)
  • Diagonal=(Perimeter/4)*sqrt(2)
  • Diagonal=2*Radius Of Circumscribed Circle
  • Diagonal=Length/sin(Theta)
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