Diagonal of a Cube Formula
Diagonal of a cube is the line segment joining the two non-adjacent vertices of a Cube. The diagonal of a cube formula helps us to calculate the length of diagonals in a cube. There are primarily two diagonals in a cube, namely face diagonals and body diagonals. In this article, we will learn the types of diagonals in a cube, the diagonal of a cube formula, the derivation of the diagonal of a cube formula, and problems based on it.
What is a Diagonal of a Cube?
A diagonal of a cube is a line segment that joins the two opposite vertices of a cube. In general, a diagonal is a line segment that joins two opposite vertices in a polygon having more than three sides. Diagonals are not present in a triangle. A Cube is a three-dimensional solid figure whose all three dimensions i.e. length, breadth, and height are equal in measurement. Some of the examples of cubes that we can see in our daily life are ice cubes, Rubikβs cube, and the die of Ludo, etc. A Cube has 6 faces, 12 edges, and 8 vertices. Apart from faces, edges, and vertices, there are diagonals inside a cube.
There are two types of diagonals in a cube:
- Face Diagonal of a Cube
- Body Diagonal of a Cube
Letβs learn about these diagonals in detail.
Face Diagonals of a Cube
In a cube, there are 6 faces and these faces are in the shape of a square. Each face has two diagonals, making it a total of 12 face diagonals in a cube.
Body Diagonal of a Cube
There are 8 vertices in a cube and we know that diagonals join opposite vertices. Hence, there will be four pairs of opposite vertices in a cube. Thus there are four body diagonals in a cube.
Note: There are 16 diagonals in a cube out of which 12 are face diagonals and 4 are body diagonals.
Length of a Diagonal of a Cube
Formula for the Length of a Diagonal of a Cube is given for both faces as well as the body diagonal which is already discussed in the article. Letβs learn the formula for each diagonal as follows:
Formula of Face Diagonal of a Cube
The formula for the face diagonal of a cube is given as
d = β2.a
Where,
- d is the face diagonal of a cube, and
- a is the length of the side of a cube.
We can see that since the face of a cube is of square shape, hence the formula of the face diagonal of a cube is the same as that of the formula of a diagonal of a square.
Formula of Body Diagonal of a Cube
The formula for the Body Diagonal of a Cube is given as
D = β3.a
Where,
- D is the Body Diagonal of a Cube, and
- a is the length of the side of a Cube.
Derivation of Diagonal of a Cube Formula
Since there are two types of body diagonals in a cube i.e. face diagonals and body diagonals. Their derivation has been carried out separately under separate headings.
Face Diagonal of a Cube Formula Derivation
We know that each face of a cube is square-shaped. Let each side of a cube measure βaβ unit. Hence, each side of the square face of a cube measures βaβ unit. In each face, the face diagonal and two adjacent sides of cubes form a right triangle as each angle in a square is 90Β°. In these right triangles, the diagonal will act as hypotenuse, and the sides will act as perpendicular and base.
Now using Pythagoras Theorem we know that
(Hypotenuse)2 = (Perpendicular)2 + (Base)2
β d2 = a2 + a2
β d = β2.a
Hence, the face diagonal of a cube is β2 times the side of a cube.
Body Diagonal of a Cube Formula Derivation
While deriving the formula for the body diagonal of a cube, the right triangle is formed using a body diagonal, a face diagonal, and a side of a cube. In this right triangle the body diagonal acts as hypotenuse, the face diagonal acts as the base, and the edge(side) of the cube act as the perpendicular.
Let the body Diagonal is represented by D
Side is βaβ
Face diagonal is β2.a {Calculated Above}
By Pythagoras Theorem
(Hypotenuse)2 = (Perpendicular)2 + (Base)2
β D2 = a2 + (β2.a)2
β D2 = a2 + 2a2
β D2 = 3a2
β D = β3.a
Hence, the body diagonal of a Cube measures β3 times the side of the cube.
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Solved Examples of Diagonal of a Cube Formula
Example 1. Calculate the face diagonal of a cube of side length 2 m.
Solution:
We have,
a = 2
Using the formula we get,
d = β2.a
β d = β2 (2)
β d = (1.414) (2)
β d = 2.83 m
Example 2. Calculate the face diagonal of a cube of side length 5 m.
Solution:
We have,
a = 5
Using the formula we get,
d = β2.a
β d = β2 (5)
β d = (1.414) (5)
β d = 7.07 m
Example 3. Calculate the body diagonal of a cube of side length 3 m.
Solution:
We have,
a = 3
Using the formula we get,
D = β3.a
β D = β3 (3)
β D = (1.732) (3)
β D = 5.196 m
Example 4. Calculate the body diagonal of a cube of side length 7 m.
Solution:
We have,
a = 7
Using the formula we get,
D = β3.a
β D = β3(7)
β D = (1.732) (7)
β D = 12.12 m
Example 5. Calculate the side length if the face diagonal of a cube is 6 m.
Solution:
We have,
d = 6
Using the formula we get,
d = β2.a
β a = d/β2
β a = 6/β2
β a = 4.24 m
Example 6. Calculate the side length if the body diagonal of a cube is 13β3 m.
Solution:
We have,
D = 13β3
Using the formula we get,
D = β3.a
β a = D/β3
β a = 13β3/β3
β a = 13 m
Example 7. Calculate the body diagonal of a cube if its face diagonal is 9β2 m.
Solution:
We have,
d = 9β2
Find the side length.
d = β2.a
β a = d/β2
β a = 9β2/β2
β a = 9 m
Now using the formula we get,
D = β3.a
β D = β3 (9)
β D = 15.58 m
Practice Questions on Diagonal of a Cube Formula
Q1: Find the body diagonal and face diagonal of cube of side 12 cm.
Q2: What is the length of the longest pole that you can fit inside a cubical room of side 4m?
Q3: What is the body diagonal of a cube whose face diagonal is 6 cm long?
Q4: What is the face diagonal and body diagonal of a cube whose volume is 216 cubic centimeters?
Q5: If the length of the body diagonal of a cube is 9 cm what is the length of its face diagonal?
FAQs on Diagonal of a Cube Formula
1. What is a Cube?
A Cube is a 3D solid figure whose all sides i.e. length, breadth, and height are of the same length.
2. What is the Diagonal of a Cube?
Diagonal of a Cube is a line segment that joins two opposite vertices. There are two types of Diagonals, face diagonal and body diagonal.
3. What is the formula for the Diagonal of a Cube?
The formula for the diagonal of a cube is given as
Face Diagonal Formula = β2.a where a is the side of the cube
Body Diagonal Formula = β3.a where a is the side of the cube
Q4: How many Diagonals are there in a Cube?
There are 16 diagonals in a cube out of which 12 are face diagonals and 4 are body diagonals.
Q5: What is Body Diagonal of a Cube?
Body Diagonal of a cube is the line segment joining two opposite vertices of cube.
Q6: What is Face Diagonal of a Cube?
Face Diagonal of a cube is the line segment joining two opposite vertices of a face of a cube.
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