How to find the Surface Area of a Square Pyramid?

Area of the square pyramid can be easily calculated using various formulas that are added in the article below. In this article, we have covered Square Pyramid definition, its formulas, examples and others in detail.

A pyramid is defined as a three-dimensional polyhedron with three or more triangle-shaped faces that meet above the base and a polygonal base. The triangle sides are the faces, while the apex is the point above the base. To construct a pyramid, the base is connected to the summit.

A pyramid is known as a square pyramid when its base is square. A square pyramid has three triangular sides and a square base. In other terms, it has 8 edges, 5 vertices, and 4 faces.

Surface Area of Square Pyramid formulas are:

• Total Surface Area Formula of Square Pyramid
• Lateral Surface Area Formula of Square Pyramid

Total Surface Area Formula of Square Pyramid

A square pyramid’s total surface area is equal to the total area covered by the four triangular sides and a square base. Its formula is equal to the sum of the base area and twice the product of base length and slant height.

TSA = a² + 2al

In terms of the base length and height of the pyramid, the formula is expressed as:

TSA = a² + 2a √(a²/4 + h²)

where,

• TSA is the Total Surface Area
• a is the Base Length
• h is the Height or Altitude

Lateral Surface Area Formula of Square Pyramid

A square pyramid’s lateral surface area is defined as the area covered by its four triangular faces. Its formula is equal to twice the product of base length and slant height. It can be interpreted as the total surface area reduced by the base area of a square pyramid.

LSA = 2al

In terms of the base length and height of the pyramid, the formula is expressed as:

LSA = 2a √(a²/4 + h²)

where,

• LSA is the Lateral Surface Area,
• a is the Base Length,
• h is the Height or Altitude

To find the surface area of a square pyramid, you need to calculate both the base area and the lateral surface area. The surface area ‘A’ of a square pyramid is given by the sum of the area of the base and the area of the four triangular faces.

A = Base Area + Lateral Surface Area

• Base of a pyramid is generally a square, and its area is calculated using area of sqaure formula.
• Lateral surface area of pyramid is calculated using formulas mentian above.

Follow the steps added below to find surface area of square pyramid.

Step 1: Identify the Given Values

Step 2: Calculate the Area of the Base

Step 3: Calculate the Area of One Triangular Face

Step 4: Calculate the Lateral Surface Area

Step 5: Calculate the Total Surface Area

Examples for the same are added below.

Read More:

• Triangular Pyramid
• Hexagonal Pyramid

Example 1: Calculate the total surface area of a square pyramid if its base is 10 cm and its slant height is 13 cm.

Solution:

We have,

a = 10

l = 13

Using the formula we have,

TSA = a² + 2al

= (10 × 10) + (2 × 10 × 13)

= 100 + 260

= 360 sq. cm

Example 2: Calculate the total surface area of a square pyramid if its base is 6 cm and its slant height is 8.54 cm.

Solution:

We have,

a = 6

l = 8.54

Using the formula we have,

TSA = a² + 2al

= (6 × 6) + (2 × 6 × 8.54)

= 36 + 102.53

= 138.53 sq. cm

Example 3: Calculate the total surface area of a square pyramid if its base is 11 cm and height is 9 cm.

Solution:

We have,

a = 11

h = 9

Using the formula we have,

TSA = a² + 2a√(a²/4 + h²)

= (11 × 11) + (2 × 11 √(11²/4 + 9²))

= 121 + 232.05

= 353.05 sq. cm

Example 4: Calculate the total surface area of a square pyramid if its base is 14 cm and height is 10 cm.

Solution:

We have,

a = 14

h = 10

Using the formula we have,

TSA = a² + 2a√(a²/4 + h²)

= (14 × 14) + (2 × 14 √(14²/4 + 10²))

= 196 + 341.8

= 537.8 sq. cm

Example 5: Calculate the lateral surface area of a square pyramid if its base is 3 cm and slant height is 4.27 cm.

Solution:

We have,

a = 3

l = 4.27

Using the formula we have,

LSA = 2al

= 2 × 13 × 4.27

= 25.63 sq. cm

Example 6: Calculate the lateral surface area of a square pyramid if its base is 13 cm and height is 10 cm.

Solution:

We have,

a = 13

h = 10

Using the formula we have,

LSA = 2a√(a²/4 + h²)

= 2 × 13 √(13²/4 + 10²)

= 310.1 sq. cm

Example 7: Calculate the lateral surface area of a square pyramid if its base is 9 cm and height is 14 cm.

Solution:

We have,

a = 9

h = 14

Using the formula we have,

LSA = 2a√(a²/4 + h²)

= 2 × 9 √(9²/4 + 14²)

= 264.7 sq. cm

What is meant by a Square Pyramid?

A square pyramid is a three-dimensional geometric figure with a square base and four triangular faces that meet at the point above the base called the apex.

What is the Lateral Surface Area of a Square Pyramid?

Lateral surface area of a square pyramid is defined as the area covered by its four triangular faces. Its formula is equal to twice the product of base length and slant height. 

What is the Formula to find the Total Surface Area of a Square Pyramid?

Formula to find the total surface area of a square pyramid is given as follows:

TSA = a² + 2al

What is the Formula to Find the Lateral Surface Area of a Square Pyramid?

Lateral surface area of a square pyramid can be interpreted as the total surface area reduced by the base area of a square pyramid. Now, the formula to find the lateral surface area of a square pyramid is given as follows:

LSA = 2al

What is Formula to find Lateral Surface Area of a Square Pyramid in terms of the Height of the Pyramid?

Formula to determine the lateral surface area of a square pyramid in terms of the height of the pyramid is given as follows:

 LSA = 2a√(a²/4 + h²)