Surface Area of a Triangular Prism

A prism is a polyhedron with two identical n-sided polygonal bases, connected by n faces, which are all parallelograms. It is a pentahedron with two triangular bases and three connecting faces, joining the sides. A right triangular prism has the three connecting faces to be perpendicular to the bases. The perpendicular faces could be squares or rectangles.

The formula can be broken down into two main parts:

Surface Area of a Right Triangular Prism = Surface Area of Triangular Bases + Lateral Surface Area

Now the lateral faces of the prism could be square or rectangular. Accordingly, there are two formulas for calculation.

A triangular prism with three identical square sides will have two equilateral triangle bases. This is a special case and its formula is as follows:

Surface Area of Right Triangular Prism With Square Sides = 3 a² + 2 X (√3a² / 4) = 3 a² + √3a² / 2

where a is the length of each edge of the triangular prism and square side. The unit for the measurement will be meter² or centimeter².

The surface area of a right triangular prism with rectangular faces of equal dimensions and equilateral triangle bases is as follows:

Surface Area of Right Triangular Prism With Rectangular Faces = 3 bh + 2 X (√3a² / 4)

where 'b' is the base width of every face and 'h' is the length of the rectangle. Using both these formulas is quite simple. You just measure the dimensions of the prism and substitute in the given formulas.

Here is the general formula (This formula is applicable to right triangular prisms only).

Surface Area of a Right Triangular Prism = 2 x (Area of Triangular Base) + (Perimeter of Base x Height)

Here, perimeter is sum of the sides of each triangular base. The area of the triangular base could be calculated using any of the two standard formulas, given by:

Area of Triangle = ½ x Base x Height = √[s (s-a) + s (s-b) + s (s-c)] 

where s is the semiperimeter and a, b, c is the length of the sides.

Complex three dimensional objects are made from the combination of simple two dimensional objects like triangles, squares, and rectangles. Knowing how to calculate the areas of these simple objects, will help you in coming up with formulas for surface areas of complex objects.