In the world of geometry, the triangular prism is triangular in shape. It is a polyhedron that has a triangular base, its translation copy and three faces connecting the sides. The right triangular prism features the shape of a rectangle with rectangular sides, and in other cases, it’s oblique. A triangular prism with a uniform shape is one that is right triangular with equal bases with square faces.
In other words, it’s a polyhedron, in which two sides are parallel and three faces are not. Surfaces of the three other faces are on the exact same planar (which isn’t necessarily in a parallel plane to basis planes). The three faces are Parallelograms. All cross-sections parallel to base faces form an identical triangle.
Triangular Prisms and Their Uses
Primarily used in telescopes, microscopes, and periscopes Also, scientists use prisms to help to study the response that the eyes of humans react to when exposed to light. Prisms can be described as any shape that has two faces with the same dimensions and shape as well as parallelogram sides. The applications of prisms cover a broad spectrum, but the use of light reflecting and refracting prisms are predominantly for optical research. In general, prisms are used in numerous fields, including architecture.
Ophthalmology and Prisms
In the field of science that is dedicated to the research and management of eye disorders Ophthalmologists have employed prisms from the beginning of the 19th century to identify and treat various conditions of the eye which include exotropia, esotropia as well as nystagmus, amblyopia and eso. For diagnosing eye conditions or deficiencies, doctors use prism-refracted light to examine various parts of the eye for signs of problems. Prisms that treat diseases aid in redirecting light into the eye and improve the patient’s vision. Prisms are also used in the creation of corrective lenses for those suffering from certain ailments of the eye or certain kinds of vision impairments.
Telescopes Cameras, Telescopes, Microscopes and Periscopes
Prisms are a major component in the creation of various optical instruments due to their capacity to move and alter light. Binoculars typically make use of Porro prisms, which were invented in 1850 and named after the inventor, Ignazio Porro -which is a unit constructed of two prisms that push light back towards the direction it came, while also both horizontally and vertically inverting it. Other optical devices that utilize prisms are telescopes, cameras as well as microscopes and even submarine periscopes. Telescopes make use of multiple prisms within an integrated unit to control the light that travels long distances to reach the eyes.
Prism Designs in Architecture
Prisms that can manipulate light appear in architecture and are usually employed in design and construction. Prisms in the form of a shape occur frequently in architecture. Architectural architects in Sweden for instance employ triangular prisms as the standard design of construction since the steep slopes of the structure make snow shed instead of accumulating. These first towers were but gigantic rectangular prisms, while rectangular or triangular prisms have a place in modern architecture projects, such as those of the Petronas Towers located in Malaysia.
Scientific Experiment Utilizes
Scientists use prisms to study how light works as well as the human eye’s perception of light. When looking at the human eye with prisms, scientists study the relationship between the brain and the eyes and the general physics behind light’s motion, speed and quality. Scientists use prisms to help children understand the characteristics of light. Isaac Newton, the discoverer of gravity, utilized prisms as well as the sun’s light to conclude that light of white is composed of all colors within the spectrum of visible light.
Triangular Prism Definition
As the term tri refers to three, the triangular prism is defined as a three-dimensional solid with two identical ends connected by equal parallel lines. In geometry, it is also defined as a polyhedron composed of three rectangular sides and two triangular bases one on either side. The two triangular bases of this prism are congruent and parallel to each other.
To understand how a triangular prism is made up of two-dimensional shapes – rectangles and triangles, there is a need to create a net for it, as shown in the image below. The top and bottom are triangles and known as bases. The three rectangles are sides, which are known as lateral faces. Two of the faces meet to form a line segment called edge and then three edges meet at a point called a vertex. And, the final shape includes 5 faces, 9 edges, and 6 vertices.
The three rectangular sides play the role of the connectors by joining the vertices and edges of the bases with each other. Besides joining the edges and vertices of the bases, the rectangular sides of this prism are joined with each other also side by side. All the cross-sections parallel to the base faces appear as triangles. Another noticeable point about this prism is that the two triangular bases present in it are often equilateral triangles.
In the case of a right triangular prism, the sides are either in the rectangular shape or else can be oblique. In general, prisms are not limited to just triangular prisms. Rather, these three-dimensional shapes composed of at least three flat surfaces are available in various types. For instance, while studying math and physics, we often come across Rectangular Prism, Polygonal Prisms, etc. Note that cubes and cuboids that we study in geometry can also be considered as prisms.
Volume of Triangular Prism
In geometry, the volume of any triangular prism is defined as the product of its triangular base area and height. By definition, the formula to calculate the volume of a prism is given as:
Volume = Area of the base x height
Now, as we know that the base of a triangular prism is in the shape of a triangle, the area of the base is the same as that of a triangle, i.e., 1/2 x base (b) x height (h)
So, the volume of a triangular prism = ½ × b × h × l
Where,
b = the base length,
h = the height of the triangle,
l = the length between the triangular bases.
Surface Area of a Triangular Prism
The surface area of a triangular prism is equal to the sum of its lateral surface area and twice the base area. By definition, the surface area of this figure is given as:
SA = 2b + Ph
Where,
SA = Surface area of the triangular prism
b = Base area of the one end of the triangular prism
P = Perimeter of the base
h = length of the prism, l
Now, if we let a, b, and c be the sides of the triangular bases, then the perimeter (P) of the base will be:
P = a + b+ c
Hence, by putting the value of perimeter and area in the above equation of the surface area of the triangular prism, we will get:
Surface area (SA) of the triangular prism = 2(½ × b × h) + (a + b + c)h
From this, we can also determine the formula for the area of the triangular prism, and it is:
Area of any Triangular Prism = (bh + (a + b + c)h)
Properties of Trian
gular Prism
It consists of a total of nine sides, five faces, and six vertices joined together by rectangular sides.Its five faces include two triangular bases and three rectangular sides or we can say rectangular lateral faces.When two faces of a triangular prism meet, they create a line segment called edge.It is a polyhedron with congruent and parallel bases.
If the bases of any triangular prism are equilateral triangles, but the faces are in a square shape instead of rectangular, then that type of prism is known as semiregular.
Examples of Triangular Prism
Some of the real-life examples of a triangular prism include triangular roofs, camping tents, Toblerone wrappers, and chocolate candy bars.
Solved Examples
1. Find out the volume of a triangular prism with base 4 cm, side 3 cm, and height 6 cm
Solution:
Given,
Base length, b = 4 cm
Height of the triangular base, h = 3 cm
Length between the triangular bases, l = 6 cm
According to the formula,
Volume of the triangular prism = 1/2 x b x h x l
Volume (v) = 1/2 X 4 X 3 X 6 = 36 cm3.
2. Find out the area of a triangular prism with height 4cm and base 5 cm respectively. The height of the triangular base is 10 cm. Note that this triangular prism consists of the equilateral triangular base with the length of its side measuring 6cm.
Solution:
Given,
Base, b = 5cm,
Height, h of the base = 10cm,
Length of the side of the equilateral triangular base, a = b = c = 6 cm,
Height, H of the prism = 4cm
Now, by putting these values in the formula below, we get:
Area of a triangular prism = (bh + (a + b + c)H)
= (5 x 10 + (6+6+6)4)
= (50 + (24)4)
= 50 + 96
= 146 cm2.