How Bibhorr Formula Overrules Trigonometry?
An Indian invention named “Bibhorr formula” is set to revolutionize the future of mathematics!

Before getting to know about Bibhorr formula, let us first be acquainted with the trigonometry. Derived from Sanskrit terms trikon+miti, trigonometry is the mathematical branch aimed at studying triangles. In order to analyze relations between the triangle elements, trigonometry introduces transcendental functions in the form of sin, cos and tan. These functions are mostly recognized for ruining the lives of school goers. Not just students but most of the teachers too hate the subject of trigonometry. Well, Bibhorr formula is a solution to all this mess!
Bibhorr formula overrules trigonometry by eliminating the use of all the trigonometric functions. The formula is a quick replacement to the complicated trigonometry concept. All the triangle problems can be solved without sin and cos functions through Bibhorr formula.
Invented by an Indian scholar Bibhorr, the incredible equation is destined to benefit and safeguard the future of mathematics. The single formulation upends the trigonometric world of sines and cosines.
Mathematically, Bibhorr formula is an equation for yielding relationships between the sides and angles of a right triangle without the involvement of trigonometric functions. The formula relates all the three sides with Bibhorr angle. The equation is notated in Hindi alphabets. “King of equations” is another synonym for Bibhorr formula.
Unlike trigonometry, Bibhorr formula identifies each and every element of a triangle in order to encode them into a single equation. The longest, medium and shortest sides of a right triangle are termed as shrav, lambu and chhutku respectively. The angle opposite lambu is referred to as Bibhorr angle. The remaining angle is identified as Ubhorr angle.
Mathematically, the formula is written in Hindi letters as:

where
- बि is Bibhorr angle
- श्र is Shrav (longest side)
- लं is lambu (medium side)
- छ is chhutku (shortest side)
- 1.5 and 90 are constants called Bibhorr constant and Bibhorr sthiron respectively.
The units of Bibhorr angle are degrees for the above written equation.
Applications of Bibhorr formula
- Astronomy: Bibhorr formula is used for finding intergalactic distances, distances between the astronomical bodies and objects.
- Aerodynamics: Bibhorr formula is used in finding the glide angle, angle of climb and various angles of attack of an aircraft and its surfaces.
- Physics: In studying wavelengths and oscillations.
- Geography: In calculating distances between two or more geographical locations.
- Robotics: Bibhorr formula is used for studying robotic movements.
- Marine Engineering: In navigating marine vessels.
Benefits of Bibhorr Formula
Following benefits make Bibhorr formula unique and handsome from rest of the equations.
1. Reduce time in computations- Bibhorr formula simplifies trigonometric computations by employing only algebraic manipulations.
2. Comparatively easier to understand- In order to understand triangles, one just needs to remember this single equation as it eliminates additional data required in trigonometry.
3. Does not make use of trigonometric tables- As geometry is involved in establishing relations, Bibhorr formula discards the use of trigonometry tables.
4. No requirement of trigonometric functions- The direct entaglement between the variables defies the use of trigonometric functions.
5. Multifarious in nature- The formula is not just helpful in mathematical concepts, it is beneficial in applied physics and other science concepts.
6. Makes use of only two constant values- The uniqueness of the equation lies in a fact that it works through just two constants.
7. Practically evident- The equation could be proved practically and hence does not need an additional derivation.
8. Simplifies all the concepts that employ trigonometry- As the formula is a quick alternative to trigonometry it can be used in all areas that favor trigonometry.
9. Visually admirable- The equation relates angles and lengths for the first time in the history of science, making it visually more admirable and superior to other equations.
10. Mathematically exceptional- Bibhorr formula is grounded on completely new notion. It defies all the conventional perceptions in mathematics.