# What is the Pythagorean theorem? Example

**Pythagoras Pramey Kya Hai** **: **dear friends today we **what is the pythagorean theorem **I will talk about it in detail. Today in this article **what is pythagorean theorem, discovery of pythagorean theorem, pythagorean formula, examples **Detailed information has been provided to you on etc. After reading our article, you **Pythagoras Pramey in Hindi **You will know all the details.

This article is ours is very useful for students in grades 8, 9, 10, 11, 12. So to help students we have **Pythagore Pramey** writing.

**What is Pythagoras Pramey in Hindi**

**Pythagore’s theorem :-** According to the Pythagorean theorem, the square of the hypotenuse of a right triangle is equal to the sum of the square of the perpendicular and the square of the base.

Pythagoras’ theorem is also called Bodhayan’s theorem. With the help of this, we can find the value of the base of the hypotenuse and perpendicular to a right triangle.

**Pythagoras Pramey Ki Khoj**

**Discovery of the Pythagorean Theorem:-** The Pythagorean theorem was discovered by the Greek mathematician Pythagoras. Pythagoras was born into one of their deep Greek groups in 570 BC.

**Pythagoras Pramey Ka Sutra**

**Pythagore’s theorem :-** According to the Pythagorean theorem, the square of the hypotenuse of a right triangle is equal to the sum of the square of the perpendicular and the square of the base of this right triangle.

meaning

**(Ear) ^{2} = (perpendicular)^{2 }+ (base)^{2}**

With the help of this, we can find the value of the base of the hypotenuse and perpendicular to a right triangle.

The longest side between the base, the perpendicular and the hypotenuse is the hypotenuse.

**Pythagorean Theorem Example in Hindi**

Question 1. The side of the perpendicular of a right triangle measures 3 cm and the side of the base measures 4 cm, then what will be the side of the hypotenuse of this triangle?

Solution: – In this question, we need to find the hypotenuse of the right triangle. We will solve this question with the Pythagorean theorem.

From the Pythagorean theorem,

(hypotenuse)² = (perpendicular)² + (base)²

(hypotenuse)² = (3)² + (4)²

(hypotenuse)² = 9 + 16

(hypotenuse)² = 25

hypotenuse = 25

hypotenuse = 5

Therefore **side of the hypotenuse of a right triangle** Will be 5.

Question 2. If the base of a right triangle is 4 m and the diagonal is 5 m, then find the length of this right triangle.

Solution: According to the Pythagorean theorem,

(hypotenuse)² = (perpendicular)² + (base)²

(perpendicular)² = (hypotenuse)² – (base)²

(Perpendicular)² = (5)² – (4)²

(perpendicular)² = 25 – 16

(perpendicular)² = 9

perpendicular = 9

length = 3

Thus, the length of the right triangle will be 3 m.

**Read also –**

What is a vector and a scalar quantity? Vectors Product | Sadish Rashi Aur Adish Rashi

Equilateral triangle | Area of an equilateral triangle | Perimeter Sambahu Tribhuj

isosceles triangle | Area Formula | Perimeter Formula | Samdibahu Tribhuj

What is Bodmas Law? Example | BODMAS rule in hindi

we hope written by us** **Faded away **Pythagoras Pramey Kya Hai** If you liked this article, don’t forget to share it with your friends and family. If you have any questions or suggestions about this, let us know by commenting.