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Pythagorean Triplet

Concept Explanation

Pythagorean Triplet

Property :For any natural number m greater than 1 the Pythagorean triplet are represented as

$(2m,m^{2}-1,m^{2}+1)$

Proof: In order to prove that $(2m,m^{2}-1,m^{2}+1)$ is a Pythagorean triplet, it is sufficient to prove that

$(2m)^{2}+(m^{2}-1)^{2}=(m^{2}+1)^{2}$

We have, $(2m)^{2}+(m^{2}-1)^{2}=4m^{2}+m^{4}-2m^{2}+1^{2}$

$=m^{4}+2m^{2}+1^{2}$

$=(m^{2}+1)^{2}$

Hence, $(2m,m^{2}-1,m^{2}+1)$ is Pythagorean triplet for any natural number m > 1.

Remark: If m and n are relatively prime natural numbers such that m > n and exactly one of them is even and other is odd, then $(2mn,m^{2}-n^{2},m^{2}+n^{2})$ is a primitive Pythagorean triple.

Here, the word primitive means that the three numbers contain no common factor.

Illustration: Write a Pythagorean triplet whose one member is:

(i) 6 (ii) 18

Solution: For any natural number m > 1, we have

$2m,m^{2}-1,m^{2}+1$ as a Pythagorean triplet.

(i) Here,

$2m=6Rightarrow m=3.$

$therefore ;m^{2}-1=3^{2}-1=9-1=8$ and $m^{2}+1=3^{2}+1=9+1=10$

Hence the pythagorean triplet is (6,8,10)

(ii) Here,

$2m=18Rightarrow m=9.$

$therefore ;m^{2}-1=9^{2}-1=81-1=80$ and $m^{2}+1=9^{2}+1=81+1=82$

Hence the pythagorean triplet is (18,80,82)

Sample Questions

(More Questions for each concept available in Login)

Question : 1

(6,8,10) and (5,12,13) are __________________
A. Both are Pythagorean triplets		B. None of the both is Pythagorean triplet
C. First is Pythagorean triplet while second is not		D. Second is Pythagorean tripletwhile first is not
Right Option : A
View Explanation

Question : 2

Choose a Pythagorean triplet whose one member is 15
A. (14,58,50)	B. (8,15,17)	C. (14,96,50)	D. (14,41,60)
Right Option : B
View Explanation

Question : 3

Check which of the following is not a pythagorean triplet
A. (12,35,37)	B. (12,33,37)	C. (12,34,36)	D. (12,34,37)
Right Option : A
View Explanation

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Attention !!!!!

Pythagorean Triplet

Pythagorean Triplet

Property :For any natural number m greater than 1 the Pythagorean triplet are represented as

Students / Parents Reviews [10]

Prisha Gupta

Cheshta

Ayan Ghosh

Archit Segal

Om Umang

Shivam Rana

Manish Kumar

Eshan Arora

Aman Kumar Shrivastava

Shreya Shrivastava