Question

Find the Pythagorean triplet whose greatest number is 5 ?​

Answer 1

Given : Pythagorean triplet whose greatest number is 5  

To Find : Pythagorean triplet

Solution:

Pythagorean triplet

2m  , m² -1  , m² + 1

greatest number is 5    

Hence m² -1 can not be  5

case 1 : 2m  = 5

=> m = 2.5  ( not an integer)

Case 2 :

m² + 1 = 5

=> m² = 4

=> m = 2

2m  , m² -1  , m² + 1

2m = 2 x 2 = 4

m² -1 = 2² - 1 = 3

m² + 1 = 2² + 1 = 5

( 3 , 4 , 5) is  Pythagorean triplet whose greatest number is 5

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Answer 2

Answer:

3,4 and 5 is your answer

hence we can get 4 y