If n is odd number and n > 1.then prove that (n, n²-1/2,n²+1/2)is a Pythagorean triplet.
Answers
Answer:
proved
Step-by-step explanation:
Given If n is odd number and n > 1.to prove that (n, n²-1/2,n²+1/2)is a Pythagorean triplet.
Consider (n, n^2 - 1/2, n^2 + 1/2)
Let us take the smaller side , so square of two smaller sides will be
n^2 + (n^2 - 1/2)^2
n ^2 + n^2 - 2n^2 + 1 / 4 (we have (a - b)^2 = a^2 -2ab + b^2)
n^4 + 2n^2 + 1 / 4 = (n^ + 1 /2)^2 is the smaller side.
Now larger side = (n^2 + 1 /2)^2 = n^4 + 2n^2 + 1/4
So the square of the larger side is equal to the sum of the two smaller sides.
Pythagoras theorem states that the square on the hypotenuse is equal to the sum of the square on the other two sides.
Now n >1
n = 3, n^2 - 1/2 = 3^2 - 1/2 = 4, n^ + 1 / 2 = 5
we get 3, 4, 5
n = 5, 5^2 - 1 /2 = 12, 5^2 + 1 / 2 = 13
we get 5, 12, 13
Answer:
Step-by-step explanation:
n)² = n²
(n²-1/2)² = n⁴ + 1 - 2n² / 4
(n²+1/2)² = n⁴ + 1 + 2n² / 4
clearly, n⁴ + 1 - 2n² / 4 + n²
= n⁴ + 1 - 2n² + 4n² / 4
= n⁴ + 1 + 2n² / 4
= (n² + 1 /2)²
so, n² + (n²-1/2)² = (n²+1/2)²
Thanks