Example 2 - Chapter 5 Class 8 Squares and Square Roots
Last updated at Dec. 16, 2024 by Teachoo
Last updated at Dec. 16, 2024 by Teachoo
Example 2 Write a Pythagorean triplet whose smallest member is 8. We know 2m, ๐^2โ1 and ๐^2+1 form a Pythagorean triplet. We know 2m, ๐^๐โ๐ and ๐^๐+๐ form a Pythagorean triplet. Given, Smallest member of the triplet = 8. Let 2m = 8 2m = 8 m = 8/2 m = 4 Let ๐^๐โ๐" = 8" ๐^2 = 8 + 1 ๐^2 = 9 โด m = 3 Let ๐^๐+๐ = 8 ๐^2 = 8 โ 1 ๐^2 = 7 Since, 7 is not a square number, โด ๐^2+1 โ 8 It is not possible. Therefore, m = 4 or m = 3 Finding Triplets for m = 3 1st number = 2m 2nd number = ๐^2โ1 3rd number = ๐^2+1 โด The required triplet is 6, 8, 10 But 8 is not a smallest member of this triplet. So, lets try for m = 4 Finding Triplets for m = 4 1st number = 2m 2nd number = ๐^2โ1 3rd number = ๐^2+1 As 8 is the smallest member of this triplet. โด The required triplet is 8, 15, 17
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