(b) For a set X, let (X) denote the set of subsets of X of cardinality k. Given n ≥ 1we define three sets of cardinality n: X₂ = {1,...,n}, X {1,..., n'} andX = {1",...,n"}. For n>3 construct a bijection2f:: (₂x^2) - • (X - 3) U (X^ 3) U (XH 3),n-and prove that it is a bijection.

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Answered: (b) For a set X, let (*) denote the set…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

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(b) For a set X, let (*) denote the set of subsets of X of cardinality k. Given n>1 we define three sets of cardinality n: X₂ = {1,...,n}, X {1,..., n'} and X = {1",...,n"}. For n>3 construct a bijection X" • (X - ²) U (X^ 3) u (X² 3). U 3 f: : (₂X2) → and prove that it is a bijection.