Material: Daly analysis 1.3.3. Let f: X Y be a function, let A be a subset of X, and let {A;}ierbe a family of subsets of X. Prove thats(U A.) = U F(A).ielielAlso prove thatc n f(A.),f(X)\f(A) C f (A©),ACFU(A).and if f is injective then equality holds in each of these inclusions. Show byexample that equality need not hold if f is not injective.

Name: Material: Daly analysis 1.3.3. Let f: X Y be a function, let A be a su
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Description: Material: Daly analysis 1.3.3. Let f: X Y be a function, let A be a subset of X, and let {A;}ierbe a family of subsets of X. Prove thats(U A.) = U F(A).ielielAlso prove thatc n f(A.),f(X)\f(A) C f (A©),ACFU(A).and if f is injective then equality hold

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1.3.3. Let f: X Y be a function, let A be a subset of X, and let {A;}ieI be a family of subsets of X. Prove that U A, iel U S(A1). iel Also prove that (04.) n FA). f(X)\f(A) C f (A©), Acf(A)). iel and if f is injective then equality holds in each of these inclusions. Show by example that equality need not hold if f is not injective.

1.3.3. Let f: X Y be a function, let A be a subset of X, and let {A;}ieI be a family of subsets of X. Prove that U A, iel U S(A1). iel Also prove that (04.) n FA). f(X)\f(A) C f (A©), Acf(A)). iel and if f is injective then equality holds in each of these inclusions. Show by example that equality need not hold if f is not injective.

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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