Q4. (a) Let ) be a o- Algebra on X. Assume that 1; µ2:2 - 0, 0) are two measures on X. Is µ1 + kµ2 a measure on X? where k is a scalar. Consider the cases: k >0 and k < 0. (b) Let (X, ) ) be a measure space. For A , B e ). Show that u(A U B) = µ(A) + µ(B) – µ(An B).

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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Q4.
(a) Let ) be a
Algebra on X.
Assume that l1, H2: >
[0, 0) are two measures on X.
Is µ1 + kµ2 a measure on X? where k is a scalar.
Consider the cases: k >0 and k < 0.
(b) Let (X, ), H) be a measure space. For A, Be ).
Show that u(A U B) = µ(A) + µ(B) – µ(An B).
Transcribed Image Text:Q4. (a) Let ) be a Algebra on X. Assume that l1, H2: > [0, 0) are two measures on X. Is µ1 + kµ2 a measure on X? where k is a scalar. Consider the cases: k >0 and k < 0. (b) Let (X, ), H) be a measure space. For A, Be ). Show that u(A U B) = µ(A) + µ(B) – µ(An B).
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