2. Let z be a complex number. Prove the following identities. a) zz* = |z|2 b) Im(z+ z*) = 0 c) (2 + z2)* = z; + z; d) (z,z2)* = z¡zż e) |z,z2|2 = |z|2|z2[?
2. Let z be a complex number. Prove the following identities. a) zz* = |z|2 b) Im(z+ z*) = 0 c) (2 + z2)* = z; + z; d) (z,z2)* = z¡zż e) |z,z2|2 = |z|2|z2[?
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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![2. Let z be a complex number. Prove the following identities.
a) zz* = |z|2 b) Im(z+z*) = 0 c) (z1 + z2)* = z; + z; d) (z,Z2)* = z¡zż e) |z,Z2|? = |z|²|z2]?
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Transcribed Image Text:2. Let z be a complex number. Prove the following identities.
a) zz* = |z|2 b) Im(z+z*) = 0 c) (z1 + z2)* = z; + z; d) (z,Z2)* = z¡zż e) |z,Z2|? = |z|²|z2]?
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