(a) Solve for z E C: 5+ iz = (1 – 3i)(2 + 4i). (b) Let S = {0, 1, x, y, z} be a set with 5 distinct elements. Suppose that there are two operations +, · on S, and that the multiplication table for S is given below. 0 1 000000 101xy z x 0 x| 01 y Y | 0 | y | 1 1 Is it possible that S is a field? Explain, using either field axioms or known (proved) facts about fields from class or the textbook.

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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(a) Solve for z e C: 5 + iz = (1 – 3i)(2 + 4i).
%3D
(b) Let S = {0, 1, x, y, z} be a set with 5 distinct elements. Suppose that there are two operations +, · on S, and that the multiplication table
for S is given below.
1 | x
0
00000
10
1 x
x|0|1|y
y 1| z
1
Is it possible that S is a field? Explain, using either field axioms or known (proved) facts about fields from class or the textbook.
Transcribed Image Text:(a) Solve for z e C: 5 + iz = (1 – 3i)(2 + 4i). %3D (b) Let S = {0, 1, x, y, z} be a set with 5 distinct elements. Suppose that there are two operations +, · on S, and that the multiplication table for S is given below. 1 | x 0 00000 10 1 x x|0|1|y y 1| z 1 Is it possible that S is a field? Explain, using either field axioms or known (proved) facts about fields from class or the textbook.
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