13. Recall Z = {..,-2,–1,0,1,2,..} (the integers). Let Z* = {1,2,3,.} be the positive integers. Let 2Z be the even integers, 3Z be the multiples of 3, and so on. (a) Is Z* C 2Z? Explain. (b) Is 2Z C Z+? Explain. (c) Find 2Z n 3Z. Describe the set in words, and using set notation. (d) Express {x e Z : 3y e Z(x = 2y V x = 3y)} as a union or intersection of two sets already described in this problem.

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
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13. Recall Z = {.,-2, –1,0,1,2,...} (the integers). Let Z* = {1,2,3,...}
be the positive integers. Let 2Z be the even integers, 3Z be the multiples
of 3, and so on.
(a) Is Z* C 2Z? Explain.
(b) Is 2Z C Z*? Explain.
(c) Find 2Z n3Z. Describe the set in words, and using set notation.
(d) Express {x e Z : 3y e Z(x = 2y V x = 3y)} as a union or
intersection of two sets already described in this problem.
%3D
Transcribed Image Text:13. Recall Z = {.,-2, –1,0,1,2,...} (the integers). Let Z* = {1,2,3,...} be the positive integers. Let 2Z be the even integers, 3Z be the multiples of 3, and so on. (a) Is Z* C 2Z? Explain. (b) Is 2Z C Z*? Explain. (c) Find 2Z n3Z. Describe the set in words, and using set notation. (d) Express {x e Z : 3y e Z(x = 2y V x = 3y)} as a union or intersection of two sets already described in this problem. %3D
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