2. Let f: Z-Z be given by the following rule: x+6 x=0 x = 1 x+8 x 2 f(x)=x+5 (mod 3) (mod 3) (mod 3) For example, to find f(100), we determine first that 100 = 3.33+1 and therefore 100 = 1 (mod 3); therefore f(100) = 105. (a) Give an example to show that f is not injective. (b) Give an example to show that f is not surjective. (c) Change one of the numbers 6, 5, and 8 to turn f into a bijection.

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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2. Let f: Z-Z be given by the following rule:
x+6
x=0
f(x)=x+5 x = 1
x = 2
x+8
(mod 3)
(mod 3)
(mod 3)
For example, to find f(100), we determine first that 100 = 3.33+1 and therefore 100 = 1
(mod 3); therefore f(100) = 105.
(a) Give an example to show that f is not injective.
(b) Give an example to show that f is not surjective.
(c) Change one of the numbers 6, 5, and 8 to turn f into a bijection.
Transcribed Image Text:2. Let f: Z-Z be given by the following rule: x+6 x=0 f(x)=x+5 x = 1 x = 2 x+8 (mod 3) (mod 3) (mod 3) For example, to find f(100), we determine first that 100 = 3.33+1 and therefore 100 = 1 (mod 3); therefore f(100) = 105. (a) Give an example to show that f is not injective. (b) Give an example to show that f is not surjective. (c) Change one of the numbers 6, 5, and 8 to turn f into a bijection.
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