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7. (10 points) Let Sym(Z) = \f : Z Z : f bijective) be the set of bijective functions from Z to Z. (Sym(Z),o) is a group, whe
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To show that giz7 is member of Sym (72), il g € Sym (72) we just need to show that g is bijective Here, g is defined by snelCase: î m, n be odd s m #n. => = m-1 n-1 g(m) # g(n). case: I let m. be odd & n be einer. - men. => = mal nti publik g(m) # g

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7. (10 points) Let Sym(Z) = \f : Z Z : f bijective) be the set...
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