Answer to Question #145992 in Abstract Algebra for Sourav Mondal

(a) Characteristic of a finite field is zero.

The characteristic of a finite field "\\mathbb Z_2=\\{\\overline{0},\\overline{1}\\}" is 2. Indeed, "2\\cdot \\overline{0}=\\overline{0}+\\overline{0}=\\overline{0}", "1\\cdot \\overline{1}=\\overline{1}" and "2\\cdot \\overline{1}=\\overline{1}+\\overline{1}=\\overline{2}=\\overline{0}".

Answer: false

(b) "\\mathbb Z_{12}" is a field.

Since "\\overline{2}\\cdot\\overline{6}=\\overline{0}, \\mathbb Z_{12}" contains zero divisors. So it is not integral domain, and therefore, it is not a field.

Answer: false

(c) In a ring with unity the sum of any two units is a unit.

Consider the ring "(\\mathbb Z,+,\\cdot)". The number "1" is a unit, but "1+1=2" is not a unit because there is not integer "x" such that "2x=1".

Answer: false

(d) Every element of "S_n" has order at most "n".

Consider the symmetric group "S_5" and its element "a=(123)(45)". Since the cycles "(123)" and "(45)" are independent, the cycles "(123)" and "(45)" commute. Taking into account that "|(123)|=3" and "|(45)|=2", we conclude that "|a|=6>5."

Answer: false

(e) There is no non-trivial group homomorphism from a group of order 5 to a group of order 6.

Let "G" and "H" be groups, "|G|=5,|H|=5". Let "a\\in G" be arbitrary. If "f:G\\to H" is a homomorhism, then "|f(a)|" divides "|a|." As a consequence of the Lagrange's theorem, "|a|" divides "|G|=5", and therefore, "|f(a)|" divides 5. On the other hand, "|f(a)|" divides "|H|=6". Since the greatest common divisor of 5 and 6 is 1, we conclude that "|f(a)|=1" for each "a\\in G." Therefore, "f(a)=e" for each "a\\in G", where "e" is identity of "H." Consequently, each homomorphism from "G" to "H"

is trivial.

Answer: true