Homework SourseLet F be a finite field say F a1 a2 an Let m x a1x a2x
Let F be a finite field, say F = {a_1, a_2, ..., a_n}. Let m = (x - a_1)(x - a_2)...(x - a_n) F[x] and A = {f F[x] | f(a_i) = 0 for all i = 1, 2,..., n}. Show that A = m, i.e., that A is the principal ideal generated by m.![Let F be a finite field, say F = {a_1, a_2, ..., a_n}. Let m = (x - a_1)(x - a_2)...(x - a_n) F[x] and A = {f F[x] | f(a_i) = 0 for all i = 1, 2,..., n}. Show](/WebImages/9/let-f-be-a-finite-field-say-f-a1-a2-an-let-m-x-a1x-a2x-999352-1761514629-0.webp "Let F be a finite field, say F = {a_1, a_2, ..., a_n}. Let m = (x - a_1)(x - a_2)...(x - a_n) F[x] and A = {f F[x] | f(a_i) = 0 for all i = 1, 2,..., n}. Show")
Solution
Consider the set A
It consists of elements f such that f(ai) =0
Since m = (x-a1)(x-a2)...(x-an)
and f(ai) = 0 for i = 1,2,3....n
we conclude that A is contained in m.
Similarly let us consider mf
If f(ai) =0 then mf(ai) =0 for i = 1,2,3...n
Hence m is contained in A
So it follows that A = <m>
