Is the set of integers a ring? A field? Why or why not.

Is the set {-1, 0, 1} a ring? A field? Why or why not.

Is the set {-1, 0, 1} a ring? A field? Why or why not.

Prove that the ring of integers of Q (a number field) is Z

Prove that the ring of integers of Q (a number field) is Z

Show that the set of all integers that are multiplies of 3 is a commutative ring....

Show that the set of all integers that are multiplies of 3 is a commutative ring. Does it have an identity?

1. Consider the set (Z,+,x) of integers with the usual addition (+) and multiplication (x) operations....

1. Consider the set (Z,+,x) of integers with the usual addition (+) and multiplication (x) operations. Which of the following are true of this set with those operations? Select all that are true. Note that the extra "Axioms of Ring" of Definition 5.6 apply to specific types of Rings, shown in Definition 5.7. - Z is a ring - Z is a commutative ring - Z is a domain - Z is an integral domain - Z is a field...

Let m,n be integers. show that the intersection of the ring generated by n and the...

Let m,n be integers. show that the intersection of the ring generated by n and the ring generated by m is the ring generated by their least common multiple.

(6) (a) Give an example of a ring with 9 elements which is not a field....

(6) (a) Give an example of a ring with 9 elements which is not a field. Explain your answer. (b) Give an example of a field of 25 elements. Explain why. (c) Find a non-zero polynomial f(x) in Z3[x] such that f(a) = 0 for every a ? Z3. (d) Find the smallest ideal of Q that contains 3/4.

Let R be the polynomial ring in infinitly many variables x_1,x_2,.... with coefficients in a field...

Let R be the polynomial ring in infinitly many variables x_1,x_2,.... with coefficients in a field F. Let M be the cyclic R- module R itself. Prove that the submodule {x_1,x_2,....} cannot be generated by any finite set.

Suppose that a ring ? is actually a field, like Q or Z17. Show that: (a)...

Suppose that a ring ? is actually a field, like Q or Z17. Show that: (a) The only two ideals possible are <0> and <1>. (b) ? is a principal ideal ring.

The electric field on the axis of a uniformly charged ring has magnitude 360 kN/C at...

The electric field on the axis of a uniformly charged ring has magnitude 360 kN/C at a point 6.6 cm from the ring center. The magnitude 16 cm from the center is 150 kN/C ; in both cases the field points away from the ring. A) What is the Radius of the ring? B) What is the charge of the ring? Please show your work

Show that if F is a field, then F[x] is a principal ideal ring

Show that if F is a field, then F[x] is a principal ideal ring