describe all the ring homomorphism from the the ring ZxZ to Z?

Prove that the only ring homomorphism from Q (rational numbers) to Q (rational numbers) is the...

Prove that the only ring homomorphism from Q (rational numbers) to Q (rational numbers) is the identity map.

Describe all of the homomorphisms from D8 to Z8(verify each is a homomorphism and prove there...

Describe all of the homomorphisms from D8 to Z8(verify each is a homomorphism and prove there can be no others) And please give a clear handwriting.

Let B = { f: ℝ  → ℝ | f is continuous } be the ring of...

Let B = { f: ℝ  → ℝ | f is continuous } be the ring of all continuous functions from the real numbers to the real numbers. Let a be any real number and define the following function: Φa:B→R f(x)↦f(a) It is called the evaluation homomorphism. (a) Prove that the evaluation homomorphism is a ring homomorphism (b) Describe the image of the evaluation homomorphism. (c) Describe the kernel of the evaluation homomorphism. (d) What does the First Isomorphism Theorem for...

Suppose that ϕ:R→S is a ring homomorphism and that the image of ϕ is not {0}....

Suppose that ϕ:R→S is a ring homomorphism and that the image of ϕ is not {0}. If R has a unity and S is an integral domain, show that ϕ carries the unity of R to the unity of S.

) In the Extra Problem on PS 2 we defined a map φ:M2,2(Z) → M2,2(Z2) by...

) In the Extra Problem on PS 2 we defined a map φ:M2,2(Z) → M2,2(Z2) by the formula φ a b c d = a mod (2) b mod (2) c mod (2) d mod (2) On PS 2 you showed that φ is a ring homomorphism and that ker(φ) = 2a 2b 2c 2d a, b, c, d ∈ Z We know the kernel of any ring homomorphism is an ideal. Let I = ker(φ). (a) (6 points) The...

Let ϕ : Z × Z → Z be a homomorphism such that ϕ ( 1...

Let ϕ : Z × Z → Z be a homomorphism such that ϕ ( 1 , 1 ) = 2 and ϕ ( 3 , 5 ) = 6 . Find Ker ϕ and ϕ （10，5）

Let M = { f: ℝ  → ℝ | f is continuous } be the ring of...

Let M = { f: ℝ  → ℝ | f is continuous } be the ring of all continuous functions from the real numbers to the real numbers. Let a be any real number and define the following function: Φa:M→R f(x)↦f(a) This is called the evaluation homomorphism. 1. Describe the kernel of the evaluation homomorphism. 2. Is the kernel of the evaluation homomorphism a prime ideal or a maximal ideal or both or neither?

Let Z[x] be the ring of polynomials with integer coefficients. Find U(Z[x]), the set of all...

Let Z[x] be the ring of polynomials with integer coefficients. Find U(Z[x]), the set of all units of Z[x].

Suppose φ:Q→Z is a homomorphism (both groups are under addition). Prove that φ is the zero...

Suppose φ:Q→Z is a homomorphism (both groups are under addition). Prove that φ is the zero map, i.e., φ(x) = 0 for all x ∈ Q.

Is the ring Z Noetherian? Prove your answer. Is the ring Z Artinian? Prove your answer.

Is the ring Z Noetherian? Prove your answer. Is the ring Z Artinian? Prove your answer.