Question

A function f:(M,∗)→(N,×) is a homomorphism if ______​

Answer 1

Answer:

HOPE IT HELPS

Explanation:

homomorphism

Answer 2

Answer:

The function is said to be in homomorphism if the condition f(a, b) = a/b satisfies.

Explanation:

Here, it is given that :

a function is said to be in homomorphism if the function:

f:(M,∗)→(N,×) if f(a, b) = a / b

Homomorphism function :

In mathematics, homomorphism is defines as a well structure preserving kind of map that lies between two algebraic given functions or structures which are of the same type, or which has groups of two or two rings or two vector spaces.

It always preserves the edges of the given function and the total correctness of the given graph.

Types of homomorphism are :

1. Group homomorphism

2. Ring homomorphism

3. Vector space homomorphism.

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