14-240/Tutorial-Sep30

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Boris

Problem

Find a set of two elements that satisfies the following:

(1) satisfies all the properties of the field except distributivity.

(2) .

Solution:

Let where is the additive identity and is the multiplicative identity and . After trial and error, we have the following addition and multiplication tables:

We verify that satisfies (1). By the addition and multiplication tables, is closed under addition and scalar multiplication. Since and , then is commutative. It can also be shown that is associative. Observe that is the additive and is the multiplicative identity. Since , then is not distributive. Then does not satisfy distributivity. Then satisfies (1).

We verify that satisfies (2). Since , then satisfies (2).

Nikita