Why does 1(theta) b = 1?

We are given that
1 ϕ a = 1, or ƒ(1,a) = 1
a ϕ b = b ϕ a, or ƒ(a,b) = ƒ(b,a) which means commutative property

1 ϕ b = ƒ(1,b). By the first definition, it is equal to 1.

I don't understand why II is true....we are not given any info about "c"...?

Ohhhh, do we have to assume II is true since both I and III are true?

The phi symbol seems to represent the cummutative property. (I will use @ to denote Greek Phi.) However, the values of the constants a,b,c are not given and inherently arbitrary. For example, we only know that 1@a = a@1 because a@b=b@a is given. However, we do not know if the symbol represents addition or multiplication because the cummutative property applies to both operations. We should pick one. Lets pick addition for simplicity. If 1@a = 1 then a=0. We still, however, do not know what b is, nor c. It cannot follow that (1@a)/(b@1) certainly equals 1. B could equal five or five million and the @ symbol could equal either multiplication or division. The problem also does not say that a=b which would be necessary for the third definition to follow. The answer to this problem should be I and II only. III is not provable via the information given.

**Correction: "multiplication or addition."