This topic is linked to null - null.
Y by
let by definition,
this is true for all thus let this might lead us to (from ),
Now let (using ),
By the transitive property,
as the first condition is true, we might then say that given all identity elements of denoted as we might have,
and inductively,
thus,
. Or in plain text, we might say that as one identity is equal to another then if we have some identity it is the same as the identity we already have.
this is true for all thus let this might lead us to (from ),
Now let (using ),
By the transitive property,
as the first condition is true, we might then say that given all identity elements of denoted as we might have,
and inductively,
thus,
. Or in plain text, we might say that as one identity is equal to another then if we have some identity it is the same as the identity we already have.