# What is connection between boolean logic and DSRP?

## A powerful logic, Boolean algebra is used for many things. Occum's net-net: DSRP can do Boolean, but Boolean can't do DSRP.

Boolean logic or algebra is predicated on three 'operators': OR, AND, and NOT. By combining these forms we can get a number of possibilities. In Boolean logic, all values are either True or False.

Boolean logic can be formed using [primarily] the D and R of DSRP. The D is for identity-other Distinctions. Identity-other (the elements) can be thought of as synonymous with is and is not. OR and AND are just types of action-reaction Relationships.

NOT-AND or NAND, for example, is simply the other or is not variable of Distinctions combined with the AND content-variable of Relationships. XNOR is merely the other to the XOR, and vice versa.

 XNOR Input Output A B A XNOR B 0 0 1 0 1 0 1 0 0 1 1 1

 XOR Input Output A B A XOR B 0 0 0 0 1 1 1 0 1 1 1 0

Thus, in XNOR, the system [A and B] is or is not. And, in XOR, either A is and B is not OR B is and A is not. Thus, it can be seen that S or part-whole Systems is utilized as well and of course Boolean logic itself is its own perspectival singularity. But the majority of the heavy lifting is being done by D and R.

So, Occum's net-net: DSRP can do Boolean, but Boolean can't do DSRP.