Exercise

Exercise logic.propositional.dnf

Description
Proposition to DNF

T /\ (~F || (~q /\ ~~(p /\ ~~~q) /\ ~F /\ T /\ p /\ ~r)) /\ ~q /\ T /\ (q || (~q /\ ~~(p /\ ~~~q) /\ ~F /\ T /\ p /\ ~r)) /\ ((T /\ p /\ ~~~~(p /\ ~q)) || (~q /\ p /\ ~~~q)) /\ ((T /\ p /\ ~~~~(p /\ ~q)) || ~F) /\ ((T /\ p /\ ~~~~(p /\ ~q)) || T) /\ ((T /\ p /\ ~~~~(p /\ ~q)) || (p /\ ~r /\ ~~~~(p /\ ~q))) /\ ~(T /\ F) /\ ((~q /\ ~(~p || ~~q)) || (~q /\ ~~(p /\ ~~~q) /\ ~F /\ p /\ ~r)) /\ ~~T /\ p /\ (T || (~q /\ ~~(p /\ ~~~q) /\ ~F /\ T /\ (p || F) /\ ~r))

ready: no

Feedback

onefirst
allfirsts (6)
allapplications
derivation
microsteps

Path 1

path [0, 2, 0, 2, 0, 0, 5, 6, 4]
steps 9
major rules 1
active labels
dnf
simplify

enter dnf, check, navigator.down, navigator.right, check, enter simplify, navigator.down, navigator.right, logic.propositional.notnot

path	[0, 2, 0, 2, 0, 0, 5, 6, 4]
steps	9
major rules	1
active labels	dnf simplify