This is the answer to the equation, but I do not understand why. Please help!

If you apply the **Laws of Boolean Algebra** one by one, the solution is a direct result:

*de Morgan´s Theorem*: The complement of two terms joined together by`OR`

is the same as the complements of two terms joined by`AND`

, and vice versa (i.e.`NOT(A + B) = NOT(A) * NOT(B)`

and`NOT(A * B) = NOT(A) + NOT(B)`

).*Commutative Law*: The order of joining two separate terms with`AND`

or`OR`

is not important.*Complement Law*: A term joined with its complement with`AND`

equals`0`

respectively with`OR`

equals`1`

(i.e.`A * NOT(A) = 0`

and`A + NOT(A) = 1`

).*Annulment Law*: A term joined with`AND`

with`0`

equals`0`

and joined with`OR`

with a`1`

equals`1`

(i.e.`A * 0 = 0`

and`A + 1 = 1`

).*Identity Law*: A term joined with`1`

by`AND`

or with`0`

by`OR`

is equal to itself (i.e.`A * 1 = A`

and`A + 0 = A`

).

(there are more, but you don't need them here)

Applied to your term:

```
(A + NOT(B*C)) * (B + NOT(B*C)) * (C + NOT(B*C))
[with 1.] = (A + NOT(B) + NOT(C)) * (B + NOT(B) + NOT(C)) * (C + NOT(B) + NOT(C))
[with 2.] = (A + NOT(B) + NOT(C)) * (B + NOT(B) + NOT(C)) * (C + NOT(C) + NOT(B))
[with 3.] = (A + NOT(B) + NOT(C)) * (1 + NOT(C)) * (1 + NOT(B))
[with 4.] = (A + NOT(B) + NOT(C)) * 1 * 1
[with 5.] = (A + NOT(B) + NOT(C))
[with 1.] = (A + NOT(B*C))
```

`B + NOT(B*C)`

. – Light Nov 20 '20 at 11:32