# Boolean Algebra Rule 10

Hi I have a question about the following algebra rule

A + AB = A

My textbook explains this as follows A + AB = A This rule can be proved as such:

• Step 1:

Dustributive Law:

A + AB = A*1 = A(1+B) Huh...? Where do they get the one(1) from?

• Step 2:

1 + B = 1

• Step 3:

: A + 1 = A

Thus A + AB = A

If anyone can clarify this for me it would be greatly appreciated

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This question appears to be off-topic because it is about maths, and as such probably would be a better fit on Maths SE. –  halfer Oct 27 '13 at 16:08

The 1 would stand for ⊤ or true. To prove the rule they're assuming the right side is true, distributing this information into the left side, and reducing.

Starting with A ∨ (A ∧ B) ↔ A,

`A + AB = A`

Call A ⊤,

⊤ ∨ (⊤ ∧ B) ↔ ⊤

`1 + 1 * B = 1` now it reads "true or true and B equals true" which could just as easily be "with gravy or gravy and something else, you will have gravy"

`1 + B = 1` AND having higher precedence...

`1 = 1` OR is true if at least one operand is true

`A` no further reduction possible.

It could just as easily be done using ⊥ (false) instead

⊥ ∨ (⊥ ∧ B) ↔ ⊥

`0 + 0 * B = 0` which would read "false or false and B equals false" which could just as easily be "without bananas or bananas and something else, you will not have bananas"

`0 + 0 = 0` AND having higher precedence...

`0 = 0` OR is false

`A` no further reduction possible

It might help to construct a truth table and then review the rules for distribution. The 1 appearing in your formula is distributed into the terms to facilitate simplifying the statement.

Since rule 0101 (10) maps to (P ∧ Q) ∨ Q ↔ Q

``````P Q x
0 0 0
0 1 1
1 0 0
1 1 1
``````

or a Karnaugh map

``````   ~Q Q
~P 0  1
P 0  1
``````