Metamath Proof Explorer

Theorem dju1p1e2

Description: 1+1=2 for cardinal number addition, derived from pm54.43 as promised. Theorem *110.643 ofPrincipia Mathematica, vol. II, p. 86, which adds the remark, "The above proposition is occasionally useful." Whitehead and Russell define cardinal addition on collections of all sets equinumerous to 1 and 2 (which for us are proper classes unless we restrict them as in karden ), but after applying definitions, our theorem is equivalent. Because we use a disjoint union for cardinal addition (as explained in the comment at the top of this section), we use ~ instead of =. See dju1p1e2ALT for a shorter proof that doesn't use pm54.43 . (Contributed by NM, 5-Apr-2007) (Proof modification is discouraged.)

Ref Expression
Assertion dju1p1e2 ( 1o ⊔ 1o ) ≈ 2o

Proof

Step Hyp Ref Expression
1 df-dju ( 1o ⊔ 1o ) = ( ( { ∅ } × 1o ) ∪ ( { 1o } × 1o ) )
2 xp01disjl ( ( { ∅ } × 1o ) ∩ ( { 1o } × 1o ) ) = ∅
3 0ex ∅ ∈ V
4 1on 1o ∈ On
5 xpsnen2g ( ( ∅ ∈ V ∧ 1o ∈ On ) → ( { ∅ } × 1o ) ≈ 1o )
6 3 4 5 mp2an ( { ∅ } × 1o ) ≈ 1o
7 xpsnen2g ( ( 1o ∈ On ∧ 1o ∈ On ) → ( { 1o } × 1o ) ≈ 1o )
8 4 4 7 mp2an ( { 1o } × 1o ) ≈ 1o
9 pm54.43 ( ( ( { ∅ } × 1o ) ≈ 1o ∧ ( { 1o } × 1o ) ≈ 1o ) → ( ( ( { ∅ } × 1o ) ∩ ( { 1o } × 1o ) ) = ∅ ↔ ( ( { ∅ } × 1o ) ∪ ( { 1o } × 1o ) ) ≈ 2o ) )
10 6 8 9 mp2an ( ( ( { ∅ } × 1o ) ∩ ( { 1o } × 1o ) ) = ∅ ↔ ( ( { ∅ } × 1o ) ∪ ( { 1o } × 1o ) ) ≈ 2o )
11 2 10 mpbi ( ( { ∅ } × 1o ) ∪ ( { 1o } × 1o ) ) ≈ 2o
12 1 11 eqbrtri ( 1o ⊔ 1o ) ≈ 2o