1lt2nq

Description: One is less than two (one plus one). (Contributed by NM, 13-Mar-1996) (Revised by Mario Carneiro, 10-May-2013) (New usage is discouraged.)

		Ref	Expression
	Assertion	1lt2nq	$⊢ 1_{𝑸} <_{𝑸} (1_{𝑸} +_{𝑸} 1_{𝑸})$

Proof

Step	Hyp	Ref	Expression
1		1lt2pi	$⊢ 1_{𝑜} <_{𝑵} (1_{𝑜} +_{𝑵} 1_{𝑜})$
2		1pi	$⊢ 1_{𝑜} \in 𝑵$
3		mulidpi	$⊢ 1_{𝑜} \in 𝑵 \to 1_{𝑜} \cdot_{𝑵} 1_{𝑜} = 1_{𝑜}$
4	2 3	ax-mp	$⊢ 1_{𝑜} \cdot_{𝑵} 1_{𝑜} = 1_{𝑜}$
5		addclpi	$⊢ (1_{𝑜} \in 𝑵 \land 1_{𝑜} \in 𝑵) \to 1_{𝑜} +_{𝑵} 1_{𝑜} \in 𝑵$
6	2 2 5	mp2an	$⊢ 1_{𝑜} +_{𝑵} 1_{𝑜} \in 𝑵$
7		mulidpi	$⊢ 1_{𝑜} +_{𝑵} 1_{𝑜} \in 𝑵 \to (1_{𝑜} +_{𝑵} 1_{𝑜}) \cdot_{𝑵} 1_{𝑜} = 1_{𝑜} +_{𝑵} 1_{𝑜}$
8	6 7	ax-mp	$⊢ (1_{𝑜} +_{𝑵} 1_{𝑜}) \cdot_{𝑵} 1_{𝑜} = 1_{𝑜} +_{𝑵} 1_{𝑜}$
9	1 4 8	3brtr4i	$⊢ (1_{𝑜} \cdot_{𝑵} 1_{𝑜}) <_{𝑵} ((1_{𝑜} +_{𝑵} 1_{𝑜}) \cdot_{𝑵} 1_{𝑜})$
10		ordpipq	$⊢ ⟨1_{𝑜}, 1_{𝑜}⟩ <_{𝑝𝑸} ⟨1_{𝑜} +_{𝑵} 1_{𝑜}, 1_{𝑜}⟩ \leftrightarrow (1_{𝑜} \cdot_{𝑵} 1_{𝑜}) <_{𝑵} ((1_{𝑜} +_{𝑵} 1_{𝑜}) \cdot_{𝑵} 1_{𝑜})$
11	9 10	mpbir	$⊢ ⟨1_{𝑜}, 1_{𝑜}⟩ <_{𝑝𝑸} ⟨1_{𝑜} +_{𝑵} 1_{𝑜}, 1_{𝑜}⟩$
12		df-1nq	$⊢ 1_{𝑸} = ⟨1_{𝑜}, 1_{𝑜}⟩$
13	12 12	oveq12i	$⊢ 1_{𝑸} +_{𝑝𝑸} 1_{𝑸} = ⟨1_{𝑜}, 1_{𝑜}⟩ +_{𝑝𝑸} ⟨1_{𝑜}, 1_{𝑜}⟩$
14		addpipq	$⊢ ((1_{𝑜} \in 𝑵 \land 1_{𝑜} \in 𝑵) \land (1_{𝑜} \in 𝑵 \land 1_{𝑜} \in 𝑵)) \to ⟨1_{𝑜}, 1_{𝑜}⟩ +_{𝑝𝑸} ⟨1_{𝑜}, 1_{𝑜}⟩ = ⟨(1_{𝑜} \cdot_{𝑵} 1_{𝑜}) +_{𝑵} (1_{𝑜} \cdot_{𝑵} 1_{𝑜}), 1_{𝑜} \cdot_{𝑵} 1_{𝑜}⟩$
15	2 2 2 2 14	mp4an	$⊢ ⟨1_{𝑜}, 1_{𝑜}⟩ +_{𝑝𝑸} ⟨1_{𝑜}, 1_{𝑜}⟩ = ⟨(1_{𝑜} \cdot_{𝑵} 1_{𝑜}) +_{𝑵} (1_{𝑜} \cdot_{𝑵} 1_{𝑜}), 1_{𝑜} \cdot_{𝑵} 1_{𝑜}⟩$
16	4 4	oveq12i	$⊢ (1_{𝑜} \cdot_{𝑵} 1_{𝑜}) +_{𝑵} (1_{𝑜} \cdot_{𝑵} 1_{𝑜}) = 1_{𝑜} +_{𝑵} 1_{𝑜}$
17	16 4	opeq12i	$⊢ ⟨(1_{𝑜} \cdot_{𝑵} 1_{𝑜}) +_{𝑵} (1_{𝑜} \cdot_{𝑵} 1_{𝑜}), 1_{𝑜} \cdot_{𝑵} 1_{𝑜}⟩ = ⟨1_{𝑜} +_{𝑵} 1_{𝑜}, 1_{𝑜}⟩$
18	13 15 17	3eqtri	$⊢ 1_{𝑸} +_{𝑝𝑸} 1_{𝑸} = ⟨1_{𝑜} +_{𝑵} 1_{𝑜}, 1_{𝑜}⟩$
19	11 12 18	3brtr4i	$⊢ 1_{𝑸} <_{𝑝𝑸} (1_{𝑸} +_{𝑝𝑸} 1_{𝑸})$
20		lterpq	$⊢ 1_{𝑸} <_{𝑝𝑸} (1_{𝑸} +_{𝑝𝑸} 1_{𝑸}) \leftrightarrow /_{𝑸} (1_{𝑸}) <_{𝑸} /_{𝑸} (1_{𝑸} +_{𝑝𝑸} 1_{𝑸})$
21	19 20	mpbi	$⊢ /_{𝑸} (1_{𝑸}) <_{𝑸} /_{𝑸} (1_{𝑸} +_{𝑝𝑸} 1_{𝑸})$
22		1nq	$⊢ 1_{𝑸} \in 𝑸$
23		nqerid	$⊢ 1_{𝑸} \in 𝑸 \to /_{𝑸} (1_{𝑸}) = 1_{𝑸}$
24	22 23	ax-mp	$⊢ /_{𝑸} (1_{𝑸}) = 1_{𝑸}$
25	24	eqcomi	$⊢ 1_{𝑸} = /_{𝑸} (1_{𝑸})$
26		addpqnq	$⊢ (1_{𝑸} \in 𝑸 \land 1_{𝑸} \in 𝑸) \to 1_{𝑸} +_{𝑸} 1_{𝑸} = /_{𝑸} (1_{𝑸} +_{𝑝𝑸} 1_{𝑸})$
27	22 22 26	mp2an	$⊢ 1_{𝑸} +_{𝑸} 1_{𝑸} = /_{𝑸} (1_{𝑸} +_{𝑝𝑸} 1_{𝑸})$
28	21 25 27	3brtr4i	$⊢ 1_{𝑸} <_{𝑸} (1_{𝑸} +_{𝑸} 1_{𝑸})$

Metamath Proof Explorer

Theorem 1lt2nq

Proof