mulsproplem7

Description: Lemma for surreal multiplication. Show one of the inequalities involved in surreal multiplication's cuts. (Contributed by Scott Fenton, 5-Mar-2025)

	Ref	Expression
Hypotheses	mulsproplem.1	$⊢ φ \to \forall a \in No \forall b \in No \forall c \in No \forall d \in No \forall e \in No \forall f \in No ((bday (a) + bday (b)) \cup (((bday (c) + bday (e)) \cup (bday (d) + bday (f))) \cup ((bday (c) + bday (f)) \cup (bday (d) + bday (e)))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E))))) \to (a \cdot_{s} b \in No \land ((c <_{s} d \land e <_{s} f) \to ((c \cdot_{s} f) -_{s} (c \cdot_{s} e)) <_{s} ((d \cdot_{s} f) -_{s} (d \cdot_{s} e)))))$
	mulsproplem7.1	$⊢ φ \to A \in No$
	mulsproplem7.2	$⊢ φ \to B \in No$
	mulsproplem7.3	$⊢ φ \to R \in R (A)$
	mulsproplem7.4	$⊢ φ \to S \in R (B)$
	mulsproplem7.5	$⊢ φ \to T \in L (A)$
	mulsproplem7.6	$⊢ φ \to U \in R (B)$
Assertion	mulsproplem7	$⊢ φ \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$

Proof

Step	Hyp	Ref	Expression
1		mulsproplem.1	$⊢ φ \to \forall a \in No \forall b \in No \forall c \in No \forall d \in No \forall e \in No \forall f \in No ((bday (a) + bday (b)) \cup (((bday (c) + bday (e)) \cup (bday (d) + bday (f))) \cup ((bday (c) + bday (f)) \cup (bday (d) + bday (e)))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E))))) \to (a \cdot_{s} b \in No \land ((c <_{s} d \land e <_{s} f) \to ((c \cdot_{s} f) -_{s} (c \cdot_{s} e)) <_{s} ((d \cdot_{s} f) -_{s} (d \cdot_{s} e)))))$
2		mulsproplem7.1	$⊢ φ \to A \in No$
3		mulsproplem7.2	$⊢ φ \to B \in No$
4		mulsproplem7.3	$⊢ φ \to R \in R (A)$
5		mulsproplem7.4	$⊢ φ \to S \in R (B)$
6		mulsproplem7.5	$⊢ φ \to T \in L (A)$
7		mulsproplem7.6	$⊢ φ \to U \in R (B)$
8	5	rightnod	$⊢ φ \to S \in No$
9	7	rightnod	$⊢ φ \to U \in No$
10		ltslin	$⊢ (S \in No \land U \in No) \to (S <_{s} U \lor S = U \lor U <_{s} S)$
11	8 9 10	syl2anc	$⊢ φ \to (S <_{s} U \lor S = U \lor U <_{s} S)$
12	4	rightoldd	$⊢ φ \to R \in Old (bday (A))$
13	1 12 3	mulsproplem2	$⊢ φ \to R \cdot_{s} B \in No$
14	5	rightoldd	$⊢ φ \to S \in Old (bday (B))$
15	1 2 14	mulsproplem3	$⊢ φ \to A \cdot_{s} S \in No$
16	13 15	addscld	$⊢ φ \to (R \cdot_{s} B) +_{s} (A \cdot_{s} S) \in No$
17	1 12 14	mulsproplem4	$⊢ φ \to R \cdot_{s} S \in No$
18	16 17	subscld	$⊢ φ \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) \in No$
19	18	adantr	$⊢ (φ \land S <_{s} U) \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) \in No$
20	6	leftoldd	$⊢ φ \to T \in Old (bday (A))$
21	1 20 3	mulsproplem2	$⊢ φ \to T \cdot_{s} B \in No$
22	21 15	addscld	$⊢ φ \to (T \cdot_{s} B) +_{s} (A \cdot_{s} S) \in No$
23	1 20 14	mulsproplem4	$⊢ φ \to T \cdot_{s} S \in No$
24	22 23	subscld	$⊢ φ \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S) \in No$
25	24	adantr	$⊢ (φ \land S <_{s} U) \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S) \in No$
26	7	rightoldd	$⊢ φ \to U \in Old (bday (B))$
27	1 2 26	mulsproplem3	$⊢ φ \to A \cdot_{s} U \in No$
28	21 27	addscld	$⊢ φ \to (T \cdot_{s} B) +_{s} (A \cdot_{s} U) \in No$
29	1 20 26	mulsproplem4	$⊢ φ \to T \cdot_{s} U \in No$
30	28 29	subscld	$⊢ φ \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U) \in No$
31	30	adantr	$⊢ (φ \land S <_{s} U) \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U) \in No$
32		lltr	$⊢ L (A) ≪_{s} R (A)$
33	32	a1i	$⊢ φ \to L (A) ≪_{s} R (A)$
34	33 6 4	sltssepcd	$⊢ φ \to T <_{s} R$
35		sltsright	$⊢ B \in No \to \{B\} ≪_{s} R (B)$
36	3 35	syl	$⊢ φ \to \{B\} ≪_{s} R (B)$
37		snidg	$⊢ B \in No \to B \in \{B\}$
38	3 37	syl	$⊢ φ \to B \in \{B\}$
39	36 38 5	sltssepcd	$⊢ φ \to B <_{s} S$
40		0no	$⊢ 0_{s} \in No$
41	40	a1i	$⊢ φ \to 0_{s} \in No$
42	6	leftnod	$⊢ φ \to T \in No$
43	4	rightnod	$⊢ φ \to R \in No$
44		bday0	$⊢ bday (0_{s}) = \emptyset$
45	44 44	oveq12i	$⊢ bday (0_{s}) + bday (0_{s}) = \emptyset + \emptyset$
46		0elon	$⊢ \emptyset \in On$
47		naddrid	$⊢ \emptyset \in On \to \emptyset + \emptyset = \emptyset$
48	46 47	ax-mp	$⊢ \emptyset + \emptyset = \emptyset$
49	45 48	eqtri	$⊢ bday (0_{s}) + bday (0_{s}) = \emptyset$
50	49	uneq1i	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B)))) = \emptyset \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))))$
51		0un	$⊢ \emptyset \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B)))) = ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B)))$
52	50 51	eqtri	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B)))) = ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B)))$
53		oldbdayim	$⊢ T \in Old (bday (A)) \to bday (T) \in bday (A)$
54	20 53	syl	$⊢ φ \to bday (T) \in bday (A)$
55		bdayon	$⊢ bday (T) \in On$
56		bdayon	$⊢ bday (A) \in On$
57		bdayon	$⊢ bday (B) \in On$
58		naddel1	$⊢ (bday (T) \in On \land bday (A) \in On \land bday (B) \in On) \to (bday (T) \in bday (A) \leftrightarrow bday (T) + bday (B) \in (bday (A) + bday (B)))$
59	55 56 57 58	mp3an	$⊢ bday (T) \in bday (A) \leftrightarrow bday (T) + bday (B) \in (bday (A) + bday (B))$
60	54 59	sylib	$⊢ φ \to bday (T) + bday (B) \in (bday (A) + bday (B))$
61		oldbdayim	$⊢ R \in Old (bday (A)) \to bday (R) \in bday (A)$
62	12 61	syl	$⊢ φ \to bday (R) \in bday (A)$
63		oldbdayim	$⊢ S \in Old (bday (B)) \to bday (S) \in bday (B)$
64	14 63	syl	$⊢ φ \to bday (S) \in bday (B)$
65		naddel12	$⊢ (bday (A) \in On \land bday (B) \in On) \to ((bday (R) \in bday (A) \land bday (S) \in bday (B)) \to bday (R) + bday (S) \in (bday (A) + bday (B)))$
66	56 57 65	mp2an	$⊢ (bday (R) \in bday (A) \land bday (S) \in bday (B)) \to bday (R) + bday (S) \in (bday (A) + bday (B))$
67	62 64 66	syl2anc	$⊢ φ \to bday (R) + bday (S) \in (bday (A) + bday (B))$
68	60 67	jca	$⊢ φ \to (bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B)))$
69		naddel12	$⊢ (bday (A) \in On \land bday (B) \in On) \to ((bday (T) \in bday (A) \land bday (S) \in bday (B)) \to bday (T) + bday (S) \in (bday (A) + bday (B)))$
70	56 57 69	mp2an	$⊢ (bday (T) \in bday (A) \land bday (S) \in bday (B)) \to bday (T) + bday (S) \in (bday (A) + bday (B))$
71	54 64 70	syl2anc	$⊢ φ \to bday (T) + bday (S) \in (bday (A) + bday (B))$
72		bdayon	$⊢ bday (R) \in On$
73		naddel1	$⊢ (bday (R) \in On \land bday (A) \in On \land bday (B) \in On) \to (bday (R) \in bday (A) \leftrightarrow bday (R) + bday (B) \in (bday (A) + bday (B)))$
74	72 56 57 73	mp3an	$⊢ bday (R) \in bday (A) \leftrightarrow bday (R) + bday (B) \in (bday (A) + bday (B))$
75	62 74	sylib	$⊢ φ \to bday (R) + bday (B) \in (bday (A) + bday (B))$
76	71 75	jca	$⊢ φ \to (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B)))$
77		naddcl	$⊢ (bday (T) \in On \land bday (B) \in On) \to bday (T) + bday (B) \in On$
78	55 57 77	mp2an	$⊢ bday (T) + bday (B) \in On$
79		bdayon	$⊢ bday (S) \in On$
80		naddcl	$⊢ (bday (R) \in On \land bday (S) \in On) \to bday (R) + bday (S) \in On$
81	72 79 80	mp2an	$⊢ bday (R) + bday (S) \in On$
82	78 81	onun2i	$⊢ (bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in On$
83		naddcl	$⊢ (bday (T) \in On \land bday (S) \in On) \to bday (T) + bday (S) \in On$
84	55 79 83	mp2an	$⊢ bday (T) + bday (S) \in On$
85		naddcl	$⊢ (bday (R) \in On \land bday (B) \in On) \to bday (R) + bday (B) \in On$
86	72 57 85	mp2an	$⊢ bday (R) + bday (B) \in On$
87	84 86	onun2i	$⊢ (bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in On$
88		naddcl	$⊢ (bday (A) \in On \land bday (B) \in On) \to bday (A) + bday (B) \in On$
89	56 57 88	mp2an	$⊢ bday (A) + bday (B) \in On$
90		onunel	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in On \land (bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in On \land bday (A) + bday (B) \in On) \to (((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \land (bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B))))$
91	82 87 89 90	mp3an	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \land (bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B)))$
92		onunel	$⊢ (bday (T) + bday (B) \in On \land bday (R) + bday (S) \in On \land bday (A) + bday (B) \in On) \to ((bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B))))$
93	78 81 89 92	mp3an	$⊢ (bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B)))$
94		onunel	$⊢ (bday (T) + bday (S) \in On \land bday (R) + bday (B) \in On \land bday (A) + bday (B) \in On) \to ((bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B))))$
95	84 86 89 94	mp3an	$⊢ (bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B)))$
96	93 95	anbi12i	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \land (bday (T) + bday (S)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B))) \leftrightarrow ((bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B))) \land (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B))))$
97	91 96	bitri	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B))) \land (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B))))$
98	68 76 97	sylanbrc	$⊢ φ \to ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B))$
99		elun1	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \to ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
100	98 99	syl	$⊢ φ \to ((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
101	52 100	eqeltrid	$⊢ φ \to (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (S))) \cup ((bday (T) + bday (S)) \cup (bday (R) + bday (B)))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
102	1 41 41 42 43 3 8 101	mulsproplem1	$⊢ φ \to (0_{s} \cdot_{s} 0_{s} \in No \land ((T <_{s} R \land B <_{s} S) \to ((T \cdot_{s} S) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} B))))$
103	102	simprd	$⊢ φ \to ((T <_{s} R \land B <_{s} S) \to ((T \cdot_{s} S) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} B)))$
104	34 39 103	mp2and	$⊢ φ \to ((T \cdot_{s} S) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} B))$
105	23 21 17 13	ltsubsubs2bd	$⊢ φ \to (((T \cdot_{s} S) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} B)) \leftrightarrow ((R \cdot_{s} B) -_{s} (R \cdot_{s} S)) <_{s} ((T \cdot_{s} B) -_{s} (T \cdot_{s} S)))$
106	13 17	subscld	$⊢ φ \to (R \cdot_{s} B) -_{s} (R \cdot_{s} S) \in No$
107	21 23	subscld	$⊢ φ \to (T \cdot_{s} B) -_{s} (T \cdot_{s} S) \in No$
108	106 107 15	ltadds1d	$⊢ φ \to (((R \cdot_{s} B) -_{s} (R \cdot_{s} S)) <_{s} ((T \cdot_{s} B) -_{s} (T \cdot_{s} S)) \leftrightarrow (((R \cdot_{s} B) -_{s} (R \cdot_{s} S)) +_{s} (A \cdot_{s} S)) <_{s} (((T \cdot_{s} B) -_{s} (T \cdot_{s} S)) +_{s} (A \cdot_{s} S)))$
109	105 108	bitrd	$⊢ φ \to (((T \cdot_{s} S) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} B)) \leftrightarrow (((R \cdot_{s} B) -_{s} (R \cdot_{s} S)) +_{s} (A \cdot_{s} S)) <_{s} (((T \cdot_{s} B) -_{s} (T \cdot_{s} S)) +_{s} (A \cdot_{s} S)))$
110	104 109	mpbid	$⊢ φ \to (((R \cdot_{s} B) -_{s} (R \cdot_{s} S)) +_{s} (A \cdot_{s} S)) <_{s} (((T \cdot_{s} B) -_{s} (T \cdot_{s} S)) +_{s} (A \cdot_{s} S))$
111	13 15 17	addsubsd	$⊢ φ \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) = ((R \cdot_{s} B) -_{s} (R \cdot_{s} S)) +_{s} (A \cdot_{s} S)$
112	21 15 23	addsubsd	$⊢ φ \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S) = ((T \cdot_{s} B) -_{s} (T \cdot_{s} S)) +_{s} (A \cdot_{s} S)$
113	110 111 112	3brtr4d	$⊢ φ \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S))$
114	113	adantr	$⊢ (φ \land S <_{s} U) \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S))$
115		sltsleft	$⊢ A \in No \to L (A) ≪_{s} \{A\}$
116	2 115	syl	$⊢ φ \to L (A) ≪_{s} \{A\}$
117		snidg	$⊢ A \in No \to A \in \{A\}$
118	2 117	syl	$⊢ φ \to A \in \{A\}$
119	116 6 118	sltssepcd	$⊢ φ \to T <_{s} A$
120	49	uneq1i	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S)))) = \emptyset \cup (((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))))$
121		0un	$⊢ \emptyset \cup (((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S)))) = ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S)))$
122	120 121	eqtri	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S)))) = ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S)))$
123		oldbdayim	$⊢ U \in Old (bday (B)) \to bday (U) \in bday (B)$
124	26 123	syl	$⊢ φ \to bday (U) \in bday (B)$
125		bdayon	$⊢ bday (U) \in On$
126		naddel2	$⊢ (bday (U) \in On \land bday (B) \in On \land bday (A) \in On) \to (bday (U) \in bday (B) \leftrightarrow bday (A) + bday (U) \in (bday (A) + bday (B)))$
127	125 57 56 126	mp3an	$⊢ bday (U) \in bday (B) \leftrightarrow bday (A) + bday (U) \in (bday (A) + bday (B))$
128	124 127	sylib	$⊢ φ \to bday (A) + bday (U) \in (bday (A) + bday (B))$
129	71 128	jca	$⊢ φ \to (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (A) + bday (U) \in (bday (A) + bday (B)))$
130		naddel12	$⊢ (bday (A) \in On \land bday (B) \in On) \to ((bday (T) \in bday (A) \land bday (U) \in bday (B)) \to bday (T) + bday (U) \in (bday (A) + bday (B)))$
131	56 57 130	mp2an	$⊢ (bday (T) \in bday (A) \land bday (U) \in bday (B)) \to bday (T) + bday (U) \in (bday (A) + bday (B))$
132	54 124 131	syl2anc	$⊢ φ \to bday (T) + bday (U) \in (bday (A) + bday (B))$
133		naddel2	$⊢ (bday (S) \in On \land bday (B) \in On \land bday (A) \in On) \to (bday (S) \in bday (B) \leftrightarrow bday (A) + bday (S) \in (bday (A) + bday (B)))$
134	79 57 56 133	mp3an	$⊢ bday (S) \in bday (B) \leftrightarrow bday (A) + bday (S) \in (bday (A) + bday (B))$
135	64 134	sylib	$⊢ φ \to bday (A) + bday (S) \in (bday (A) + bday (B))$
136	132 135	jca	$⊢ φ \to (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (A) + bday (S) \in (bday (A) + bday (B)))$
137		naddcl	$⊢ (bday (A) \in On \land bday (U) \in On) \to bday (A) + bday (U) \in On$
138	56 125 137	mp2an	$⊢ bday (A) + bday (U) \in On$
139	84 138	onun2i	$⊢ (bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in On$
140		naddcl	$⊢ (bday (T) \in On \land bday (U) \in On) \to bday (T) + bday (U) \in On$
141	55 125 140	mp2an	$⊢ bday (T) + bday (U) \in On$
142		naddcl	$⊢ (bday (A) \in On \land bday (S) \in On) \to bday (A) + bday (S) \in On$
143	56 79 142	mp2an	$⊢ bday (A) + bday (S) \in On$
144	141 143	onun2i	$⊢ (bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in On$
145		onunel	$⊢ ((bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in On \land (bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in On \land bday (A) + bday (B) \in On) \to (((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in (bday (A) + bday (B)) \land (bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in (bday (A) + bday (B))))$
146	139 144 89 145	mp3an	$⊢ ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in (bday (A) + bday (B)) \land (bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in (bday (A) + bday (B)))$
147		onunel	$⊢ (bday (T) + bday (S) \in On \land bday (A) + bday (U) \in On \land bday (A) + bday (B) \in On) \to ((bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (A) + bday (U) \in (bday (A) + bday (B))))$
148	84 138 89 147	mp3an	$⊢ (bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (A) + bday (U) \in (bday (A) + bday (B)))$
149		onunel	$⊢ (bday (T) + bday (U) \in On \land bday (A) + bday (S) \in On \land bday (A) + bday (B) \in On) \to ((bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (A) + bday (S) \in (bday (A) + bday (B))))$
150	141 143 89 149	mp3an	$⊢ (bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (A) + bday (S) \in (bday (A) + bday (B)))$
151	148 150	anbi12i	$⊢ ((bday (T) + bday (S)) \cup (bday (A) + bday (U)) \in (bday (A) + bday (B)) \land (bday (T) + bday (U)) \cup (bday (A) + bday (S)) \in (bday (A) + bday (B))) \leftrightarrow ((bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (A) + bday (U) \in (bday (A) + bday (B))) \land (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (A) + bday (S) \in (bday (A) + bday (B))))$
152	146 151	bitri	$⊢ ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (S) \in (bday (A) + bday (B)) \land bday (A) + bday (U) \in (bday (A) + bday (B))) \land (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (A) + bday (S) \in (bday (A) + bday (B))))$
153	129 136 152	sylanbrc	$⊢ φ \to ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in (bday (A) + bday (B))$
154		elun1	$⊢ ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in (bday (A) + bday (B)) \to ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
155	153 154	syl	$⊢ φ \to ((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
156	122 155	eqeltrid	$⊢ φ \to (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (S)) \cup (bday (A) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (A) + bday (S)))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
157	1 41 41 42 2 8 9 156	mulsproplem1	$⊢ φ \to (0_{s} \cdot_{s} 0_{s} \in No \land ((T <_{s} A \land S <_{s} U) \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S))))$
158	157	simprd	$⊢ φ \to ((T <_{s} A \land S <_{s} U) \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S)))$
159	119 158	mpand	$⊢ φ \to (S <_{s} U \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S)))$
160	159	imp	$⊢ (φ \land S <_{s} U) \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S))$
161	29 27 23 15	ltsubsubs3bd	$⊢ φ \to (((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S)) \leftrightarrow ((A \cdot_{s} S) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U)))$
162	15 23	subscld	$⊢ φ \to (A \cdot_{s} S) -_{s} (T \cdot_{s} S) \in No$
163	27 29	subscld	$⊢ φ \to (A \cdot_{s} U) -_{s} (T \cdot_{s} U) \in No$
164	162 163 21	ltadds2d	$⊢ φ \to (((A \cdot_{s} S) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U)) \leftrightarrow ((T \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (T \cdot_{s} S))) <_{s} ((T \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U))))$
165	161 164	bitrd	$⊢ φ \to (((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S)) \leftrightarrow ((T \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (T \cdot_{s} S))) <_{s} ((T \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U))))$
166	165	adantr	$⊢ (φ \land S <_{s} U) \to (((T \cdot_{s} U) -_{s} (T \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (A \cdot_{s} S)) \leftrightarrow ((T \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (T \cdot_{s} S))) <_{s} ((T \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U))))$
167	160 166	mpbid	$⊢ (φ \land S <_{s} U) \to ((T \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (T \cdot_{s} S))) <_{s} ((T \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U)))$
168	21 15 23	addsubsassd	$⊢ φ \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S) = (T \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (T \cdot_{s} S))$
169	168	adantr	$⊢ (φ \land S <_{s} U) \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S) = (T \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (T \cdot_{s} S))$
170	21 27 29	addsubsassd	$⊢ φ \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U) = (T \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U))$
171	170	adantr	$⊢ (φ \land S <_{s} U) \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U) = (T \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (T \cdot_{s} U))$
172	167 169 171	3brtr4d	$⊢ (φ \land S <_{s} U) \to (((T \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (T \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$
173	19 25 31 114 172	ltstrd	$⊢ (φ \land S <_{s} U) \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$
174	173	ex	$⊢ φ \to (S <_{s} U \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U)))$
175	36 38 7	sltssepcd	$⊢ φ \to B <_{s} U$
176	49	uneq1i	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B)))) = \emptyset \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))))$
177		0un	$⊢ \emptyset \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B)))) = ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B)))$
178	176 177	eqtri	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B)))) = ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B)))$
179		naddel12	$⊢ (bday (A) \in On \land bday (B) \in On) \to ((bday (R) \in bday (A) \land bday (U) \in bday (B)) \to bday (R) + bday (U) \in (bday (A) + bday (B)))$
180	56 57 179	mp2an	$⊢ (bday (R) \in bday (A) \land bday (U) \in bday (B)) \to bday (R) + bday (U) \in (bday (A) + bday (B))$
181	62 124 180	syl2anc	$⊢ φ \to bday (R) + bday (U) \in (bday (A) + bday (B))$
182	60 181	jca	$⊢ φ \to (bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B)))$
183	132 75	jca	$⊢ φ \to (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B)))$
184		naddcl	$⊢ (bday (R) \in On \land bday (U) \in On) \to bday (R) + bday (U) \in On$
185	72 125 184	mp2an	$⊢ bday (R) + bday (U) \in On$
186	78 185	onun2i	$⊢ (bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in On$
187	141 86	onun2i	$⊢ (bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in On$
188		onunel	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in On \land (bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in On \land bday (A) + bday (B) \in On) \to (((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \land (bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B))))$
189	186 187 89 188	mp3an	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \land (bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B)))$
190		onunel	$⊢ (bday (T) + bday (B) \in On \land bday (R) + bday (U) \in On \land bday (A) + bday (B) \in On) \to ((bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B))))$
191	78 185 89 190	mp3an	$⊢ (bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B)))$
192		onunel	$⊢ (bday (T) + bday (U) \in On \land bday (R) + bday (B) \in On \land bday (A) + bday (B) \in On) \to ((bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B))))$
193	141 86 89 192	mp3an	$⊢ (bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B)) \leftrightarrow (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B)))$
194	191 193	anbi12i	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \land (bday (T) + bday (U)) \cup (bday (R) + bday (B)) \in (bday (A) + bday (B))) \leftrightarrow ((bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B))) \land (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B))))$
195	189 194	bitri	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (T) + bday (B) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B))) \land (bday (T) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (B) \in (bday (A) + bday (B))))$
196	182 183 195	sylanbrc	$⊢ φ \to ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B))$
197		elun1	$⊢ ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in (bday (A) + bday (B)) \to ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
198	196 197	syl	$⊢ φ \to ((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
199	178 198	eqeltrid	$⊢ φ \to (bday (0_{s}) + bday (0_{s})) \cup (((bday (T) + bday (B)) \cup (bday (R) + bday (U))) \cup ((bday (T) + bday (U)) \cup (bday (R) + bday (B)))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
200	1 41 41 42 43 3 9 199	mulsproplem1	$⊢ φ \to (0_{s} \cdot_{s} 0_{s} \in No \land ((T <_{s} R \land B <_{s} U) \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} U) -_{s} (R \cdot_{s} B))))$
201	200	simprd	$⊢ φ \to ((T <_{s} R \land B <_{s} U) \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} U) -_{s} (R \cdot_{s} B)))$
202	34 175 201	mp2and	$⊢ φ \to ((T \cdot_{s} U) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} U) -_{s} (R \cdot_{s} B))$
203	1 12 26	mulsproplem4	$⊢ φ \to R \cdot_{s} U \in No$
204	29 21 203 13	ltsubsubs2bd	$⊢ φ \to (((T \cdot_{s} U) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} U) -_{s} (R \cdot_{s} B)) \leftrightarrow ((R \cdot_{s} B) -_{s} (R \cdot_{s} U)) <_{s} ((T \cdot_{s} B) -_{s} (T \cdot_{s} U)))$
205	13 203	subscld	$⊢ φ \to (R \cdot_{s} B) -_{s} (R \cdot_{s} U) \in No$
206	21 29	subscld	$⊢ φ \to (T \cdot_{s} B) -_{s} (T \cdot_{s} U) \in No$
207	205 206 27	ltadds1d	$⊢ φ \to (((R \cdot_{s} B) -_{s} (R \cdot_{s} U)) <_{s} ((T \cdot_{s} B) -_{s} (T \cdot_{s} U)) \leftrightarrow (((R \cdot_{s} B) -_{s} (R \cdot_{s} U)) +_{s} (A \cdot_{s} U)) <_{s} (((T \cdot_{s} B) -_{s} (T \cdot_{s} U)) +_{s} (A \cdot_{s} U)))$
208	204 207	bitrd	$⊢ φ \to (((T \cdot_{s} U) -_{s} (T \cdot_{s} B)) <_{s} ((R \cdot_{s} U) -_{s} (R \cdot_{s} B)) \leftrightarrow (((R \cdot_{s} B) -_{s} (R \cdot_{s} U)) +_{s} (A \cdot_{s} U)) <_{s} (((T \cdot_{s} B) -_{s} (T \cdot_{s} U)) +_{s} (A \cdot_{s} U)))$
209	202 208	mpbid	$⊢ φ \to (((R \cdot_{s} B) -_{s} (R \cdot_{s} U)) +_{s} (A \cdot_{s} U)) <_{s} (((T \cdot_{s} B) -_{s} (T \cdot_{s} U)) +_{s} (A \cdot_{s} U))$
210	13 27 203	addsubsd	$⊢ φ \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U) = ((R \cdot_{s} B) -_{s} (R \cdot_{s} U)) +_{s} (A \cdot_{s} U)$
211	21 27 29	addsubsd	$⊢ φ \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U) = ((T \cdot_{s} B) -_{s} (T \cdot_{s} U)) +_{s} (A \cdot_{s} U)$
212	209 210 211	3brtr4d	$⊢ φ \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$
213		oveq2	$⊢ S = U \to A \cdot_{s} S = A \cdot_{s} U$
214	213	oveq2d	$⊢ S = U \to (R \cdot_{s} B) +_{s} (A \cdot_{s} S) = (R \cdot_{s} B) +_{s} (A \cdot_{s} U)$
215		oveq2	$⊢ S = U \to R \cdot_{s} S = R \cdot_{s} U$
216	214 215	oveq12d	$⊢ S = U \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) = ((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U)$
217	216	breq1d	$⊢ S = U \to ((((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U)) \leftrightarrow (((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U)))$
218	212 217	syl5ibrcom	$⊢ φ \to (S = U \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U)))$
219	18	adantr	$⊢ (φ \land U <_{s} S) \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) \in No$
220	13 27	addscld	$⊢ φ \to (R \cdot_{s} B) +_{s} (A \cdot_{s} U) \in No$
221	220 203	subscld	$⊢ φ \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U) \in No$
222	221	adantr	$⊢ (φ \land U <_{s} S) \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U) \in No$
223	30	adantr	$⊢ (φ \land U <_{s} S) \to ((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U) \in No$
224		sltsright	$⊢ A \in No \to \{A\} ≪_{s} R (A)$
225	2 224	syl	$⊢ φ \to \{A\} ≪_{s} R (A)$
226	225 118 4	sltssepcd	$⊢ φ \to A <_{s} R$
227	49	uneq1i	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U)))) = \emptyset \cup (((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))))$
228		0un	$⊢ \emptyset \cup (((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U)))) = ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U)))$
229	227 228	eqtri	$⊢ (bday (0_{s}) + bday (0_{s})) \cup (((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U)))) = ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U)))$
230	128 67	jca	$⊢ φ \to (bday (A) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B)))$
231	135 181	jca	$⊢ φ \to (bday (A) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B)))$
232	138 81	onun2i	$⊢ (bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in On$
233	143 185	onun2i	$⊢ (bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in On$
234		onunel	$⊢ ((bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in On \land (bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in On \land bday (A) + bday (B) \in On) \to (((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \land (bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B))))$
235	232 233 89 234	mp3an	$⊢ ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \land (bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)))$
236		onunel	$⊢ (bday (A) + bday (U) \in On \land bday (R) + bday (S) \in On \land bday (A) + bday (B) \in On) \to ((bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \leftrightarrow (bday (A) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B))))$
237	138 81 89 236	mp3an	$⊢ (bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \leftrightarrow (bday (A) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B)))$
238		onunel	$⊢ (bday (A) + bday (S) \in On \land bday (R) + bday (U) \in On \land bday (A) + bday (B) \in On) \to ((bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \leftrightarrow (bday (A) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B))))$
239	143 185 89 238	mp3an	$⊢ (bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B)) \leftrightarrow (bday (A) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B)))$
240	237 239	anbi12i	$⊢ ((bday (A) + bday (U)) \cup (bday (R) + bday (S)) \in (bday (A) + bday (B)) \land (bday (A) + bday (S)) \cup (bday (R) + bday (U)) \in (bday (A) + bday (B))) \leftrightarrow ((bday (A) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B))) \land (bday (A) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B))))$
241	235 240	bitri	$⊢ ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in (bday (A) + bday (B)) \leftrightarrow ((bday (A) + bday (U) \in (bday (A) + bday (B)) \land bday (R) + bday (S) \in (bday (A) + bday (B))) \land (bday (A) + bday (S) \in (bday (A) + bday (B)) \land bday (R) + bday (U) \in (bday (A) + bday (B))))$
242	230 231 241	sylanbrc	$⊢ φ \to ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in (bday (A) + bday (B))$
243		elun1	$⊢ ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in (bday (A) + bday (B)) \to ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
244	242 243	syl	$⊢ φ \to ((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
245	229 244	eqeltrid	$⊢ φ \to (bday (0_{s}) + bday (0_{s})) \cup (((bday (A) + bday (U)) \cup (bday (R) + bday (S))) \cup ((bday (A) + bday (S)) \cup (bday (R) + bday (U)))) \in ((bday (A) + bday (B)) \cup (((bday (C) + bday (E)) \cup (bday (D) + bday (F))) \cup ((bday (C) + bday (F)) \cup (bday (D) + bday (E)))))$
246	1 41 41 2 43 9 8 245	mulsproplem1	$⊢ φ \to (0_{s} \cdot_{s} 0_{s} \in No \land ((A <_{s} R \land U <_{s} S) \to ((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U))))$
247	246	simprd	$⊢ φ \to ((A <_{s} R \land U <_{s} S) \to ((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U)))$
248	226 247	mpand	$⊢ φ \to (U <_{s} S \to ((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U)))$
249	248	imp	$⊢ (φ \land U <_{s} S) \to ((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U))$
250	15 17 27 203	ltsubsubsbd	$⊢ φ \to (((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U)) \leftrightarrow ((A \cdot_{s} S) -_{s} (R \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U)))$
251	15 17	subscld	$⊢ φ \to (A \cdot_{s} S) -_{s} (R \cdot_{s} S) \in No$
252	27 203	subscld	$⊢ φ \to (A \cdot_{s} U) -_{s} (R \cdot_{s} U) \in No$
253	251 252 13	ltadds2d	$⊢ φ \to (((A \cdot_{s} S) -_{s} (R \cdot_{s} S)) <_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U)) \leftrightarrow ((R \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (R \cdot_{s} S))) <_{s} ((R \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U))))$
254	250 253	bitrd	$⊢ φ \to (((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U)) \leftrightarrow ((R \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (R \cdot_{s} S))) <_{s} ((R \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U))))$
255	254	adantr	$⊢ (φ \land U <_{s} S) \to (((A \cdot_{s} S) -_{s} (A \cdot_{s} U)) <_{s} ((R \cdot_{s} S) -_{s} (R \cdot_{s} U)) \leftrightarrow ((R \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (R \cdot_{s} S))) <_{s} ((R \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U))))$
256	249 255	mpbid	$⊢ (φ \land U <_{s} S) \to ((R \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (R \cdot_{s} S))) <_{s} ((R \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U)))$
257	13 15 17	addsubsassd	$⊢ φ \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) = (R \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (R \cdot_{s} S))$
258	257	adantr	$⊢ (φ \land U <_{s} S) \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S) = (R \cdot_{s} B) +_{s} ((A \cdot_{s} S) -_{s} (R \cdot_{s} S))$
259	13 27 203	addsubsassd	$⊢ φ \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U) = (R \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U))$
260	259	adantr	$⊢ (φ \land U <_{s} S) \to ((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U) = (R \cdot_{s} B) +_{s} ((A \cdot_{s} U) -_{s} (R \cdot_{s} U))$
261	256 258 260	3brtr4d	$⊢ (φ \land U <_{s} S) \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U))$
262	212	adantr	$⊢ (φ \land U <_{s} S) \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (R \cdot_{s} U)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$
263	219 222 223 261 262	ltstrd	$⊢ (φ \land U <_{s} S) \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$
264	263	ex	$⊢ φ \to (U <_{s} S \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U)))$
265	174 218 264	3jaod	$⊢ φ \to ((S <_{s} U \lor S = U \lor U <_{s} S) \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U)))$
266	11 265	mpd	$⊢ φ \to (((R \cdot_{s} B) +_{s} (A \cdot_{s} S)) -_{s} (R \cdot_{s} S)) <_{s} (((T \cdot_{s} B) +_{s} (A \cdot_{s} U)) -_{s} (T \cdot_{s} U))$

Metamath Proof Explorer

Theorem mulsproplem7

Proof