xleadd1

Description: Weakened version of xleadd1a under which the reverse implication is true. (Contributed by Mario Carneiro, 20-Aug-2015)

		Ref	Expression
	Assertion	xleadd1	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (A \leq B \leftrightarrow A +_{𝑒} C \leq B +_{𝑒} C)$

Proof

Step	Hyp	Ref	Expression
1		rexr	$⊢ C \in ℝ \to C \in ℝ^{*}$
2		xleadd1a	$⊢ ((A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ^{*}) \land A \leq B) \to A +_{𝑒} C \leq B +_{𝑒} C$
3	2	ex	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ^{*}) \to (A \leq B \to A +_{𝑒} C \leq B +_{𝑒} C)$
4	1 3	syl3an3	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (A \leq B \to A +_{𝑒} C \leq B +_{𝑒} C)$
5		simp1	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to A \in ℝ^{*}$
6	1	3ad2ant3	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to C \in ℝ^{*}$
7		xaddcl	$⊢ (A \in ℝ^{} \land C \in ℝ^{}) \to A +_{𝑒} C \in ℝ^{*}$
8	5 6 7	syl2anc	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to A +_{𝑒} C \in ℝ^{*}$
9		simp2	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to B \in ℝ^{*}$
10		xaddcl	$⊢ (B \in ℝ^{} \land C \in ℝ^{}) \to B +_{𝑒} C \in ℝ^{*}$
11	9 6 10	syl2anc	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to B +_{𝑒} C \in ℝ^{*}$
12		xnegcl	$⊢ C \in ℝ^{} \to - C \in ℝ^{}$
13	6 12	syl	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to - C \in ℝ^{*}$
14		xleadd1a	$⊢ ((A +_{𝑒} C \in ℝ^{} \land B +_{𝑒} C \in ℝ^{} \land - C \in ℝ^{*}) \land A +_{𝑒} C \leq B +_{𝑒} C) \to (A +_{𝑒} C) +_{𝑒} (- C) \leq (B +_{𝑒} C) +_{𝑒} (- C)$
15	14	ex	$⊢ (A +_{𝑒} C \in ℝ^{} \land B +_{𝑒} C \in ℝ^{} \land - C \in ℝ^{*}) \to (A +_{𝑒} C \leq B +_{𝑒} C \to (A +_{𝑒} C) +_{𝑒} (- C) \leq (B +_{𝑒} C) +_{𝑒} (- C))$
16	8 11 13 15	syl3anc	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (A +_{𝑒} C \leq B +_{𝑒} C \to (A +_{𝑒} C) +_{𝑒} (- C) \leq (B +_{𝑒} C) +_{𝑒} (- C))$
17		xpncan	$⊢ (A \in ℝ^{*} \land C \in ℝ) \to (A +_{𝑒} C) +_{𝑒} (- C) = A$
18	17	3adant2	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (A +_{𝑒} C) +_{𝑒} (- C) = A$
19		xpncan	$⊢ (B \in ℝ^{*} \land C \in ℝ) \to (B +_{𝑒} C) +_{𝑒} (- C) = B$
20	19	3adant1	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (B +_{𝑒} C) +_{𝑒} (- C) = B$
21	18 20	breq12d	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to ((A +_{𝑒} C) +_{𝑒} (- C) \leq (B +_{𝑒} C) +_{𝑒} (- C) \leftrightarrow A \leq B)$
22	16 21	sylibd	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (A +_{𝑒} C \leq B +_{𝑒} C \to A \leq B)$
23	4 22	impbid	$⊢ (A \in ℝ^{} \land B \in ℝ^{} \land C \in ℝ) \to (A \leq B \leftrightarrow A +_{𝑒} C \leq B +_{𝑒} C)$

Metamath Proof Explorer

Theorem xleadd1

Proof