df-od

Description: Define the order of an element in a group. (Contributed by Mario Carneiro, 13-Jul-2014) (Revised by Stefan O'Rear, 4-Sep-2015) (Revised by AV, 5-Oct-2020)

		Ref	Expression
	Assertion	df-od	$⊢ od = (g \in V ⟼ (x \in {Base}_{g} ⟼ ⦋ \{n \in ℕ \| n \cdot_{g} x = 0_{g}\} / i ⦌ if (i = \emptyset, 0, sup (i ℝ <))))$

Detailed syntax breakdown

Step	Hyp	Ref	Expression
0		cod	$class od$
1		vg	$setvar g$
2		cvv	$class V$
3		vx	$setvar x$
4		cbs	$class Base$
5	1	cv	$setvar g$
6	5 4	cfv	$class {Base}_{g}$
7		vn	$setvar n$
8		cn	$class ℕ$
9	7	cv	$setvar n$
10		cmg	$class ⋅_{𝑔}$
11	5 10	cfv	$class \cdot_{g}$
12	3	cv	$setvar x$
13	9 12 11	co	$class (n \cdot_{g} x)$
14		c0g	$class 0_{𝑔}$
15	5 14	cfv	$class 0_{g}$
16	13 15	wceq	$wff n \cdot_{g} x = 0_{g}$
17	16 7 8	crab	$class \{n \in ℕ \| n \cdot_{g} x = 0_{g}\}$
18		vi	$setvar i$
19	18	cv	$setvar i$
20		c0	$class \emptyset$
21	19 20	wceq	$wff i = \emptyset$
22		cc0	$class 0$
23		cr	$class ℝ$
24		clt	$class <$
25	19 23 24	cinf	$class sup (i ℝ <)$
26	21 22 25	cif	$class if (i = \emptyset, 0, sup (i ℝ <))$
27	18 17 26	csb	$class ⦋ \{n \in ℕ \| n \cdot_{g} x = 0_{g}\} / i ⦌ if (i = \emptyset, 0, sup (i ℝ <))$
28	3 6 27	cmpt	$class (x \in {Base}_{g} ⟼ ⦋ \{n \in ℕ \| n \cdot_{g} x = 0_{g}\} / i ⦌ if (i = \emptyset, 0, sup (i ℝ <)))$
29	1 2 28	cmpt	$class (g \in V ⟼ (x \in {Base}_{g} ⟼ ⦋ \{n \in ℕ \| n \cdot_{g} x = 0_{g}\} / i ⦌ if (i = \emptyset, 0, sup (i ℝ <))))$
30	0 29	wceq	$wff od = (g \in V ⟼ (x \in {Base}_{g} ⟼ ⦋ \{n \in ℕ \| n \cdot_{g} x = 0_{g}\} / i ⦌ if (i = \emptyset, 0, sup (i ℝ <))))$

Metamath Proof Explorer

Definition df-od

Detailed syntax breakdown