itgeq12i

Description: Equality inference for an integral. General version of itgeq1i and itgeq2i . (Contributed by GG, 1-Sep-2025)

	Ref	Expression
Hypotheses	itgeq12i.1	$⊢ A = B$
	itgeq12i.2	$⊢ C = D$
Assertion	itgeq12i	$⊢ \int_{A} C d x = \int_{B} D d x$

Proof

Step	Hyp	Ref	Expression
1		itgeq12i.1	$⊢ A = B$
2		itgeq12i.2	$⊢ C = D$
3	2	oveq1i	$⊢ \frac{C}{i^{k}} = \frac{D}{i^{k}}$
4	3	fveq2i	$⊢ ℜ (\frac{C}{i^{k}}) = ℜ (\frac{D}{i^{k}})$
5	1	eleq2i	$⊢ x \in A \leftrightarrow x \in B$
6	5	anbi1i	$⊢ (x \in A \land 0 \leq y) \leftrightarrow (x \in B \land 0 \leq y)$
7		ifbi	$⊢ ((x \in A \land 0 \leq y) \leftrightarrow (x \in B \land 0 \leq y)) \to if ((x \in A \land 0 \leq y), y, 0) = if ((x \in B \land 0 \leq y), y, 0)$
8	6 7	ax-mp	$⊢ if ((x \in A \land 0 \leq y), y, 0) = if ((x \in B \land 0 \leq y), y, 0)$
9	8	ax-gen	$⊢ \forall y if ((x \in A \land 0 \leq y), y, 0) = if ((x \in B \land 0 \leq y), y, 0)$
10	4 9	pm3.2i	$⊢ (ℜ (\frac{C}{i^{k}}) = ℜ (\frac{D}{i^{k}}) \land \forall y if ((x \in A \land 0 \leq y), y, 0) = if ((x \in B \land 0 \leq y), y, 0))$
11		csbeq2	$⊢ \forall y if ((x \in A \land 0 \leq y), y, 0) = if ((x \in B \land 0 \leq y), y, 0) \to ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0) = ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)$
12		csbeq1	$⊢ ℜ (\frac{C}{i^{k}}) = ℜ (\frac{D}{i^{k}}) \to ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0) = ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)$
13	11 12	sylan9eqr	$⊢ (ℜ (\frac{C}{i^{k}}) = ℜ (\frac{D}{i^{k}}) \land \forall y if ((x \in A \land 0 \leq y), y, 0) = if ((x \in B \land 0 \leq y), y, 0)) \to ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0) = ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)$
14	10 13	ax-mp	$⊢ ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0) = ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)$
15	14	mpteq2i	$⊢ (x \in ℝ ⟼ ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0)) = (x \in ℝ ⟼ ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0))$
16	15	fveq2i	$⊢ \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0))) = \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)))$
17	16	oveq2i	$⊢ i^{k} \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0))) = i^{k} \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)))$
18	17	sumeq2si	$⊢ \sum_{k = 0}^{3} i^{k} \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0))) = \sum_{k = 0}^{3} i^{k} \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)))$
19		df-itg	$⊢ \int_{A} C d x = \sum_{k = 0}^{3} i^{k} \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{C}{i^{k}}) / y ⦌ if ((x \in A \land 0 \leq y), y, 0)))$
20		df-itg	$⊢ \int_{B} D d x = \sum_{k = 0}^{3} i^{k} \int^{2} ((x \in ℝ ⟼ ⦋ ℜ (\frac{D}{i^{k}}) / y ⦌ if ((x \in B \land 0 \leq y), y, 0)))$
21	18 19 20	3eqtr4i	$⊢ \int_{A} C d x = \int_{B} D d x$

Metamath Proof Explorer

Theorem itgeq12i

Proof