Let x0 of type ι be given.

Assume H0: x0 ∈ real.

Apply real_Re_eq with x0, λ x1 x2 . SNo_pair (add_SNo (mul_SNo (CSNo_Re (SNo_pair 0 1)) x2) (minus_SNo (mul_SNo (CSNo_Im x0) (CSNo_Im (SNo_pair 0 1))))) (add_SNo (mul_SNo (CSNo_Im x0) (CSNo_Re (SNo_pair 0 1))) (mul_SNo (CSNo_Im (SNo_pair 0 1)) x2)) = SNo_pair 0 x0 leaving 2 subgoals.

The subproof is completed by applying H0.

Apply real_Im_eq with x0, λ x1 x2 . SNo_pair (add_SNo (mul_SNo (CSNo_Re (SNo_pair 0 1)) x0) (minus_SNo (mul_SNo x2 (CSNo_Im (SNo_pair 0 1))))) (add_SNo (mul_SNo x2 (CSNo_Re (SNo_pair 0 1))) (mul_SNo (CSNo_Im (SNo_pair 0 1)) x0)) = SNo_pair 0 x0 leaving 2 subgoals.

The subproof is completed by applying H0.

Apply complex_Re_eq with 0, 1, λ x1 x2 . SNo_pair (add_SNo (mul_SNo x2 x0) (minus_SNo (mul_SNo 0 (CSNo_Im (SNo_pair 0 1))))) (add_SNo (mul_SNo 0 x2) (mul_SNo (CSNo_Im (SNo_pair 0 1)) x0)) = SNo_pair 0 x0 leaving 3 subgoals.

The subproof is completed by applying real_0.

The subproof is completed by applying real_1.

Apply complex_Im_eq with 0, 1, λ x1 x2 . SNo_pair (add_SNo (mul_SNo 0 x0) (minus_SNo (mul_SNo 0 x2))) (add_SNo (mul_SNo 0 0) (mul_SNo x2 x0)) = SNo_pair 0 x0 leaving 3 subgoals.

The subproof is completed by applying real_0.

The subproof is completed by applying real_1.

Apply mul_SNo_zeroL with x0, λ x1 x2 . SNo_pair (add_SNo x2 (minus_SNo (mul_SNo 0 1))) (add_SNo (mul_SNo 0 0) (mul_SNo 1 x0)) = SNo_pair 0 x0 leaving 2 subgoals.

Apply real_SNo with x0.

The subproof is completed by applying H0.

Apply mul_SNo_zeroL with 1, λ x1 x2 . SNo_pair (add_SNo 0 (minus_SNo x2)) (add_SNo (mul_SNo 0 0) (mul_SNo 1 x0)) = SNo_pair 0 x0 leaving 2 subgoals.

The subproof is completed by applying SNo_1.

Apply minus_SNo_0 with λ x1 x2 . SNo_pair (add_SNo 0 x2) (add_SNo (mul_SNo 0 0) (mul_SNo 1 x0)) = SNo_pair 0 x0.

Apply mul_SNo_zeroL with 0, λ x1 x2 . SNo_pair (add_SNo 0 0) (add_SNo x2 (mul_SNo 1 x0)) = SNo_pair 0 x0 leaving 2 subgoals.

The subproof is completed by applying SNo_0.

Apply mul_SNo_oneL with x0, λ x1 x2 . SNo_pair (add_SNo 0 0) (add_SNo 0 x2) = SNo_pair 0 x0 leaving 2 subgoals.

Apply real_SNo with x0.

The subproof is completed by applying H0.

Apply add_SNo_0L with 0, λ x1 x2 . SNo_pair x2 (add_SNo 0 x0) = SNo_pair 0 x0 leaving 2 subgoals.

The subproof is completed by applying SNo_0.

Apply add_SNo_0L with x0, λ x1 x2 . SNo_pair 0 x2 = SNo_pair 0 x0 leaving 2 subgoals.

Apply real_SNo with x0.

The subproof is completed by applying H0.

Let x1 of type ι → ι → ο be given.

Assume H1: x1 (SNo_pair 0 x0) (SNo_pair 0 x0).

The subproof is completed by applying H1.

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Proofgold Proof