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Proofgold Proof

pf
Claim L0: ...
...
Claim L1: ...
...
Claim L2: OSNo Octonion_i3
The subproof is completed by applying OSNo_Octonion_i3.
Claim L3: OSNo (mul_OSNo Octonion_i5 Quaternion_j)
Apply OSNo_mul_OSNo with Octonion_i5, Quaternion_j leaving 2 subgoals.
The subproof is completed by applying L0.
The subproof is completed by applying L1.
Apply OSNo_proj0proj1_split with mul_OSNo Octonion_i5 Quaternion_j, Octonion_i3 leaving 4 subgoals.
The subproof is completed by applying L3.
The subproof is completed by applying L2.
Apply OSNo_p0_i3 with λ x0 x1 . OSNo_proj0 (mul_OSNo Octonion_i5 Quaternion_j) = x1.
Apply mul_OSNo_proj0 with Octonion_i5, Quaternion_j, λ x0 x1 . x1 = 0 leaving 3 subgoals.
The subproof is completed by applying L0.
The subproof is completed by applying L1.
Apply OSNo_p0_i5 with λ x0 x1 . add_HSNo (mul_HSNo x1 (OSNo_proj0 Quaternion_j)) (minus_HSNo (mul_HSNo (conj_HSNo (OSNo_proj1 Quaternion_j)) (OSNo_proj1 Octonion_i5))) = 0.
Apply OSNo_p1_i5 with λ x0 x1 . add_HSNo (mul_HSNo 0 (OSNo_proj0 Quaternion_j)) (minus_HSNo (mul_HSNo (conj_HSNo (OSNo_proj1 Quaternion_j)) x1)) = 0.
Apply OSNo_p0_j with λ x0 x1 . add_HSNo (mul_HSNo 0 x1) (minus_HSNo (mul_HSNo (conj_HSNo (OSNo_proj1 Quaternion_j)) (minus_HSNo Quaternion_k))) = 0.
Apply OSNo_p1_j with λ x0 x1 . add_HSNo (mul_HSNo 0 Quaternion_j) (minus_HSNo (mul_HSNo (conj_HSNo x1) (minus_HSNo Quaternion_k))) = 0.
Apply conj_HSNo_id_SNo with 0, λ x0 x1 . add_HSNo (mul_HSNo 0 Quaternion_j) (minus_HSNo (mul_HSNo x1 (minus_HSNo Quaternion_k))) = 0 leaving 2 subgoals.
The subproof is completed by applying SNo_0.
Apply mul_HSNo_0L with Quaternion_j, λ x0 x1 . add_HSNo x1 (minus_HSNo (mul_HSNo 0 (minus_HSNo Quaternion_k))) = 0 leaving 2 subgoals.
The subproof is completed by applying HSNo_Quaternion_j.
Apply mul_HSNo_0L with minus_HSNo Quaternion_k, λ x0 x1 . add_HSNo 0 (minus_HSNo x1) = 0 leaving 2 subgoals.
Apply HSNo_minus_HSNo with Quaternion_k.
The subproof is completed by applying HSNo_Quaternion_k.
Apply minus_HSNo_0 with λ x0 x1 . add_HSNo 0 x1 = 0.
Apply add_HSNo_0L with 0.
The subproof is completed by applying HSNo_0.
Apply OSNo_p1_i3 with λ x0 x1 . OSNo_proj1 (mul_OSNo Octonion_i5 Quaternion_j) = x1.
Apply mul_OSNo_proj1 with Octonion_i5, Quaternion_j, λ x0 x1 . x1 = minus_HSNo Complex_i leaving 3 subgoals.
The subproof is completed by applying L0.
The subproof is completed by applying L1.
Apply OSNo_p0_i5 with λ x0 x1 . add_HSNo (mul_HSNo (OSNo_proj1 Quaternion_j) x1) (mul_HSNo (OSNo_proj1 Octonion_i5) (conj_HSNo (OSNo_proj0 Quaternion_j))) = minus_HSNo Complex_i.
Apply OSNo_p1_i5 with λ x0 x1 . add_HSNo (mul_HSNo (OSNo_proj1 Quaternion_j) 0) (mul_HSNo x1 (conj_HSNo (OSNo_proj0 Quaternion_j))) = minus_HSNo Complex_i.
Apply OSNo_p0_j with λ x0 x1 . add_HSNo (mul_HSNo (OSNo_proj1 Quaternion_j) 0) (mul_HSNo (minus_HSNo Quaternion_k) (conj_HSNo x1)) = minus_HSNo Complex_i.
Apply OSNo_p1_j with λ x0 x1 . add_HSNo (mul_HSNo x1 0) (mul_HSNo (minus_HSNo Quaternion_k) (conj_HSNo Quaternion_j)) = minus_HSNo Complex_i.
Apply mul_HSNo_0L with 0, λ x0 x1 . add_HSNo x1 (mul_HSNo (minus_HSNo Quaternion_k) (conj_HSNo Quaternion_j)) = minus_HSNo Complex_i leaving 2 subgoals.
The subproof is completed by applying HSNo_0.
Apply conj_HSNo_j with λ x0 x1 . add_HSNo 0 (mul_HSNo (minus_HSNo Quaternion_k) x1) = minus_HSNo Complex_i.
Apply minus_mul_HSNo_distrR with minus_HSNo Quaternion_k, Quaternion_j, λ x0 x1 . add_HSNo 0 x1 = minus_HSNo Complex_i leaving 3 subgoals.
Apply HSNo_minus_HSNo with Quaternion_k.
The subproof is completed by applying HSNo_Quaternion_k.
The subproof is completed by applying HSNo_Quaternion_j.
Apply minus_mul_HSNo_distrL with Quaternion_k, Quaternion_j, λ x0 x1 . add_HSNo 0 (minus_HSNo x1) = minus_HSNo Complex_i leaving 3 subgoals.
The subproof is completed by applying HSNo_Quaternion_k.
The subproof is completed by applying HSNo_Quaternion_j.
Apply Quaternion_k_j with λ x0 x1 . add_HSNo 0 (minus_HSNo (minus_HSNo x1)) = minus_HSNo Complex_i.
Apply minus_HSNo_invol with Complex_i, λ x0 x1 . add_HSNo 0 (minus_HSNo x1) = minus_HSNo Complex_i leaving 2 subgoals.
The subproof is completed by applying HSNo_Complex_i.
Apply add_HSNo_0L with minus_HSNo Complex_i.
Apply HSNo_minus_HSNo with Complex_i.
The subproof is completed by applying HSNo_Complex_i.