let m, n, x, y, z be Quaternion; :: thesis:
assume A1: z = ((m + n) + x) + y ; :: thesis:
consider m1, m2, m3, m4, n1, n2, n3, n4 being Real such that
A2: m = [*m1,m2,m3,m4*] and
A3: n = [*n1,n2,n3,n4*] and
A4: m + n = [*(m1 + n1),(m2 + n2),(m3 + n3),(m4 + n4)*] by Def6;
consider x1, x2, x3, x4, y1, y2, y3, y4 being Real such that
A5: x = [*x1,x2,x3,x4*] and
A6: y = [*y1,y2,y3,y4*] and
x + y = [*(x1 + y1),(x2 + y2),(x3 + y3),(x4 + y4)*] by Def6;
A7: Rea m = m1 by A2, Th16;
A8: Rea n = n1 by A3, Th16;
A9: Rea x = x1 by A5, Th16;
A10: Rea y = y1 by A6, Th16;
A11: Im1 m = m2 by A2, Th16;
A12: Im1 n = n2 by A3, Th16;
A13: Im1 x = x2 by A5, Th16;
A14: Im1 y = y2 by A6, Th16;
A15: Im2 m = m3 by A2, Th16;
A16: Im2 n = n3 by A3, Th16;
A17: Im2 x = x3 by A5, Th16;
A18: Im2 y = y3 by A6, Th16;
A19: Im3 m = m4 by A2, Th16;
A20: Im3 n = n4 by A3, Th16;
A21: Im3 x = x4 by A5, Th16;
A22: Im3 y = y4 by A6, Th16;
(m + n) + x = [*((m1 + n1) + x1),((m2 + n2) + x2),((m3 + n3) + x3),((m4 + n4) + x4)*] by A4, A5, Def6;
then z = [*(((m1 + n1) + x1) + y1),(((m2 + n2) + x2) + y2),(((m3 + n3) + x3) + y3),(((m4 + n4) + x4) + y4)*] by A1, A6, Def6;
hence ( Rea z = (((Rea m) + (Rea n)) + (Rea x)) + (Rea y) & Im1 z = (((Im1 m) + (Im1 n)) + (Im1 x)) + (Im1 y) & Im2 z = (((Im2 m) + (Im2 n)) + (Im2 x)) + (Im2 y) & Im3 z = (((Im3 m) + (Im3 n)) + (Im3 x)) + (Im3 y) ) by A7, A8, A9, A10, A11, A12, A13, A14, A15, A16, A17, A18, A19, A20, A21, A22, Th16; :: thesis: