Abstract
The construction of Freudenthal's Magic Square, which contains the exceptional simple Lie algebras of types F_4,E_6,E_7 and E_8 , in terms of symmetric composition algebras is further developed here. The para-Hurwitz algebras, which form a subclass of the symmetric composition algebras, will be defined, in the split case, in terms of the natural two dimensional module for the simple Lie algebra \mathfrak{sl}_2 . As a consequence, it will be shown how all the Lie algebras in Freudenthal's Magic Square can be constructed, in a unified way, using copies of \mathfrak{sl}_2 and of its natural module.
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