All Banach algebras considered are over the real field and all homomorphisms considered are algebraic (real-linear). An algebra is called semi-simple, strongly semi-simple, or strictly semi-simple, if its Jacobson radical, Segal radical, or strict radical, respectively, is the zero ideal; that is, if its regular maximal right ideals, its regular maximal two-sided ideals, or those of its two-sided ideals which are regular maximal right ideals, intersect in the zero ideal. Rickart proved that a semi-simple commutative Banach algebra has the property that every homomorphism of a Banach algebra into it is continuous. Call an algebra with this property an absolute algebra. Yood proved that every homomorphism of a Banach algebra onto a dense subset of a strongly semi-simple Banach algebra is continuous. Thus a strongly semi-simple Banach algebra is "almost" absolute. The question arose: Is a (noncommutative) semi-simple or strongly semi-simple Banach algebra necessarily absolute? A negative answer is furnished in the present note. It is shown that in order for a Banach algebra to be absolute it is sufficient that it be strictly semi-simple and necessary that it have zero as its only nilpotent element. The latter condition is shown to be sufficient for some special Banach algebras to be absolute.