Mathematics for Enzyme Reaction Kinetics and Reactor Performance. F. Xavier MalcataЧитать онлайн книгу.
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and
(2.358)
with
and
respectively. Note that
(2.361)
and
(2.362)
were used as defining relationships, in agreement with Eqs. (2.288) and (2.290), complemented by Fig. 2.10 a; and after replacing ‖ u ‖ by ρi,
in view of Eqs. (2.359) and (2.360), or else
after lumping ρ1 and ρ2, and applying the distributive property to the product of sums of trigonometric functions; since ι2 = −1 by definition, Eq. (2.364) becomes
along with convenient factoring out of ι. Insertion of Eqs. (2.325) and (2.328) supports transformation of Eq. (2.365) to
in the case of n complex numbers, Eq. (2.366) readily generalizes to
via consecutive application of the transformation of Eq. (2.363) to Eq. (2.366). Should, in addition, ρ1 = ρ2 = ⋯ = ρn = ρ and θ1 = θ2 = ⋯ = θn = θ, then Eq. (2.367) degenerates to
– in view of the functional form conveyed by either Eq. (2.359) or Eq. (2.360), and the definition of power; if ρ is further set equal to unity, then Eq. (2.368) simplifies to
usually known as Moivre's formula – and valid for any positive or negative integer n (as well as for rational numbers). For instance, Eq. (2.369) yields
in the case of n = −1, which breaks down to merely
in view of Eqs. (2.295) and (2.296) – and with z defined
combination of Eqs. (2.370) and (2.371) obviously looks like
Ordered addition of Eqs. (2.371) and (2.372) produces
(2.374)