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the definition of cotangent as per Eq. (2.304) allows reformulation of Eq. (2.338) to

(2.339)

      The same rationale may be applied to Eq. (2.336), viz.

      (2.340)

      with division of both numerator and denominator of the right‐hand side by tan x tan y unfolding

(2.341)

recalling again the definition of cotangent as reciprocal of tangent, i.e. Eq. (2.304), it is possible to transform Eq. (2.341) to

(2.342)

Equations (2.339) and (2.342) accordingly convey a tool for the calculation of cotan{x ± y} knowing solely cotan x and cotan y.

      Upon ordered addition of Eqs. (2.321) and (2.325), one gets

(2.343)

      whereas ordered subtraction thereof gives rise to

(2.344)

      by the same token, ordered addition of Eqs. (2.328) and (2.330) generates

(2.345)

      and ordered subtraction unfolds

(2.346)

      One may now define two auxiliary variables, X and Y, according to

(2.347)

      and

(2.348)

respectively; ordered addition of Eqs. (2.347) and (2.348) yields

      (2.349)

      or else

(2.350)

      upon isolation of x – whereas ordered subtraction of Eq. (2.348) from Eq. (2.347) leads to

      (2.351)

      which in turn conveys

(2.352)

when solved for y. Insertion of Eqs. (2.347), (2.348), (2.350), and (2.352) transforms Eq. (2.343) to

(2.353)

and Eq. (2.344) likewise supports

      (2.354)

one may similarly transform Eq. (2.345) to

      (2.355)

while Eq. (2.346) yields

(2.356)

Equations (2.353)–(2.356) may be useful whenever logarithms of their left‐hand sides are to be handled, because there is no formula to calculate the logarithm of an algebraic sum – unlike happens with the logarithm of a product, see Eq. (2.20).

      In attempts to generate further useful relationships involving transformation of arguments of trigonometric functions, it is convenient to resort to the complex domain – and recall that complex numbers, say z₁ and z₂, may be defined by Cartesian (or rectangular) coordinates as

(2.357)