We introduce and study the two-parameter family of block-alternating infinite products M^ (d) (a, b), where the exponent imposes a block-alternating sign pattern of period 2d. For d=1 we establish a closed-form identity that transforms the classical sine-ratio product into a tangent ratio, yielding algebraic values in Q (√2), Q (√3), and Q (√5). For d=2 at (a, b) = (2/5, 4/5), we prove the rational value M^ (2) (2/5, 4/5) =5/2 via a double √5-cancellation rooted in the Gauss multiplication formula and the arithmetic of Q (ζ₂₀). As d→∞, limiting values for 1/5-multiple parameters lie in the golden-ratio field Q (√5), with φ= (1+√5) /2 appearing explicitly. The paper concludes by drawing a structural parallel with the Rogers–Ramanujan continued fraction R (q), showing that the same field Q (√5) arises through the arithmetic of cyclotomic fields rather than modular geometry: the engine is the same; the vehicle is different.
Masanori Fujii (Sun,) studied this question.