PARADOXICAL SUMMATIONS
The sum of two singular expressions which intuitively makes sense but the PLURAL is never conclusive and because of that in the first place both SINGULARS ARE INACCURATE to reach the PLURAL which is there where the paradox formation occurs.
E.9 A.15 I.22 T.27 D.27 O.28 R.30 H.33 F.35 S.38 C.38 U.40 G.40 L.42 W.42 Q.42 N.45 P.45 B.46 Y.47 K.51 J.52 M.53 V.66 X.68 Z.72
In this example the SUMMATIONS individually of EACH CIRCLE comes very close in EQUALING TOTAL DEGREES IN A CIRCLE but the PLURAL itself is 153 DEGREES OFF.
E.9 A.15 I.22 T.27 D.27 O.28 R.30 H.33 F.35 S.38 C.38 U.40 G.40 L.42 W.42 Q.42 N.45 P.45 B.46 Y.47 K.51 J.52 M.53 V.66 X.68 Z.72
In this example the SUMMATIONS individually of EACH CIRCLE comes very close in EQUALING TOTAL DEGREES IN A CIRCLE but the PLURAL itself is 153 DEGREES OFF.
CIRCLE.179 CIRCLE.179 CIRCLE CIRCLE.358
CIRCLES.217
THE PARADOXICAL SUMMATIONS of CIRCLE in the SINGULAR form does not lead to the SUMMATIONS in the PLURAL FORM.
The PARADOXICAL SUMMATIONS CIRCLE CIRCLE.358 almost equals the number of DEGREES in a CIRCLE by using the two PLURAL taken each ELEMENT SEPARATELY IF you counted each CIRCLE as a DEGREE it indeed would EQUAL 360 DEGREES as if counting the TWO DEGREES OF FREEDOM.
CIRCLES.217
THE PARADOXICAL SUMMATIONS of CIRCLE in the SINGULAR form does not lead to the SUMMATIONS in the PLURAL FORM.
The PARADOXICAL SUMMATIONS CIRCLE CIRCLE.358 almost equals the number of DEGREES in a CIRCLE by using the two PLURAL taken each ELEMENT SEPARATELY IF you counted each CIRCLE as a DEGREE it indeed would EQUAL 360 DEGREES as if counting the TWO DEGREES OF FREEDOM.