For , and with the common modulus suppressed:
| 22.8.1 | ||||
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ⓘ
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| 22.8.2 | ||||
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| 22.8.3 | ||||
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| 22.8.4 | |||
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See also Carlson (2004).
For , and with the common modulus suppressed:
| 22.8.13 | ||||
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| 22.8.14 | ||||
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| 22.8.15 | ||||
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| 22.8.16 | ||||
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| 22.8.17 | ||||
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| 22.8.18 | ||||
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See also Carlson (2004).
In the following equations the common modulus is again suppressed.
Let
| 22.8.19 | |||
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Then
| 22.8.20 | |||
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and
| 22.8.21 | |||
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A geometric interpretation of (22.8.20) analogous to that of (23.10.5) is given in Whittaker and Watson (1927, p. 530).
Next, let
| 22.8.22 | |||
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Then
| 22.8.23 | |||
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For these and related identities see Copson (1935, pp. 415–416).
If sums/differences of the ’s are rational multiples of , then further relations follow. For instance, if
| 22.8.24 | |||
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then
| 22.8.25 | |||
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is independent of , , . Similarly, if
| 22.8.26 | |||
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then
| 22.8.27 | |||
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Greenhill (1959, pp. 121–130) reviews these results in terms of the geometric poristic polygon constructions of Poncelet. Generalizations are given in §22.9.