I was able to find a (4,2)c/5 component that can be inlined with (4,2)c/4 and (4,2)c/6 to a limited extent. It can accept (4,2)c/4 or (4,2)c/6 inputs and can output to (4,2)c/6. However, it will be able to correct parity problems that (4,2)c/4 and (4,2)c/6 can't fix themselves.
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x = 43, y = 26, rule = Symbiosis
40.2B$40.2B$36.2B$36.2B2.A$32.2B6.3A$32.2B2.A5.B$36.3A$28.BA2.A4.2B$24.
2B6.3A$24.2B2.A4.2B$20.2B6.3A.B.B$20.2B2.A5.B2.B$16.2B6.3A$16.2B2.A4.
2B$20.3A$12.BA2.A5.B$8.2B6.3A$8.2B2.A4.2B$4.2B6.3A.B.B$4.2B2.A5.B2.B$
8.3A$4.A5.B$4.3A$.2A3.B$A.A$2.A!
EDIT: Some turners:
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x = 39, y = 13, rule = Symbiosis
7.BA9.AB$8.A9.A$8.2A7.2A2$5.BA13.AB11.2B$5.BA2.2B5.AB2.AB6.2B4.B$6.2A
.2B6.B.2A7.2B2.3A$32.A5.B$4.A12.A10.A7.3A$4.3A10.3A8.3A2.B2.A$.2A3.B7.
2A3.B5.2A3.B2.A$A.A10.A.A8.A.A$2.A12.A10.A!
The (4,2)c/6 wire part is extremely robust.
Edit 2: A diagonal wire:
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x = 19, y = 21, rule = Symbiosis
14.A$13.BA$9.B2.A.2A$8.A3.B$5.BA$9.A3.A$8.BA3.3A2.B$4.B2.A.2A3.B2.A$3.
A3.B4.BA$BA14.A$4.A3.A7.B$3.BA3.3A2.B$2.A.2A3.B2.A$2.B4.BA$11.A$3.A7.
B$2A.3A2.B$A3.B2.A$2.BA$6.A$6.B!