(a+2bcosx)(a−2bcosy)=a2−b2
(a−2bcosy)(−2bsinx)dydx+2bsiny(a+2bcosx)=0
dydx=2bsinx(a−2bcosy)2bsiny(a+2bcosx)=sinx(a−2bcosy)siny(a+2bcosx)
dydx∣(4π,4π)=a−ba+b.
If (a+2bcosx)(a−2bcosy)=a2−b2, where a>b>0, thendydx at (4π,4π) is:
Held on 4 Sept 2020 · Verified 6 Jul 2026.
a+2ba−2b
a+ba−b
a−ba+b
2a−b2a+b
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