Find the derivative of y=sinxcosy with respect to x
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Step-by-step explanation:
✏Find here Derivative of
y = SinX CosY
[ Differentiate w.r.to X ]
dy/dx = d/dx [ SinX cosY ]
= Cos y d/dx (sinX )+ SinX d/dx (CosY)
= cosy. Cosx +SinX .(-sinY) dy/dx
=>(1+SinX .Siny) dy/dx = Cosy .cosx
=>dy/dx = ( cosy .cosx )/(1+sinx siny)
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