If siny=xsin(a+y) prove that dy/dx=sin^2(a+y)/sina
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sin(x−y)=sinx.cosy−siny.cosx
It's very simple here. You just have to separate out the terms containing x and terms containing y:-
siny=x.sin(a+y)
x=sinysin(a+y)
Differentiating both sides
dx=sin(a+y).cosy.dy−siny.cos(a+y).dysin2(a+y)
Using Prerequisite (1)
dx=sin(a+y−y).dysin2(a+y)
dx=sina.dysin2(a+y)
So,
dydx=sin^2(a+y)sina
So how it is derived.
⌣¨
It's very simple here. You just have to separate out the terms containing x and terms containing y:-
siny=x.sin(a+y)
x=sinysin(a+y)
Differentiating both sides
dx=sin(a+y).cosy.dy−siny.cos(a+y).dysin2(a+y)
Using Prerequisite (1)
dx=sin(a+y−y).dysin2(a+y)
dx=sina.dysin2(a+y)
So,
dydx=sin^2(a+y)sina
So how it is derived.
⌣¨
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