यदि y=(sinx)^(sinx) हो, तो सिद्ध कीजिए क...

यदि `y=(sinx)^(sinx)` हो, तो सिद्ध कीजिए कि `(dy)/(dx)=(sinx)^(sinx)cosx[1+log(sinx)]`

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y=(sinx)^(cosx)+(cosx)^(sinx)

Find (dy)/(dx), y=(sinx)^(cosx)+(cosx)^(sinx)

int(sinx)/(sinx-cosx)dx=

int(sinx)/(sinx-cosx)dx=

int(sinx)/(sinx-cosx)dx=

Find (dy)/(dx) , when: y=x^(sinx)+(sinx)^(cosx)

int((sinx+cosx)dx)/sinx

int(cosx)/((1+sinx)(2+sinx))dx

"If "y=(sinx)^(cosx)+(cosx)^(sinx)", prove that "(dy)/(dx)=(sinx)^(cosx).[cot x cos x-sin x(log sinx)]+(cosx)^(sinx).[cosx(log cos x)-sinx tanx].

x sinx(dy)/(dx)+(x cos x+sinx)y=sinx

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