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(ln(x^2)-e^sin(x))'The calculation above is a derivative of the function f (x)
(ln(x^2))'+(-e^sin(x))'
(1/(x^2))*(x^2)'+(-e^sin(x))'
(-e^sin(x))'+2*(1/(x^2))*x^(2-1)
2*x^-1-e^sin(x)*((sin(x))'*ln(e)+(sin(x)*(e)')/e)
2*x^-1-e^sin(x)*((sin(x))'*ln(e)+(sin(x)*0)/e)
2*x^-1-e^sin(x)*(cos(x)*ln(e)+(sin(x)*0)/e)
(-e^sin(x))'+2*x^-1
2*x^-1-((-e)^sin(x)*cos(x))
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