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(sin(0.5*x)/0.5)'The calculation above is a derivative of the function f (x)
((sin(0.5*x))'*0.5-(sin(0.5*x)*(0.5)'))/(0.5^2)
(cos(0.5*x)*(0.5*x)'*0.5-(sin(0.5*x)*(0.5)'))/(0.5^2)
(cos(0.5*x)*((0.5)'*x+0.5*(x)')*0.5-(sin(0.5*x)*(0.5)'))/(0.5^2)
(cos(0.5*x)*(0*x+0.5*(x)')*0.5-(sin(0.5*x)*(0.5)'))/(0.5^2)
(cos(0.5*x)*(0*x+0.5*1)*0.5-(sin(0.5*x)*(0.5)'))/(0.5^2)
(0.5*cos(0.5*x)*0.5-(sin(0.5*x)*(0.5)'))/(0.5^2)
(0.5*cos(0.5*x)*0.5-(sin(0.5*x)*0))/(0.5^2)
(0.25*cos(0.5*x))/(0.5^2)
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