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• Differentiation_of_trigonometric_functions abstract "The differentiation of trigonometric functions is the mathematical process of finding the rate at which a trigonometric function changes with respect to a variable—the derivative of the trigonometric function. Commonplace trigonometric functions include sin(x), cos(x) and tan(x). For example, in differentiating f(x) = sin(x), one is calculating a function f ′(x) which computes the rate of change of sin(x) at a particular point a. The value of the rate of change at a is thus given by f ′(a). Knowledge of differentiation from first principles is required, along with competence in the use of trigonometric identities and limits. All functions involve the arbitrary variable x, with all differentiation performed with respect to x.It turns out that once one knows the derivatives of sin(x) and cos(x), one can easily compute the derivatives of the other circular trigonometric functions because they can all be expressed in terms of sine or cosine; the quotient rule is then implemented to differentiate this expression. Proofs of the derivatives of sin(x) and cos(x) are given in the proofs section; the results are quoted in order to give proofs of the derivatives of the other circular trigonometric functions. Finding the derivatives of the inverse trigonometric functions involves using implicit differentiation and the derivatives of regular trigonometric functions also given in the proofs section.".
• Differentiation_of_trigonometric_functions wikiPageID "13146531".
• Differentiation_of_trigonometric_functions wikiPageRevisionID "593117468".
• Differentiation_of_trigonometric_functions hasPhotoCollection Differentiation_of_trigonometric_functions.
• Differentiation_of_trigonometric_functions subject Category:Differential_calculus.
• Differentiation_of_trigonometric_functions comment "The differentiation of trigonometric functions is the mathematical process of finding the rate at which a trigonometric function changes with respect to a variable—the derivative of the trigonometric function. Commonplace trigonometric functions include sin(x), cos(x) and tan(x). For example, in differentiating f(x) = sin(x), one is calculating a function f ′(x) which computes the rate of change of sin(x) at a particular point a. The value of the rate of change at a is thus given by f ′(a).".
• Differentiation_of_trigonometric_functions label "Derivación de funciones trigonométricas".
• Differentiation_of_trigonometric_functions label "Diferenciação de funções trigonométricas".
• Differentiation_of_trigonometric_functions label "Differentiation of trigonometric functions".
• Differentiation_of_trigonometric_functions sameAs Derivación_de_funciones_trigonométricas.
• Differentiation_of_trigonometric_functions sameAs Diferenciação_de_funções_trigonométricas.
• Differentiation_of_trigonometric_functions sameAs m.02z8l1l.
• Differentiation_of_trigonometric_functions sameAs Q3296857.
• Differentiation_of_trigonometric_functions sameAs Q3296857.
• Differentiation_of_trigonometric_functions wasDerivedFrom Differentiation_of_trigonometric_functions?oldid=593117468.
• Differentiation_of_trigonometric_functions isPrimaryTopicOf Differentiation_of_trigonometric_functions.