Study of Properties of inverse trigonometric functions
Keywords:
Domains, RangesAbstract
Inverse of a function ‘f ’ exists, if the function is one-one and onto, Since trigonometric functions are many-one over their domains, we restrict their domains and co-domains in order to make them one-one and onto and then find their inverse.
References
Ahlfors, L.V., Complex Analysis. McGraw-Hill Book Company, 1979.
Conway, J.B., Functions of One complex variables Narosa Publishing, 2000.
Priestly, H.A., Introduction to Complex Analysis Claredon Press, Orford, 1990.
D.Sarason, Complex Function Theory, Hindustan Book Agency, Delhi, 1994.
Mark J.Ablewitz and A.S.Fokas, Complex Variables : Introduction & Applications,
Cambridge University Press, South Asian Edition, 1998.
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Published
2018-03-30
How to Cite
Sunita. (2018). Study of Properties of inverse trigonometric functions. Universal Research Reports, 5(1), 138–142. Retrieved from https://urr.shodhsagar.com/index.php/j/article/view/500
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Original Research Article
