LEADER 04478nam 2200565Ia 450 001 9910461902703321 005 20200520144314.0 010 $a81-224-3491-6 035 $a(CKB)2670000000254100 035 $a(EBL)3017437 035 $a(SSID)ssj0000937043 035 $a(PQKBManifestationID)11542721 035 $a(PQKBTitleCode)TC0000937043 035 $a(PQKBWorkID)10975562 035 $a(PQKB)10414514 035 $a(MiAaPQ)EBC3017437 035 $a(Au-PeEL)EBL3017437 035 $a(CaPaEBR)ebr10594267 035 $a(OCoLC)842259898 035 $a(EXLCZ)992670000000254100 100 $a20111102d2012 uy 0 101 0 $aeng 135 $aurcn||||||||| 181 $ctxt 182 $cc 183 $acr 200 10$aAdvanced trigonometric relations through Nbic functions$b[electronic resource] /$fNIsith K. Bairagi 210 $aNew Delhi $cNew Age International$d2012 215 $a1 online resource (281 p.) 300 $aIncludes index. 311 $a81-224-3023-6 327 $a""Cover ""; ""Preface ""; ""Acknowledgement ""; ""Notation ""; ""Contents ""; ""Chapter 1 Nbic Functions and Nbic Trigonometric Relations ""; ""1.1 Introduction ""; ""1.1.1 Circular Angle ""; ""1.1.2 Definition of Hyperbolic Angle and Tan-equivalent Hyperbolic (tehy) Angle ""; ""1.2 Definition and Interpretation of Nbic Angle ""; ""1.2.1 Nbic Angle and its Interpretation ""; ""1.2.2 Tan-Equivalent Nbic (teN) Angle ""; ""1.3 Symbolic Identification of Nbic Functions ""; ""1.3.1 Nbic Trigonometry ""; ""1.3.2 Interchangeability of Trigonometric and Hyperbolic Functions "" 327 $a""1.3.3 Surface, Gaussian Curvature and Angle Sum """"1.3.4 Nbic Functions and Nbic Trigonometric Relations ""; ""1.4 Complex Nbic Functions ""; ""1.4.1 Some Basic Complex Functions ""; ""1.4.2 Generation of Single Nbic Function, N (x, y) ""; ""1.4.3 Single Nbic Function With Suffixes A and B ""; ""1.4.4 Particular Case ""; ""1.4.5 Complex Single Nbic Function with Suffixes A and B, [NA / (x, x), NB / (x, x)] ""; ""1.5 Generation of Double Nbic Function,N2 (x,y) ""; ""1.5.1 As Generated from Complex Double Nbic Function, N2/(x, y) ""; ""1.5.2 Category 1 : (E type) "" 327 $a""1.5.3 Particular Case """"1.5.4 Category 2 : (F type) ""; ""1.5.5 Particular Case ""; ""1.5.6 Double Nbic Function with Suffixes A and B ""; ""1.6 Generation of Triple Nbic Function, N3(x, y) ""; ""1.6.1 As Generated from Complex Triple Nbic Function, N3 / (x, y) ""; ""1.6.2 Category 1 : (E type) ""; ""1.6.3 Particular Case ""; ""1.6.4 Category 2 : (F type) ""; ""1.6.5 Particular Case ""; ""1.6.6 Category M (Mixed Category) ""; ""1.6.7 Triple Nbic Function with Suffixes A and B ""; ""1.6.8 Particular Case ""; ""1.7 Definition and Development of Nbic Function "" 327 $a""1.7.1 Single Nbic Function with Variable (x, y) : N(x, y) """"1.7.2 Single Nbic Function with Variable of x Only : N(x, x) ""; ""1.7.3 Graphical Determination of Single Nbic Functions ""; ""1.7.4 Single Nbic Function with Complex Variable of (ix) Only : N (ix, ix) ""; ""1.7.5 Comparison with Corresponding Circular and Hyperbolic Functions ""; ""1.8 Derivation of Expressions of Other Basic Nbic Functions ""; ""1.8.1 To Find sinNx and cosNx, when only, tanNx is given ""; ""1.8.2 Differentiation Rule for Single Nbic Functions ""; ""1.8.3 Numerical Verification of Expressions "" 327 $a""1.8.4 Basic Nbic Functions and their Derivatives """"1.8.5 Integration Rule for Single Nbic Functions ""; ""1.8.6 Related Expressions Involving Differentiation and Integration ""; ""1.8.7 Interpretation and Representation in Terms of Circular Functions ""; ""1.9 Nbic Functions with Variable (2x, A?± 2x) AND (2x, A?± x) ""; ""1.9.1 Similarity of Forms ""; ""1.9.2 Single Nbic Function with Double Angle, N(2x, 2x) in Terms of, N(2x, x) ""; ""1.9.3 Some Examples Related to Nbic Functions with Variable (2x, A?± 2x) and (2x, A?± x) ""; ""Chapter 2 Complex Nbic Function and Associated Topics "" 327 $a""2.1 De Moivre's form Extended in Nbic Function "" 606 $aTrigonometry 606 $aMathematics 608 $aElectronic books. 615 0$aTrigonometry. 615 0$aMathematics. 700 $aBairagi$b Nisith K$0854937 801 0$bMiAaPQ 801 1$bMiAaPQ 801 2$bMiAaPQ 906 $aBOOK 912 $a9910461902703321 996 $aAdvanced trigonometric relations through Nbic functions$91909065 997 $aUNINA