One type of identity, the reciprocal identities, defines the cosecant function as the reciprocal of the sine function, the secant function as the reciprocal of the cosine function, and the cotangent function as the reciprocal of the tangent function. Answer and Explanation: This problem asks us...
A list of such examples may be continued. Our approach is based on the following observation. Any reproducing formula may be interpreted as a representation of the identity operator I. Consider an analytic operator family {Kα}, α ϵ ₵, for which K0 = I (for instance, one can take...
Chapter Nos List of Chapter Names 1 Transport in Plants 2 Mineral Nutrition 3 Photosynthesis 4 Respiration 5 Digestion and Absorption 6 Breathing and Exchange of Gases 7 Body Fluids and Circulation 8 Excretory Products And Their Elimination 9 Locomotion and Movement 10 Organisms and Population 11 Eco...
These are used to define three new trigonometric functions, cosecant, secant, and cotangent, from three more basic trigonometric functions: sine, cosine, and tangent. Answer and Explanation: To complete this identity, we need to use the reciprocal identities. This is because we need to fill i...