![]() We know that the principal value of the trigonometric function at a point is the value of the inverse function at a point, which falls in the range of the principal values unit. For example.,ĭomain and Principal Value of Inverse Trigonometric Functions To avoid this confusion, some people choose to represent the inverse function by using arc as a prefix. We generally use Cosecant or csc to determine the reciprocal of sin. Although in this situation, Sin -1 θ = 1/Sin θ. ![]() Note: The representation Sin -1 might create confusion because we usually use a negative exponent to represent reciprocals. It implies inverse trigonometric functions are beneficial whenever the sides of a triangle are known and we want to determine the angles of a triangle. However, the inverse trigonometric function considers the ratio of the side of a triangle as input and obtains the value of angles. ![]() In the above basic trigonometric function, the angles are termed as input and the ratio of the sides of a triangle is considered as their outcomes. In the above triangle ABC, the basic trigonometric function will be defined as: We can understand the concept of inverse trigonometric function in a better way with the help of the triangle given below. The other names of Inverse trigonometric functions are arcus function, anti-trigonometric function or cyclomatic function. ![]() Inverse Trigonometric Functions in Maths is simply defined as the inverse of some basic trigonometric functions such as sine, cosine, tan, sec, cosec and cot.
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |