Found 3 Articles for Maths Properties

Properties of Inverse Trigonometric Functions

Praveen Varghese Thomas
Updated on 02-Apr-2024 17:29:20

27 Views

Introduction The properties of inverse trigonometric functions are associated with the range as well as domain of the function. Inverse trigonometric functions are identified as the inverse of some basic trigonometric functions such as sine, cosine, tangent, secant, cosecant, and cotangent functions. Inverse trigonometric functions are also known as, arc functions and cyclometric functions. These expressions of inverse trigonometric functions allow you to find any angle at any trigonometric ratio. These expressions are derived from the properties of trigonometric functions.It is expressed as − $$\mathrm{\sin^{-1}\:, \:\cos^{-1}\:, \:\sec^{-1}\:, \:cosec^{-1}\:, \:\cot^{-1}\:, \:and\:\tan^{-1}}$$ Inverse trigonometric functions also are known as, arc functions, and ... Read More

Properties of Definite Integrals

Praveen Varghese Thomas
Updated on 29-Feb-2024 11:44:04

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Introduction There are two methods of integration − Deterministic integration and Indefinite integration. Definitive integration is performed on boundaries or areas specified by boundaries. Since the curve is finite, the area under the curve is also said to be finite, but indefinite integrals are used for functions that have no upper or lower bound, but because the function is essentially infinite, the upper bound and the lower limit is indefinite. Functions + ∞ & -∞. Integrals In differential calculus we are concerned with the methods of finding the derivative (or differential) of a differentiable function. ... Read More

Properties of Logarithms

Praveen Varghese Thomas
Updated on 09-Feb-2024 11:06:19

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Introduction Logarithms are just another way of expressing exponents and can be used to solve problems that cannot be solved by the concept of exponents alone. In mathematics, logarithmic function properties are used to solve logarithmic problems. The division takes the final number and determines the count of the addition. Perhaps now you can appreciate how exponents and logarithms are a lot like multiplication and division. You will generally deal with a "base" in exponents and logarithms. The "base" of the exponent will be the same as the base of the logarithm. You have ... Read More

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