When the value of one quantity increases with respect to decrease in other or vice-versa, then they are said to be inversely proportional. It means that the two quantities behave opposite in nature. For example, speed and time are in inverse proportion with each other.
changing in an opposite direction in relation to something else, esp. an amount: in inverse proportion. an inverse relationship
Inverse, in mathematics, refers to the opposite or reverse relationship between two variables. When two variables are inversely related, it means that as one variable increases, the other variable decreases, and vice versa.
For example, let's consider the relationship between the speed of a car and the time it takes to travel a certain distance. If we assume that the distance is constant, then the speed and time are inversely related. As the speed increases, the time taken to cover the distance decreases, and conversely, if the speed decreases, the time taken increases.
Inversely can also refer to the inverse function. In this context, if a function f(x) has an inverse function f^(-1)(x), it means that applying f(x) and f^(-1)(x) in sequence will return the original value of x. The inverse function "undoes" the actions of the original function.
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Inverse, in mathematics, refers to the opposite or reverse relationship between two variables. When two variables are inversely related, it means that as one variable increases, the other variable decreases, and vice versa.
For example, let's consider the relationship between the speed of a car and the time it takes to travel a certain distance. If we assume that the distance is constant, then the speed and time are inversely related. As the speed increases, the time taken to cover the distance decreases, and conversely, if the speed decreases, the time taken increases.
Inversely can also refer to the inverse function. In this context, if a function f(x) has an inverse function f^(-1)(x), it means that applying f(x) and f^(-1)(x) in sequence will return the original value of x. The inverse function "undoes" the actions of the original function.
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