inverse function

inverse function (plural inverse functions)

1. (mathematics) For a given function ƒ, another function, denoted ƒ ^-1, that reverses the mapping action of ƒ; (formally) given a function ${\displaystyle f:X\rightarrow Y}$ , a function ${\displaystyle g:Y\rightarrow X}$ such that, ${\displaystyle \forall x\in X,\ f(x)=y\implies g(y)=x}$ .

   Halving is the inverse function of doubling.

   If an inverse function exists for a given function, then it is unique.

   The inverse function of an inverse function is the original function.

   • 1995, Nicholas M. Karayanakis, Advanced System Modelling and Simulation with Block Diagram Languages, CRC Press, page 217,

     In the context of linearization, we recall the reflective property of inverse functions; the ƒ curve contains the point (a,b) if and only if the ƒ ^-1 curve contains the point (b,a).

   • 2014, Mary Jane Sterling, Trigonometry For Dummies, Wiley, 2nd Edition, page 51,

     An example of another function that has an inverse function is ${\displaystyle f(x)=4x+5}$ .

     Its inverse is ${\displaystyle f^{-1}(x)={\frac {x-5}{4}}}$ .

   • 2014, Mark Ryan, Calculus For Dummies, Wiley, 2nd Edition, page 147,

     If ${\displaystyle f}$ and ${\displaystyle g}$ are inverse functions, then

     ${\displaystyle f'(x)={\frac {1}{g'(f(x))}}}$

     In words, this formula says that the derivative of a function, ${\displaystyle f}$ , with respect to ${\displaystyle x}$ , is the reciprocal of the derivative of its inverse function with respect to ${\displaystyle f}$ .

• (function that reverses the mapping action of a given function): anti-function (obsolete or nonstandard in this sense)

• invertible

• Bijection on Wikipedia.Wikipedia
• Inverse function theorem on Wikipedia.Wikipedia
• Inverse function on Encyclopedia of Mathematics
• Inverse Function on Wolfram MathWorld