Does the inverse function of the following real valued function of real variable
exist ? Give reasons.
f(x)=1x1
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Given : f(x)=[x]
To Find : Does the inverse function of real variable exist
Solution:
f(x)=[x]
[x] = Greatest integer function
x = 1 => f(1) = 1
x= 1.01 => f(1.01) = 1
x = 1.2 => f(1.2) = 1
x = 1.99 => f(1.99) = 1
f(1) = f(1.2) but 1#1.2 Hence function is not one to one
As function is not one to one so function is not bijective
A function is said to be invertible iff it is bijective
Since function is not bijective
Hence the inverse does not exists
=> the inverse function of the f(x)=[x] of real variable does not exist
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