Prove that mapping f:I -> I, where I is ...

Prove that mapping `f:I -> I`, where `I` is the set of integers and `f(x) = 5x, x in I` is one-one and into.

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Prove that mapping f:I rarr I, where I is the set of integers and f(x)=5x,x in I is one- one and into.

Let I be the set of integer and f : I rarr I be defined as f(x) = x^(2), x in I , the function is

Let I be the set of integer and f : I rarr I be defined as f(x) = x^(2), x in I , the function is

Let I be the set of integer and f : I rarr I be defined as f(x) = x^(2), x in I , the function is

Let I be the set of integer and f : I rarr I be defined as f(x) = x^(2), x in I , the function is

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If R is the set of real numbers prove that a function f: R -> R,f(x)=e^x , x in R is one to one mapping.

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Which of the following is not an equivalence relation on I,the set of integers x,y in I?

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