Show that the function f: N->N given by ...

Show that the function `f: N->N` given by `f(1)=f(2)=1` and `f(x)=x-1` for every `xgeq2` , is onto but not one-one.

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Show that the function f: N rarr N, given by f(1) f(2)= 1 and f(x) = x - 1 for every x gt 2, is onto but not one-one.

Show that the function f:N to N, given by f (1) =f (2) =1 and f (x) =x -1, for every x gt 2, is onto but not one-one.

Show that the function f:N to N, given by f (1) =f (2) =1 and f (x) =x -1, for every x gt 2, is onto but not one-one.

Show that the function f:N to N, given by f (1) =f (2) =1 and f (x) =x -1, for every x gt 2, is onto but not one-one.

Show that the function f:N to N, given by f (1) =f (2) =1 and f (x) =x -1, for every x gt 2, is onto but not one-one.

Show that the function f:NtoN given by f(1)=f(2)=1 and f(x)=x-1 for every xgt2 is on to but not one -one.

Show that the function f:N rarr N given by f(1)=f(2)=1 and f(x)=x-1 for every x>=2, is onto but not one-one.

Show that the function: f: N rarr N given by f(1) = f (2) = 1 and f (x) =x-1 , for every x > 2 is onto but not one-one.

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