For one value of n we will get only one corresponding value of f(n), so f(n) is one-one
Now, for n=2,4,6⋯;f(n)=4,8,12...
for n=3,7,11⋯;f(n)=2,6,10...
for n=1,5,9⋯;f(n)=1,3,5,7...
So range of f(n) is N
Hence f(n) is onto
Let a function f:N→N be defined by f(n)=[2n,n−1,2n+1,n=2,4,6,8,…..n=3,7,11,15,…..n=1,5,9,13,…..
then, f is
Held on 28 Jun 2022 · Verified 6 Jul 2026.
One-one and onto
One-one but not onto
Onto but not one-one
Neither one-one nor onto
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