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Question

Prove that the function f:NN, defined by f(x)=x2+x+1 is one-one but not onto. Find inverse of f:NS, where S is range of f.

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Solution

Given f(x)=x2+x+1
To prove one-one, we will show if f(x1)=f(x2), then x1=x2
Let f(x1)=f(x2)
x21+x1+1=x22+x2+1
x21+x1x22x2=0
(x1x2)(x1+x2+1)=0
Since x1+x2+10 x1,x2N,
we have x1x2=0
x1=x2
Thus, f(x1)=f(x2)x1=x2
​​​​​​Hence, f is one-one.

f(x)=1 has no pre-image in R.
So, f is not onto.

f:NS is one- one and onto.
Hence, f:NS is invertible.
To find the inverse of f
Let f(x)=y
x=f1(y) (1)
and y=x2+x+1
y=(x+12)2+34
y34=x+12
(Taking positive root only because xN and hence, RHS is always positive)
y3412=x
y3412=f1(y) [From (1)]
On replacing y with x, we get
f1(x)=x3412

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