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Question

Let f:RR be a function defined by f(x)=e|x|exex+ex. Then

A
f is both one-one and onto
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B
f is one-one but not onto
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C
f is onto but not one-one
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D
f is neither one-one nor onto
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Solution

The correct option is D f is neither one-one nor onto
f(x)=e|x|exex+ex
f(x)=exexex+ex,x00,x<0

For x<0,f(x)=0
f is not a one-one function.

For x0,
f(x)=exexex+ex =e2x1e2x+1
f(x)=(e2x+1)e2x2e2x2(e2x1)(e2x+1)2
=4e2x(e2x+1)2>0 x0
f(x) is a strictly increasing function.

Also, f(0)=0 and l=limxe2x1e2x+1=limx11e2x1+1e2x=1
f(x)[0,l)=[0,1)
f is not an onto function.
f is neither one-one nor onto.

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