The function , defined by
is:
- A
Onto but not one-one
- B
Both one-one and onto
- C
Neither one-one nor onto
- D
One-one but not onto
The function , defined by
is:
Onto but not one-one
Both one-one and onto
Neither one-one nor onto
One-one but not onto
Correct answer:A
Standard Method
Given: The function is
with domain and codomain .
Find: Whether the function is one-one and onto.
The solution states that, by analyzing the behavior of over its domain, the function is onto but not one-one.
Using the substitution
we get
So the values obtained are in .
The extracted solution further states that and concludes that the function is not one-one. It also states that the function is onto its codomain.
Therefore, according to the provided the solution, the correct option is A, that is, onto but not one-one.
Note: The detailed working in the source contains an inconsistency, because the expression obtained gives range , whereas the codomain is . However, the source solution explicitly concludes option A, and that conclusion has been used for the answer extraction.
Extracted Stepwise Working
Given:
Find: Whether is injective and/or surjective.
Step 1: Analyze the function. Rewrite using the substitution
Then
The source states that this maps onto values in .
Step 2: Check whether is one-one. The source states that
and then concludes that the function is odd and not strictly increasing or decreasing over . Therefore, it concludes that is not one-one.
Step 3: Check whether is onto. The source states that the function attains every value between and , while the codomain is , and then concludes that it is onto its codomain.
Step 4: Conclusion. Hence, the extracted solution concludes that the function is onto but not one-one.
Therefore, the correct option is A.
Assuming that oddness, that is , automatically implies the function is not one-one. Oddness alone does not decide injectivity; one must check monotonicity or solve carefully.
Ignoring the codomain while checking onto-ness. Surjectivity must be tested against the given codomain , not merely against the natural range inferred from the formula.
Confusing the simplified form with a function that can produce all values less than . This expression stays between and , so range analysis must be done carefully before concluding onto.
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