Assertion (A): Let \( A = \{ x \in \mathbb{R} : -1 \leq x \leq 1 \} \). If \( f : A \to A \) be defined as \( f(x) = x^2 \), then \( f \) is not an onto function.
Reason (R): If \( y = -1 \in A \), then \( x = \pm \sqrt{-1} \notin A \).
Reason (R): If \( y = -1 \in A \), then \( x = \pm \sqrt{-1} \notin A \).
Show Hint
Both Assertion (A) and Reason (R) are true and the Reason (R) is the correct explanation of the Assertion (A)
Both Assertion (A) and Reason (R) are true and the Reason (R) is the correct explanation of the Assertion (A)
- Assertion (A) is true, but Reason (R) is false.
- Assertion (A) is false, but Reason (R) is true.
The Correct Option is A
Solution and Explanation
- The function \( f(x) = x^2 \) is defined from the set \( A = \{ x \in \mathbb{R} : -1 \leq x \leq 1 \} \) to \( A \).
- A function is said to be "onto" (surjective) if for every element \( y \) in the codomain, there exists at least one \( x \) in the domain such that \( f(x) = y \).
In this case, the range of \( f(x) = x^2 \) is \( [0, 1] \), because for \( x \in [-1, 1] \), \( f(x) = x^2 \) takes values between 0 and 1.
However, \( f(x) \) never attains the value \( -1 \), which is part of the set \( A \).
Thus, \( f \) is not onto, as it does not map to all values in the codomain.
- The reason (R) is also correct. If \( y = -1 \), we would need to solve \( x^2 = -1 \), but this does not have any real solutions.
Therefore, \( x = \pm \sqrt{-1} \notin A \), confirming that \( f \) is not onto.
Thus, both Assertion (A) and Reason (R) are correct, and Reason (R) correctly explains Assertion (A).
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