If $f(x) = \begin{cases} x, & x \in \mathbb{Q} \\ 0, & x \notin \mathbb{Q} \end{cases}$ and $g(x) = \begin{cases} x, & x \in \mathbb{Q} \\ 0, & x \notin \mathbb{Q} \end{cases}$,then the function $(f - g)$ is:
- AOne-one onto
- BOne-one but not onto
- COnto but not one-one
- DNeither one-one nor onto
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Similar Questions
Let $A = \{1, 2, 3, \ldots, n\}$ and $B = \{a, b\}$. If the number of onto functions from $A$ to $B$ is $62$,then the number of subsets of $A$ containing exactly three elements is:
Let $f, g: N \rightarrow N$ such that $f(n+1)=f(n)+f(1)$ for all $n \in N$ and $g$ be any arbitrary function. Which of the following statements is $NOT$ true?
If $f: R \rightarrow R$ is defined by $f(x) = \begin{cases} x+4 & \text{for } x < -4 \\ 3x+2 & \text{for } -4 \leq x < 4 \\ x-4 & \text{for } x \geq 4 \end{cases}$ then the correct matching of List-$I$ from List-$II$ is:
List-$I$ List-$II$ $(A)$ $f(-5) + f(-4)$ $(i)$ $14$ $(B)$ $f(|f(-8)|)$ $(ii)$ $4$ $(C)$ $f(f(-7) + f(3))$ $(iii)$ $-11$ $(D)$ $f(f(f(f(0)))) + 1$ $(iv)$ $-1$ $(v)$ $1$ $(vi)$ $0$
| List-$I$ | List-$II$ |
| $(A)$ $f(-5) + f(-4)$ | $(i)$ $14$ |
| $(B)$ $f(|f(-8)|)$ | $(ii)$ $4$ |
| $(C)$ $f(f(-7) + f(3))$ | $(iii)$ $-11$ |
| $(D)$ $f(f(f(f(0)))) + 1$ | $(iv)$ $-1$ |
| $(v)$ $1$ | |
| $(vi)$ $0$ |
DifficultAP EAMCET 2006
View SolutionLet $A = \{x : x \in R, x \text{ is not a positive integer}\}$. Define $f: A \rightarrow R$ as $f(x) = \frac{2x}{x-1}$. Then $f$ is:
Which of the following function$(s)$ is/are transcendental?
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