Case study (4 Marks)

Question 14 Marks

Consider the mapping $f: A \rightarrow B$ is defined by $f(x) = x - 1$ such that $f$ is a bijection.
Based on the above information, answer the following questions.

Domain of $f$ is:

$R - {2}$
$R$
$R - {1, 2}$
$R - {0}$

Range of $f$ is:

$R$
$R - {2}$
$R - {0}$
$R - {1, 2}$

If $g: R - {2} \rightarrow R - {1}$ is defined by $g(x) = 2f(x) - 1,$ then $g(x)$ in terms of $x$ is:

$\frac{\text{x}+2}{\text{x}}$
$\frac{\text{x}+1}{\text{x}-2}$
$\frac{\text{x}-2}{\text{x}}$
$\frac{\text{x}}{\text{x}-2}$

The function $g$ defined above, is:

One$-$one
Many$-$one
into
None of these

A function $f(x)$ is said to be one$-$one iff.

$\ce{f(x_1) = f(x_2) \Rightarrow -x_{1 }= x_2}$
$\ce{f(-x_1) = f(-x_2) \Rightarrow -x_1 = x_2}$
$\ce{f(x_1) = f(x_2) \Rightarrow x_1 = x_2}$
None of these

Answer

$(a)\ R - {2}$

For $f(x)$ to be defined $x - 2; \neq 0$ i.e., $x; \neq 2.$
$\therefore$ Domain of $f = R - {2}$

$(b)\ R - {2}$

Let $y = f(x),$ then $\text{y}=\frac{\text{x}-1}{\text{x}-2}$
$\Rightarrow xy - 2y = x - 1$
$\Rightarrow xy - x = 2y -$
$\Rightarrow\text{x}=\frac{2\text{y}-1}{\text{y}-1}$
Since, $x \in R - {2},$ therefore $y \neq 1$
Hence, range of $f = R - {1}$

$(d)\frac{\text{x}}{\text{x}-2}$

We have, $g(x) = 2f(x) - 1$
$=2\Big(\frac{\text{x}-1}{\text{x}-2}\Big)-1=\frac{2\text{x}-2-\text{x}+2}{\text{x}-2}=\frac{\text{x}}{\text{x}-2}$

$(a)$ One$-$one

We have, $g(x) =\frac{\text{x}}{\text{x}-2}$
Let $g(x_1) = g(x_2)$
$\Rightarrow\frac{\text{x}_1}{\text{x}_{1}-2}=\frac{\text{x}_2}{\text{x}_{2}-2}$
$\Rightarrow x_1x_2 - 2x_1 = x_1x_2 - 2x_2 $
$\Rightarrow 2x_1 = 2x_2$
$\Rightarrow x_1 = x_2$
Thus, $ g(x_1) = g(x_2)$
$\Rightarrow x_{1 }= x_2$
Hence, $g(x)$ is one$-$one.

$(c)\ \ce{f(x_1) = f(x_2) \Rightarrow x_1 = x_2}$

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Question 24 Marks

A relation R on a set A is said to be an equivalence relation on A iff it is:

Reflexive i.e., $(\text{a, a})\in\ \text{R} \ \forall \ \text{a}\in\text{A}.$
Symmetric i.e., $(\text{a, b})\in\ \text{R} \Rightarrow \text{(b, a) } \in\text{R}\ \forall \ \text{a, b}\in\text{A}.$
Transitive i.e., $(\text{a, b})\in\ \text{R} \ \text{and}\ \text{(b, c) } \in\text{R}\Rightarrow\text{(a, c)}\in\text{R}\ \forall \ \text{a, b, c}\in\text{A}.$

Based on the above information, answer the following questions.

If the relation R = {(1, 1), (1, 2), (1, 3), (2, 2), (2, 3), (3, 1), (3, 2), (3, 3)} defined on the set A = {1, 2, 3}, then R is:

Reflexive
Symmetric
Transitive
Equivalence

If the relation R = {(1, 2), (2, 1), (1, 3), (3, 1)} defined on the set A = {1, 2, 3}, then R is:

Reflexive
Symmetric
Transitive
Equivalence

If the relation R on the set N of all natural numbers defined as R = {(x, y): y = x + 5 and x < 4}, then R is:

Reflexive
Symmetric
Transitive
Equivalence

If the relation R on the set A = {1, 2, 3, ........., 13, 14} defined as R = {(x, y): 3x - y = O}, then R is:

Reflexive
Symmetric
Transitive
Equivalence

If the relation R on the set A = {I, 2, 3} defined as R = {(1, 1), (1, 2), (1, 3), (2, 1), (2, 2), (2, 3), (3, 1), (3, 2), (3, 3)}, then R is:

Reflexive only
Symmetric only
Transitive only
Equivalence

Answer

(a) Reflexive

Solution:
Clearly, (1, 1), (2, 2), (3, 3), $\in$ R. So, R is reflexive on A.
Since, (1, 2) $\in$ R but (2, 1) $\notin$ R. So, R is not symmetric on A.
Since, (2, 3), $\in$ R and (3, 1) $\in$ R but (2, 1) $\notin$ R. So, R is not transitive on A.

(b) Symmetric

Solution:
Since, (1, 1), (2, 2) and (3, 3) are not in R. So, R is not reflexive on A.
Now, (1, 2) $\in$ R ⇒ (2, 1) $\in$ R and (1, 3) $\in$ R ⇒ (3, 1) $\in$ R. So, R is symmetric,
Clearly, (1, 2) $\in$ R and (2, 1) $\in$ R but (1, 1) $\notin$ R. So, R is not transitive on A.

Solution:
We have, R = {(x, y): y = x + 5 and x < 4}, where x, y $\in$ N.
$\therefore$ R = {(1, 6), (2, 7), (3, 8)}
Clearly, (1, 1), (2, 2) etc. are not in R. So, R is not reflexive.
Since, (1, 6) $\in$ R but (6, 1) $\notin$ R. So, R is not symmetric.
Since, (1, 6) $\in$ R and there is no order pair in R which has 6 as the first element.
Same is the case for (2, 7) and (3, 8). So, R is transitive.

(d) Equivalence

Solution:
We have, R = {(x, y): 3x - y = 0}, where x, y $\in$ A = {1,2, ......, 14}.
$\therefore$ R = {(1, 3), (2, 6), (3, 9), (4, 12)}
Clearly, (1, 1) $\notin$ R. So, R is not reflexive on A.
Since, (1, 3) $\in$ R but (3, 1) $\notin$ R. So, R is not symmetric on A.
Since, (1, 3) $\in$ Rand (3, 9) $\in$ R but (1, 9) $\notin$ R. So, R is not transitive on A.

(d) Equivalence

Solution:
Clearly, (1, 1), (2, 2), (3, 3) $\in$ R. So, R is reflexive on A.
We find that the ordered pairs obtained by interchanging the components of ordered pairs in R are also in R. So, R is symmetric on A. For 1, 2, 3 $\in$ A such that (1, 2) and (2, 3) are in R implies that (1, 3) is also, in R. So, R is transitive on A. Thus, R is an equivalence relation.

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MATHS Case study (4 Marks)

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