NCERT Solutions for Exercise 2.3, Class 11, Maths - Class 11, Maths, NCERT Solutions

Exercise 2.3 Relations and Functions
Question and Answers
Class 11 – Maths

Class	Class 11
Subject	Mathematics
Chapter Name	Relations and Functions
Chapter No.	Chapter 2
Exercise	Exercise 2.3
Category	Class 11 Maths NCERT Solutions

Question 1 Which of the following relations are functions? Give reasons. If it is a function, determine its domain and range.

(i) {(2,1), (5,1), (8,1), (11,1), (14,1), (17,1)}

(i) {(2, 1), (5, 1), (8, 1), (11, 1), (14, 1), (17, 1)}

As 2, 5, 8, 11, 14, and 17 are the elements of the domain of the given relation having their unique images, this relation can be called a function.

Here, domain = {2, 5, 8, 11, 14, 17} and range = {1}

(ii) {(2,1), (4,2), (6,3), (8,4), (10,5), (12,6), (14,7)}

(ii) {(2, 1), (4, 2), (6, 3), (8, 4), (10, 5), (12, 6), (14, 7)}

As 2, 4, 6, 8, 10, 12, and 14 are the elements of the domain of the given relation having their unique images, this relation can be called a function.

Here, domain = {2, 4, 6, 8, 10, 12, 14} and range = {1, 2, 3, 4, 5, 6, 7}

(iii) {(1,3), (1,5), (2,5)}.

(iii) {(1, 3), (1, 5), (2, 5)}

It’s seen that the same first element, i.e., 1, corresponds to two different images, i.e., 3 and 5; this relation cannot be called a function.

Question 2 Find the domain and range of the following real functions:

(i) f(x) = – x

(i) We have the given function as, $f (x) = - | x |$

It is also know that, $| x | = {\begin{matrix} x, i f x \geq 0 \\ - x, i f x < 0 \end{matrix}$

$| x | = {\begin{matrix} x, i f x \geq 0 \\ - x, i f x < 0 \end{matrix}$

Thus, $f (x) = - | x | = {\begin{matrix} - x, i f x \geq 0 \\ x, i f x < 0 \end{matrix}$

x ,if x < 0

As f(x) is defined for x ∈ R, the domain of f is R.

It is also seen that the range of f(x) = –|x| is all real numbers except positive real numbers.

Therefore, the range of f is given by (–∞, 0].

(ii) f(x) = √9 − x²

(ii) As √(9 – x²) is defined for all real numbers that are greater than or equal to –3 and less than or equal to 3, for 9 – x² ≥ 0.

So, the domain of f(x) is {x: –3 ≤ x ≤ 3} or [–3, 3]

For any value of x in the range [–3, 3], the value of f(x) will lie between 0 and 3.

Therefore, the range of f(x) is {x: 0 ≤ x ≤ 3} or [0, 3].

Question 3 A function f is defined by f(x) = 2x –5. Write down the values of

(i) f (0)

(i) Function, f(x) = 2x – 5

f (0) = 2 × 0 – 5 = 0 – 5 = –5

(ii) f (7)

(ii) Function, f(x) = 2x – 5

f(7) = 2 × 7 – 5 = 14 – 5 = 9

(iii) f (–3)

(iii) Function, f(x) = 2x – 5

f(–3) = 2 × (–3) – 5 = – 6 – 5 = –11

Question 4 The function ‘t’ which maps temperature in degree Celsius into temperature in degree Fahrenheit is defined by t(C) = 9C/ 5 + 32. Find

(i) t(0)

(i) We have our given function as, $t (C) = \frac{9 C}{5} + 32$

To find our needed values of the function we just have to put the values in the given function and simplify it.

So, we get now,

t (0) =[ (9 \times o ) /5 ] + 32 t (0)= 32

(ii) t(28)

(ii) We have our given function as, $t (C) = \frac{9 C}{5} + 32$

To find our needed values of the function we just have to put the values in the given function and simplify it.

So, we get now,

t (28) =[ (9 × 28 ) /5 ] + 32

t (28 ) =( 252 + 160) /5

t (28 ) =(412 /5 ]

t (28 ) = $= 82.4$

(iii) t(–10)

(iii) We have our given function as, $t (C) = \frac{9 C}{5} + 32$

To find our needed values of the function we just have to put the values in the given function and simplify it.

So, we get now,

t ( -10 ) = [ (9 × (-10) ) /5 ] + 32

t (-10) =−18+32

t (-10) = 14

(iv) The value of C, when t(C) = 212.

(iv) We have our given function as, $t (C) = \frac{9 C}{5} + 32$

we are given that, $t (C) = 212$

212 = $t (C) = \frac{9 C}{5} + 32$

$t (C) = \frac{9 C}{5} + 32$

C = 900 / 9 = 100

Thus , it can be said that, for $t (C) = 212$ the value of $t$ is $100$

$100$ Question 5 Find the range of each of the following functions.

(i) f (x) = 2 – 3x, x ∈ R, x > 0.

(i) f(x) = 2 – 3x, x ∈ R, x > 0

$x$	$0.01$	$0.1$	$0.9$	$1$	$2$	$2.5$	$4$	$5$	…
$f (x)$	$1.97$	$1.7$	$- 0.7$	$- 1$	$- 4$	$- 5.5$	$- 10$	$- 13$	…

We can now see, it can be seen that the elements of the range is less than 2.

So, the range will be, $f = (- \infty, 2)$

x > 0, So , 3x > 0

-3x < 0 [Multiplying by -1 on both sides, the inequality sign changes]

2 – 3x < 2

Therefore, the value of 2 – 3x is less than 2.

Hence, Range = (–∞, 2)

(ii) f (x) = x 2 + 2, x is a real number.

(ii) f(x) = x² + 2, x is a real number

$x$	$0$	$\pm 0.3$	$\pm 0.8$	$\pm 1$	$\pm 2$	$\pm 3$	…
$f (x)$	$2$	$2.09$	$2.64$	$3$	$6$	$11$	…

So, we see that the range of the function $f$ is the set of all numbers which are greater than or equal to 2.

Thus we can conclude that the range of the function is, $[2, \infty)$

x² ≥ 0

So,

x² + 2 ≥ 2 [Adding 2 on both sides]

Therefore, the value of x² + 2 is always greater or equal to 2, for x is a real number.

Hence, Range = [2, ∞)

(iii) f (x) = x, x is a real number.

(iii) f(x) = x, x is a real number

Clearly, the range of f is the set of all real numbers.

Thus,

Range of f = R

Exercise 2.3 Relations and Functions Question and Answers Class 11 – Maths

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Exercise 2.3 Relations and Functions
Question and Answers
Class 11 – Maths