NCERT Solutions Class 12th Maths Chapter – 1 Relations and Functions Exercise 1.3
| Textbook | NCERT |
| class | Class – 12th |
| Subject | Mathematics |
| Chapter | Chapter – 1 |
| Chapter Name | Relations and Functions |
| grade | Class 12th Maths solution |
| Medium | English |
| Source | last doubt |
NCERT Solutions Class 12th Maths Chapter – 1 Relations and Functions Exercise 1.3
?Chapter – 1?
✍ Relations and Functions✍
?Exercise – 1.3?
1. Let f: {1, 3, 4} → {1, 2, 5} and g: {1, 2, 5} → {1, 3} be given by f = {(1, 2), (3, 5), (4, 1)} and g = {(1, 3), (2, 3), (5, 1)}. Write down gof.
Solution:
The functions f: {1, 3, 4} → {1, 2, 5} and g: {1, 2, 5} → {1, 3} are defined as
f = {(1, 2), (3, 5), (4, 1)} and g = {(1, 3), (2, 3), (5, 1)}.
gof(1) = g(f(1)) = g(2) = 3 [f(1) = 2 and g(2) = 3]
gof(3) = g(f(3)) = g(5) = 1 [f(3) = 5 and g(5) = 1]
gof(4) = g(f(4)) = g(1) = 3 [f(4) = 1 and g(1) = 3]
∴ gof = { (1,3) , (3,1) , (4,3) }
2. Let f, g and h be functions from R to R. Show that (f + g)oh = foh + goh (f . g)oh = (foh) . (goh)
Solution:
To prove:
(f + g)oh = foh + goh
Consider:
(( f + g)oh)(x)
= (f + g)(h(x))
=f(h(x))+g(h(x))
= (foh)(x) + (goh) (x)
= {(foh) + (goh)} (x)
:. ((f +g)oh) (x) = {(foh) +(goh) } (x) ∀x ∈ R
Hence (f + g)oh = foh + goh
To prove
(f .g)oh=(foh).(goh)
Consider
((f .g)oh)(x)
=(f .g)(h(x))
=f(h(x)).g(h(x))
=(foh)(x).(goh)(x)
={(foh).(goh)}(x)
∴ ((f .g)oh)(x) ={(foh).(goh)}(x) ∀x ∈ R
Hence (f . g)oh = (foh) .(goh)
3. (i) Find gof and fog, if f(x) = |x| and g(x) = |5x – 2|
Solution:
f(x)=|x| and g(x)=|5x-2|
∴ (gof) (x) = g g(f(x)) = g(|x|) = |5|x|-2|
(fog) (x) = F(g(x))= f |5x – 2|) = ||5x -2|=|5x-2
(ii) Find gof and fog, if f(x)=8x3 and g (x) = x 1/3
Solution:
f (x) = 8x3 and g(x) = x 1/2
∴ (gof) (x) = g(f(x)) = g(8x3) = g(8x3)1/3 = 2x
(fog) (x) = f(g(x)) = f(x1/3)= 8(x1/3)3 = 8x
4. if f(x) = 4x+3/6x-4,x≠ 2/3 show that fof(x) = x, for all x ≠ 2/3 . What is the inverse of f?
Solution:
t is given that f(x)=4x+3/6x-4,x≠2/3
(fof) (x) = f(f(x))=f(4x+3/6x-4)
=4(4x+3/6x-4)+3/6(4x+36x-4)-4 = 16x+12+18x-12/24x+18-24x+16 = 34x/34 = x
Therefore fof(x) = x for all x≠2/3
=> fof = 1
Hence, the given function f is invertible and the inverse of f is f itself.
5. (i) State with reason whether following functions have inverse
f: {1, 2, 3, 4} → {10} with
f = {(1, 10), (2, 10), (3, 10), (4, 10)}
Solution:
f: {1, 2, 3, 4} → {10}defined as:
f = {(1, 10), (2, 10), (3, 10), (4, 10)}
From the given definition of f, we can see that f is a many one function as: f(1) = f(2) = f(3) = f(4) = 10
∴f is not one-one.
Hence, function f does not have an inverse.
(ii) State with reason whether following functions have inverse g: {5, 6, 7, 8} → {1, 2, 3, 4} with g = {(5, 4), (6, 3), (7, 4), (8, 2)}
Solution:
g: {5, 6, 7, 8} → {1, 2, 3, 4} defined as:
g = {(5, 4), (6, 3), (7, 4), (8, 2)}
From the given definition of g, it is seen that g is a many one function as: g(5) = g(7) = 4.
∴g is not one-one,
Hence, function g does not have an inverse.
(iii) State with reason whether following functions have inverse h: {2, 3, 4, 5} → {7, 9, 11, 13} with h = {(2, 7), (3, 9), (4, 11), (5, 13)}
Solution:
h: {2, 3, 4, 5} → {7, 9, 11, 13} defined as:
h = {(2, 7), (3, 9), (4, 11), (5, 13)}
It is seen that all distinct elements of the set {2, 3, 4, 5} have distinct images under h.
∴Function h is one-one.
Also, h is onto since for every element y of the set {7, 9, 11, 13}, there exists an element x in the set {2, 3, 4, 5}such that h(x) = y.
Thus, h is a one-one and onto function. Hence, h has an inverse.
6. Show that f: [−1, 1] → R, given by f(x) = x/x+2 is one-one. Find the inverse of the function f: [−1, 1] → Range f. (Hint: For y in Range f, y = f(x)=x/x+2 for some x in [-1, 1] ie x = 2 y/1-y
Solution:
`f: [−1, 1] → R is given as f(x)=x/x+2
Let f(x) = f(y).
⇒x/x+2 = y/y+2
=> xy + 2x = xy + 2y
=> 2x = 2y
=> x = y
∴ f is a one-one function.
It is clear that f: [−1, 1] → Range f is onto.
∴ f: [−1, 1] → Range f is one-one and onto and therefore, the inverse of the function:
f: [−1, 1] → Range f exists.
Let g: Range f → [−1, 1] be the inverse of f.
Let y be an arbitrary element of range f.
Since f: [−1, 1] → Range f is onto, we have:
⇒y=x/x+2
=> xy + 2y = x
=> x(1-y)= 2y
Solution:
f: R → R is given by,
f(x) = 4x + 3
One-one:
Let f(x) = f(y).
=> 4x + 3 = 4y + 3
=> 4x = 4y
=> x = y
∴ f is a one-one function.
Onto:
For y ∈ R, let y = 4x + 3.
⇒x = y-3/4 ∈R
Therefore, for any y ∈ R, there exists x = y-3/4 ∈R such that
f(x) = f(y-3/4) = 4(y-3/4)+3 = y
∴ f is onto.
Thus, f is one-one and onto and therefore, f−1 exists.
Let us define g: R→ R by g(x)=y-3/4
Now, (gof) (x) = g(f(x))=g(4x+3)=(4x+3)-3/4=x
(fog)(y) = f(g(y)) = f(y-3/4) = 4(y-3/4)+3 = y-3+3 = y
∴gof=fog=IR
Hence, f is invertible and the inverse of f is given by
f-1=g(y)=y-3/4
Solution:
f: R+ → [4, ∞) is given as f(x) = x2 + 4.
One-one:
Let f(x) = f(y).
⇒x2+4 = y2+4
⇒x2 = y2
=> x = y [as x = y ∈R]
∴ f is a one-one function.
Onto:
For y ∈ [4, ∞), let y = x2 + 4.
⇒x2 = y-4 ≥ 0 [as y ≥4]
⇒x = √y-4 ≥ 0
Therefore, for any y ∈ R, there exists x = √y-4 ∈R such that
f(x) = f(√y-4) = (√y-4)2+4 = y – 4 + 4 = y
∴ f is onto.
Thus, f is one-one and onto and therefore, f−1 exists.
Let us define g: [4, ∞) → R+ by,
9. Consider f: R+ → [−5, ∞) given by f(x) = 9x2 + 6x − 5. Show that f is invertible with f -1 (y) ( √y+6 – 1/3)
Solution:
f: R+ → [−5, ∞) is given as f(x) = 9x2 + 6x − 5.
Let y be an arbitrary element of [−5, ∞).
Let y = 9x2 + 6x − 5.
⇒y = (3x+1)2-1 -5 = (3x+1)2-6
⇒(3x+1)2 = y+6
⇒3x+1 = √y+6 [as y≥5⇒y+6>0]
⇒x = √y+6-1/3
∴f is onto, thereby range f = [−5, ∞).
Let us define g: [−5, ∞) → R+ as g(y) = √y+6-1/3
We now have:
(gof) (x) = g(f(x))=g(9x2+6x-5)
=g((3x+1)2-6)
10. Let f: X → Y be an invertible function. Show that f has unique inverse. (Hint: suppose g1 and g2 are two inverses of f. Then for all y ∈ Y, fog1(y) = IY(y) = fog2(y). Use one-one ness of f).
Solution:
Let f: X → Y be an invertible function.
Also, suppose f has two inverses (say g1 and g2)).
Then, for all y ∈Y, we have:
fog1(y)= Iy (y) = fog2(y)
⇒f(g1(y))=f(g2(y)) [f is invertible => f is one-one]
⇒g1= g2 [g is one- one]
Hence, f has a unique inverse.
11.Consider f: {1, 2, 3} → {a, b, c} given by f(1) = a, f(2) = b and f(3) = c. Find f−1 and show that (f−1)−1 = f.
Solution:
Function f: {1, 2, 3} → {a, b, c} is given by,
f(1) = a, f(2) = b, and f(3) = c
If we define g: {a, b, c} → {1, 2, 3} as g(a) = 1, g(b) = 2, g(c) = 3, then we have:
(fog)(a) = f(g(a)) = f(1) = a
(fog)(b) = f(g(b)) = f(2) = b
(fog) (c) = f(g(c)) = f(3) = c
And
(gof)(1) = g(f(1)) = g(a) = 1
(gof)(2) = g(f(2)) = g(b) = 2
(gof)(3) = g(f(3)) = g(c) = 3
:. gof =IX and fog=IY
where X = {1, 2, 3} and Y= {a, b, c}.
Thus, the inverse of f exists and f−1 = g.
∴f−1: {a, b, c} → {1, 2, 3} is given by,
f−1(a) = 1, f−1(b) = 2, f-1(c) = 3
Let us now find the inverse of f−1 i.e., find the inverse of g.
If we define h: {1, 2, 3} → {a, b, c} as
h(1) = a, h(2) = b, h(3) = c, then we have
(goh) (1) = g(h(1)) = g(a) = 1
(goh)(2) = g(h(2)) = g(b) = 2
(goh)(3) = g(h(3)) = g(c) = 3
And
(hog)(a) = h(g(a)) = h(1) =a
(hog)(b) = h(g(b)) = h(2) = b
(hog)(c) = h(g(c)) = h(3) = c
:. goh=IX and hog=IY
where X = {1, 2, 3} and Y = {a, b, c}.
Thus, the inverse of g exists and g−1 = h ⇒ (f−1)−1 = h.
It can be noted that h = f.
Hence, (f−1)−1 = f.
Solution:
Let f: X → Y be an invertible function.
Then, there exists a function g: Y → X such that gof = IXand fog = IY.
Here, f−1 = g.
Now, gof = IXand fog = IY
⇒ f−1of = IXand fof−1= IY
Hence, f−1: Y → X is invertible and f is the inverse of f−1
i.e., (f−1)−1 = f.
13. If f: R → R be given by f(x)=(3-x3)1/3 , then fof (x) is
(A) 1/x3
(B) x3
(C) x
(D) (3 − x3)
Solution:
14. Let f:R -{-43}→R be a function defined as f(x)=4x/3x+4. The inverse of f is map g Range f→R-{-4/3}
(A) g(y)=3y/3-4y
(B) g(y)=4y/4-3y
(C) g(y)=4y/3-4y
(D) g(y)= 3y/4-3y
Solution:
t is given that f: R -{-4/3}→R is defined as f(x)=4x/3x-4
Let y be an arbitrary element of Range f.
Then, there exists x ∈ R-{-4/3} such that y=f(x)
⇒y=4x/3x+ 4
=>3xy + 4y = 4x Let us define g: Range asf→R-{-4/3} as g(y)=4y/4-3y
=> x(4 – 3y) = 4y
:. gof=IR-(-4/3) and fog = I_” Range f”
Thus, g is the inverse of f i.e., f−1 = g.
Hence, the inverse of f is the map `g: Range f -> R – {-4/3}` which is given by g(y)=4y/4-3y
The correct answer is B.