5. ο± An equation which can be put in the form ax + by + c = 0
where a, b and c are real numbers {a, b β 0) is called a linear equation
in two variables βxβ and βyβ
ο± General form of a linear pair of equations in two variables is:
a1x + b1y + c1 = 0 and
a2x + b2y + c2 = 0
where a1 b1, c1, a2, b2, c2 are real numbers such that
a1
2 + b1
2 β 0 and a2
2 + b2
2 β 0
LINEAR Equations in two variables:
GENERAL FORM OR
STANDARD FORM
6. ο± The solution of a linear equation in two variables βxβ and βyβ is a pair
of values(one for βxβ and other for βyβ)which makes the two sides of
the equation equal.
ο± There are two methods to solve a pair of linear equations:
(i) algebraic method
(ii) graphical method.
SOLUTION OF A PAIR OF LINEAR
EQUATIONS IN TWO VARIABLES
7. (i) If the graphs of two equations of a system intersect at a point,
the system is said to have a unique solution,
i.e., the system is consistent.
(ii) If the graphs of two equations of a system are two parallel lines,
the system is said to have no solution,
i.e., the system is inconsistent.
(iii) When the graphs of two equations of a system are two coincident lines,
the system is said to have infinitely many solutions,
i.e., the system is consistent and dependent.
GRAPHICAL METHOD OF SOLUTION OF A PAIR OF
LINEAR EQUATIONS:
8. Consistent System
i) If both the lines intersect at a point, then there exists a unique solution
to the pair of linear equations.
ii) In such a case, the pair of linear equations is said to be consistent.
9. If the lines coincide, there are indefinitely many solutions for the pair of linear equations.
In this case, each point on the line is a solution.
If there are infinitely many solutions of the given pair of linear equations,
the equations are called dependent (consistent).
Consistent and Dependent
Ratio :
10. Inconsistent system:
β’If the lines are parallel, there is no solution for the pair of linear
equations.
β’If there is no solution of the given pair of linear equations, the equations
are called inconsistent.
β c1
c2
19. 1. Aftab tells his daughter, βSeven years ago, I was seven times as old
as you were then. Also, three years from now, I shall be three times as
old as you will beβ. Isnβt this interesting? Represent this situation
algebraically and graphically.
EX:3.1
:
SOLUTION :
Let the present age of Aftab be βxβ.
And, the present age of his daughter be βyβ.
Now, we can write, seven years ago,
Age of Aftab = x β 7
Age of his daughter = y β 7
According to the question,
xβ7 = 7(yβ7) β xβ7 = 7yβ49
β xβ7y = β42 β¦β¦β¦β¦β¦β¦β¦β¦β¦(i)
20. Also, three years from now or after three years,
Age of aftab will become = x + 3.
Age of his daughter will become = y + 3
According to the situation given,
x+3 = 3(y+3)
βx+3 = 3y+9
βxβ3y = 6 β¦β¦β¦β¦..β¦β¦β¦β¦β¦β¦β¦(ii)
Subtracting equation (i) from equation (ii) we have
(xβ3y)β(xβ7y) = 6β(β42)
ββ3y+7y=6+42 β4y=48
βY=12
EX:3.1
:
21. The algebraic equation is represented by
xβ7y = β42
xβ3y = 6
For, xβ7y =β42 or x = β42+7y
The solution table is
For, xβ3y=6 or x=6+3y
The solution table is
EX:3.1
: Eqn (i)
x = (-7)
(-7) = (-42) + 7y
7y = 42 - 7 = 35
y = 35/7 = 5
Eqn (ii)
x = 6
x β 3y = 6 ; 6 β 3y = 6
-3y = 6 β 6 = 0 ; -3y = 0
y = 0
23. 2. The coach of a cricket team buys 3 bats and 6 balls for Rs.3900.
Later, she buys another bat and 3 more balls of the same kind for Rs.1300.
Represent this situation algebraically and geometrically.
EX:3.1
:
Let the cost of a bat and a ball be Rs x and Rs y respectively.
The given conditions can be algebraically represented as:
3x + 6y = 3900 ; x + 2y = 1300
x + 2y = 1300 .... (i)
x + 3y = 1300 .... (ii)
24.
25.
26. 3. The cost of 2 kg of apples and 1 kg of grapes on a day was found to be βΉ160. After a
month, the cost of 4 kg of apples and 2 kg of grapes is βΉ300. Represent the
situation algebraically and geometrically
Solution:
Let the cost of 1 kg of apples be βRs. xβ
And, cost of 1 kg of grapes be βRs. yβ
According to the question, the algebraic representation is
2x+y=160
And 4x+2y=300
EX:3.1
:
27. x 50 60 70
y 60 40 20
x 70 80 75
y 10 -10 0
Three solutions of this equation can be written in a table as follows:
For, 2x+y=160 or y=160β2x, the solution table is;
29. (i) Let there are x number of girls and y number of boys. As per the given
question, the algebraic expression can be represented as follows.
x + y = 10
x β y = 4
Now, for x + y = 10 or x=10βy, the solutions are;
x 5 4 6
y 5 6 4
1. Form the pair of linear equations in the following problems, and find their solutions graphically.
(i) 10 students of Class X took part in a Mathematics quiz. If the number of girls is 4 more than the number of
boys,
find the number of boys and girls who took part in the quiz.
(ii) 5 pencils and 7 pens together cost Rs. 50, whereas 7 pencils and 5 pens together cost Rs. 46.
Find the cost of one pencil and that of one pen.
Solution:
EX:3.2
:
31. EX:3.2
:
(ii) Let 1 pencil costs Rs.x and 1 pen costs Rs.y.
According to the question, the algebraic expression cab be represented as;
5x + 7y = 50
7x + 5y = 46
For, 5x + 7y = 50 or x = {50-7y}/{5}
the solutions are;
x 3 10 -4
y 5 0 10
(i) If x = 3
x = 50 β 7y/5
3 = 50 β 7y/5
50 β 7y = 15
-7y = 15 - 50
-7y = -35
y = (-35)/(-7)
y = 5
32. x 8 3 -2
y -2 5 12
For 7x + 5y = 46 or x = {46-5y}/{7} the solutions
are;
(i) If x = 8
x = 46 β 5y / 7
8 = 46 β 5y/7
46 β 5y = 56
-5y = 56 β 46
-5y = 10
y = 10/(-5)
y = (-2)
EX:3.2
:
33. Hence, the graphical representation is as follows;
From the graph, it is can be seen that the
given lines cross each other at point (3, 5).
So, the cost of a eraser is 3/- and cost of a
chocolate is 5/-.
EX:3.
2:
34. 2. On comparing the ratios , find out whether the lines representing the following pairs of linear
equations intersect at a point, are parallel or coincident:
(i) 5x β 4y + 8 = 0 : 7x + 6y β 9 = 0 (ii) 9x + 3y + 12 = 0 : 18x + 6y + 24 = 0
(iii) 6x β 3y + 10 = 0 ; 2x β y + 9 = 0
Solutions:
EX:3.2
:
(i) Given expressions;
5xβ4y+8=0
7x+6yβ9=0
Comparing these equations with a1x + b1y + c1 = 0
And a2x + b2y + c2 = 0
So, the pairs of equations given in the question have a unique solution and
the lines cross each other at exactly one point.
35. 2.
(ii) Given expressions;
9x + 3y + 12 = 0
18x + 6y + 24 = 0
Comparing these equations with a1x + b1y + c1 = 0 and a2x + b2y + c2 = 0 . We get,
So, the pairs of equations given in the question have infinite possible
solutions and the lines are coincident.
EX:3.2
:
36. (iii) Given Expressions;
6x β 3y + 10 = 0
2x β y + 9 = 0
So, the pairs of equations given in the question are parallel to each other and the lines never intersect
each other at any point and there is no possible solution for the given pair of equations.
EX:3.2
:
37. 3. On comparing the ratios a1/a2, b1/b2 & c1/c2 find out whether the following pair of linear
equations are consistent, or inconsistent.
(i) 3x + 2y = 5 ; 2x β 3y = 7
(ii) 2x β 3y = 8 ; 4x β 6y = 9
(iii)(3/2)x+(5/3)y = 7 ; 9x β 10y = 14
(iv) 5x β 3y = 11 ; β 10x + 6y = β22
(v) (4/3)x+2y = 8; 2x + 3y = 12
EX:3.2
:
Solution:
(i) Given : 3x + 2y = 5 or 3x + 2y -5 = 0
and 2x β 3y = 7 or 2x β 3y -7 = 0
39. (ii) Given 2x β 3y = 8 and 4x β 6y = 9
Therefore,
(iii) (3/2)x+(5/3
EX:3.2
:
40. (iii) (3/2)x+(5/3)y = 7 and 9x β 10y = 14
Therefore,
So, the equations are intersecting each other at one point and they have only one possible solution.
Hence, the equations are consistent.
EX:3.2
:
43. 4. Which of the following pairs of linear equations are consistent/inconsistent? If consistent,
obtain the solution graphically:
(i) x + y = 5, 2x + 2y = 10
(ii) x β y = 8, 3x β 3y = 16
(iii) 2x + y β 6 = 0, 4x β 2y β 4 = 0
(iv) 2x β 2y β 2 = 0, 4x β 4y β 5 = 0
Solution:
(i) Given, x + y = 5 and 2x + 2y = 10
EX:3.2
:
45. So, the equations are represented
in graph as follows:
From the figure, we can see, that the
lines are overlapping each other.
Therefore, the equations have infinite
possible solutions.
EX:3.2
:
46. ii) Given, x β y = 8 and 3x β 3y = 16
EX:3.2
:
47. (iii) Given, 2x + y β 6 = 0 and 4x β 2y β 4 = 0EX:3.2
:
48. From the graph, it can be seen
that these lines are intersecting
each other at only one
point,(2,2).
EX:3.2
:
49. (iv) Given, 2x β 2y β 2 = 0 and 4x β 4y β 5 = 0
Thus, these linear equations have parallel and have no
possible solutions.
Hence, the pair of linear equations are inconsistent.
EX:3.2
:
50. 5. Half the perimeter of a rectangular garden, whose length is 4 m more than its
width, is 36 m. Find the dimensions of the garden.
Solution:
Let us consider.
Width of the garden is x
Length of the garden is y.
Now, according to the question, we can express the given condition as;
y + x = 36
y β x = 4
Now, taking y β x = 4 or y = x + 4
EX:3.2
:
51. x 0 8 12
y 4 12 16
Now, taking y β x = 4 or y = x + 4
x 0 36 16
y 36 0 20
For y + x = 36, y = 36 β x
EX:3.2
:
52. The graphical representation of both the equation is as follows;
From the graph you can see, the lines
intersects each other at a point(16, 20). Hence,
the width of the garden is 16 and length is 20.
EX:3.2
:
53. 6. Given the linear equation 2x + 3y β 8 = 0, write another linear equation in two
variables such that the geometrical representation of the pair so formed is:
(i) Intersecting lines
(ii) Parallel lines
(iii) Coincident lines
Solution:
(i) Given the linear equation 2x + 3y β 8 = 0.
To find another linear equation in two variables such that the geometrical representation of
the pair so formed is intersecting lines, it should satisfy below condition;
EX:3.2
:
54. EX:3.2
:
Clearly, you can another equation satisfies the condition.
2x + 3y β 8 = 0
(i) Intersecting lines
55. (ii) Given the linear equation 2x + 3y β 8 = 0.
To find another linear equation in two variables such that the geometrical
representation
of the pair so formed is parallel lines, it should satisfy below condition;
Clearly, you can see another equation satisfies the
condition.
EX:3.2
:
(ii) Parallel lines
56. iii) Given the linear equation 2x + 3y β 8 = 0.
To find another linear equation in two variables such that the geometrical representation
of the pair so formed is coincident lines, it should satisfy below condition;
Clearly, you can see another equation satisfies the condition.
EX:3.2
:
(iii) Coincident lines
57. 7. Draw the graphs of the equations x β y + 1 = 0 and 3x + 2y β 12 = 0. Determine
the coordinates of the vertices of the triangle formed by these lines and the x-
axis, and shade the triangular region.
Solution:
Given, the equations for graphs are x β y + 1 = 0 and 3x +
2y β 12 = 0.
For, x β y + 1 = 0 or x = 1+y
X 0 1 2
Y 1 2 3
EX:3.2
:
58. For, 3x + 2y β 12 = 0 or x = {12-2y}/{3}
X 4 2 0
Y 0 3 6
EX:3.2
:
x = 12 β 2(y)
3
(i) y = 0
x = 12 β 2(0)
3
= 12/3 = 4
x = 4.
(ii) y = 3
x = 12 β 2(3)
3
= 12 β 6 = 6/3 =2
3
x = 2
59. Hence, the graphical
representation of these
equations is as follows;
From the figure,
it can be seen that these
lines are intersecting each
other at point (2, 3) and x-
axis at (β1, 0) and (4, 0).
Therefore, the vertices of
the triangle are (2, 3), (β1,
0), and (4, 0).
EX:3.2
:
X 4 2 0
Y 0 3 6
X 0 1 2
Y 1 2 3
61. ALGEBRAIC METHOD
There are following methods for finding the solutions of the pair of linear equations:
1.Substitution method
2.Elimination method
3.Cross-multiplication method
63. Substitute y = 4 in (3)
y = x + 3
4 = x + 3
x = 4 β 3
x = 1.
..(3
)
64.
65. 1. Solve the following pair of linear equations by
the substitution method
EX:3.3
:
66. i) x + y = 14 ... (i)
x - y = 4 ... (ii)
From (i), we obtain:
x = 14 - y ... (iii)
Substituting this value in equation (ii), we obtain:
Substituting the value of y in
equation (iii), we obtain:
EX:3.3
:
67. From (i), we obtain:
s = t + 3 ...(iii)
Substituting this value in equation (ii), we obtain:
Substituting the value of βtβ in
equation (iii), we obtain:
s = 6 + 3
s = 9
; 2(t+3)+3t=6
6
t = 30/5
EX:3.3
:
72. EX:3.3
:
2. Solve 2x + 3y = 11 and 2x β 4y = β 24
and hence find the value of βmβ
for which y = mx + 3.
Solution:
-7y = -24 -11
x= 11- 15 = (-4)/2
2
73. 3. Form the pair of linear equations for the following problems and find their solution by
substitution method.
(i) The difference between two numbers is 26 and one number is three times the other.
Find them.
Solution :
Let the two numbers be x and y respectively, such that y > x.
According to the question,
y = 3x β¦β¦β¦β¦β¦β¦ (1)
y β x = 26 β¦β¦β¦β¦..(2)
Substituting the value of (1) into (2), we get
3x β x = 26
x = 13 β¦β¦β¦β¦β¦. ..(3)
Substituting (3) in (1), we get y = 39
Hence, the numbers are 13 and 39.
EX:3.3
:
74. (ii) The larger of two supplementary angles exceeds the smaller by
18 degrees. find them.
Solution:
Let the larger angle by xo and smaller angle be yo.
we know that the sum of two supplementary pair of angles is
always 180o.
According to the question,
x + y = 180oβ¦β¦β¦β¦β¦. (1)
x = 18o + y
x β y = 18o β¦β¦β¦β¦β¦..(2)
from (1), we get x = 180o β y β¦β¦β¦β¦. (3)
substituting (3) in (2), we get
180o β y β y =18o ; 180o - 18o = -2y
162o = 2y
y = 81o β¦β¦β¦β¦.. (4)
using the value of y in (3), we get
x = 180o β 81o
= 99o
Hence, the angles are 99o and 81o.
EX:3.3
:
75. (iii) The coach of a cricket team buys 7
bats and 6 balls for Rs.3800. Later, she
buys 3 bats and 5 balls for Rs.1750. Find
the cost of each bat and each ball.
Solution:
EX:3.3
:
Let cost of each bat and each ball be Rs.x
and Rs.y respectively.
Cost of each bat = Rs. x
Cost of each ball = Rs. Y
Hence, the cost of each bat and
each ball is Rs, 500 and Rs. 50
respectively.
76. (iv) The taxi charges in a city consist of a
fixed charge together with the charge for
the distance covered. For a distance of
10 km, the charge paid is Rs.105 and for
a journey of 15 km, the charge paid is
Rs.155. What are the fixed charges and
the charge per km? How much does a
person have to pay for travelling a
distance of 25 km?
EX:3.3
:
Solution :
Given :
77. v) A fraction becomes 9/11 , if 2
is added to both the numerator
and the denominator.
If, 3 is added to both the
numerator and the denominator
it becomes 5/6. Find the fraction.
Solution :
Let the required fraction be x/y
Then, according to the question,
the pair of linear equations
formed is ,
EX:3.3
:
78. (vi) Five years hence,
the age of Jacob
will be three times
that of his son. Five
years ago, Jacobβs
age was seven
Substituting the value of x in (2), we get
3y + 10 β 7y = -30
-4y = -40
y = 10 β¦β¦β¦β¦β¦β¦β¦ (4)
Substituting the value of y in (3), we get
x = 3 x 10 + 10 = 40
Hence, the present age of Jacobβs and
his son is 40 years and 10 years
respectively.
EX:3.3
:
81. 1. Solve the following pair of linear equations by the
elimination method and the substitution method:
(i) x + y = 5 and 2x β 3y = 4
(ii) 3x + 4y = 10 and 2x β 2y = 2
(iii) 3x β 5y β 4 = 0 and 9x = 2y + 7
(iv) (x/2)+(2y/3) = -1 and x β (y/3) = 3
EX:3.4
:
82. Solution:
(i) x + y = 5 and
2x β 3y = 4
EX:3.4
:
2x + 2y = 10
2x β 3y = 4
(-) (+) (-)
____________
0x + 5y = 6
y = 6/5
83. Elimination method:
3x + 4y = 10 ...(1)
2x - 2y = 2 ...(2)
Multiplying equation (2) by 2,
we obtain:
4x - 4y = 4 ...(3)
adding equation (1) and (3), we obtain
EX:3.4
:
Solution:
(ii) 3x + 4y = 10
2x β 2y = 2
substituting the value of x in
equation (1), we obtain:
6 + 4y = 10
4y = 4
y = 1
hence, x = 2, y = 1
3x + 4y = 10
4x β 4y = 4
____________
7x + 0y = 14
____________
7x = 14
x = 2
87. SUBSTITUTION METHOD:
3x + 4y = -6 β¦β¦β¦β¦β¦β¦..(1)
3x β y = 9 β¦β¦β¦β¦β¦β¦β¦(2)
From equation (2), we obtain:
y = 3x - 9 β¦β¦β¦β¦β¦.... (3)
putting this value in equation (1), we obtain:
3x + 4(3x - 9) = -6
15x = 30
x = 2
substituting the value of x in equation (3), we obtain:
y = 6 - 9 = -3
Hence x = 2 and y = -3.
EX:3.4
:
(iv) (x/2)+(2y/3) = -1
x β (y/3) = 3
88. 2. Form the pair of linear equations in the following problems, and find their solutions
(if they exist) by the elimination method:
(I) if we add 1 to the numerator and subtract 1 from the denominator, a fraction reduces to 1.
It becomes if we only add 1 to the denominator. What is the fraction?
Solution:
Let the fraction be a/b
According to the given information,
When equation (i) is subtracted from equation (ii) we get,
a = 3 β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦β¦..(iii)
EX:3.4
:
When a = 3 is substituted in equation (i) we
get,
3 β b = -2
-b = -5
b= 5
Hence, the fraction is 3/5.
a β b = - 2
2a β b = 1
(-) (+) (-)
____________
-a + 0y = -3
____________
a = 3
89. Let present age of Nuri and Sonu be x and y respectively.
According to the question,
2.
ii) Five years ago, Nuri was thrice as old as Sonu. Ten years later, Nuri will be twice as old as
Sonu. How old are Nuri and Sonu?
Solution:
Thus, the age of Nuri and Sonu are 50 years
and 20 years respectivelySubtracting equation (1) from equation (2), we obtain:
y = 20
Substituting the value of y in equation (1),
we obtain:
x β 3y = -10
x β 3(20) = -10
EX:3.4
:
x β 3y = - 10
x β 2y = 10
(-) (+) (-)
____________
0x -1y = - 20
____________
y = 20
90. Adding equations (1) and (2), we obtain:
9y = 9
y = 1
Substituting the value of y in equation (1), we
obtain:
x + y = 9
x + 1 = 9
x = 9 β 1 = 8.
x = 8
Thus, the number is 10y + x = 10 x 1 + 8 = 18
2.
(iii) The sum of the digits of a two-digit number is 9. Also, nine times this number is
twice the number obtained by reversing the order of the digits. Find the number.
EX:3.4
:
SOLUTION :
x + y = 9
-x + 8y = 0
____________
0x +9y = 9
____________
y = 1
(iii) Let the units digit and tens digit of the number
be x and y respectively.
Number = 10y + x
Number after reversing the digits = 10x + y
According to the question,
x + y = 9 ... (1)
9(10y + x) = 2(10x + y)
88y - 11x = 0
- x + 8y =0 ... (2)
91. (Solution:
Let the number of Rs.50 notes be A and
the number of Rs.100 notes be B.
According to the given information,
A + B = 25 β¦β¦β¦β¦β¦β¦β¦β¦β¦(i)
50A + 100B = 2000
A + 2 B = 40β¦β¦β¦β¦β¦β¦β¦β¦.(ii)
Subtracting the equation (iii) from the equation (ii)
we get,
50B = 750
B = 15
Substituting in the equation (i) we get,
A + B = 25
A + 15 = 25
A = 25 β 15 = 10.
A = 10
Hence, Manna has 10 notes of Rs.50 and 15 notes of
Rs.100.
2.
iv) Meena went to a bank to withdraw Rs.2000. She asked the cashier to give her Rs.50 and
Rs.100 notes only. Meena got 25 notes in all. Find how many notes of Rs.50 and Rs.100 she
received.
EX:3.4
:
A + B = 25
A + 2B = 40
(-) (-) (-)
____________
0A - B = -15
____________
B = 15
92. Solution:
Let the fixed charge for the first three days be
Rs.a
and the charge for each day extra be Rs.b.
According to the information given,
a + 4b = 27 β¦β¦β¦(i)
a + 2b = 21 β¦β¦β¦ (ii)
(v) A lending library has a fixed charge for the first three days and an additional charge for
each day thereafter. Saritha paid Rs.27 for a book kept for seven days, while Susy paid Rs.21
for the book she kept for five days. Find the fixed charge and the charge for each extra day.
EX:3.4
:
When equation (ii) is subtracted from equation (i)
we get,
2b = 6
b = 3β¦β¦β¦β¦β¦β¦(iii)
Substituting b = 3 in equation (i) we get,
a + 12 = 27
a = 15
Hence, the fixed charge is rs.15/-
and the charge per day is rs.3/-.
a + 4b = 27
a + 2B = 21
(-) (-) (-)
____________
0a + 2b = 6
____________
2b = 6
b = 6/2 = 3
98. Thus, the given pair of equations has no
solution.
1. Which of the following pairs of linear equations has unique solution, no solution, or
infinitely many solutions. In case there is a unique solution, find it by using cross
multiplication method.
(i) x β 3y β 3 = 0 and 3x β 9y β 2 = 0 (ii) 2x + y = 5 and 3x + 2y = 8
(iii) 3x β 5y = 20 and 6x β 10y = 40 (iv) x β 3y β 7 = 0 and 3x β 3y β 15 = 0
Solution:
EX:3.5
:
(i) x β 3y β 3 = 0 and 3x β 9y β 2 = 0
99. 1.
(ii) 2x + y = 5 and 3x + 2y = 8
EX:3.5
:
x y 1
b c a b
1 -5 2 1
2 -8 3 2
x y 1
b1 c1 a1 b1
b2 c2 a2 b2
Thus, the given pair of equations has unique
solution.
Therefore, It has unique
solution.
By cross-multiplication,
100. Thus, the given pair of equations has infinite solutions.
1.
(iii) 3x β 5y = 20 and 6x β 10y = 40
EX:3.5
:
101. Thus, the given pair of equations has unique
solution.
EX:3.5
:
By cross-multiplication,
(iv) x β 3y β 7 = 0 and 3x β 3y β 15 = 0
x y 1
b c a b
-3 -7 1 -3
-3 -15 3 -3
x y 1
b1 c1 a1 b1
b2 c2 a2 b2
The given pair of equations has unique
solution.
102. EX:3.5
:
2. (i) For which values of a
and b does the following pair
of linear equations have an
infinite number of solutions?
3y + 2x = 7;
(a β b) x + (a + b) y = 3a + b β 2
Solution:
2(3a + b - 2) = 7(a-b)
2(a +b) = 3(a-b)
2a -3a = -3b β 2b
-a = -5b Therefore , a-5b = 0
a β 5b β ( a β 9b) = 0 β (-4) = -
3b
a β 5b βa + 9b = 4
4b = 4
103. 2.
(ii) For which value of k will
the following pair of linear
equations have no solution?
3x + y = 1;
(2k β 1) x + (k β 1) y = 2k + 1
EX:3.5
:
3 ( k-1) = 1 ( 2k β 1) ( cross
multiplying)
3k β 2k = -1 + 3
105. Cross-multiplication method:
3. 8x + 5y = 9;
3x + 2y = 4
EX:3.5
:
x y 1
b1 c1 a1 b1
b2 c2 a2 b2
x y 1
b c a b
5 -9 8 5
2 -4 3 2
x = y = 1
-20+18 -27+32 16-15
106. 4. Form the pair of linear equations in the
following problems and find their
solutions (if they exist) by any
algebraic method:
(I) A part of monthly hostel charges is
fixed and the remaining depends on
the number of days one has taken food
in the mess. When a student A takes
food for 20 days she has to pay rs.1000
as hostel charges whereas a student
B, who takes food for 26 days, pays
rs.1180 as hostel charges. Find the
fixed charges and the cost of food per
day.
EX:3.5
:
x + 20 y β 1000 = 0
x + 26 y β 1180 = 0
x y 1
b c a b
20 -1000 1 20
26 - 1180 1 26
+ +
+
107. ,
(Ii) A fraction becomes 1/3
when 1 is subtracted from
the numerator and it
becomes 1/4 when 8 is
added to its denominator.
Find the fraction.
EX:3.5
:
108. (iii) Yash scored 40 marks in
a test, getting 3 marks for
each right answer and losing
1 mark for each wrong
answer. Had 4 marks been
awarded for each correct
answer and 2 marks been
deducted for each incorrect
answer, then Yash would
have scored 50 marks. How
many questions were there
in the test?
EX:3.5
:
109. (iv) Let the speed of first car and
second car be u km/h and v km/h
respectively.
Speed of both cars while they are
travelling in same direction = (u - v)
km/h
(Iv) places a and b are 100 km apart on a highway. One car starts from A and
another from B at the same time. If the cars travel in the same direction at
different speeds, they meet in 5 hours. If they travel towards each other, they
meet in 1 hour. What are the speeds of the two cars?
EX:3.5
:
Speed of both cars while they are travelling in
opposite directions
i.e., when they are travelling towards each
other = (u + v) km/h
Distance travelled = Speed x Time
110. Substituting the value of u in
equation (2), we obtain:
u + v = 100
60 + v = 100
v = 100 - 60
v = 40
Hence, speed of the first car is
60 km/h and speed of the
second car is 40 km/h.
According to the question,
EX:3.5
: u β v = 20
u + v = 100
___________
2u = 120
____________
u = 60
111. (v) Let,
The length of rectangle = x unit
And breadth of the rectangle = y unit
(V) The area of a rectangle gets reduced by 9 square units, if its length is reduced by 5
units and breadth is increased by 3 units. If we increase the length by 3 units and the
breadth by 2 units, the area increases by 67 square units. Find the dimensions of the
rectangle.
EX:3.5
: