Careers360 Logo
NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables

NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables

Edited By Dinesh Goyal | Updated on Mar 10, 2025 10:36 AM IST | #CBSE Class 10th
Upcoming Event
CBSE Class 10th  Exam Date : 13 Mar' 2025 - 13 Mar' 2025

NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables are discussed here. Class 10 Maths chapter 3 is an important chapter of Algebra and this chapter are created by expert team at careers360 keeping in mind of latest CBSE syllabus 2023. In Class 10 Maths chapter 3 solutions, students will learn to solve the linear equation with two variables. Class 10 Maths chapter 3 NCERT solutions contain the answers of all exercise NCERT questions.

This Story also Contains
  1. Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables PDF Free Download
  2. Pair of Linear Equations in Two Variables Class 10- Important Formulae
  3. NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables (Intext Questions and Exercise)
  4. Key Features of NCERT Class 10 Maths Solutions Chapter 3
  5. NCERT Books and NCERT Syllabus
  6. NCERT Solutions of Class 10 - Subject Wise
  7. NCERT Exemplar solutions - Subject wise
NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables
NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables

NCERT Class 10 Maths chapter 3 solutions are helpful to know the answers to the questions asked in NCERT class 10 maths book. Apart from this, by going through NCERT solutions for class 10 maths chapter 3, they will come to know about various methods of solving questions. NCERT solutions for class 10 are also available for other subjects.

Background wave

Also read,

Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables PDF Free Download

Download Solution PDF

Pair of Linear Equations in Two Variables Class 10- Important Formulae

Types of Linear Equations:

S. No.

Types of Linear Equation

General form

Description

Solutions

1.

Linear Equation in one Variable

ax + b = 0

Where a ≠ 0 and a & b are real numbers

One Solution

2.

Linear Equation in Two Variables

ax + by + c = 0

Where a ≠ 0 & b ≠ 0 and a, b & c are real numbers

Infinite Solutions possible

3.

Linear Equation in Three Variables

ax + by + cz + d = 0

Where a ≠ 0, b ≠ 0, c ≠ 0 and a, b, c, d are real numbers

Infinite Solutions possible

Simultaneous System of Linear Equations: A pair of equations in the format:

a1x + b1y + c1 = 0

a2x + b2y + c2 = 0

This arrangement is visually depicted through the use of two straight lines on the Cartesian plane, as explained in the following context:

1693838268417

When there is a unique solution then

x/(b1c2 - b2c1) = y/(c1a2 - c2a1) = 1/(a1b2 - a2b2)

This formula can be remembered as the diagram given below

1693838268800

Free download NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables PDF for CBSE Exam.

NCERT Solutions for Class 10 Maths Chapter 3 Pair of Linear Equations in Two Variables (Intext Questions and Exercise)

Solving the CBSE class 10 Questions. So, that students can understand. First will solve the intext Question which covers numerous topic like Linear equation and non linear

Class 10 Maths Chapter 3 solutions Pair of Linear Equations in two variables Excercise: 3.1

Q1 Aftab tells his daughter, “Seven 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 be.” (Isn’t this interesting?) Represent this situation algebraically and graphically.

Answer: Let x be the age of Aftab and y be the age of his daughter

Now, According to the question,

(x7)=7×(y7)x7=7y49x7y=42.1


Also,

(x+3)=3(y+3)x+3=3y+9x3y=6.(2)


Now, let's represent both equations graphically,
From (1), we get

y=x+427

So, Putting different values of x we get corresponding values of y

X

0

7

-7

Y

6

7

5


And From (2) we get,

y=x63

So, Putting different values of x we get corresponding values of y

X

0

3

6

Y

-2

-1

0

GRAPH:

Graph X-Y

Q2 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.

Answer:

Let the price of one Bat be x and the price of one ball be y,

Now, According to the question,

3x+6y=3900.(1)x+3y=1300.(2)


From(1) we have

y=39003x6

By putting different values of x, we get different corresponding values of y.So

X
100
300
-100
Y
600
500
700

Now, From (2), we have,

y=1300x3

By putting different values of x, we get different corresponding values of y.So

X
100
400
-200
Y
400
300
500

GRAPH:

1635919652158

Q3 The cost of 2 kg of apples and 1kg of grapes on a day was found to be Rs 160. After a month, the cost of 4 kg of apples and 2 kg of grapes is Rs 300. Represent the situation algebraically and geometrically.

Answer:

Let, x be the cost of 1kg apple and y be the cost of 1kg grapes.

Now, According to the question,

On a day:

2x+y=160.


After One Month:

4x+2y=300


Now, From (1) we have

y=1602x

Putting different values of x we get corresponding values of y, so,'

X

80

60

50

Y

0

40

60


And From (2) we have,

y=3004x2=1502x

Putting different values of x we get corresponding values of y, so,

X

50

60

70

Y

50

30

10

Graph:

graph


Class 10 Maths Chapter 3 solutions Pair of Linear Equations in Two Variables Excercise: 3.2

Q1 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.

Answer:

Let the number of boys is x and the number of girls is y.

Now, According to the question,

Total number of students in the class = 10, i.e.

x+y=10..(1)


And the number of girls is 4 more than the number of boys,i.e.

x=y+4xy=4.

Different points (x, y) for equation (1)

X
5
6
4
Y
5
4
6

Different points (x,y) satisfying (2)

X
5
6
7
y
1
2
3


Graph,

1635919752095

As we can see from the graph, both lines intersect at the point (7,3). that is x= 7 and y = 3 which means the number of boys in the class is 7 and the number of girls in the class is 3.

Q1 Form the pair of linear equations in the following problems and find their solutions graphically.

(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.

Answer:

Let x be the price of 1 pencil and y be the price of 1 pen,

Now, According to the question

5x+7y=50


And

7x+5y=46

Now, the points (x,y), that satisfies the equation (1) are

X
3
-4
10
Y
5
10
0

And, the points(x,y) that satisfies the equation (2) are

X
3
8
-2
Y
5
-2
12

The Graph,

Graph

As we can see from the Graph, both line intersects at point (3,5) that is, x = 3 and y = 5 which means cost of 1 pencil is 3 and the cost of 1 pen is 5.

Q2 On comparing the ratios |b1b2|a1a2]and |c1c2|find out whether the lines representing the following pairs of linear equations intersect at a point, are parallel or coincident: (i) 5x4y+8=07x+6y9=0

Answer:

Give, Equations,

5x4y+8=07x+6y9=0


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=57,b1b2=46 and c1c2=89


As we can see

a1a2b1b2

It means that both lines intersect at exactly one point.

Q2 On comparing the ratios [a1a2],b1b2 and |c1c2 find out whether the lines representing the following pairs of linear equations intersect at a point, are parallel or coincident: (ii) 9x+3y+12=018x+6y+24=0

Answer:

Given, Equations,

9x+3y+12=018x+6y+24=0


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=918=12b1b2=36=12 and c1c2=1224=12


As we can see

a1a2=b1b2=c1c2

It means that both lines are coincident.

Q2 On comparing the ratios [a1a2,[b1b2 and |c1c2] , find out whether the lines representing the following pairs of linear equations intersect at a point, are parallel or coincident: (iii) 6x3y+10=02xy+9=0

Answer:

Give, Equations,

6x3y+10=02xy+9=0


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=62=3,b1b2=31=3 and c1c2=109


As we can see

a1a2=b1b2c1c2

It means that both lines are parallel to each other.

Q2 On comparing the ratios a1a2,|b1b2b2 and c1c22 find out whether the lines representing the following pairs of linear equations are consistent, or inconsistent: (i) 3x+2y=5;2x3y=7

Answer:

Give, Equations,

3x+2y=52x3y=7


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=32,b1b2=23 and c1c2=57


As we can see

a1a2b1b2

It means the given equations have exactly one solution and thus pair of linear equations is consistent.

Q3 On comparing the ratios [a1a2][b1b2] and [c1c2],, find out whether the lines representing the following pairs of linear equations are consistent, or inconsistent: (ii) 2x3y=8;4x6y=9

Answer:

Given, Equations,

2x3y=84x6y=9


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=24=12b1b2=36=12 and c1c2=89


As we can see

a1a2=b1b2c1c2

It means the given equations have no solution and thus pair of linear equations is inconsistent.

Q3 On comparing the ratios [a1a2],[b1b2] and [c1c2], find out whether the lines representing the following pairs of linear equations are consistent, or inconsistent: (iii) 32x+53y=7;9x10y=14

Answer:

Given, Equations,

32x+53y=79x10y=14


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=3/29=318=16b1b2=5/310=530=16 and c1c2=714=12


As we can see

a1a2b1b2

It means the given equations have exactly one solution and thus pair of linear equations is consistent.

Q3 On comparing the ratios |a1a2,[b1b2| and |c1c2],find out whether the lines representing the following pairs of linear equations are consistent, or inconsistent: (iv) 5x3y=11;10x+6y=22

Answer:

Given, Equations,

5x3y=1110x+6y=22


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=510=12b1b2=36=12 and c1c2=1122=12


As we can see

a1a2=b1b2=c1c2

It means the given equations have an infinite number of solutions and thus pair of linear equations is consistent.

Q3 On comparing the ratios a1a2|,[b1b22|c1c2 find out whether the following pair of linear equations are consistent, or inconsistent (v) 43x+2y=8;2x+3y=12

Answer:

Given, Equations,

43x+2y=82x+3y=12


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=4/32=46b1b2=23 and c1c2=812=23


As we can see

a1a2=b1b2=c1c2

It means the given equations have an infinite number of solutions and thus pair of linear equations is consistent.

Q4 Which of the following pairs of linear equations are consistent/inconsistent? If consistent, obtain the solution graphically: (i) x+y=52x+2y=10

Answer:

Given, Equations,

x+y=52x+2y=10


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=12b1b2=12 and c1c2=510=12


As we can see

a1a2=b1b2=c1c2

It means the given equations have an infinite number of solutions and thus pair of linear equations is consistent.

The points (x,y) which satisfies in both equations are

X
1
3
5
Y
4
2
0

Graph

Q4 Which of the following pairs of linear equations are consistent/inconsistent? If consistent, obtain the solution graphically: (ii) xy=8,3x3y=16

Answer:

Given, Equations,

xy=83x3y=16


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=13b1b2=13=13 and c1c2=816=12


As we can see

a1a2=b1b2c1c2

It means the given equations have no solution and thus pair of linear equations is inconsistent.

Q4 Which of the following pairs of linear equations are consistent/inconsistent? If consistent, obtain the solution graphically: (iii) 2x+y6=0,4x2y4=0

Answer:

Given, Equations,

2x+y6=04x2y4=0


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=24=12b1b2=12=12 and c1c2=64=32


As we can see

a1a2b1b2

It means the given equations have exactly one solution and thus pair of linear equations is consistent.

Now The points(x, y) satisfying the equation are,

X
0
2
3
Y
6
2
0


And The points(x,y) satisfying the equation 4x2y4=0 are,

X
0
1
2
Y
-2
0
2


GRAPH:

1635919975632

As we can see both lines intersects at point (2,2) and hence the solution of both equations is x = 2 and y = 2.

Q4 Which of the following pairs of linear equations are consistent/inconsistent? If consistent, obtain the solution graphically: (iv) 2x2y2=0,4x4y5=0

Answer:

Given, Equations,

2x2y2=04x4y5=0


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=24=12


b1b2=24=12 and 


c1c2=25=25


As we can see

a1a2=b1b2c1c2

It means the given equations have no solution and thus pair of linear equations is inconsistent.

Q5 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.

Answer:

Let l be the length of the rectangular garden and b be the width.
Now, According to the question, the length is 4 m more than its width.i.e.

l=b+4lb=4


Also Given Half Parameter of the rectangle =36 i.e.

l+b=36.(2)


Now, as we have two equations, on adding both equations, we get,

l+b+lb=4+362l=40l=20


Putting this in equation (1),

20b=4b=204b=16

Hence Length and width of the rectangle are 20m and 16 respectively.

Q6 Given the linear equation 2x+3y8=0 , write another linear equation in two variables such that the geometrical representation of the pair so formed is: (i) intersecting lines

Answer:

Given the equation,

2x+3y8=0


As we know that the condition for the intersection of lines a1x+b1y+c1=0 and a2x+b2y+c2=0, is,

a1a2b1b2


So Any line with this condition can be 4x+3y16=0
Here,

a1a2=24=12b1b2=33=1


As

121

the line satisfies the given condition.

Q6 Given the linear equation 2x+3y8=0 , write another linear equation in two variables such that the geometrical representation of the pair so formed is (ii) parallel lines

Answer:

Given the equation,

2x+3y8=0


As we know that the condition for the lines a1x+b1y+c1=0 and a2x+b2y+c2=0, for being parallel is,

a1a2=b1b2c1c2


So Any line with this condition can be 4x+6y8=0
Here,

a1a2=24=12b1b2=36=12c1c2=88=1


As
12=121 the line satisfies the given condition.

Q6 Given the linear equation 2x+3y8=0 , write another linear equation in two variables such that the geometrical representation of the pair so formed is: (iii) coincident lines

Answer:

Given the equation,

2x+3y8=0


As we know that the condition for the coincidence of the lines a1x+b1y+c1=0 and a2x+b2y+c2=0, is,

a1a2=b1b2=c1c2


So any line with this condition can be 4x+6y16=0
Here,

a1a2=24=12b1b2=36=12c1c2=816=12


As
12=12=12 the line satisfies the given condition.

Q7 Draw the graphs of the equations xy+1=0and 3x+2y12=0 . Determine the coordinates of the vertices of the triangle formed by these lines and the x-axis, and shade the triangular region.

Answer:

Given, two equations,

xy+1=0


And

3x+2y12=0

The points (x,y) satisfying (1) are

X

0

3

6

Y

1

4

7

And The points(x,y) satisfying (2) are,

X

0

2

4

Y

6

3

0


GRAPH:

1635920037829

As we can see from the graph that both lines intersect at the point (2,3), And the vertices of the Triangle are ( -1,0), (2,3) and (4,0). The area of the triangle is shaded with a green color.

Pair of linear equations in two variables class 10 solutions Excercise: 3.3

Q1 Solve the following pair of linear equations by the substitution method. (i) x+y=14xy=4

Answer:

Given, two equations,

x+y=14.(1)xy=4.(2)


Now, from (1), we have

y=14x


Substituting this in (2), we get

x(14x)=4x14+x=42x=4+14=18x=9


Substituting this value of x in (3)

y=14x=149=5


Hence, Solution of the given equations is x=9 and y=5.

Q1 Solve the following pair of linear equations by the substitution method (ii) st=3s3+t2=6

Answer:

Given, two equations,

st=3s3+t2=6.


Now, from (1), we have

s=t+3.


Substituting this in (2), we get

t+33+t2=62t+6+3t6=65t+6=365t=30t=6


Substituting this value of t in (3)

s=t+3=6+3=9

Hence, Solution of the given equations is s = 9 and t = 6.

Q1 Solve the following pair of linear equations by the substitution method. (iii) 3xy=39x3y=9

Answer:

Given, two equations,

3xy=39x3y=9.


Now, from (1), we have

y=3x3..


Substituting this in (2), we get

9x3(3x3)=99x9x+9=99=9


This is always true, and hence this pair of the equation has infinite solutions.
As we have

y=3x3


One of many possible solutions is x=1, and y=0.

Q1 Solve the following pair of linear equations by the substitution method. (iv) 0.2x+0.3y=1.30.4x+0.5y=2.3

Answer:

Given, two equations,

0.2x+0.3y=1.30.4x+0.5y=2.3


Now, from (1), we have

y=1.30.2x0.3


Substituting this in (2), we get

0.4x+0.5(1.30.2x0.3)=2.30.12x+0.650.1x=0.690.02x=0.690.65=0.04x=2


Substituting this value of x in (3)

y=(1.30.2x0.3)=(1.30.40.3)=0.90.3=3


Hence, Solution of the given equations is,

x=2 and y=3

Q1 Solve the following pair of linear equations by the substitution method. (v) \begin{tabular}{|l|}2x+3y=03x8y=0

Answer:

Given, two equations,

2x+3y=03x8y=0


Now, from (1), we have

y=2x3


Substituting this in (2), we get

3x8(2x3)=03x=8(2x3)3x=4x7x=0x=0


Substituting this value of x in (3)

y=2x3=0

Hence, Solution of the given equations is,

x = 0 , y = 0 .

Q1 Solve the following pair of linear equations by the substitution method. (vi) 3x25y3=2x3+y2=136

Answer:

Given,

3x25y3=2.x3+y2=136


From (1) we have,

x=23(5y32)


Putting this in (2) we get,

13×23(5y32)+y2=13610y2749+y2=13620y5449+27y54=13647y54=136+4947y54=11754+245447y=117+2447y=141

y=14147y=3

putting this value in (3) we get,

x=23(5y32)x=23(5×332)x=23(52)x=23×3x=2


Hence x=2 and y=3.

Q2 Solve 2x+3y=11and 2x4y=24 and hence find the value of ‘ m’ for which y=mx+3 .

Answer:

Given, two equations,

2x+3y=112x4y=24


Now, from (1), we have

y=112x3


Substituting this in (2), we get

2x4(112x3)=246x44+8x=7214x=447214x=28x=2


Substituting this value of x in (3)

y=(112x3)=112×(2)3=153=5


Hence, Solution of the given equations is,

x=2, and y=5

Now,

As it satisfies y=mx+3,

5=m(2)+32m=352m=2m=1

Hence Value of m is -1.

Q3 Form the pair of linear equations for the following problem and find their solution by substitution method.

(i) The difference between the two numbers is 26 and one number is three times the other. Find them.

Answer:

Let two numbers be x and y and let the bigger number is y.

Now, According to the question,

yx=26.


And

y=3x.


Now, the substituting value of y from (2) in (1) we get,

3xx=262x=26x=13


Substituting this in (2)

y=3x=3(13)=39

Hence the two numbers are 13 and 39.

Q3 Form the pair of linear equations for the following problem and find their solution by substitution method (ii) The larger of two supplementary angles exceeds the smaller by 18 degrees. Find them.

Answer:

Let the larger angle be x and smaller angle be y

Now, As we know the sum of supplementary angles is 180. so,

x+y=180


Also given in the question,

xy=18


Now, From (2) we have,

y=x18


Substituting this value in (1)

x+x18=1802x=180+182x=198x=99


Now, Substituting this value of x in (3), we get

y=x18=9918=81


Hence the two supplementary angles are

990 and 810

Q3 Form the pair of linear equations for the following problems and find their solution by substitution method. (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.

Answer:

Let the cost of 1 bat is x and the cost of 1 ball is y.

Now, According to the question,

7x+6y=3800..3x+5y=1750..


Now, From (1) we have

y=38007x6


Substituting this value of y in (2)

3x+5(38007x6)=175018x+1900035x=1750×617x=105001900017x=8500x=850017x=500

Now, Substituting this value of x in (3)

y=38007x6=38007×5006=380035006=3006=50

Hence, The cost of one bat is 500 Rs and the cost of one ball 50 Rs.

Q3 Form the pair of linear equations for the following problems and find their solution by substitution method. (v) A fraction becomes 911,, if 2 is added to both the numerator and the denominator. If, 3 is added to both the numerator and the denominator it becomes 56, . Find the fraction.

Answer:

Let the numerator of the fraction be x and denominator of the fraction is y

Now According to the question,

x+2y+2=91111(x+2)=9(y+2)11x+22=9y+1811x9y=4


Also,

x+3y+3=566(x+3)=5(y+3)6x+18=5y+156x5y=3

Now, From (1) we have

y=11x+49.


Substituting this value of y in (2)

6x5(11x+49)=354x55x20=27x=2027x=7


Substituting this value of x in (3)

y=11x+49=11(7)+49=819=9


Hence the required fraction is

xy=79

Q3 Form the pair of linear equations for the following problems and find their solution by substitution method. (vi) Five years hence, the age of Jacob will be three times that of his son. Five years ago, Jacob’s age was seven times that of his son. What are their present ages?

Answer:

Let x be the age of Jacob and y be the age of Jacob's son,

Now, According to the question

x+5=3(y+5)x+5=3y+15x3y=10


Also,

x5=7(y5)x5=7y35x7y=30


Now,
From (1) we have,

x=10+3y


Substituting this value of x in (2)

10+3y7y=304y=3010

4y=40y=10


Substituting this value of y in (3),

x=10+3y=10+3(10)=10+30=40


Hence, Present age of Jacob is 40 years and the present age of Jacob's son is 10 years.

Pair of linear equations in two variables class 10 solutions Excercise: 3.4

Q1 Solve the following pair of linear equations by the elimination method and the substitution method :

(i) x+y=5 and 2x3y=4

Answer:
Elimination Method:
Given, equations

x+y=5..(1) and 2x3y=4.(2)


Now, multiplying (1) by 3 we, get

3x+3y=15


Now, Adding (2) and (3), we get

2x3y+3x+3y=4+155x=19x=195

Substituting this value in (1) we, get

195+y=5y=5195y=65


Hence,

x=195 and y=65


Substitution method :
Given, equations

x+y=52x3y=4.


Now, from (1) we have,

y=5x(3)

substituting this value in (2)

2x3(5x)=42x15+3x=45x=19x=195


Substituting this value of x in (3)

y=5x=5195=65


Hence,

x=195 and y=65

Q1 Solve the following pair of linear equations by the elimination method and the substitution method :

(ii) 3x+4y=10 and 2x2y=2

Answer:
Elimination Method:
Given, equations

3x+4y=10.(1) and 2x2y=2.(2)


Now, multiplying (2) by 2 we, get

4x4y=4


Now, Adding (1) and (3), we get

3x+4y+4x4y=10+47x=14x=2

Putting this value in (2) we, get

2(2)2y=22y=2y=1


Hence,

x=2 and y=1


Substitution method :
Given, equations

3x+4y=10.(1) and 2x2y=2.(2)


Now, from (2) we have,

y=2x22=x1

substituting this value in (1)

3x+4(x1)=10

3x+4x4=107x=14x=2


Substituting this value of x in (3)

y=x1=21=1


Hence,

x=2 and y=1

Q1 Solve the following pair of linear equations by the elimination method and the substitution method: (iii) 3x5y4=0 and 9x=2y+7

Answer:

Elimination Method:

Given, equations

3x5y4=09x=2y+79x2y7=0

(1) and

Now, multiplying (1) by 3 we, get

9x15y12=0


Now, Subtracting (3) from (2), we get

9x2y79x+15y+12=013y+5=0y=513


Putting this value in (1) we, get

3x5(513)4=0

3x=425133x=2713x=913


Hence,

x=913 and y=513


Substitution method :
Given, equations

3x5y4=0.(1) and 9x=2y+79x2y7=0.(2)

Now, from (2) we have,

y=9x72

substituting this value in (1)

3x5(9x72)4=06x45x+358=039x+27=0x=2739=913


Substituting this value of x in (3)

y=9(9/13)72=81/1372=513


Hence,

x=913 and y=513

Q1 Solve the following pair of linear equations by the elimination method and the substitution method :(iv) x2+2y3=1 and xy3=3

Answer:

Elimination Method:

Given, equations

x2+2y3=1xy3=3

(1) and

Now, multiplying (2) by 2 we, get

2x2y3=6


Now, Adding (1) and (3), we get

x2+2y3+2x2y3=1+65x2=5x=2


Putting this value in (2) we, get

2y3=3

y3=1y=3


Hence,

x=2 and y=3


Substitution method:
Given, equations

x2+2y3=1(1) and xy3=3(2)


Now, from (2) we have,

y=3(x3)

substituting this value in (1)

x2+2(3(x3))3=1x2+2x6=15x2=5x=2


Substituting this value of x in (3)

y=3(x3)=3(21)=3


Hence,

x=2 and y=3

Q2 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 1/2 if we only add 1 to the denominator. What is the fraction?

Answer:

Let the numerator of the fraction be x and denominator is y,

Now, According to the question,

x+1y1=1x+1=y1xy=2..


Also,

xy+1=122x=y+12xy=1


Now, Subtracting (1) from (2) we get

x=3


Putting this value in (1)

3y=2

y=5


Hence

x=3 and y=5


And the fraction is

35

Q2 Form the pair of linear equations in the following problems, and find their solutions (if they exist) by the elimination method : (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?

Answer:

Let the age of Nuri be x and age of Sonu be y.

Now, According to the question

x5=3(y5)x5=3y15x3y=10..


Also,

x+10=2(y+10)x+10=2y+20x2y=10


Now, Subtracting (1) from (2), we get

y=20

putting this value in (2)

x2(20)=10x=50

Hence the age of Nuri is 50 and the age of Nuri is 20.

Q2 Form the pair of linear equations in the following problems and find their solutions (if they exist) by the elimination method : (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.

Answer:

Let the unit digit of the number be x and 10's digit be y.

Now, According to the question,

x+y=9(1)24323


Also

9(10y+x)=2(10x+y)90y+9x=20x+2y88y11x=08yx=0..(2)


Now adding (1) and (2) we get,

9y=9y=1

now putting this value in (1)

x+1=9x=8

Hence the number is 18.

Q2 Form the pair of linear equations in the following problems and find their solutions (if they exist) by the elimination method : (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.

Answer:

Let the number of Rs 50 notes be x and the number of Rs 100 notes be y.

Now, According to the question,

x+y=25.


And

50x+100y=2000x+2y=40..


Now, Subtracting(1) from (2), we get

y=15


Putting this value in (1).

x+15=25x=10

Hence Meena received 10 50 Rs notes and 15 100 Rs notes.

Pair of linear equations in two variables class 10 solutions Excercise: 3.5

Q1 Which of the following pairs of linear equations has a unique solution, no solution, or infinitely many solutions? In case there is a unique solution, find it by using a cross multiplication method.

(i) x3y3=03x9y2=0

Answer:

Given, two equations,

x3y3=0.(1)3x9y2=0.(2)


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=13b1b2=39=13c1c2=32=32


As we can see,

a1a2=b1b2c1c2

Hence, the pair of equations has no solution.

Q1 Which of the following pairs of linear equations has a unique solution, no solution, or infinitely many solutions? In case there is a unique solution, find it by using a cross multiplication method.

(ii) 2x+y=53x+2y=8

Answer:

Given, two equations,

2x+y=53x+2y=8


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=23b1b2=12c1c2=58


As we can see,

a1a2b1b2c1c2

Hence, the pair of equations has exactly one solution.

By Cross multiplication method,

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(1)(8)(2)(5)=y(5)(3)(8)(2)=1(2)(2)(3)(1)x2=y1=11x=2, and y=1

Q1 Which of the following pairs of linear equations has a unique solution, no solution, or infinitely many solutions? In case there is a unique solution, find it by using a cross multiplication method.

(iii) 3x5y=206x10y=40

Answer:

Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=36=12b1b2=510=12c1c2=2040=12


As we can see,

a1a2=b1b2=c1c2

Hence, the pair of equations has infinitely many solutions.

Q1 Which of the following pairs of linear equations has a unique solution, no solution, or infinitely many solutions? In case there is a unique solution, find it by using a cross multiplication method.

(iv) x3y7=03x3y15=0

Answer:

Given the equations,

x3y7=0.3x3y15=0.


Comparing these equations with a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

a1a2=13b1b2=33=1c1c2=715=715


As we can see,

a1a2b1b2c1c2

Hence, the pair of equations has exactly one solution.

By Cross multiplication method,

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(3)(15)(3)(7)=y(7)(3)(15)(1)=1(1)(3)(3)(3)x4521=y21+15=13+9x24=y6=16x=246=4, and y=1

Q2 (i) For which values of a and b does the following pair of linear equations have an infinite number of solutions? 2x+3y=7(ab)x+(a+b)y=3a+b2

Answer:

Given equations,

2x+3y=7(ab)x+(a+b)y=3a+b2


As we know, the condition for equations a1x+b1y+c1=0 and a2x+b2y+c2=0 to have an infinite solution is

a1a2=b1b2=c1c2


So, Comparing these equations with, a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

2ab=3a+b=73a+b2


From here we get,

2ab=3a+b2(a+b)=3(ab)2a+2b=3a3ba5b=0..(1)

Also,

2ab=73a+b22(3a+b2)=7(ab)6a+2b4=7a7ba9b+4=0..(2)


Now, Subtracting (2) from (1) we get

4b4=0b=1


Substituting this value in (1)

a5(1)=0a=5


Hence, a=5 and b=1.

Q2 (ii) For which value of k will the following pair of linear equations have no solution? 3x+y=1(2k1)x+(k1)y=2k+1

Answer:

Given, the equations,

3x+y=1(2k1)x+(k1)y=2k+1


As we know, the condition for equations a1x+b1y+c1=0 and a2x+b2y+c2=0 to have no solution is

a1a2=b1b2c1c2


So, Comparing these equations with, a1x+b1y+c1=0 and a2x+b2y+c2=0, we get

32k1=1k112k+1


From here we get,

32k1=1k13(k1)=2k13k3=2k13k2k=31

k=2

Hence, the value of K is 2.

Q3 Solve the following pair of linear equations by the substitution and cross-multiplication methods :8x+5y=93x+2y=4

Answer:

Given the equations

8x+5y=9.3x+2y=4.


By Substitution Method,
From (1) we have

y=98x5.


Substituting this in (2),

3x+2(98x5)=415x+1816x=20x=2018x=2

Substituting this in (3)

y=98x5=98(2)5=255=5


Hence x=2 and y=5.
By Cross Multiplication Method

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(5)(4)(2)(9)=y(3)(9)(8)(4)=1(8)(2)(3)(5)x20+18=y3227=11615x2=y5=11x=2, and y=5

Q4 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.

Answer:

Let the fixed charge be x and the cost of food per day is y,

Now, According to the question

x+20y=1000


Also

x+26y=1180..


Now subtracting (1) from (2),

x+26yx20y=11801006y=180y=30


Putting this value in (1)

x+20(30)=1000x=1000600x=400

Hence, the Fixed charge is Rs 400 and the cost of food per day is Rs 30.

Q4 Form the pair of linear equations in the following problems and find their solutions (if they exist) by any algebraic method : (ii) A fraction becomes 1/3when 1 is subtracted from the numerator and it becomes 1/4 when 8 is added to its denominator. Find the fraction.

Answer:

Let numerator of a fraction be x and the denominator is y.

Now, According to the question,

x1y=133(x1)=y3x3=y3xy=3


Also,

xy+8=144x=y+84xy=8.


Now, Subtracting (1) from (2) we get,

4x3x=83x=5

Putting this value in (2) we get,

4(5)y=8y=208y=12


Hence, the fraction is

xy=512

Q4 Form the pair of linear equations in the following problems and find their solutions (if they exist) by any algebraic method : (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?

Answer:

Let the number of right answer and wrong answer be x and y respectively

Now, According to the question,

3xy=40.


And

4x2y=502xy=25.


Now, subtracting (2) from (1) we get,

x=4025x=15


Putting this value in (1)

3(15)y=40y=4540y=5


Hence the total number of question is x+y=15+5=20.

Q4 Form the pair of linear equations in the following problems and find their solutions (if they exist) by any algebraic method : (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?

Answer:

Let the speed of the first car is x and the speed of the second car is y.

Let's solve this problem by using relative motion concept,

the relative speed when they are going in the same direction= x - y

the relative speed when they are going in the opposite direction= x + y

The given relative distance between them = 100 km.

Now, As we know,

Relative distance = Relative speed * time .

So, According to the question,

5×(xy)=1005x5y=100xy=20..


Also,

1(x+y)=100x+y=100


Now Adding (1) and (2) we get

2x=120x=60

putting this in (1)

60y=20y=6020

y=40

Hence the speeds of the cars are 40 km/hour and 60 km/hour.

Q4 Form the pair of linear equations in the following problems and find their solutions (if they exist) by any algebraic method : (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.

Answer:

Let l be the length of the rectangle and b be the width,
Now, According to the question,

(l5)(b+3)=lb9lb+3l5b15=lb93l5b6=0.(1)


Also,

(l+3)(b+2)=lb+67lb+2l+3b+6=lb+672l+3b61=0.(2)


By Cross multiplication method,

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(5)(61)(3)(6)=y(6)(2)(61)(3)=1(3)(3)(2)(5)

x305+18=y12+183=19+10x323=y171=119x=17, and y=9

Hence the length and width of the rectangle are 17 units and 9 units respectively.

NCERT Solutions for class 10 math chapter 3 Pair of Linear Equations in Two Variables Excercise: 3.6

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:

(i) 12x+13y=213x+12y=136

Answer:

Given Equations,

12x+13y=213x+12y=136


Let,

1x=p and 1y=q


Now, our equation becomes

p2+q3=23p+2q=12..


And

p3+q2=1362p+3q=13.

By Cross Multiplication method,

pb1c2b2c1=qc1a2c2a1=1a1b2a2b1p(2)(13)(3)(12)=q(12)(2)(13)(3)=1(3)(3)(2)(2)p26+36=q24+39=194p10=q15=15p=2, and q=3


And Hence,

x=12 and y=13

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:

(ii) 2x+3y=2
4x9y=1

Answer:

Given Equations,

2x+3y=24x9y=1


Let,

1x=p and 1y=q


Now, our equation becomes

2p+3q=2


And

4p9q=1


By Cross Multiplication method,

pb1c2b2c1=qc1a2c2a1=1a1b2a2b1

p(3)(1)(9)(2)=q(2)(4)(1)(2)=1(2)(9)(4)(3)p318=q82=11812p15=q10=130p=12, and q=13


So,

p=12=1xx=4q=13=1yy=9


And hence

x=4 and y=9

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:

(iii) 4x+3y=143x4y=23

Answer:

Given Equations,

4x+3y=143x4y=23


Let,

1x=p and y=q


Now, our equation becomes

4p+3q=14


And

3p4q=23


By Cross Multiplication method,

pb1c2b2c1=qc1a2c2a1=1a1b2a2b1

p(3)(23)(4)(14)=q(14)(3)(23)(4)=1(4)(4)(3)(3)p6956=q42+92=1169p125=q50=125p=5, and q=2


And Hence,

x=15 and y=2.

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:

(iv) 5x1+1y2=26x13y2=1

Answer:

Given Equations,

5x1+1y2=26x13y2=1


Let,

1x1=p and 1y2=q


Now, our equation becomes

5p+q=2


And

6p3q=1


Multiplying (1) by 3 we get

15p+3q=6.

Now, adding (2) and (3) we get

21p=7p=13


Putting this in (2)

6(13)3q=13q=1q=13


Now,

p=13=1x1x1=3x=4q=13=1y2y2=3x=5

Hence,

x=4, and y=5

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations: (v)

7x2yxy=58x+7yxy=15

Answer:

Given Equations,

7x2yxy=57y2x=58x+7yxy=158y+7x=15


Let,

1x=p and 1y=q


Now, our equation becomes

7q2p=5


And

8q+7p=15

By Cross Multiplication method,

qb1c2b2c1=pc1a2c2a1=1a1b2a2b1q(2)(15)(7)(5)=p(5)(8)(15)(7)=1(7)(7)(8)(2)q30+35=p40+105=149+16q65=p65=165p=1, and q=1


And Hence, x=1 and y=1.

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:

(vi) 6x+3y=6xy2x+4y=5xy

Answer:

Given Equations,

6x+3y=6xy6xxy+3yxy=66y+3x=6 and 2x+4y=5xy2xxy+4yxy=52y+4x=5


Let,

1x=p and 1y=q


Now, our equation becomes

6q+3p=6

And

2q+4p=5..


By Cross Multiplication method,

qb1c2b2c1=pc1a2c2a1=1a1b2a2b1q(3)(5)(6)(4)=p(6)(2)(6)(5)=1(6)(4)(3)(2)q15+24=p12+30=1246q9=p18=118q=12 and p=1


And Hence,

x=1 and y=2

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:
(vii) 10x+y+2xy=415x+y5xy=2


Answer:

Given Equations,

10x+y+2xy=415x+y5xy=2


Let,

1x+y=p and 1xy=q


Now, our equation becomes

10p+2q=4


And

15p5q=2.


By Cross Multiplication method,

pb1c2b2c1=qc1a2c2a1=1a1b2a2b1

p(2)(2)(5)(4)=q(4)(15)(2)(10)=1(10)(5)(15)(2)p420=q6020=15030p16=q80=180p=15, and q=1


Now,

p=15=1x+yx+y=5.


And,

q=1=1xy

xy=1


Adding (3) and (4) we get,

2x=6x=3


Putting this value in (3) we get,

3+y=5y=2


And Hence,

x=3 and y=2

Q1 Solve the following pairs of equations by reducing them to a pair of linear equations:

(viii) 13x+y+13xy=3412(3x+y)12(3xy)=18


Answer:

Given Equations,

13x+y+13xy=3412(3x+y)12(3xy)=18


Let,

13x+y=p and 13xy=q


Now, our equation becomes

p+q=34


And

p2q2=18pq=14

Now, Adding (1) and (2), we get

2p=34142p=24p=14


Putting this value in (1)

14+q=34q=3414q=24q=12

Now,

p=14=13x+y3x+y=4.


And

q=12=13xy3xy=2.


Now, Adding (3) and (4), we get

6x=4+26x=6x=1


Putting this value in (3),

3(1)+y=4y=43

y=1


Hence,

x=1, and y=1

Q2 Formulate the following problems as a pair of equations and hence find their solutions: (i) Ritu can row downstream 20 km in 2 hours, and upstream 4 km in 2 hours. Find her speed of rowing in still water and the speed of the current.

Answer:

Let the speed of Ritu in still water be x and speed of current be y,

Let's solve this problem by using relative motion concept,

the relative speed when they are going in the same direction (downstream)= x +y

the relative speed when they are going in the opposite direction (upstream)= x - y

Now, As we know,

Relative distance = Relative speed * time .

So, According to the question,

x+y=202x+y=10.


And,

xy=42xy=2


Now, Adding (1) and (2), we get

2x=10+22x=12x=6


Putting this in (2)

6y=2y=62

y=4


Hence,

x=6 and y=4

Hence Speed of Ritu in still water is 6 km/hour and speed of the current is 4 km/hour

Q2 Formulate the following problems as a pair of equations and hence find their solutions: (ii) 2 women and 5 men can together finish an embroidery work in 4 days, while 3 women and 6 men can finish it in 3 days. Find the time taken by 1 woman alone to finish the work, and also that taken by 1 man alone.

Answer:

Let the number of days taken by woman and man be x and y respectively,

The proportion of Work done by a woman in a single day

=1x


The proportion of Work done by a man in a single day

=1y


Now, According to the question,

4(2x+5y)=1(2x+5y)=14


Also,

3(3x+6y)=1(3x+6y)=13

Let,

1x=p and 1y=q


Now, our equation becomes

2p+5q=148p+20q=1


And

3p+6p=139p+18p=1


By Cross Multiplication method,

pb1c2b2c1=qc1a2c2a1=1a1b2a2b1p(20)(1)(18)(1)=q(1)(9)(8)(1)=1(8)(18)(20)(9)

p20+18=q9+8=114660p2=q1=136p=118, and q=136


So,

x=18 and y=36

Q2 Formulate the following problems as a pair of equations and hence find their solutions: (iii) Roohi travels 300 km to her home partly by train and partly by bus. She takes 4 hours if she travels 60 km by train and the remaining by bus. If she travels 100 km by train and the remaining by bus, she takes 10 minutes longer. Find the speed of the train and the bus separately.

Answer:

Let the speed of the train and bus be u and v respectively

Now According to the question,

60u+240v=4


And

100u+200v=4+16100u+200v=256


Let,

1u=p and 1v=q


Now, our equation becomes

60p+140q=415p+60q=1.

And

100p+200q=2564p+8q=1624p+48q=1..


By Cross Multiplication method,

pb1c2b2c1=qc1a2c2a1=1a1b2a2b1q(60)(1)(48)(1)=p(1)(24)(1)(15)=1(15)(48)(60)(24)p60+48=q24+15=17201440p12=q9=1720

p=12720=160, and q=9720=180


And Hence,

x=60 and y=80

Hence the speed of the train and bus are 60 km/hour and 80 km/hour respectively.

Class 10 math chapter 3 solutions Pair of Linear Equations in Two Variables Excercise: 3.7

Q1 The ages of two friends Ani and Biju differ by 3 years. Ani’s father Dharam is twice as old as Ani and Biju is twice as old as his sister Cathy. The ages of Cathy and Dharam differ by 30 years. Find the ages of Ani and Biju.

Answer:

Let the age of Ani be a, age of Biju be b ,

Case 1: when Ani is older than Biju

age of Ani's father Dharam:

d=2a and 

age of his sister Cathy :

c=b2


Now According to the question,

ab=3


Also,

dc=302ab2=304ab=60


Now subtracting (1) from (2), we get,

3a=603a=19

putting this in (1)

19b=3b=16


Hence the age of Ani and Biju is 19 years and 16 years respectively.
Case 2:

ba=3.


And

dc=302ab2=304ab=60


Now Adding (3) and (4), we get,

3a=63a=21

putting it in (3)

b21=3b=24

Hence the age of Ani and Biju is 21 years and 24 years respectively.

Q2 One says, “Give me a hundred, friend! I shall then become twice as rich as you”. The other replies, “If you give me ten, I shall be six times as rich as you”. Tell me what is the amount of their (respective) capital? [From the Bijaganita of Bhaskara II]

[Hint : x+100=2(y100),y+10=6(x10) ]

Answer:

Let the amount of money the first person and the second person having is x and y respectively

Noe, According to the question.

x+100=2(y100)x2y=300


Also

y+10=6(x10)y6x=70


Multiplying (2) by 2 we get,

2y12x=140


Now adding (1) and (3), we get

11x=14030011x=440x=40


Putting this value in (1)

402y=300

2y=340y=170

Thus two friends had 40 Rs and 170 Rs respectively.


Q3 A train covered a certain distance at a uniform speed. If the train would have been 10 km/h faster, it would have taken 2 hours less than the scheduled time. And, if the train were slower by 10 km/h; it would have taken 3 hours more than the scheduled time. Find the distance covered by the train.

Answer:

Let the speed of the train be v km/h and the time taken by train to travel the given distance be t hours and the distance to travel be d km.

Now As we Know,

 speed = distance  time v=dt


d=vt.


Now, According to the question,

(v+10)=dt2(v+10)t2=dvt+10t2v20=d


Now, Using equation (1), we have

2v+10t=20


Also,

(v10)=dt+3

(v10)(t+3)=dvt+3v10t30=d3v10t=30.(3)


Adding equations (2) and (3), we obtain:

v=50


Substituting the value of x in equation (2), we obtain:

(2)(50)+10t=20100+10t=2010t=120t=12


Putting this value in (1) we get,

d=vt=(50)(12)=600

Hence the distance covered by train is 600km.

Q4 The students of a class are made to stand in rows. If 3 students are extra in a row, there would be 1 row less. If 3 students are less in a row, there would be 2 rows more. Find the number of students in the class.

Answer:

Let the number of rows is x and the number of students in a row is y.
Total number of students in the class = Number of rows * Number of students in a row
= xy

Now, According to the question,

xy=(x1)(y+3)xy=xyy+3x33xy3=03xy=3(1)


Also,

xy=(x+2)(y3)xy=xy+2y3x63x2y=6(2)


Subtracting equation (2) from (1), we get:

y=9


Substituting the value of y in equation (1), we obtain:

3x9=33x=9+3=12x=4


Hence,
The number of rows is 4 and the Number of students in a row is 9 .

Total number of students in a class

:xy=(4)(9)=36

Hence there are 36 students in the class.

Q5 In a ABC,C=3B=2(A+B). Find the three angles.

Answer:

Given,

C=3B=2(A+B)3B=2(A+B)B=2A2AB=0


Also, As we know that the sum of angles of a triangle is 180 , so

A+B+C=180A+B+3B=180A+4B=180.


Now From (1) we have

B=2A.


Putting this value in (2) we have

A+4(2A)=180.9A=180.

A=200.


Putting this in (3)

B=2(20)=40


And

C=3B=3(40)=120


Hence three angles of triangles 20,40 and 120.

Q6 Draw the graphs of the equations 5xy=5 and 3x7=3. Determine the coordinates of the vertices of the triangle formed by these lines and the y-axis.

Answer:

Given two equations,

5xy=5.


And

3xy=3.

Points(x,y) which satisfies equation (1) are:

X
0
1
5
Y
-5
0
20

Points(x,y) which satisfies equation (1) are:

X
0
1
2
Y
-3
0
3


GRAPH:

Graph

As we can see from the graph, the three points of the triangle are, (0,-3),(0,-5) and (1,0).

Q7 Solve the following pair of linear equations: (i) px+qy=pqqxpy=p+q

Answer:

Given Equations,

px+qy=pq.qxpy=p+q.


Now By Cross multiplication method,

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(q)(pq)(qp)(p)=y(qp)(q)(p)(pq)=1(p)(p)(q)(q)xp2q2=yp2+q2=1p2q2x=1, and y=1

Q7 Solve the following pair of linear equations: (ii) ax+by=cbx+ay=1+c

Answer:

Given two equations,

ax+by=cbx+ay=1+c.


Now By Cross multiplication method,

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(b)(1c)(c)(a)=y(c)(b)(a)(1c)=1(a)(a)(b)(b)xbbc+ac=ycb+a+ac=1a2b2x=bbc+aca2b2, and y=abc+aca2b2


Q7 Solve the following pair of linear equations: (iii) xayb=0ax+by=a2+b2

Answer:

Given equation,

xayb=0bxay=0ax+by=a2+b2


Now By Cross multiplication method,

xb1c2b2c1=yc1a2c2a1=1a1b2a2b1x(a)(a2b2)(b)(0)=y(0)(a)(b)(a2b2)=1(b)(b)(a)(a)xa(a2+b2)=yb(a2+b2)=1a2+b2x=a, and y=b

Q7 Solve the following pair of linear equations: (iv) (ab)x+(a+b)y=a22abb2(a+b)(x+y)=a2+b2

Answer:

Given,

(ab)x+(a+b)y=a22abb2


And

(a+b)(x+y)=a2+b2(a+b)x+(a+b)y=a2+b2


Now, Subtracting (1) from (2), we get

(a+b)x(ab)x=a2+b2a2+2ab+b2(a+ba+b)x=2b2+2ab2bx=2b(b+2a)x=(a+b)


Substituting this in (1), we get,

(ab)(a+b)+(a+b)y=a22abb2a2b2+(a+b)y=a22abb2

(a+b)y=2aby=2aba+b


Hence,

x=(a+b), and y=2aba+b

Q7 Solve the following pair of linear equations: (v) 152x378y=74378x+152y=604

Answer:

Given Equations,

152x378y=74.378x+152y=604.


As we can see by adding and subtracting both equations we can make our equations simple to solve.
So,
Adding (1) and )2) we get,

226x226y=678x+y=3..(3)


Subtracting (2) from (1) we get,

530x530y=530xy=1..


Now, Adding (3) and (4) we get,

2x=4x=2

Putting this value in (3)

2+y=3y=1


Hence,

x=2 and y=1

Q8 ABCD is a cyclic quadrilateral (see Fig. 3.7). Find the angles of the cyclic quadrilateral.

Answer:

As we know that in a quadrilateral the sum of opposite angles is 180 degrees.

So, From Here,

4y+204x=1804y4x=160yx=40


Also,

3y57x+5=1803y7x=180.


Multiplying (1) by 3 we get,

3y3x=120

Now,

Subtracting, (2) from (3) we get,

4x=60x=15


Substituting this value in (1) we get,

y(15)=40y=4015y=25


Hence four angles of a quadrilateral are :

A=4y+20=4(25)+20=100+20=120B=3y5=3(25)5=755=700C=4x=4(15)=60D=7x+5=7(15)+5=105+5=110

Class 10 Maths Chapter 3 Topics

  • Solving a linear equation with two variables.

  • Representation of linear equation in a graph.

  • Solutions of linear equations using the graph.

  • Algebraic interpretation of linear equations.

  • Formation of linear equations using statements.

Pearson | PTE

Trusted by 3,500+ universities and colleges globally | Accepted for migration visa applications to AUS, CAN, New Zealand , and the UK

Also get the solutions exercise wise-

Key Features of NCERT Class 10 Maths Solutions Chapter 3

  • The questions and their answers given in Chapter 3 Class 10 Maths NCERT solutions are very interesting and important for board and competitive exams.
  • NCERT solutions for Maths chapter 3 Linear Equations in Two Variables Class 10 will help to boost preparation for all of the examinations.
  • Many real-life situations can be formulated using Mathematical equations given in this chapter 3 NCERT Class 10 Maths solutions.

  • For example, consider the statement "cost of 1 Kg Apple and 2Kg orange is 120 and the cost of 3 Kg Apple and 1 Kg orange is 210". The statement can be formulated using the Mathematical equation, for this consider the cost of Apple as x and that of orange as y. Then we can write two equations as x+2y=120 and 3x+y=210.

NCERT Books and NCERT Syllabus

NCERT Solutions for Class 10 Maths - Chapter Wise

NCERT Solutions of Class 10 - Subject Wise

NCERT Exemplar solutions - Subject wise

How to use NCERT Solutions for Class 10 Maths Chapter 3?

Follow the given tips to make the most of NCERT solutions Class 10 Maths Chapter 3 PDF download:

  • NCERT solutions Class 10 Maths Chapter 3 are the most important tool when you are appearing for board examinations. 90% paper of CBSE board examinations, directly come from the NCERT.

  • Now you have done the NCERT solutions for Class 10 Maths chapter 3 and learned the approach to solving questions in the step by step method.

  • After covering Linear Equations in Two Variables Class 10 solutions you should target the past year papers of CBSE board examinations. The previous year papers will cover the rest 10% part of the Class 10 board exams.

Frequently Asked Questions (FAQs)

1. What is a pair of linear equations in two variables Class 10 Maths?

In Class 10 Maths, a pair of linear equations in two variables is a set of two linear equations that contain two variables, typically represented by x and y. Linear equations are equations of the form ax + by = c, where a, b, and c are constants.

2. How can I obtain the solutions for Chapter 3 maths Class 10?

Students can find NCERT solutions for maths to class 10 linear equations in two variables above in this article. Our experts in simple and easy format develop these maths class 10 chapter 3 pair of linear equations in two variables class 10 solutions. These will be very helpful for students.

3. Is it necessary to work through all of the questions provided in the NCERT solutions for class 10 Chapter 3 maths?

It is very important to go through Class 10 maths linear equations in two variables questions as they are designed to help you understand the material and practice your problem-solving skills. Students can find ch 3 maths class 10 ncert solutions at careers360 official website. However, it is not necessarily required to work through class 10 chapter 3 maths solutions by every question in order to understand the concepts covered in the chapter.

4. What key concepts are covered in the NCERT solutions for Chapter 3 Class 10 Maths?

NCERT class chapter 3 pair of linear equations in two variables class 10 solutions

Contains the concepts of pairs of linear equations and solving them using methods like graphing method, substitution method, elimination method, Consistency and inconsistency of a pair of linear equations, and Dependent and independent linear equations. As  Class 10 linear equations in two variables questions are used to solve real-world problems.

5. What are the most crucial questions for ch3 maths class 10 linear equations in two variables?

In chapter 3 Pair of linear equations class 10 Exercise 3.1, Question 1 is important. All questions in Exercise 3.2 are important. In Exercise 3.3, Question 1 (parts iv, v, vi), Question 2, and Question 3 are important. Exercise 3.4's Question 2 is important, and Exercise 3.5's Questions 2 and 4 are important. All questions in Exercise 3.6 are important. All questions in the optional Exercise 3.7 are important. Students can download a pair of linear equations in two variables class 10 pdf.

Articles

Upcoming School Exams

View All School Exams

Explore Top Universities Across Globe

Questions related to CBSE Class 10th

Have a question related to CBSE Class 10th ?

Hello

Since you are a domicile of Karnataka and have studied under the Karnataka State Board for 11th and 12th , you are eligible for Karnataka State Quota for admission to various colleges in the state.

1. KCET (Karnataka Common Entrance Test): You must appear for the KCET exam, which is required for admission to undergraduate professional courses like engineering, medical, and other streams. Your exam score and rank will determine your eligibility for counseling.

2. Minority Income under 5 Lakh : If you are from a minority community and your family's income is below 5 lakh, you may be eligible for fee concessions or other benefits depending on the specific institution. Some colleges offer reservations or other advantages for students in this category.

3. Counseling and Seat Allocation:

After the KCET exam, you will need to participate in online counseling.

You need to select your preferred colleges and courses.

Seat allocation will be based on your rank , the availability of seats in your chosen colleges and your preferences.

4. Required Documents :

Domicile Certificate (proof that you are a resident of Karnataka).

Income Certificate (for minority category benefits).

Marksheets (11th and 12th from the Karnataka State Board).

KCET Admit Card and Scorecard.

This process will allow you to secure a seat based on your KCET performance and your category .

check link for more details

https://medicine.careers360.com/neet-college-predictor

Hope this helps you .

Hello Aspirant,  Hope your doing great,  your question was incomplete and regarding  what exam your asking.

Yes, scoring above 80% in ICSE Class 10 exams typically meets the requirements to get into the Commerce stream in Class 11th under the CBSE board . Admission criteria can vary between schools, so it is advisable to check the specific requirements of the intended CBSE school. Generally, a good academic record with a score above 80% in ICSE 10th result is considered strong for such transitions.

hello Zaid,

Yes, you can apply for 12th grade as a private candidate .You will need to follow the registration process and fulfill the eligibility criteria set by CBSE for private candidates.If you haven't given the 11th grade exam ,you would be able to appear for the 12th exam directly without having passed 11th grade. you will need to give certain tests in the school you are getting addmission to prove your eligibilty.

best of luck!

According to cbse norms candidates who have completed class 10th, class 11th, have a gap year or have failed class 12th can appear for admission in 12th class.for admission in cbse board you need to clear your 11th class first and you must have studied from CBSE board or any other recognized and equivalent board/school.

You are not eligible for cbse board but you can still do 12th from nios which allow candidates to take admission in 12th class as a private student without completing 11th.

View All

A block of mass 0.50 kg is moving with a speed of 2.00 ms-1 on a smooth surface. It strikes another mass of 1.00 kg and then they move together as a single body. The energy loss during the collision is

Option 1)

0.34\; J

Option 2)

0.16\; J

Option 3)

1.00\; J

Option 4)

0.67\; J

A person trying to lose weight by burning fat lifts a mass of 10 kg upto a height of 1 m 1000 times.  Assume that the potential energy lost each time he lowers the mass is dissipated.  How much fat will he use up considering the work done only when the weight is lifted up ?  Fat supplies 3.8×107 J of energy per kg which is converted to mechanical energy with a 20% efficiency rate.  Take g = 9.8 ms−2 :

Option 1)

2.45×10−3 kg

Option 2)

 6.45×10−3 kg

Option 3)

 9.89×10−3 kg

Option 4)

12.89×10−3 kg

 

An athlete in the olympic games covers a distance of 100 m in 10 s. His kinetic energy can be estimated to be in the range

Option 1)

2,000 \; J - 5,000\; J

Option 2)

200 \, \, J - 500 \, \, J

Option 3)

2\times 10^{5}J-3\times 10^{5}J

Option 4)

20,000 \, \, J - 50,000 \, \, J

A particle is projected at 600   to the horizontal with a kinetic energy K. The kinetic energy at the highest point

Option 1)

K/2\,

Option 2)

\; K\;

Option 3)

zero\;

Option 4)

K/4

In the reaction,

2Al_{(s)}+6HCL_{(aq)}\rightarrow 2Al^{3+}\, _{(aq)}+6Cl^{-}\, _{(aq)}+3H_{2(g)}

Option 1)

11.2\, L\, H_{2(g)}  at STP  is produced for every mole HCL_{(aq)}  consumed

Option 2)

6L\, HCl_{(aq)}  is consumed for ever 3L\, H_{2(g)}      produced

Option 3)

33.6 L\, H_{2(g)} is produced regardless of temperature and pressure for every mole Al that reacts

Option 4)

67.2\, L\, H_{2(g)} at STP is produced for every mole Al that reacts .

How many moles of magnesium phosphate, Mg_{3}(PO_{4})_{2} will contain 0.25 mole of oxygen atoms?

Option 1)

0.02

Option 2)

3.125 × 10-2

Option 3)

1.25 × 10-2

Option 4)

2.5 × 10-2

If we consider that 1/6, in place of 1/12, mass of carbon atom is taken to be the relative atomic mass unit, the mass of one mole of a substance will

Option 1)

decrease twice

Option 2)

increase two fold

Option 3)

remain unchanged

Option 4)

be a function of the molecular mass of the substance.

With increase of temperature, which of these changes?

Option 1)

Molality

Option 2)

Weight fraction of solute

Option 3)

Fraction of solute present in water

Option 4)

Mole fraction.

Number of atoms in 558.5 gram Fe (at. wt.of Fe = 55.85 g mol-1) is

Option 1)

twice that in 60 g carbon

Option 2)

6.023 × 1022

Option 3)

half that in 8 g He

Option 4)

558.5 × 6.023 × 1023

A pulley of radius 2 m is rotated about its axis by a force F = (20t - 5t2) newton (where t is measured in seconds) applied tangentially. If the moment of inertia of the pulley about its axis of rotation is 10 kg m2 , the number of rotations made by the pulley before its direction of motion if reversed, is

Option 1)

less than 3

Option 2)

more than 3 but less than 6

Option 3)

more than 6 but less than 9

Option 4)

more than 9

Back to top