Linear Equations In Two Variables

5x + 3y = 9 ……. (i)

2x + 3y = 12 ……… (ii)

Let’s add equations (I) and (II).

Hence, x = -1 and y = 14/3 is the solution of the equation.

Change the sign of Eq. (II)

Substituting a = 2 in Eq. (II)

∴ solution is (a, b) = (2, 4)

Multiply Eq. I by 2 and Eq. II by 7

x=3

Substituting x= 3 in Eq. I

7y=7

y=1

∴ Solution is (x , y) = (3, 1)

Change the sign of Eq. (II)

Substituting y = 1 in Eq. (II)

2x = 13 - 1
2x = 12
x = 6

∴ solution is (x, y) = (1,6)

Multiply Eq. II by 5

equating (I) and (III), change the sign of Eq. (III)

⇒

⇒

⇒ n = 2

Substituting n = 2 in Eq 1
⇒ 5m - 3(2) = 19
⇒ 5m - 6 = 19
⇒ 5m = 25
⇒ m = 5

∴ Solution is (m , n) = (5, 2)

Multiply Eq. I by 5 and Eq. II by 2

Change sign of Eq.(IV)

Subsituting x=–1in Eq.II

∴ solution is (x, y) = (–1, 1)

⇒ ⇒

⇒ ⇒

Multiplying Eq. II by 3

Equating Eq. I and III, change the signs of Eq. III

Substituting x = 1 in Eq. I

∴ solution is (x,y) = (1, 3)

Adding both the Equations

Dividing both sides by 200

…(III)

Subtract equation (I) and (II)

Divide both sides by (–2)

…(IV)

Equating Eq. (III) and (IV)

Substituting x=3 in Eq. III

∴ solution is (x, y) = (3, 2)

Adding both the Equations

Dividing both sides by 106

…(III)

Subtract equation (I) and (II)

Divide both sides by (–8)

…(IV)

Equating Eq. (III) and (IV)

Substituting x=7 in Eq. IV

∴ solution is (x, y) = (7,3)

(1). In Equation

i. Put value x=3 in Eq. I we get, ⇒

ii. Put value y=5 in Eq. I we get, ⇒

iii. Put value y=3 in Eq. I we get, ⇒

(2). In Equation

i. Put value y=0 in Eq. II we get,⇒

ii. Put value x=–1 in Eq. I we get,

iii. Put value y=–4 in Eq. I we get, ⇒

Eq. I =

Eq. II =

Calculating intersecting point

Putting x= 5 in Eq.I

5+ y = 6

Eq. I =

Eq. II =

Calculating intersecting point

Putting x= 4 in Eq.I

4+ y = 5

Intersection Point (4,1)

Eq. I =

Eq. II =

Calculating intersecting point

Putting x= 3 in Eq.I

3+ y = 0

Intersection point (3,–3)

Eq. I =

Eq. II =

Calculating intersecting point

Putting x= –1 in Eq.I

3× –1 – y = 2

Intersection point (–1,–5)

Eq. I =

Eq. II =

Plotting both the graphs we get,

Calculating intersecting point

Putting x= –1 in Eq.I

3× –1 – y = 2

Intersection point (–1,–5)

we know, determinant of a 2 × 2 matrix

is (ad - bc)

(1) (–1× 4) – (7 × 2) = –4 – 14 = –18

(2) (5× 0)– (3× –7)= 0 –(–21) = 21

(3) =

D= = =

= = = 50

= = = –25

= = 2

∴ (x,y) = (2, –1) is the solution

D = = = 20–18 =2

= = 20–24 =–4

= = 32–24 = 8

∴(x,y)= (–2, 4) is the solution.

D = = –3–4 = –7

= = 3–24= –21

= =12+2 = 14

∴ (x,y) = (3, –2) is solution.

= –18 + 32 = 14

∴ (x,y) = (2, 6) is solution.

= 8–18 =10

∴ (x,y) = (6, 5) is solution.

⇒

= –2–6 = –8

∴ (x,y) = is solution.

Let = m and = n

Multiply Eq. I by 4

Equating Eq. II and III. Change the signs of Eq. III

Substituting n=1 in Eq. II

∴ ⇒ ⇒

∴ ⇒ ⇒

Hence (x,y) = (

Let = m and = n

Multiply Eq. I by 5 and Eq.II by 2

Substituting in Eq. I

∴ ⇒ ⇒ ….(III)

∴ ⇒ ⇒ ….(IV)

Now, equating Eq. III and IV

Subsituting value of x=3 in Eq. III

Hence (x,y) = (

Let = m and = n

Adding both equations

Dividing both sides by 58

…(III)

Subtracting Eq. I and II

Dividing both sides by 4

…(IV)

Equating Eq. III and IV

Subsituting n=1 in Eq. III

∴ ⇒ ⇒ ⇒ ⇒

⇒ ⇒

∴ ⇒ ⇒ ⇒ ⇒

Hence (x,y) = (

Let = m and = n

⇒

⇒

Multiply Eq. I by 2

.... (a)

..... (b)

Substituting in Eq. II

⇒ 4 - 8n = 2

⇒ - 8n = 2 - 4

⇒ - 8n = -2

⇒

⇒

∴

⇒

⇒ 2 = 2 (3x+y)

⇒ 2 = 6x + 2y ...... III

∴

⇒

⇒ 4 = 2(3x - y)

⇒ 4 = 6x - 2y ….IV

Add Eq. III and IV

Substituting

⇒ 3 + 2y = 2

⇒ 2y = 2 - 3

⇒ 2y = -1

Hence (x,y) = (

Let the greater no. be x and smaller no. be x–3

As per given situation,

2(x–3) + 3(x) = 19

⇒

⇒

⇒

⇒

⇒

∴ smaller no is x–3 ⇒

Hence, The numbers are 5 and 2.

Length of rectangle ⇒

⇒

⇒

⇒ ……(I)

Breadth of the rectangle =

⇒ ……(II)

Equating Eq. I and II and change sign of Eq. II

Substituting y=8 in Eq.I

Length =

Breadth =

Area = Length × breadth = 40× 16 = 640 sq. unit

Perimeter = 2(Length + Breadth) = 2(40+16) = 2(56) =112 unit.

Suppose father’s age(in years) be x and that son’s age be y.

Then,

…(I)

…(II)

Multiply Eq.I by 2 and equate

Substituting y=15 in Eq.II

∴ Son’s age is 15 years, father’s age is 40 years.

Let the numerator and denominator of the fraction be x and y respectively.

Fraction =

Given,

Denominator = 2(Numerator) + 4

⇒

⇒ 2x-y=(-4) …I

According to the given condition, we have

⇒

⇒ …II

Equating Eq. I and II,

Putting x = 7 in equation I, we get

⇒

⇒

⇒

⇒

Hence, required fraction =

A – 30kg, B – 55k

Let the weight of box ‘A’ = x kg

Let the Weight of box’B’ = y kg

According to question,

150 boxes of type A and 100 boxes of type B are loaded in the truck and it weighs 10tons.

∴ [∵ 1ton = 1000kg]

⇒

260 boxes of type A are loaded in the truck, it can still accommodate 40 boxes of type B, still it weighs 10tons

∴ [∵ 1ton = 1000kg]

⇒ ……(II)

Solving Equation I and II

Putting x=30 in Eq. I

Hence, A – 30kg, B – 55kg

Let the distance travelled by bus = x

Time taken travelling by bus =

Let the distance traveled by plane = y

Distance traveled by plane = (1900–x)

Time travelling by plane =

Total time = 5 hours

⇒ 32x + 5700 = 10500
⇒ 32x = 4800
⇒ x = 150 km

and y = 1900 - x
= 1900 - 150 = 1750 km

Vishal travels 150km by bus and 1750 km by plane.

Put x= 1 in Eq.

⇒

⇒

⇒

Hence, option B is correct.

Hence option A is correct.

= =

Hence, option D is correct.

=

Hence, Option C is correct.

Given: ax + by = c and mx + ny = d
Then,

Now, we know that when the ratio of coefficients is not equal.
Equations will have unique solution.

Hence, A is the correct answer.

Put x= –5, then ⇒

Put y = 0, then

For equation 1, let's find the points for graph

3x - y - 2 = 0
At x = 0
3(0) - y - 2 = 0
⇒ y = -2

At x = 1
3(1) - y - 2 = 0
⇒ y = 1

At x = 2
3(2) - y - 2 = 0
⇒ 6 - y - 2 = 0
⇒ y =4

Hence, points for graph are (0, -1) (1, 1) and (2, 4)

For equation 2
2x+ y = 8

at x = 0
y =8

at x = 1
2(1) + y = 8
⇒ y = 6

at x =4
2(4) + y = 8
⇒ y = 0

Hence, points for graph are (0, 8) (1, 6) and (4, 0)

3x+y=10

x-y=2

Solving Both equations

(1) =

(2) D =

(3)

∴ (x , y) =

∴ (x , y) =

∴ (x , y) = (1/2, -1/2)

∴ (x , y) =

Let,

⇒ 3x + 3y – 24 = 2x + 4y – 28

⇒ x – y = –4 …(1)

Also,

Let

⇒ 4x + 8y – 56 = 9x – 3y

⇒ 5x –11y = – 56 …(2)

Hence the two equations are:

x – y = –4 …(1)

5x – 11y = – 56 …(2)

Now,

⇒ D = (–11 -(- 5)) = -6

Also,

D_x = 44 - 56 = -12

And,

⇒ D_y = –56 + 20 = – 36

Now,

And,

Hence, (2, 6) is the solution

Let

Multiply Eq. II by 2

Subtract Eq.III from Eq. I

Substitute m=1/6 in Eq. I

∴

∴

Hence,

Let

Adding Eq. I and II

Subtract Eq. I and II

Equating Eq. III and IV

Substituting n=1 in Eq. III

∴

⇒

∴

Hence,

Adding Eq. I and II

…(III)

Subtracting Eq. I and II

…(IV)

Equating I and II

Substituting x=1 in Eq. I

Hence,

Let

Multiply Eq. 1 by 7 and Eq.II by 2

Substituting value in Eq.VI

∴

∴

Hence,

Let

…(I)

… (II)

Equating Eq. I and II

Substituting in Eq. I

∴

∴

Multiply Eq. III by 3 and Eq. IV by 4 and Equate

Substituting x=2 in Eq. V

Hence,

Let the digit in unit’s place is x

and that in the ten’s place is y

∴ the number = 10y+ x

The number obtained by interchanging the digits is

According to first condition two digit number + the number obtained by interchanging the digits = 143

∴

∴

∴

From the second condition,

digit in unit’s place = digit in the ten’s place + 3

∴

∴ ….. (II)

Adding equations (I) and (II)

Putting this value of x in equation (I)

x + y = 13

∴

The original number is 10

⇒ 50+8

⇒ 58

Let x be the cost of tea and y be the cost of sugar

As she paid ₹50 as return fare

∴

According to second situation,

Multiplying Eq. I by 2 and Eq. II by 3

…..(III)

Subtracting Eq. III from IV

Substituting y=40 in Eq. I

3x=900

Tea; ₹ 300 per kg.

Sugar ; ₹ 40 per kg.

According to 1^st situation ,

According to 2^nd situation,

Adding I and II,

…III

Subtracting I from II

….IV

Equating Eq. III with Eq. IV

Substituting x=10 in Eq. III

₹100 notes = 10

₹50 notes = 20

Let Manish’s present age be x

Let Savita’s present age be y

According to 1^st situation,

According to second situation,

Subtracting Eq. II from I

Substitute y=8 in eq. I

Manisha's age 23 years

Savita's age 8 years.

Ratio of skilled and unskilled worker’s salary = 5:3

Let it be 5x and 3x

Total of one day’s salary = ₹720

So,

Skilled worker's wages = = ₹450.

unskilled worker's wages = ₹270

Let the speed of Joseph = x km/h

Let the speed of Hamid be = y km/h

When approaching each other, combined speed =

Time taken to meet =

∴

When moving away from each other, combined speed =

Time taken for Hamid to catch up =

∴

Equating I and II,

Substituting x=50in eq. I

Hamid's speed 50 km/hr.

Joseph's speed 40 km/hr.