Worksheet on Forming of Linear Equations in One Variable | Forming Linear Equations in One Variable Worksheet with Solutions

Worksheet on Forming of Linear Equations in One Variable come with numerous questions framed on the topic and gives you ample practice. Solve the Questions on Forming of Linear Equations in One Variable and improve your logical skills as well as speed while attempting the exams. Step by Step Solutions makes it clear for you to understand the topic. Download the free accessible Forming Linear Equations in One Variable Worksheet and resolve all your queries in no time.

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Forming Linear Equations in One Variable Worksheet

Example 1. One of the numbers is two times the other. The sum of these two numbers is 45. Form the equation to find the numbers using a linear equation in one variable?

Solution:

Let the number be x
The Other Number is 2 times the given number i.e. 2x
From the given condition, the sum of these two numbers is 40
We can write the equation x+2x=45
3x=45
x=45/3
x=15
The other number is 2x i.e. 2(15)=30


Example 2.
The perimeter of a rectangular swimming pool is 140 meters. Its length is 4 m more than twice its breadth. What are the length and breadth of the pool?

Solution:

Let the breadth of the rectangular swimming pool be x
Since length is 4m more than twice its breadth we can have length = 2x+4
Perimeter of a Rectangular Swimming Pool = 2(l+b)
140 =2(2x+4+x)
140=2(3x+4)
140=6x+8
140-8=6x
132=6x
x=132/6
x=22
Length l =2x+4
=2(22)+4
=44+4
=48
Thus, the breadth and length of the swimming pool are 22m and 48m respectively.


Example 3.
The sum of three consecutive odd numbers is 45. Find the numbers?

Solution:

Let the three odd consecutive numbers be x, x+1, x+2
As per the given condition sum of three consecutive odd numbers is 45
x+x+1+x+2=45
3x+3=45
3x=45-3
3x=42
x=42/3
x=14
x+1=14+1=15
x+2=14+2=16
Therefore, the three consecutive numbers are 14, 15, 16


Example 4.
A sum of Rs. 4500 is to be given in the form of 90 prizes. If the prize is of either Rs. 100 or Rs. 25, find the number of prizes of each type?

Solution:

Let us assume the type of 100Rs prizes be x
Since the total number of prizes is 90 the number of 25 Rs. prize is 90-x
As per the given data in the question
100*x+(90-x)=4500
100x+90-x=4500
99x+90=4500
99x=4500-90
99x=4410
x=4410/99
~44
Therefore 25Rs. Prizes are 90-44 = 46


Example 5.
A dealer sold a television set for Rs. 12,000 and earned a profit of 15%. Find the cost price of the television set?

Solution:

Selling Price of the Television = Rs. 12,000
Let us assume the cost price = x
Profit earned = 15%
Cost Price of the television set CP = (100  / ( 100 + percentage profit))*SP
=(100/(100+15)*12000
=(100/115)*12000
=Rs. 10434
Therefore, the dealer bought the television set for a cost price of Rs. 10434


Example 6.
Twenty years from now Rahul’s age will be 5 times his current age. What is his current age?

Solution:

Let us consider the current age of Rahul as x
Twenty Years from now his age would be x+20
As per the given condition in the question we have x+20=5x
20=5x-x
20=4x
20/4 =x
x=5
Therefore current age of Rahul is 5 Years.


Example 7.
Solve 2y -10 = 4

Solution:

Given Expression is 2y-10=4
Transfering constants to one side and variables to the other side we have 2y =4+10
2y=14
y=7


Example 8.
Rajesh is a cashier in a State bank. he has notes of denominations of Rs. 100, 50, and 20 respectively. The ratio of the number of these notes is 4:3:2 respectively. The total cash with Rajesh is 4,72,000. How many notes of each denomination does he have?

Solution:

Let us assume the numbers of notes be 4x, 3x, and 2x respectively based on the ratio of notes
100*4x+50*3x+20*2x =4,72,000
400x+150x+40x=4,72,000
590x=4,72,000
x=4,72,000/590
=800
No. of 100 Rs Notes Rajesh has = 4x
=4*800
=3200
No. of 50 Rs Notes Rajesh has = 3x
=3*800
=2400
No. of 20 Rs Notes Rajesh has = 2x
=2*800
=1600


Example 9.
Solve for 8x + 40 = 4x +100?

Solution:

Given Expression is 8x + 40 = 4x +100
Transferring the constant terms to one side and variables terms to another side we have
8x-4x=100-40
6x=60
x=10


Example 10.
Amar thinks of a number and subtracts 3/2 from it. She multiplies the result by 7. The final result is 4 times her original number. Find the number?

Solution:

Let the number be x
From the given statement we can infer 7(x-3/2)=4x
7x-21/2=4x
(14x-21)=2*4x
14x-8x=21
6x=21
x=21/6
Therefore, the number is 21/6


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