Class 7 Exam  >  Class 7 Notes  >  Mathematics (Maths) Class 7  >  Practice Questions: Simple Equations

Class 7 Maths Chapter 4 Practice Question Answers - Simple Equations

Q1. Solve for x:  3x+9=33
(a) 8
(b) 3
(c) 2
(d) 5
Ans:
(a)
Sol: Given, 3x+9=33
Subract 9 on both side
⇒3x+9−9=33−9
⇒3x=24
On dividing throughout by 3, we get
⇒ x= 24/3
=8
Hence, required solution is x=8.


Q2. Solve the following equation: y+3=10
(a) 3
(b) 7
(c) 10
(d) 13
Ans: 
(b)
Sol: Given, y + 3 = 10
Subtracting 3 on both the sides, we get:
y + 3 − 3 = 10 − 3
⇒ y = 7
Hence, option B is correct.


Q3. If  t/5 =10, then t is equal to
(a) 25
(b) 10
(c) 50
(d) 100
Ans: 
(c)
Sol: Given, t/5 =10
To eliminate 5 from the denominator, we multiply both sides by 5
So, 5 x t/5 = 10 x 5
⇒ t = 50


Q4. If 2x/3 = 18, then x is equal to
(a) 36
(b) 54
(c) 32
(d) 27
Ans:
(d)
Sol: Given, 2x/3 = 18
Multiply 3 on both the sides, we get
2x = 18 × 3
⇒ 2x = 54
Divide both side by 2
⇒ x = 27


Q5. Solve the following equation: x−2=7
(a) 7
(b) 2
(c) 9
(d) 11
Ans:
(c)
Sol: Given, x − 2 = 7
Add 2 on both the sides, we get
x − 2 + 2 = 7 + 2
⇒ x = 9
Hence, option C is correct.


Q6. If 6x=12, then x is
(a) 12
(b) 2
(c) 72
(d) 6
Ans:
(b)
Sol: Given, 6x=12
Dividing both sides by 6, we get:
6x/6 = 12/6
∴ x = 2
Hence, option B is correct.


Q7. The solution of the equation 7+3(x+5)=31 is
(a) 4
(b) 3
(c) 0
(d) 2
Ans:
(b)
Sol: Given, 7 + 3(x + 5) = 31
⇒ 7 + 3x + 15 = 31
⇒ 22 + 3x = 31
⇒ 3x = 31 − 22 = 9
⇒  x =  9/3
= 3.
Hence, required solution is x=3.


Q8. When 6 is subtracted from four times a number, the result is 54. What is the number?
(a) 60
(b) 30
(c) 15
(d) 10
Ans:
(c)
Sol: Let the number be x.
Then, 4x − 6 = 54
Add 6 on both side
⇒ 4x − 6 + 6 = 54 + 6
⇒ 4x = 60
Divide throughout by 4
⇒ x = 60/4
= 15
Hence, the required number is 15.


Q9. Solve the following equation: 6=z+2
(a) 4
(b) 2
(c) 6
(d) 8
Ans: 
(a)
Sol: Given, 6 = z + 2
Subtract 2 on both the sides,
6 − 2 = z + 2 − 2
⇒ z = 4
Hence, option A is correct.


Q10. If 7x−9=16, then x is equal to:
(a) x = 16/2
(b) x = 7/7
(c) x = 25/7
(d) x = 2/16
Ans:
(c)
Sol: Given, 7x − 9 = 16
Add 9 on both the sides, we get
7x − 9 + 9 = 16 + 9
∴ 7x = 25
Divide 7 on both the sides,
∴  x = 25/7
Therefore, C is the correct answer.


Q11. Find the value of x:  x−7=−8
(a) 1
(b) −1
(c) 0
(d) None of the above
Ans: (b)
Sol: x − 7 = −8
Add 7 to both sides,
⇒ x − 7 + 7 = −8 + 7
⇒ x= −8 + 7
⇒ x = −1
Hence, answer is option B. 


Q12. Solve the following equations:
3(y – 2) = 2(y – 1) – 3
Sol:

3(y – 2) = 2(y – 1) – 3
⇒ 3y – 6 = 2y – 2 – 3 (Removing the brackets)
⇒ 3y – 6 = 2y – 5
⇒ 3y – 2y = 6 – 5 (Transposing 6 to RHS and 2y to LHS)
⇒ y = 1
Thus y = 1

Q13. The length of a rectangle is twice its breadth. If its perimeter is 60 cm, find the length and the breadth of the rectangle.
Sol:
Let the breadth of the rectangle be x cm.
its length = 2x
Perimeter = 2 (length + breadth) = 2(2x + x) = 2 × 3x = 6x
As per the condition of the question, we have
6x = 60 ⇒ x = 10
Thus the required breadth = 10 cm
and the length = 10 × 2 = 20 cm.

Q14. Frame the statement into an equation: Adding 16 to 3 times x is 39.
(a) 3x − 16 = 39
(b) 3x + 16 = −39
(c) −3x + 16 = 39
(d) 3x + 16 = 39
Ans:
(d)
Sol: 3 × x = 3x
As per the given condition,
Adding 16 to 3x results in 16 + 3x = 39
So, option D is correct.


Q15. The method of finding solution by trying out various values for the variable is called
(a) Error method
(b) Trial and error method
(c) Testing method
(d) Checking method
Ans:
(b)
Sol: The required method is called "Trial and error method"


Q16. Sunita's mother is 36 years old. She is 3 years older than 3  times sunita's age. What is sunita's age?
(a) 6
(b) 7
(c) 8
(d) 11
Ans: 
(d)
Sol: We do not know sunita’s age.
Let us take it to be y years. .
Sunita’s mother’s age is 3years older than 3y;
It is also given that Sunita’s mother is 36 years old.
Therefore, 3y + 3 = 36
Subract 3 from both side
3y + 3 − 3 = 36 − 3
3y = 33
Divide both side by 3
y = 11


Q17. Convert the statement into an equation : Adding 14 to 9 times y is 89.
(a) 14y + 9 = 89
(b) 14 + 9y = 89
(c) 14 − 9y = −89
(d) 14 + y = 89
Ans:
(b)
Sol: According to the question,
9 times y means 9 × y = 9y.
Adding 14 to it means  9y + 14.
∴ the equation is 9y + 14=89.


Q18. Algebraic expression for the statement: 6 times a taken away from 40
(a) 6a − 40
(b) 40a − 6
(c) 40 − 6a
(d) 0
Ans: 
(c)
Sol: Given, 6 times a takes away from 40.
Required algebraic equation is given by,
40 − 6 × a = 40 − 6a


Q19. Frame the statement "Twice a number decreased by 119 equals 373" into an equation.
(a) 2y + 119 = 373
(b) 3y − 119 = 373
(c) 2y − 119 = 373
(d) None of the above.
Ans:
(c)
Sol: Let y be the number.
According to the question,
Twice a number y, decreased by 119 means
2y − 119 = 373.
So, option C is correct.


Q20. Frame the given statement into a mathematical expression: "Thrice of a number increased by 150."
(a) 150 − x
(b) 3x − 150
(c) 3x + 150
(d) None of these
Ans:
(c)
Sol: Let x be the required number.
∴ thrice of a number shall be 3 × x = 3x.
According to the question, if it is increased by 150,
The number would be (3x + 150).


Q21. What is an equation?
(a) A statement in which the values of two mathematical expressions are equal.
(b) An expression that computes the values of variables.
(c) A mathematical expression.
(d) None of these
Ans:
(a)
Sol: An equation is a mathematical statement which represents two things are equal. It consists of two expressions, one on either side of equal to symbol. In other words, an equation is a statement in which the values of two mathematical expressions are equal.


Q22. If the average of 3,4, and x is 2, then find x.
(a) −15
(b) −1
(c) −8
(d) −6
Ans:
(b)
Sol: Given: The average of 3,4 and x is 2
we have to find x
⇒ 3 + 4 + x /3 = 2
⇒ 7 + x = 6
⇒ x = −1
x is −1
Hence, the answer is option B.


Q23. The value of x in the equation 5x−35=0 is:
(a) 2
(b) 7
(c) 8
(d) 11
Ans: 
(b)
Sol: Given, 5x − 35 = 0
Transpose 35 to R.H.S.,
5x = 35
Divide throughout by 5
5x/5 = 35/5
⇒ x = 7


Q24. 12 times a number is 4 less than the 5 times the number. Write an equation representing the statement given.
(a) 12x − 4 = 5x
(b) 12x + 4 = 5x
(c) 12 + 4x = 5
(d) 12 − 4x = 5
Ans:
(B)
Sol: Let the number be x
⇒ 12 × x = 5 × x − 4
⇒ 12x + 4 = 5x


Q25. Three times the number is 300. Convert this statement in mathematical form.
(a) 3x = 100
(b) 3+x = 300
(c) 3 = 300 + x
(d) 3x = 300
Ans:
(d)
Sol: 3 times the number is 300.
⇒ Let the number = x
⇒ 3 times the number = 3x
⇒ This is equal to 3x = 300.
Hence, the answer is 3x = 300.


Q26. If the mean of 6, 8, 5, x and 4 is 7, then the value of x is ______.
(a) 11
(b) 12
(c) 13
(d) 14
Ans:
(b)
Sol: Given, mean =7 and data is 6,8,5,x,4
Therefore, 6 + 8 + 5 + x + 4 / 5 = 7
⇒  x + 23 = 35
⇒  x = 12


Q27. Which of the sign should always be there in an equation?
(a) =
(b) ≠
(c) >
(d) <
Ans:
(a)
Sol: An equation is a mathematical statement that two things are equal. It consists of two expressions, one on each side of an 'equals' sign. For example x=y is an equation where two expressions x and y are equal.
Hence, = sign should always be there in an equation.


Q28. 12, a ,6, 8, 2, 14 The average (arithmetic mean) of the numbers listed above is 6. Calculate the value of a.
(a) −36
(b) −6
(c) 0
(d) 6
Ans:
(b)
Sol: We know that  average of a bunch of numbers is the sum of the numbers divided by how many numbers in the bunch. We can set up an equation for the average from the given question,
⇒ 12 + a + 6 + 8 + 2 + 14 / 6  = 6
⇒ 42 + a / 6 = 6
⇒ 42 + a = 6
⇒ a = -6

The document Class 7 Maths Chapter 4 Practice Question Answers - Simple Equations is a part of the Class 7 Course Mathematics (Maths) Class 7.
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FAQs on Class 7 Maths Chapter 4 Practice Question Answers - Simple Equations

1. What is a simple equation in mathematics?
Ans.A simple equation is an equation that contains one variable and can be solved to find the value of that variable. It typically takes the form of "ax + b = c," where "a," "b," and "c" are constants.
2. How do you solve a simple equation step by step?
Ans.To solve a simple equation, follow these steps: 1. Isolate the variable on one side by performing inverse operations (like addition or subtraction). 2. Simplify both sides of the equation if necessary. 3. Check your solution by substituting the value back into the original equation.
3. Can you give an example of a simple equation and how to solve it?
Ans.An example of a simple equation is 2x + 3 = 11. To solve it: 1. Subtract 3 from both sides: 2x = 8. 2. Divide both sides by 2: x = 4. Thus, the solution is x = 4.
4. What are some common mistakes to avoid when solving simple equations?
Ans.Common mistakes include: 1. Forgetting to perform the same operation on both sides of the equation. 2. Misplacing negative signs. 3. Failing to simplify the equation correctly. Being careful with these points can help avoid errors.
5. How can I practice solving simple equations effectively?
Ans.To practice effectively, you can: 1. Work through textbook exercises. 2. Use online resources and quizzes. 3. Create your own equations and try to solve them. 4. Join study groups to discuss problems and solutions with peers.
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