Class 7 Exam  >  Class 7 Notes  >  Mathematics (Maths) Class 7  >  Practice Questions: Algebraic Expressions

Class 7 Maths Chapter 10 Practice Question Answers - Algebraic Expressions

Q1. Which of the following is an algebraic expression?
(a) 2 + 3
(b) 4 - x
(c) 5 × 6
(d) √9
Ans:
 (b)

Sol: An algebraic expression contains variables, and "4 - x" has the variable 'x.'


Q2. Simplify: 2x + 3x - (4 + x)
(a) 4x - 4
(b) 5x - 2
(c) 2x + 4
(d) 6x - 4
Ans:
 (a)

Sol: 2x + 3x - (4 + x)           
=5x-4-x. (Distributed the negative sign over parentheses and added the like signs )
= 4x - 4


Q3. Which of the following is equivalent to "2a - 5b + 3a"?
(a) 5ab
(b) 5a - 2b
(c) 5a2 - 5b2
(d) 5a - 5b
Ans
: (d)

Sol: Combine the 'a' terms and the 'b' terms separately: 2a + 3a = 5a, and -5b remains unchanged.
so answer would be 5a-5b

Q4. The algebraic expression for "twice a number increased by 5" is:
(a) 2x + 5
(b) 2x - 5
(c) 5x + 2
(d) x + 2
Ans:
 (a)

Sol: The expression "twice a number" is 2x, and "increased by 5" means + 5.

Q5. Simplify: 4(2x + 3) + 2(x - 1)
(a) 10x + 10
(b) 10x - 5
(c) 6x + 2
(d) 8x + 5
Ans:
(a)

Sol: 4(2x + 3) + 2(x - 1) 
= 8x + 12 + 2x - 2. 
= 10x + 10.

Q6. The algebraic expression for "one-third of a number" is:
(a) x + 3
(b) x/3
(c) 3x
(d) x - 3
Ans:
(b)

Sol: "One-third of a number" is 1/3 multiplied by x = x/3.

Q7. Simplify: 5a - (2b - 3a)
(a) 8a - 2b
(b) 8a + 3b
(c) 3a + 2b
(d) 8a - 3b
Ans:
 (a)

Sol: Distribute the negative sign inside the parentheses:
5a - (2b - 3a)
= 5a - 2b + 3a
= 8a - 2b.

Q8. The algebraic expression for "the sum of twice x and three times y" is
(a) 2x - 3y
(b) 2x + 3y
(c) 2xy
(d) 2x + y
Ans:
(b)

Sol: "Twice x" is 2x, and "three times y" is 3y. The sum is 2x + 3y. 

therefore, the algebric equation becomes 2x + 3y

Q9. Simplify: 3(x + 2) - 2(2x - 1)
(a) x + 8
(b) 3x + 2
(c) -x+8
(d) 5x + 1
Ans:
 (c)

Sol: 3(x + 2) - 2(2x - 1)   [Distribute the negative sign inside the parentheses]

= 3x + 6 - 4x + 2 

= -x + 8

Q10. The algebraic expression for "one more than the product of x and y" is:
(a) x + y
(b) xy
(c) xy + 1
(d) x - y
Ans:
 (c)

Sol: "Product of x and y" is xy, and "one more than" means + 1.
therefore, the algebric equation becomes  xy + 1

Q11. Simplify: 4x + 3y - 2x + 5y
(a) 6x + 2y
(b) 2x + 8y
(c) 2x - 2y
(d) 2x + 8y
Ans:
 (d)

Sol: Combine the 'x' terms and the 'y' terms separately:
4x - 2x = 2x, and 3y + 5y = 8y.
therefore, the algebric equation becomes 2x + 8y

Q12. The algebraic expression for "five times a number decreased by 7" is:
(a) 5x - 7
(b) 7x - 5
(c) 5x + 7
(d) 7 - 5x
Ans:
(a)

Sol: "Five times a number" is 5x, and "decreased by 7" means - 7.
therefore, the algebric equation becomes 5x - 7

Q13. Simplify: 3(2x + 4) - 2(3x - 5)
(a) -x + 6
(b) 3x + 2
(c) 22
(d) x + 8
Ans:
 (c)

Sol: 3(2x + 4) - 2(3x - 5)
= 6x + 12 - 6x + 10
=  22.

Q14. The algebraic expression for "one less than the double of a number" is:
(a) 2x - 1
(b) 2x + 1
(c) x - 2
(d) x + 2
Ans:
 (a)

Sol: "Double of a number" is 2x, and "one less than" means - 1.
therefore, the algebric equation becomes 2x - 1.

Q15. Simplify: 2(a - 3b) + 3(2b - a)
(a) 2a + 6b
(b) 3a + 2b
(c) -a
(d) 4b - a
Ans:
 (c)

Sol: 2(a - 3b) + 3(2b - a) 
= 2a - 6b + 6b - 3a
 = -a

Q16. The algebraic expression for "three less than twice a number" is:
(a) 2x - 3
(b) 3 - 2x
(c) 2x + 3
(d) 3x - 2
Ans:
(a)

Sol: "Twice a number" is 2x, and "three less than" means - 3.
therefore, the algebric equation becomes 2x - 3

Q17. Simplify: 5(3x - 2) - 2(4 - x)
(a) 13x - 2
(b) 17x -18
(c) 15x - 8
(d) 13x + 8
Ans:
(b)

Sol: 5(3x - 2) - 2(4 - x) 
= 15x - 10 - 8 + 2x 
= 17x - 18.

Q18. The algebraic expression for "half of the sum of a number and 8" is:
(a) x + 8
(b) 
(x + 8)/2
(c) 2x + 8
(d) (x - 8)/2
Ans:
(b)

Sol: "Sum of a number and 8" is x + 8, and "half of" means divided by 2.
therefore, the algebric equation becomes (x + 8)/2

Q19. Simplify: 4(2x - 3) + 3(4x + 1)
(a) 20x + 3
(b) 8x - 9
(c)20x-9
(d) 16x - 8
Ans:
 (c)

Sol: 4(2x - 3) + 3(4x + 1) 
= 8x - 12 + 12x + 3 
= 20x - 9.

Q20. The algebraic expression for "the sum of thrice x and twice y" is:
(a) 5xy
(b) 
3x + 2y
(c) 3x - 2y
(d) 2xy + 3
Ans
: (b)

Sol: "Thrice x" is 3x, and "twice y" is 2y. The sum is 3x + 2y.
therefore, the algebric equation becomes 3x + 2y

Q21. Simplify: 2(x + 5) - (3x - 2)
(a) 5x + 4
(b) x + 8
(c) 5x - 8
(d) -x +12
Ans:
 (d)

Sol: 2(x + 5) - (3x - 2) 
= 2x + 10 - 3x + 2 
= -x + 12.

Q22. The algebraic expression for "four times the sum of x and y" is:
(a) 4xy
(b) 4(x + y)
(c) 4x + y
(d) 4x - y
Ans:
(b)

Sol: "Sum of x and y" is x + y, and "four times" means 4 multiplied by the sum.
therefore, the algebric equation becomes 4(x + y)

Q23. Simplify: 3(2x - 5) + 4(3x + 1)
(a) 18x - 11
(b) 11x + 1
(c) 9x - 1
(d) 5x + 11
Ans:
 (a)

Sol: 3(2x - 5) + 4(3x + 1)
= 6x - 15 + 12x + 4
= 18x - 11.

Q24. The algebraic expression for "five more than the double of a number" is:
(a) 2x - 5
(b) 2x + 5
(c) 5 - 2x
(d) 5x + 2
Ans:
 (b)

Sol: "Double of a number" is 2x, and "five more than" means + 5.
therefore, the algebric equation becomes 2x + 5

Q25. Simplify: 3(a + 2b) - 2(3a - 5b)
(a) -3a + 16b
(b) 5a + b
(c) 9a + 11b
(d) 11a + 2b
Ans:
(a)

Sol: 3(a + 2b) - 2(3a - 5b)
= 3a + 6b - 6a + 10b
= -3a + 16b.

Q26. The algebraic expression for "the difference between a number and 5" is:
(a) x - 5
(b) 5 -2 x
(c) 5x
(d) 5 + x
Ans: 
(a)

Sol: "The difference between a number and 5" is x - 5.
therefore, the algebric equation becomes  x - 5

Q27. Simplify: 4(2a - 3b) - 3(4a + b)
(a) -4a - 11b
(b) -4a -15b
(c) -4a + b
(d) 11a - 4b
Ans: 
(b)

Sol: 4(2a - 3b) - 3(4a + b)
= 8a - 12b - 12a - 3b
= -4a - 15b.

Q28. The algebraic expression for "half of the difference between x and y" is:
(a) x + y
(b) (x - y)/2
(c) 2xy
(d) x - y
Ans:
(b)

Sol: "Difference between x and y" is x - y, and "half of" means divided by 2.
therefore, the algebric equation becomes  (x - y)/2


Q29. Simplify: 3(2x + 4) + 2(3x - 1)
(a) 12x + 10
(b) 8x - 2
(c) 12x + 2
(d) 6x + 10
Ans:
 (a)

Sol: 3(2x + 4) + 2(3x - 1)
= 6x + 12 + 6x - 2
= 12x + 10.

Q30. The algebraic expression for "the sum of a number and its square" is:
(a) x + 1
(b) x - 1
(c) x2 +x
(d) 1 - x
Ans:
 (c)

Sol: "A number" is x, and "its square" is x2. The sum is x2 + x.
therefore, the algebric equation becomes x2 + x.

The document Class 7 Maths Chapter 10 Practice Question Answers - Algebraic Expressions is a part of the Class 7 Course Mathematics (Maths) Class 7.
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FAQs on Class 7 Maths Chapter 10 Practice Question Answers - Algebraic Expressions

1. What are algebraic expressions and how are they different from numerical expressions?
Ans.Algebraic expressions are mathematical phrases that include numbers, variables (letters that represent unknown values), and operation symbols (such as +, -, ×, ÷). They differ from numerical expressions, which only contain numbers and operation symbols without any variables. For example, \(3x + 5\) is an algebraic expression, while \(2 + 3\) is a numerical expression.
2. How do you simplify an algebraic expression?
Ans.To simplify an algebraic expression, you combine like terms (terms that have the same variable raised to the same power) and perform any arithmetic operations where possible. For instance, in the expression \(2x + 3x + 4\), you can combine \(2x\) and \(3x\) to get \(5x + 4\), which is the simplified form.
3. What are like terms in algebraic expressions?
Ans.Like terms are terms in an algebraic expression that have the same variable raised to the same power. For example, in the expression \(4x^2 + 3x^2 + 2y\), \(4x^2\) and \(3x^2\) are like terms because they both contain the variable \(x\) raised to the power of 2. They can be combined to simplify the expression to \(7x^2 + 2y\).
4. How do you evaluate an algebraic expression for a given value of the variable?
Ans.To evaluate an algebraic expression for a specific value of the variable, substitute the given value into the expression and then perform the arithmetic operations. For example, to evaluate \(2x + 3\) for \(x = 4\), substitute \(4\) for \(x\): \(2(4) + 3 = 8 + 3 = 11\).
5. What is the importance of understanding algebraic expressions in mathematics?
Ans.Understanding algebraic expressions is crucial in mathematics because they are the foundation for more complex concepts such as equations, inequalities, and functions. They help in modeling real-world situations, solving problems, and facilitating the understanding of relationships between quantities, making them essential for higher-level math and everyday applications.
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