Class 7: Maths Chapter 1 solutions. Complete Class 7 Maths Chapter 1 Notes.
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RD Sharma Solutions for Class 7 Maths Chapter 1–Integers
RD Sharma 7th Maths Chapter 1, Class 7 Maths Chapter 1 solutions
Exercise 1.1 Page No: 1.5
1. Determine each of the following products:
(i) 12 × 7
(ii) (-15) × 8
(iii) (-25) × (-9)
(iv) 125 × (-8)
Solution:
(i) Given 12 × 7
Here we have to find the products of given numbers
12 ×7 = 84
Because the product of two integers of like signs is equal to the product of their absolute values.
(ii) Given (-15) × 8
Here we have to find the products of given numbers
(-15) ×8 = -120
Because the product of two integers of opposite signs is equal to the additive inverse of the product of their absolute values.
(iii) Given (-25) × (-9)
Here we have to find the products of given numbers
(-25) × (-9) = + (25 ×9) = +225
Because the product of two integers of opposite signs is equal to the additive inverse of the product of their absolute values.
(iv) Given 125 × (-8)
Here we have to find the products of given numbers
125 × (-8) = -1000
Because the product of two integers of opposite signs is equal to the additive inverse of the product of their absolute values.
2. Find each of the following products:
(i) 3 × (-8) × 5
(ii) 9 × (-3) × (-6)
(iii) (-2) × 36 × (-5)
(iv) (-2) × (-4) × (-6) × (-8)
Solution:
(i) Given 3 × (-8) ×5
Here we have to find the product of given number.
3 × (-8) × 5 = 3 × (-8 × 5)
=3 × -40 = -120
Since the product of two integers of opposite signs is equal to the additive inverse of the product of their absolute values.
(ii) Given 9 × (-3) × (-6)
Here we have to find the product of given number.
9 × (-3) × (-6) = 9 × (-3 × -6) [∵ the product of two integers of like signs is equal to
the product of their absolute values.]
=9 × +18 = +162
(iii) Given (-2) × 36 × (-5)
Here we have to find the product of given number.
(-2) × 36 × (-5) = (-2 × 36) × -5 [∵ the product of two integers of like signs is equal to
the product of their absolute values.]
=-72 × -5 = +360
(iv) Given (-2) × (-4) × (-6) × (-8)
Here we have to find the product of given number.
(-2) × (-4) × (-6) × (-8) = (-2 × -4) × (-6 × -8) [∵ the product of two integers of like signs is
equal to the product of their absolute values.]
=-8 × -48 = +384
3. Find the value of:
(i) 1487 × 327 + (-487) × 327
(ii) 28945 × 99 – (-28945)
Solution:
(i) Given 1487 × 327 + (-487) × 327
By using the rule of multiplication of integers, we have
1487 × 327 + (-487) × 327 = 486249 – 159249
Since the product of two integers of opposite signs is equal to the additive inverse of the product of their absolute values.
=327000
(ii) Given 28945 × 99 – (-28945)
By using the rule of multiplication of integers, we have
28945 × 99 – (-28945) = 2865555 + 28945
Since the product of two integers of like signs is equal to the product of their absolute values.
=2894500
4. Complete the following multiplication table:
Second number
First number | x | -4 | -3 | -2 | -1 | 0 | 1 | 2 | 3 | 4 |
-4 | ||||||||||
-3 | ||||||||||
-2 | ||||||||||
-1 | ||||||||||
0 | ||||||||||
1 | ||||||||||
2 | ||||||||||
3 | ||||||||||
4 |
Is the multiplication table symmetrical about the diagonal joining the upper left corner to the lower right corner?
Solution:
Second number
First number | x | -4 | -3 | -2 | -1 | 0 | 1 | 2 | 3 | 4 |
-4 | 16 | 12 | 8 | 4 | 0 | -4 | -8 | -12 | -16 | |
-3 | 12 | 9 | 6 | 3 | 0 | -3 | -6 | -9 | -12 | |
-2 | 8 | 6 | 4 | 2 | 0 | -2 | -4 | -6 | -8 | |
-1 | 4 | 3 | 2 | 1 | 0 | -1 | -2 | -3 | -4 | |
0 | 0 | 0 | 0 | 0 | 0 | 0 | 0 | 0 | 0 | |
1 | -4 | -3 | -2 | -1 | 0 | 1 | 2 | 3 | 4 | |
2 | -8 | -6 | -4 | -2 | 0 | 2 | 4 | 6 | 8 | |
3 | -12 | -9 | -6 | -3 | 0 | 3 | 6 | 9 | 12 | |
4 | -16 | -12 | -8 | -4 | 0 | 4 | 8 | 12 | 16 |
From the table it is clear that, the table is symmetrical about the diagonal joining the upper left corner to the lower right corner.
5. Determine the integer whose product with ‘-1’ is
(i) 58
(ii) 0
(iii) -225
Solution:
(i) Given 58
Here we have to find the integer which is multiplied by -1
We get, 58 × -1 = -58
Since the product of two integers of opposite signs is equal to the additive inverse of the product of their absolute values.
(ii) Given 0
Here we have to find the integer which is multiplied by -1
We get, 0 × -1 = 0 [because anything multiplied with 0 we get 0 as their result]
(iii) Given -225
Here we have to find the integer which is multiplied by -1
We get, -225 × -1 = 225
Since the product of two integers of like signs is equal to the product of their absolute values.
Exercise 1.2 Page No: 1.8
1. Divide:
(i) 102 by 17
(ii) -85 by 5
(iii) -161 by -23
(iv) 76 by -19
(v) 17654 by -17654
(vi) (-729) by (-27)
(vii) 21590 by -10
(viii) 0 by -135
Solution:
(i) Given 102 by 17
We can write given question as 102 ÷ 17
102 ÷ 17 = |102/17| = |102|/|17| [by applying the mod]
= 102/17 = 6
(ii) Given -85 by 5
We can write given question as -85 ÷ 5
-85 ÷ 5 = |-85/5| = |-85|/|5| [by applying the mod]
= -85/5 = -17
(iii) Given -161 by -23
We can write given question as -161 ÷ -23
-161 ÷ -23 = |-161/-23| = |-161|/|-23| [by applying the mod]
= 161/23 = 7
(iv) Given 76 by -19
We can write given question as 76 ÷ -19
76 ÷ -19 = |76/-19| = |76|/|-19| [by applying the mod]
= 76/-19 = -4
(v) Given 17654 by -17654
We can write given question as 17654 ÷ -17654
17654 ÷ -17654 = |17654/-17654| = |17654|/|-17654| [by applying the mod]
= 17654/-17654 = -1
(vi) Given (-729) by (-27)
We can write given question as (-729) ÷ (-27)
(-729) ÷ (-27) = |-729/-27| = |-729|/|-27| [by applying the mod]
= 729/27 = 27
(vii) Given 21590 by -10
We can write given question as 21590 ÷ -10
21590 ÷ -10 = |21590/-10| = |21590|/|-10| [by applying the mod]
= 21590/-10 = -2159
(viii) Given 0 by -135
We can write given question as 0 ÷ -135
0 ÷ -135 = 0 [because anything divided by 0 we get the result as 0]
Exercise 1.3 Page No: 1.9
Find the value of
1. 36 ÷ 6 + 3
Solution:
Given 36 ÷ 6 + 3
According to BODMAS rule we have to operate division first then we have to do addition
Therefore 36 ÷ 6 + 3 = 6 + 3 = 9
2. 24 + 15 ÷ 3
Solution:
Given 24 + 15 ÷ 3
According to BODMAS rule we have to operate division first then we have to do addition
Therefore 24 + 15 ÷ 3 = 24 + 5 = 29
3. 120 – 20 ÷ 4
Solution:
Given 120 – 20 ÷ 4
According to BODMAS rule we have to operate division first then we have to do subtraction
Therefore 120 – 20 ÷ 4 = 120 – 5 = 115
4. 32 – (3 × 5) + 4
Solution:
Given 32 – (3 × 5) + 4
According to BODMAS rule we have to operate in brackets first then move to addition and subtraction.
Therefore 32 – (3 × 5) + 4 = 32 – 15 + 4
= 32 – 11 = 21
5. 3 – (5 – 6 ÷ 3)
Solution:
Given 3 – (5 – 6 ÷ 3)
According to BODMAS rule we have to operate in brackets first then we have move to subtraction.
Therefore 3 – (5 – 6 ÷ 3) = 3 – (5 – 2)
= 3 –3 = 0
6. 21 – 12 ÷ 3 × 2
Solution:
Given 21 – 12 ÷ 3 × 2
According to BODMAS rule we have to perform division first then move to multiplication and subtraction.
Therefore, 21 – 12 ÷ 3 × 2 = 21 – 4 × 2
= 21 – 8 = 13
7. 16 + 8 ÷ 4 – 2 × 3
Solution:
Given 16 + 8 ÷ 4 – 2 × 3
According to BODMAS rule we have to perform division first followed by multiplication, addition and subtraction.
Therefore, 16 + 8 ÷ 4 – 2 × 3 = 16 + 2 – 2 × 3
= 16 + 2 – 6
= 18 -6
= 12
8. 28 – 5 × 6 + 2
Solution:
Given 28 – 5 × 6 + 2
According to BODMAS rule we have to perform multiplication first followed by addition and subtraction.
Therefore, 28 – 5 × 6 + 2 = 28 – 30 +2
= 28 – 28 = 0
9. (-20) × (-1) + (-28) ÷ 7
Solution:
Given (-20) × (-1) + (-28) ÷ 7
According to BODMAS rule we have to perform division first followed by multiplication, addition and subtraction.
Therefore, (-20) × (-1) + (-28) ÷ 7 = (-20) × (-1) – 4
= 20 – 4 = 16
10. (-2) + (-8) ÷ (-4)
Solution:
Given (-2) + (-8) ÷ (-4)
According to BODMAS rule we have to perform division first followed by addition and subtraction.
Therefore, (-2) + (-8) ÷ (-4) = (-2) + 2
=0
11. (-15) + 4 ÷ (5 – 3)
Solution:
Given (-15) + 4 ÷ (5 – 3)
According to BODMAS rule we have to perform division first followed by addition and subtraction.
Therefore, (-15) + 4 ÷ (5 – 3) = (-15) + 4 ÷ 2
= -15 + 2
= -13
12. (-40) × (-1) + (-28) ÷ 7
Solution:
Given (-40) × (-1) + (-28) ÷ 7
According to BODMAS rule we have to perform division first followed by multiplication, addition and subtraction.
(-40) × (-1) + (-28) ÷ 7 = (-40) × (-1) – 4
= 40 – 4
= 36
13. (-3) + (-8) ÷ (-4) -2 × (-2)
Solution:
Given (-3) + (-8) ÷ (-4) -2 × (-2)
According to BODMAS rule we have to perform division first followed by multiplication, addition and subtraction.
(-3) + (-8) ÷ (-4) -2 × (-2) = -3 + 2 -2 × (-2)
= -3 + 2 + 4
= 6 – 3
=3
14. (-3) × (-4) ÷ (-2) + (-1)
Solution:
Given (-3) × (-4) ÷ (-2) + (-1)
According to BODMAS rule we have to perform division first followed by multiplication, addition and subtraction.
(-3) × (-4) ÷ (-2) + (-1) = -3 × 2 -1
= – 6 – 1
= -7
Exercise 1.4 Page No: 1.12
Simplify each of the following:
1. 3 – (5 – 6 ÷ 3)
Solution:
Given 3 – (5 – 6 ÷ 3)
According to removal of bracket rule firstly remove inner most bracket
We get 3 – (5 – 6 ÷ 3) = 3 – (5 – 2)
= 3 – 3
= 0
2. -25 + 14 ÷ (5 – 3)
Solution:
Given -25 + 14 ÷ (5 – 3)
According to removal of bracket rule firstly remove inner most bracket
We get -25 + 14 ÷ (5 – 3) = -25 + 14 ÷ 2
= -25 + 7
= -18
Solution:
According to removal of bracket rule first we have to remove vinculum we get
= 25 – ½ {5 + 4 – (5 – 4)}
Now by removing the innermost bracket we get
= 25 – ½ {5 + 4 – 1}
By removing the parentheses we get
= 25 – ½ (8)
Now simplifying we get
= 25 – 4
= 21
Solution:
According to removal of bracket rule first we have to remove vinculum we get
= 27 – [38 – {46 – (15 – 11)}]
Now by removing inner most bracket we get
= 27 – [38 – {46 – 4}]
By removing the parentheses we get
= 27 – [38 – 42]
Now by removing braces we get
= 27 – (-4)
= 27 + 4
= 31
Solution:
By removing innermost bracket we get
= 36 – [18 – {14 – (11 ÷ 2 × 2)}]
= 36 – [18 – {14 – 11}]
Now by removing the parentheses we get
= 36 – [18 – 3]
Now remove the braces we get
= 36 – 15
= 21
6. 45 – [38 – {60 ÷ 3 – (6 – 9 ÷ 3) ÷ 3}]
Solution:
Given 45 – [38 – {60 ÷ 3 – (6 – 9 ÷ 3) ÷ 3}]
First remove the inner most brackets
= 45 – [38 – {20 – (6 – 3) ÷ 3}]
= 45 – [38 – {20 – 3 ÷ 3}]
Now remove the parentheses we get
= 45 – [38 – 19]
Now remove the braces we get
= 45 – 19
= 26
Solution:
Now first remove the vinculum we get
= 23 – [23 – {23 – (23 – 0)}]
Now remove the innermost bracket we get,
= 23 – [23 – {23 – 23}]
By removing the parentheses we get,
= 23 – [23 -0]
Now we have to remove the braces and on simplifying we get,
= 23 – 23
= 0
Solution:
First we have to remove the vinculum from the given equation we get,
= 2550 – [510 – {270 – (90 – 150)}]
We get,
= 2550 – [510 – {270 – (-60)}]
= 2550 – [510 – {270 + 60}]
Now remove the parentheses we get,
= 2550 – [510 – 330]
Now we have to remove braces
= 2550 – 180
= 2370
Solution:
First we have to remove vinculum from the given equation,
= 4 + 1/5 [{-10 × (25 – 10)} ÷ (-5)]
Now remove the innermost bracket, we get
= 4 + 1/5 [{-10 × 15} ÷ -5]
Now by removing the parentheses we get,
= 4 + 1/5 [-150 ÷ -5]
By removing the braces we get,
= 4 + 1/5 (30)
On simplifying we get,
= 4 + 6
= 10
Solution:
Now we have to remove innermost bracket
= 22 – ¼ {-5 – (- 48 ÷ – 16)}
After removing innermost bracket
= 22 – ¼ {-5 – 3}
Now remove the parentheses we get
= 22 – ¼ (-8)
On simplifying we get,
= 22 + 2
= 24
Solution:
First we have to remove vinculum from the given equation then we get,
= 63 – [(-3) {-2 – 5}] ÷ [3 {5 + 2}]
Now remove the parentheses from the above equation
= 63 – [(-3) (-7)] ÷ [3 (7)]
= 63 – [21] ÷ [21]
= 63 – 1
= 62
Solution:
First we have to remove the innermost brackets then we get,
= [29 – (-2) {6 – 4}] ÷ [3 × {5 + 6}]
Now remove the parentheses in the above equation,
= [29 + 2 (2)] ÷ [3 × 11]
Now remove all braces present in the above equation,
= 33 ÷ 33
= 1
13. Using brackets, write a mathematical expression for each of the following:
(i) Nine multiplied by the sum of two and five.
(ii) Twelve divided by the sum of one and three.
(iii) Twenty divided by the difference of seven and two.
(iv) Eight subtracted from the product of two and three.
(v) Forty divided by one more than the sum of nine and ten.
(vi) Two multiplied by one less than the difference of nineteen and six.
Solution:
(i) 9 (2 + 5)
(ii) 12 ÷ (1 + 3)
(iii) 20 ÷ (7 – 2)
(iv) 2 × 3 -8
(v) 40 ÷ [1 + (9 + 10)]
(vi) 2 × [(19 -6) -1]
RD Sharma Solutions for Class 7 Maths Chapter 1: Download PDF
RD Sharma Solutions for Class 7 Maths Chapter 1–Integers
Download PDF: RD Sharma Solutions for Class 7 Maths Chapter 1–Integers PDF
Chapterwise RD Sharma Solutions for Class 7 Maths :
- Chapter 1–Integers
- Chapter 2–Fractions
- Chapter 3–Decimals
- Chapter 4–Rational Numbers
- Chapter 5–Operations On Rational Numbers
- Chapter 6–Exponents
- Chapter 7–Algebraic Expressions
- Chapter 8–Linear Equations in One Variable
- Chapter 9–Ratio And Proportion
- Chapter 10–Unitary Method
- Chapter 11–Percentage
- Chapter 12–Profit And Loss
- Chapter 13–Simple Interest
- Chapter 14–Lines And Angles
- Chapter 15–Properties of Triangles
- Chapter 16–Congruence
- Chapter 17–Constructions
- Chapter 18–Symmetry
- Chapter 19–Visualising Solid Shapes
- Chapter 20–Mensuration – I (Perimeter and area of rectilinear figures)
- Chapter 21–Mensuration – II (Area of Circle)
- Chapter 22–Data Handling – I (Collection and Organisation of Data)
- Chapter 23–Data Handling – II Central Values
- Chapter 24–Data Handling – III (Constructions of Bar Graphs)
- Chapter 25–Data Handling – IV (Probability)
About RD Sharma
RD Sharma isn’t the kind of author you’d bump into at lit fests. But his bestselling books have helped many CBSE students lose their dread of maths. Sunday Times profiles the tutor turned internet star
He dreams of algorithms that would give most people nightmares. And, spends every waking hour thinking of ways to explain concepts like ‘series solution of linear differential equations’. Meet Dr Ravi Dutt Sharma — mathematics teacher and author of 25 reference books — whose name evokes as much awe as the subject he teaches. And though students have used his thick tomes for the last 31 years to ace the dreaded maths exam, it’s only recently that a spoof video turned the tutor into a YouTube star.
R D Sharma had a good laugh but said he shared little with his on-screen persona except for the love for maths. “I like to spend all my time thinking and writing about maths problems. I find it relaxing,” he says. When he is not writing books explaining mathematical concepts for classes 6 to 12 and engineering students, Sharma is busy dispensing his duty as vice-principal and head of department of science and humanities at Delhi government’s Guru Nanak Dev Institute of Technology.