Class 7 Exam  >  Class 7 Notes  >  Mathematics (Maths) Class 7  >  Long Question Answer: Integers

Class 7 Maths Chapter 1 Question Answers - Integers

Q1. Subtract the sum of −1032 and 878 from −34
Ans:
 
Step 1: Find the sum of −1032 and 878
(−1032+ 878) = −154
Step 2: Subtract the sum i.e., −154 from −34
-34 - (-154)
= -34 + 154
= 120


Q2. In a quiz, Team A scored −40, 10, 0 and Team B scored 10, 0, − 40 in three successive rounds. Which team scored more? Can we say that we can add integers in any order?
Ans:

Given: Scores of Team A =−40, 10, 0
Scores of Team B = 10, 0,− 40
To find: The total score of each team separately.
Sol: 
Total score of Team A = −40 + 10 + 0 = −30
Total score of Team B = 10 + 0 + (−40) = 10 + 0 − 40 = −30
We observe that the scores of both the teams are Equal in numbers. Yes. We can add integers in any order even though their order Is different from the above observation.


Q3. In a class test containing 10 questions, 5 marks are awarded for every correct answer and (−2) marks are awarded for every incorrect answer and zero for each question not attempted.
(i)  Ravi gets 4 correct and 6 incorrect answers. What is his score?
(ii)  Reenu gets 5 correct and 5 incorrect answers. What is her score?
(iii)  Heena gets 2 correct and 5 incorrect answers. What is her score?

Ans:
Given:
Total number of questions in a class test = 10
Marks awarded for every correct answer =+5
Marks awarded for every incorrect answer = (−2)
Marks awarded for questions not attempted = 0

Calculating total marks scored by Ravi in the class test:
Marks obtained by Ravi for 4 correct answers = 5 x 4 = 20
Marks obtained by Ravi for 6 incorrect answers = (-2) x  6 = -12
Total marks scored by Ravi = 4 correct answers + 6 incorrect answers
= 20  + (-12
= 20 - 12
= 8
Thus, the total marks scored by Ravi in the class test is 8 marks.
Calculating total marks scored by Reenu in the class test:
Marks obtained by Reenu for 5 correct answers = 5 x 5 = 25
Marks obtained by Reenu for 5 incorrect answers = (-2) x 5 = -10
Total marks scored by Reenu = 5 correct answers + 5 incorrect answers
= 25 + ( -10)
= 25 - 10
= 15
Thus, the total marks scored by Reenu in the class test is 15 marks.
Calculating total marks scored by Heena in the class test:
Marks obtained by Heena for 2 correct answers = 5 x 2 = 10
Marks obtained by Heena for 5 incorrect answers = (-2) x 5 = -10
Total marks scored by Heena = 2 correct answers + 5 incorrect answers
= 10 + (-10)
= 10 - 10
= 0
Thus, the total marks scored by Heena in the class test is 0 marks.

Q4. Simplify: (−16) x (-15) + (-16) x (-5)
Ans:

Applying the Distributive Law axb + bxc = ax(b + c) we get,
(-16) x (-15) + (-16) x (-5) = (-16) x (-15 + (-5))
= (-16)x(-15-5)
= (-16)x(-20)
= 320
So, the answer is 320

Q5. Solve 45 - [38 - {60 ÷ 3 — (6 — 9 ÷3) ÷3}]
Ans:

Here, we should apply the BODMAS Rule
45 - [38 - {60 ÷ 3 - (6 -9 ÷ 3)÷3}]
First, solve for the inner brackets
= 45 - [38 - (60 ÷3 — (6 — 3) ÷ 3} ]
= 45 - [38 - (60 ÷ 3 — (3) ÷ 3}]
= 45 -[38- (60 ÷ 3- (1)}]
Second, solve for the curly brackets
= 45 - [38 - {20 - 1}]
= 45 - [38 - 19]
Third, solve for the square brackets
= 45 - 19
= 26
Thus, the solution is 26

Q6. Verify that a + {b + c) ≠ {a ÷ b) + {a ÷ c)
(i)    a = 8, b = -4, c = 2
(ii)    a = -15,b = 2, c = 1
Ans:
 
We should verify that,
a + {b + c) ≠ {a ÷ b} + {a ÷ c}
Steps:
(i) Given a = 8 b = -4, c = 2 Consider the L.H.S. = a + (b ÷ c)
Substituting the values for a, b and c
L.H.S. = 8 ÷ (-4 + 2)
= 8 ÷ (—2)
= -4
Thus, a ÷ (b + c) = 4
Consider the R.H.S. = (a ÷ b) + (a ÷ c)
Substituting the values for a,b and c
R.H.S. = {(8) ÷ (-4)} + {(8) ÷ 2}
= -2 + 4 = 2
Thus, (a ÷ b) + (a ÷ c) = 2

We observe that L.H.S. and R.H.S. are not same.
Hence, it is verified that a ÷ (b + c) ≠ (a ÷ b) + {a ÷ c)
(ii)    Given a = -15, b = 2, c = 1
Consider the L.H.S. = a ÷ (b + c)
Substituting the values for a,b and c
L.H.S. = -15 ÷ (2 + 1)
= -15 ÷ (3)
= -5
Thus, L.H.S. = a ÷ (b + c) = -5
Consider R.H. S. = {a ÷ b) + {a ÷ c)
Substituting the values for a, b and c
R.H.S. = {(-15) ÷ (2)} + {(-15) ÷ 1}
= -7.5 + (-15)
= -22.5
Thus, R.H.S. = (a ÷ b) + (a ÷ c) = -22.5
We observe that L.H.S. and R.H.S. are not same.
Hence, it is verified that a ÷ (b + c) ≠ (a ÷ b) + (a ÷ c).

The document Class 7 Maths Chapter 1 Question Answers - Integers is a part of the Class 7 Course Mathematics (Maths) Class 7.
All you need of Class 7 at this link: Class 7
76 videos|345 docs|39 tests

Top Courses for Class 7

76 videos|345 docs|39 tests
Download as PDF
Explore Courses for Class 7 exam

Top Courses for Class 7

Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

Extra Questions

,

Class 7 Maths Chapter 1 Question Answers - Integers

,

ppt

,

shortcuts and tricks

,

practice quizzes

,

Important questions

,

mock tests for examination

,

Previous Year Questions with Solutions

,

MCQs

,

video lectures

,

Summary

,

Sample Paper

,

Objective type Questions

,

Class 7 Maths Chapter 1 Question Answers - Integers

,

Class 7 Maths Chapter 1 Question Answers - Integers

,

Semester Notes

,

Viva Questions

,

Free

,

past year papers

,

pdf

,

Exam

,

study material

;