Class 6 Exam > Class 6 Notes > RD Sharma Solutions for Class 6 Mathematics > RD Sharma Solutions -Page No.5.11, Negative Numbers And Integers, Class 6, Maths
Page No.5.11, Negative Numbers And Integers, Class 6, Maths RD Sharma Solutions | RD Sharma Solutions for Class 6 Mathematics PDF Download
PAGE NO 5.11:
Question 1: Find the additive inverse of each of the following integers:
(i) 52
(ii) −176
(iii) 0
(iv) 1
ANSWER: THE ADDITIVE INVERSE OF THE NUMBER A IS THE NUMBER ADDED TO A, YIELDS ZERO. SO, WE FIND THE FOLLOWING:
(i) 52 + (−52) = 0Here, −52 is the additive inverse of 52.
(ii) (−176) + 176 = 0Here, 176 is the additive inverse of −176.
(iii) 0 + 0 = 0Here, 0 itself is its inverse.
(iv) 1 + (−1) = 0Here, −1 is the additive inverse of 1.
Question 2:
Find the successor of each of the following integers:
(i) −42
(ii) −1
(iii) 0
(iv) −200
(v) −99
ANSWER: For the integer a, a + 1 will be its successor.
(i) −41 is the successor of −42.
(ii) 0 is the successor of −1.
(iii) 1 is the successor of 0.
(iv) −199 is the successor of 200.
(v) −98 is the successor of −99.
(i) −41 is the successor of −42.
(ii) 0 is the successor of −1.
(iii) 1 is the successor of 0.
(iv) −199 is the successor of 200.
(v) −98 is the successor of −99.
Question 3:
Find the predecessor of each of the following integers:
(i) 0
(ii) 1
(iii) −1
(iv) −125
(v) 1000
ANSWER:
For the integer a, the predecessor is (a − 1).
(i) −1 is the predecessor of 0.
(ii) 0 is the predecessor of 1.
(iii) −2 is the predecessor of −1.
(iv) −126 is the predecessor of −125.
(v) 999 is the predecessor of 1000
Question 4:
Which of the following statements are true?
(i) The sum of a number and its opposite zero.
(ii) The sum of two negative integer is positive integer.
(iii) The sum of a negative integer and a positive integer is always a negative integer.
(iv) The successor of −1 is 1.
(v) The sum of three different integers can never be zero.
ANSWER:
(i) True − It is the definition of additive inverse; for example, 5 + (−5) = 0.
(ii) False − For example, −2 − 3 = −5; it is a negative integer.
(iii) False − −3 + 5 = 2; it is a positive integer.
(iv) False − 0 is the successor of −1.
(v) False − It can be zero like (−2) + (−1) + (3).
Question 5:
Write all integers whose absolute values are less than 5.ANSWER: Let x be an integer such that |x| < 5.
∴ -5 < x < 5
=> x = ] -4, 4 [
These are the nine integers whose absolute values are less than 5, namely, -4, -3, -2, -1, 0, 1, 2, 3 and 4.
Question 6:
Which of the following is false:
(i)|4+2|=|4|+|2|
(ii) |2-4|=|2|+|4|
(iii)|4-2| =|4|-|2|
(iv) |(−2)+(−4)|=|−2|+|−4|
ANSWER:(i) |4|+ |2| = 6 = |4| + |2|; True
(ii) |2 − 4| = |−2| = 2 ≠ 2 + 4 = 6; False
(iii) |4 − 2| = 2 = |4| − |2|; True
(iv) |(−2) + (−4)| = |−6| = 6 = |−2| + |(−4)|; True
The document Page No.5.11, Negative Numbers And Integers, Class 6, Maths RD Sharma Solutions | RD Sharma Solutions for Class 6 Mathematics is a part of the Class 6 Course RD Sharma Solutions for Class 6 Mathematics.
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FAQs on Page No.5.11, Negative Numbers And Integers, Class 6, Maths RD Sharma Solutions - RD Sharma Solutions for Class 6 Mathematics
| 1. What are negative numbers and integers? |  |
Ans. Negative numbers are numbers less than zero, represented with a negative sign (-) in front of them. Integers, on the other hand, include both positive and negative whole numbers, including zero.
| 2. How are negative numbers and integers used in mathematics? | |
Ans. Negative numbers and integers are used in various mathematical operations. They help in representing debts, losses, temperatures below freezing point, and coordinates in a coordinate plane.
| 3. Can negative numbers and integers be used in real-life situations? | |
Ans. Yes, negative numbers and integers are used in real-life situations. For example, they are used in representing bank account balances, measuring temperatures below zero, calculating distances between two points in opposite directions, etc.
| 4. How do we add and subtract negative numbers and integers? | |
Ans. To add or subtract negative numbers and integers, we follow certain rules. When adding, we add the absolute values and assign the sign of the larger number. When subtracting, we change the sign of the second number and then add.
| 5. What are the properties of negative numbers and integers? | |
Ans. Negative numbers and integers follow various properties such as the commutative property (addition and multiplication), associative property (addition and multiplication), distributive property, and the property of 0 as an additive identity. These properties help in simplifying mathematical operations involving negative numbers and integers.
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