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Ex-1.1 Integers, Class 7, Math RD Sharma Solutions | RD Sharma Solutions for Class 7 Mathematics PDF Download

Q 1. Determine each of the following products:
(i) 12 ☓ 7
(ii) (−15) ☓ 8
(iii) (−25) ☓ (−9)
(iv) 125 ☓ (−8)

(i) 12 × 7 = 84
(ii) (−15) × 8 =  −120
(iii) (−25) × (−9) =  225
(iv) 125 × (−8) =  −1000


Q 2. Find each of the following products:
(i) 3 ☓ (−8) ☓ 5
(ii) 9 ☓ (−3) ☓ (−6)
(iii) (−2) ☓ 36 ☓ (−5)
(iv) (−2) ☓ (−4) ☓ (−6) ☓ (−8)

(i) 3 × (−8) × 5 = −3 × (8 × 5) - 3 × (8 × 5) = −-120
(ii) 9 × (−3) × (−6) = 9 × (3 × 6) 9 × (3 × 6) = 162
(iii) (−2) × 36 × (−5) = 36 × (2 × 5)36 × (2 × 5) = 360
(iv) (−2) × (−4) × (−6) × (−8) =  (2 × 4 × 6 × 8)(2 × 4 × 6 × 8) = 384


Q 3. Find the value of:
(i) 1487 × 327 + (−487) × 327
(ii) 28945 × 99 − (−28945)

(i) 1487 × 327 + (−487) × 327 = 327 (1487 − 487) = 327 × 1000 = 327000327 (1487 - 487) = 327 × 1000 = 327000
(ii) 28945 × 99 − (−28945) = 28945 (99 − (−1)) = 28945 (99 + 1) = 2894500


Q 4. Complete the following multiplication table:

Ex-1.1 Integers, Class 7, Math RD Sharma Solutions | RD Sharma Solutions for Class 7 Mathematics









Is the multiplication table symmetrical about the diagonal joining the upper left corner to the lower right corner? 

Ex-1.1 Integers, Class 7, Math RD Sharma Solutions | RD Sharma Solutions for Class 7 Mathematics










Yes, the table is symmetrical along the diagonal joining the upper left corner to the lower right corner. 


Q 5. Determine the integer whose product with '−1' is
(i) 58
(ii) 0
(iii) −225
The integer, whose product with −1 is the given number, can be found by multiplying the given number by −1.
Thus, we have:
(i) 58 × (−1) =  −58
(ii) 0 × (−1) = − (0 × 1) - (0 × 1) = 0
(iii) (−225) × (−1) =  225

Q 6. What will be the sign of the product if we multiply together
(i) 8 negative integers and 1 positive integer?
(ii) 21 negative integers and 3 positive integers?
(iii) 199 negative integers and 10 positive integers?
Negative numbers, when multiplied even number of times, give a positive number. However, when multiplied odd number of times, they give a negative number. Therefore, we have:

(i) (negative) 8 times × (positive)  1 time = positive × positive positive × positive = positive integer
(ii) (negative) 21 times  × (positive) 3 times = negative ×positive negative ×positive  = negative integer
(iii) (negative) 199 times × (positive) 10 times = negative × positive negative × positive = negative integer 


Q 7. State which is greater:
(i) (8 + 9) × 10 and 8 + 9  × 10
(ii) (8 − 9) × 10 and 8 − 9 × 10
(iii) {(−2) − 5} × (−6) and (−2) −5 × (−6)
(i) ( 8 + 9) × 10 = 170   >   8 + 90 = 98
(ii) (8 − 9) × 10 = −10  >  8 − 90 = − 82
(iii) {(−2) − 5 } × (−6) = −7 × (−6) = 42 > (−2) − 5 × (−6)  = ( −2 ) −  (−30)  = −2 + 30 = 28

Q 8. (i) If a × (−1) = −30, is the integer a positive or negative?
(ii) If a × (−1) = 30, is the integer a positive or negative?
(i) a × (−1) = −30  
When multiplied by a negative integer, a gives a negative integer. Hence, a should be a positive integer.
a = 30
(ii) a × (−1) = 30  
When multiplied by a negative integer, a gives a positive integer. Hence, a should be a negative integer.
a = −30



Q 9. Verify the following:
(i) 19 × {7 + (−3)} = 19 × 7 + 19 × (−3)
(ii) (−23) {(−5) + (+19)} = (−23) × (−5) + (−23) × (+19)
(i) LHS = 19 × { 7 + (−3) } = 19 × {4} =  76
RHS =  19 × 7 + 19 × (−3) = 133 + (−57) = 76
Because LHS is equal to RHS, the equation is verified.
(ii) LHS = (−23) {(−5) + 19} = (−23) { 14} = −322
RHS = (−23) × (−5) + (−23) × 19 = 115 + (−437) = −322
Because LHS is equal to RHS, the equation is verified.



Q 10. Which of the following statements are true?
(i) The product of a positive and a negative integer is negative.
(ii) The product of three negative integers is a negative integer.
(iii) Of the two integers, if one is negative, then their product must be positive.
(iv) For all non-zero integers a and b, a × b is always greater than either a or b.
(v) The product of a negative and a positive integer may be zero.
(vi) There does not exist an integer b such that for a > 1, a × b = b × a = b.
(i) True. Product of two integers with opposite signs give a negative integer.
(ii) True. Negative integers, when multiplied odd number of times, give a negative integer.
(iii) False. Product of two integers, one of them being a negative integer, is not necessarily positive. For example, (−1) × 2 = −2
(iv) False. For two non-zero integers a and b, their product is not necessarily greater than either a or b. For example, if a = 2 and  b = −2, then, a × b = −4, which is less than both 2 and −2.
(v) False. Product of a negative integer and a positive integer can never be zero.

(vi) True. If a > 1, then, a × b ≠ b × a ≠ b 

The document Ex-1.1 Integers, Class 7, Math RD Sharma Solutions | RD Sharma Solutions for Class 7 Mathematics is a part of the Class 7 Course RD Sharma Solutions for Class 7 Mathematics.
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FAQs on Ex-1.1 Integers, Class 7, Math RD Sharma Solutions - RD Sharma Solutions for Class 7 Mathematics

1. What is RD Sharma Solutions?
Ans. RD Sharma Solutions is a book that provides solutions to the math problems given in the RD Sharma textbook. It is specifically designed for students in Class 7 and covers topics related to integers, fractions, decimals, data handling, and algebraic expressions.
2. What is the importance of studying integers in Class 7?
Ans. Integers are an important concept in mathematics and have several real-world applications. They help in understanding concepts like temperature, money, and distance. Studying integers in Class 7 lays the foundation for more complex concepts like fractions, decimals, and algebraic expressions that are covered in higher classes.
3. How can RD Sharma Solutions help in preparing for exams?
Ans. RD Sharma Solutions provides step-by-step solutions to all the problems given in the RD Sharma textbook. It helps in understanding the concepts better and provides a better understanding of the problem-solving approach. Regular practice of problems from RD Sharma Solutions can help in improving the problem-solving speed and accuracy, thereby helping in preparing for exams.
4. Is RD Sharma Solutions available online?
Ans. Yes, RD Sharma Solutions is available online. There are several websites and apps that provide free access to RD Sharma Solutions. Students can also purchase the book online from various e-commerce websites.
5. What are the topics covered in the RD Sharma textbook for Class 7?
Ans. The RD Sharma textbook for Class 7 covers topics related to integers, fractions, decimals, data handling, algebraic expressions, simple equations, lines and angles, congruence, and symmetry. It provides a comprehensive understanding of the fundamental concepts of mathematics and helps in building a strong foundation for higher classes.
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