RS Aggarwal Class 7\u00a0Solutions\u00a0Integers<\/a><\/li>\n<\/ul>\nAddition of integers having the same sign<\/strong> \n1. The sum of two positive integers is the sum of their absolute values with a positive sign.<\/p>\nExample 1:<\/strong> Add (+ 6) + (+4). \nSolution:<\/strong> On a number line, first draw an arrow from 0 to 6 and then go 4 steps ahead. The tip of the last arrow reaches +10. So, (+ 6) + (+ 4) = +10 \n \n2. The sum of two negative integers is the sum of their absolute values with negative sign(-).<\/p>\nExample 2:<\/strong> Add (-3) + (-4). \nSolution:<\/strong> On a number line, first we draw an arrow on the left side of zero from 0 to -3 and then further move to the left 4 steps. The tip of the last arrow is at -7. So,\u00a0(-3) + (-4) = (-7) \n \nAddition of integers having opposite signs<\/strong> \nThe sum of two integers having opposite signs is the difference of their absolute values with the sign of integer of greater absolute value.<\/p>\nExample 3:<\/strong> Add(+6) + (-9). \nSolution:<\/strong> On a number line, first we draw an arrow from 0 to 6 on the right and then go 9 steps to the left. The tip of the last arrow is at -3. So,\u00a0(+6) + (-9) =\u00a0(-3) \n <\/p>\n2. Subtraction of integers<\/strong><\/h3>\nIn subtraction, we change the sign of the integer which is to be subtracted and then add to the first integer. In other words, if a and b are two integers, then\u00a0a – b = a + (-b)<\/strong><\/p>\nExample 4:<\/strong> Subtract 5 from 12. \nSolution:<\/strong> (12) – (5) = (12) + (-5)\u00a0= 7 \n \nExample 5:<\/strong> Subtract -7 from -15. \nSolution:<\/strong> (-15) – (-7) = (-15) + (7)= -8 \n \nExample 6:<\/strong> Subtract 6 from -10. \nSolution:<\/strong> (-10) -(6) = (-10) + (- 6) \n \nExample 7:<\/strong> Subtract (-5) from 4. \nSolution:<\/strong> 4 – (-5) = 4 + (5) = 9 \n \nTo subtract (-5) from 4, we have to find a number which when added to (-5) gives us 4. So, on the number line we start from (-5) and move up to 4. Now find how many units we have moved. We have moved 9 units. \nSo, 4-(-5) =9<\/p>\nNote:<\/strong><\/p>\n\nAddition of integers<\/strong> \n(a) The sum of two integers with like signs is the sum of their absolute values with the same sign. \n(b) The sum of two integers with unlike signs is the difference of their absolute values with _the sign of the greater absolute value.<\/li>\nSubtraction of integers<\/strong> \nThe sign of the integer is changed which is to be subtracted and then added to the first integer.<\/li>\n<\/ol>\n3. Multiplication of integers<\/strong><\/h3>\nMultiplication of integers having the same sign<\/strong> \nWhen two integers have the same sign, their product is the product of their absolute values with positive sign. \nExamples<\/strong> \n(a) (+6) \u00d7 (+7) = + 42 or 42 \n(b) (+5) \u00d7 (+10) = + 50 or 50 \n(c) (-3) \u00d7 (-5) = + 15 or 15 \n(d) (-20) \u00d7 (-6) = 120 \n(e) (12) \u00d7 (5) = 60<\/p>\nMultiplication of integers having opposite signs<\/strong> \nThe product of two integers having opposite signs is the product of their absolute values with negative sign. \nExamples<\/strong> \n(a) (-10) \u00d7 (8) = (- 80) \n(b) (- 5) \u00d7 (7) = (-35) \n(c) (12) \u00d7 (-3) = (-36) \n(d) (-6) \u00d7 (3) = (-18) \n(e) 5 \u00d7 (-4) = (-20)<\/p>\nNote:<\/strong> \nplus \u00d7 minus = minus \nminus \u00d7 plus = minus \nminus \u00d7 minus = plus \nplus \u00d7 plus = plus<\/p>\n4. Division of integers<\/strong><\/h3>\nDivision of integers having the same sign<\/strong> \nDivision of two integers having the same sign\u00a0is the division of their absolute value with a positive sign. If both integers have the same sign, then the quotient will be positive. \nExamples:<\/strong> \n(a) (+9) \u00f7 (+3) = (3) \n(b) (-9) \u00f7 (-3) = (3) \n(c) (-24) \u00f7 (-12) = (2)<\/p>\nDivision of integers having opposite signs<\/strong> \nIf both integers have different signs, the quotient will be negative. \nExamples: (a) 12 \u00f7 (-3) = (-4) \n(b) (-10) \u00f7 (5) = (-2) \n(c) (-18) \u00f7 (3) = (-6)<\/p>\nExample 8:<\/strong> Evaluate (-13) – (-7 – 6). \nSolution:<\/strong> (-13) – (-7 – 6) \n= (-13) -(-13) \n= (-13) + (13) (Opposite to each other) = 0<\/p>\nExample 9:<\/strong> Subtract (-5128) from 0. \nSolution:<\/strong> 0 – (-5128) = 0 + 5128 = 5128<\/p>\nExample 10:<\/strong> Divide (4000) + (- 100). \nSolution:<\/strong> \\(\\frac{4000}{-100}\\) = -40<\/p>\nExample 11:<\/strong> Multiply (-18) and (-8). \nSolution:<\/strong> (-18) \u00d7 (-8) = 18 \u00d7 8 = 144<\/p>\nNote:<\/strong><\/p>\n\nMultiplication of integers<\/strong> \n(a) When two integers have the same sign, their product is the product of their absolute values with a positive sign. \n(b) The product of two integers having opposite signs is the product of their absolute values with a negative sign.<\/li>\nDivision of integers<\/strong> \n(a) If integers have the same sign, the quotient is always positive. \n(b) If integers have opposite signs, the quotient will be negative.<\/li>\n<\/ol>\nNote:<\/strong><\/p>\n\nThe integers are …, -3,-2,-1, 0,1, 2, 3,…<\/li>\n 1, 2, 3, 4,… are called positive integers and -1,-2,-3,… are called negative integers. 0 is neither positive nor negative.<\/li>\n Integer 0 is less than every positive integer but greater than every negative integer.<\/li>\n The absolute value of an integer is the numerical value of the integer regardless of its sign.<\/li>\n The absolute value of an integer is either positive or zero. It cannot be negative.<\/li>\n The sum of two integers having the same sign is the sum of their absolute values with a positive sign.<\/li>\n The sum of two integers having opposite signs is the difference of their absolute values with the sign of the greater absolute value.<\/li>\n To subtract an integer b from a we change the sign of b and add, i.e., a + (-b)<\/li>\n The product of two integers having the same sign is positive.<\/li>\n The product of two integers having different signs is negative.<\/li>\n Two integers, which when added give 0, are called additive inverse of each other.<\/li>\n Additive inverse of zero is 0.<\/li>\n<\/ul>\nMaths<\/a><\/p>\n","protected":false},"excerpt":{"rendered":"Fundamental Operations on Integers We have four fundamental operations on integers. They are addition, subtraction, multiplication, and division. 1. Addition of integers A monkey is sitting at the bottom in an empty water tank 8 ft high. The monkey wants to jump to the top of the water tank. He jumps 3 ft up and […]<\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":{"_genesis_hide_title":false,"_genesis_hide_breadcrumbs":false,"_genesis_hide_singular_image":false,"_genesis_hide_footer_widgets":false,"_genesis_custom_body_class":"","_genesis_custom_post_class":"","_genesis_layout":"","footnotes":""},"categories":[5],"tags":[2385,2388,55912,2387,2389,55948,2386],"yoast_head":"\n
Fundamental Operations on Integers - A Plus Topper<\/title>\n \n \n \n \n \n \n \n \n \n \n \n \n \n \n\t \n\t \n\t \n