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CAT Study Materials PDF

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Quantitative Aptitude eBook for CAT from www.OneStopMBA.com CAT Study Materials Free Study Material from www.OneStopMBA.com World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com CAT Quantitative Reasoning (Math) (cid:25) 3 Refresher books covering all relevant topics - starting from Number systems, Percentages to Permutation & Combination to Geometry to Functions. • A total of 27 topics from Arithmetic, Algebra and Geometry. • The refresher books contain introduction and explanation on concepts in each topic followed by adequate number of solved examples which cover a wide range of questions that appear from these chapters in CAT. • Solved examples in the refresher books include questions that are replicas of questions that appeared in previous CATs. Such questions are separately identified for your convenience. • Solved examples are followed by several exercise problems. These problems are provided with answers and detailed explanatory solutions. • Shortcuts or alternate methods to solve quant questions are provided alongside the solved examples wherever possible. 6 A book of Chapter wise Tests in Math. • Each test comprises 30 to 60 oft-repeated questions. • The Speed Tests are to be taken after you complete each chapter. • The tests have been designed to help you consolidate what you have learnt in the respective topic. • Speed Tests help you identify ways of solving a question in the quickest possible time, when multiple choices are provided. • Explanatory answers along with correct answers to each question is provided 6 Quant Proficiency Tests in select Math topics • These tests test your proficiency in 1 to 3 chapters in mathematics. • These tests are to be taken as part of your final revision, about two months before CAT. • These tests are designed to acquaint you with a variety of CAT - like questions and to help you master concepts in Math and skillfully employ smart techniques in answering these questions. World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com Math’s Course Materials CAT Quantitative Ability (Quant / Math) Syllabus, Topics tested in IIM's Common Admissions Test The Quant (Math) section in CAT usually accounts for a third of the questions in CAT. For instance, in CAT 2006 the quant section had 100 marks worth questions out of the total of 300 marks worth questions. More often than not students who take CAT find the quant section as the toughest one. Albeit, CAT 2006 was an exception Number Questions & Answers Ascent's CAT Math Refresher Books cover the following topics Broadly categorized as Arithmetic, Algebra and Geometry CAT typically tests a student's quantitative ability from over 25 topics. These topics that appear in CAT are of high school level. Click on the links that follow each topic for details of what is covered in Ascent's Quant Refresher books on these topics and for accesing an archive of sample questions from these topics. I. Arithmetic Number Theory Question bank - CAT 2007 Sample Questions An oft repeated topic in CAT since CAT 2000. Questions include simple word problems testing one's understanding of applied class="text"cation of LCM, HCF, Factors, Divisibility class="text"ty to questions that would require knowledge of remainders, remainder theorem, factorials, different bases to which numbers can be expressed. Number Theory: Remainders, Finding Divisors Remainders of division of different numbers by the same divisor Question A number when divided by a divisor leaves a remainder of 24. When twice the original number is divided by the same divisor, the remainder is 11. What is the value of the divisor? (1) 13 (2) 59 (3) 35 (4) 37 World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com Correct Choice - (4). Correct Answer is 37 Explanatory Answer Let the original number be 'a' Let the divisor be 'd' Let the quotient of the division of a by d be 'x' Therefore, we can write the relation as a/d = x and the remainder is 24. i.e., a = dx + 24 When twice the original number is divided by d, 2a is divided by d. We know that a = dx + 24. Therefore, 2a = 2dx + 48 The problem states that 2dx + 48 / d leaves a remainder of 11. 2dx is perfectly divisible by d and will therefore, not leave a remainder. The remainder of 11 was obtained by dividing 48 by d. When 48 is divided by 37, the remainder that one will obtain is 11. Hence, the divisor is 37. Remainders of division of different numbers by the same divisor Question A number when divided by a divisor leaves a remainder of 24. When twice the original number is divided by the same divisor, the remainder is 11. What is the value of the divisor? (1) 13 (2) 59 (3) 35 (4) 37 Correct Choice - (4). Correct Answer is 37 Explanatory Answer Let the original number be 'a' Let the divisor be’d’ World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com Let the quotient of the division of a by d be 'x' Therefore, we can write the relation as a/d = x and the remainder is 24. i.e., a = dx + 24 When twice the original number is divided by d, 2a is divided by d. We know that a = dx + 24. Therefore, 2a = 2dx + 48 The problem states that 2dx + 48 / d leaves a remainder of 11. 2dx is perfectly divisible by d and will therefore, not leave a remainder. The remainder of 11 was obtained by dividing 48 by d. When 48 is divided by 37, the remainder that one will obtain is 11. Hence, the divisor is 37. Number Theory: Counting Methods : Combinatorics Number of two-digit, three-digit positive integers Question How many keystrokes are needed to type numbers from 1 to 1000? (1) 3001 (2) 2893 (3) 2704 (4) 2890 Correct Choice is (2) and Correct Answer is 2893 Explanatory Answer 1. While typing numbers from 1 to 1000, you have 9 single digit numbers from 1 to 9. Each of them require one keystroke. That is 9 key strokes. There are 90 two-digit numbers, from 10 to 99. Each of these numbers require 2 keystrokes. Therefore, one requires 180 keystrokes to type the 2 digit numbers. There are 900 three-digit numbers, from 100 to 999. Each of these numbers require 3 keystrokes. Therefore, one requires 2700 keystrokes to type these 3 digit numbers. Then 1000 is a four-digit number which requires 4 keystrokes. Totally, therefore, one requires 9 + 180 + 2700 + 4 = 2893 keystrokes. World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com Number Theory: Remainders, Divisors Remainders of division of two different numbers and their sum by the same divisor Question When 242 is divided by a certain divisor the remainder obtained is 8. When 698 is divided by the same divisor the remainder obtained is 9. However, when the sum of the two numbers 242 and 698 is divided by the divisor, the remainder obtained is 4. What is the value of the divisor? (1) 11 (2) 17 (3) 13 (4) 23 Correct Choice is (3) and Correct Answer is 13 Explanatory Answer Let the divisor be d. When 242 is divided by the divisor, let the quotient be 'x' and we know that the remainder is 8. Therefore, 242 = xd + 8 Similarly, let y be the quotient when 698 is divided by d. Then, 698 = yd + 9. 242 + 698 = 940 = xd + yd + 8 + 9 940 = xd + yd + 17 As xd and yd are divisible by d, the remainder when 940 is divided by d should have been 17. However, as the question states that the remainder is 4, it would be possible only when leaves a remainder of 4. If the remainder obtained is 4 when 17 is divided by d, then d has to be 1 Number Theory : Division of Polynomial Remainders of division of a polynomial Question World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com What number should be subtracted from x3 + 4x2 - 7x + 12 if it is to be perfectly divisible by x + 3? (1) 42 (2) 39 (3) 13 (4) None of these Correct Choice is (1) and Correct Answer is 42 Explanatory Answer According to remainder theorem when f(x) / x+a, then the remainder is f(-a). In this case, as x + 3 divides x3 + 4x2 - 7x + 12 - k perfectly (k being the number to be subtracted), the remainder is 0 when the value of x is substituted by -3. i.e., (-3)3 + 4(-3)2 - 7(-3) + 12 - k = 0 or -27 + 36 + 21 + 12 = k or k = 42 Number Theory : HCF, GCD, Factors, Divisors Word problem in number theory, using the concept of HCF / GCD Question What is the minimum number of square marbles required to tile a floor of length 5 metres 78 cm and width 3 metres 74 cm? (1) 176 (2) 187 (3) 54043 (4) 748 Correct Choice is (2) and correct answer is 187 Explanatory Answer 2. The marbles used to tile the floor are square marbles. Therefore, the length of the marble = width of the marble. As we have to use whole number of marbles, the side of the square should a factor of both 5 m 78 cm and 3m 74. And it should be the highest factor of 5 m 78 cm and 3m 74. World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com 5 m 78 cm = 578 cm and 3 m 74 cm = 374 cm. The HCF of 578 and 374 = 34. Hence, the side of the square is 34. The number of such square marbles required = 578*374 / 34*34 = 17*11= 187 marbles. Number Theory : Division of factorials, remainders The highest power of 10 that can divide a factorial. Number of trailing zeroes. Question A person starts multiplying consecutive positive integers from 20. How many numbers should he multiply before the will have result that will end with 3 zeroes? (1) 11 (2) 10 (3) 6 (4) 5 Correct Choice is (3) and correct answer is 6 Explanatory Answer 3. A number will end in 3 zeroes when it is multiplied by 3 10s. To get a 10, one needs a 5 and a 2. Therefore, this person should multiply till he encounters three 5s and three 2s. 20 has one 5 (5 * 4) and 25 has two 5s (5 * 5). 20 has two 2s (5 * 2 * 2) and 22 has one 2 (11 * 2). Therefore, he has to multiply till 25 to get three 5s and three 2s, that will make three 10s. So, he has to multiply from 20 to 25 i.e. 6 numbers. Number Theory : Remainders of division Finding remainders when the same power of two numbers leave the same remainder when divided by a common integer. World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com Question For what value of 'n' will the remainder of 351^n and 352^n be the same when divided by 7? (1) 2 (2) 3 (3) 6 (4) 4 Correct Choice is (2) and the Correct Answer is 3 Explanatory Answer When 351 is divided by 7, the remainder is 1. When 352 is divided by 7, the remainder is 2. Let us look at answer choice (1), n = 2 When 3512 is divided by 7, the remainder will be 12 = 1. When 3522 is divided by 7, the remainder will be 22 = 4. So when n = 2, the remainders are different. When n = 3, When 3513 is divided by 7, the remainder will be 13 = 1. When 3523 is divided by 7, the remainder will be 23 = 8. As 8 is greater than 7, divide 8 again by 7, the new remainder is 1. So when n = 3, both 351n and 352n will have the same remainder when divided by 7. Number Theory : Remainders of division by 6 Finding remainders when sum of powers of 9 are divided by 6 Question What is the remainder when 9^1 + 9^2 + 9^3 + .... + 9^8 is divided by 6? (1) 3 (2) 2 (3) 0 World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com Quantitative Aptitude eBook for CAT from www.OneStopMBA.com (4) 5 Correct Choice is (3) and Correct Answer is 0 Explanatory Answer 6 is an even multiple of 3. When any even multiple of 3 is divided by 6, it will leave a remainder of 0. Or in other words it is perfectly divisible by 6. On the contrary, when any odd multiple of 3 is divided by 6, it will leave a remainder of 3. For e.g when 9 an odd multiple of 3 is divided by 6, you will get a remainder of 3. 9 is an odd multiple of 3. And all powers of 9 are odd multiples of 3. Therefore, when each of the 8 powers of 9 listed above are divided by 6, each of them will leave a remainder of 3. The total value of the remainder = 3 + 3 + .... + 3 (8 remainders) = 24. 24 is divisible by 6. Hence, it will leave no remainder. Hence, the final remainder when the expression 9^1 + 9^2 + 9^3 + ..... + 9^8 is divided by 6 will be equal to '0'. World’s Largest Portal on MBA Information & Jobhttp://www.OneStopMBA.com Join MBA Community at http://groups.yahoo.com/group/OneStopMBA Over 5,000 Testing Interview Questions at http://www.CoolInterview.com

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systems, Percentages to Permutation & Combination to Geometry to. Functions. • A total of 27 covered in Ascent's Quant Refresher books on these topics and for accesing an archive of sample Factors, Divisibility class="text"ty to questions that would require knowledge of remainders, remainder
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