Quantitative Aptitude Preparation Numbers Prepared by: MS. RUPAL PATEL Assistant Professor CMPICA, CHARUSAT
Numbers Numbers In Hindu Arabic system, we have total 10 digits. Namely, 0, 1, 2, 3, 4, 5, 6, 7, 8, 9 Number is a group of digits called numeral. Places of each digit in a numeral 5 6 1 3 0 7 0 9 0 Ten Crores Crores Ten Lakhs Lakhs Ten Thousands Thousand Hundreds Tens Units
Face value and Place Value
Types of Numbers Numbers Quick Description Symbol Natural {1, 2, 3,.} N Whole {0,1, 2, 3, } W Integers {..-3, -2, -1, 0, 1, 2, 3, } Z Rational Q Irrationals Not Rational Real All Rational and Irrational R Imaginary I Complex C
Even and Odd Numbers The integers which are divisible by 2 are called even numbers. E.g. 0, 2, 4, 6, 8,, etc. The integers which are not divisible by 2 are called odd numbers. E.g. 1, 3, 5, 7, 9,.., etc.
Prime Numbers A counting number which has only two factors: 1 and itself is called prime number. E.g. Prime numbers between 1 and 100 2, 3, 5, 7, 11, 13, 17, 19, 23, 29, 31, 37, 41, 43, 47, 53, 59, 61, 67, 71, 73, 79, 83, 89, 97 IMP: The only even prime number is 2.
Composite Numbers and Co-primes The natural numbers which are not prime are called composite numbers. E.g. 4, 6, 8, 9, 10, 12, 14, 15, 16, etc. Two natural numbers a and b are said to be co-prime if their HCF is 1. Means both a and b has no common factor. E.g. (2,3), (4,5), (7,9), (8,11), etc. IMP: 1 is neither prime nor a composite number
Important
Modulus or Absolute value of a Real Number
Test of Divisibility of Numbers Div. Rule Example (s) 2 If the last digit is an even number or zero(0) 3 If the sum of the digits divisible by 3 4 If the last two digits divisible by 4 or it ends with 00 84, 138, 2, 1920 3705 3+7+0+5 = 15 is divisible by 3 21660, 5100 21660- since 60 is divisible by 4 5100- last 2 digits 00 5 If the last digit is 0 or 5 865, 1705, 25, 4270, 3300 6 If the number is divisible by both 2 and 3 8 If the last three digits divisible by 8 or it ends with 000 629130 last digit 0 so divisible by 2 6+2+9+1+3+0=21 is divisible by 3 81976, 6145000 81976- since 976 is divisible by 8 6145000- last 3 digits 000
Test of Divisibility of Numbers Div. Rule Example (s) 9 If the sum of the digits is divisible by 9 870111 8+7+0+1+1+1 = 18 10 If the last digit is 0 730, 20, 5500 11 If the difference = sum of digits of (odd places - even places) is 0 or a multiple of 11 7 and 13 If the difference of the number formed by the last 3 digits and the number formed by the rest digits divisible by 7 or 13 respectively 647053 Odd sum = 6+7+5=18 Even Sum = 4+0+3 = 7 Difference = 18-7 = 11 265216, 2503681 265 216 = 49 is divisible by 7 2503 618 = 1885 885 1 = 884 is divisible by 13
General Properties of Divisibility 1. If a number A is divisible by another number B, then any number divisible by A, will also be divisible by B and all the factors of B. E.g. 84 is divisible by 6 252 is divisible by 84, it will also be divisible by 6 and also factors of 6, i.e. 2 and 3
General Properties of Divisibility 2. If two numbers A and B are divisible by a number p, then their sum A+B is also divisible by p E.g. 225 and 375 are divisible by 5. Then, 225 + 375 = 600 is also divisible by 5. 3. If two numbers A and B are divisible by a number p, then their difference A-B is also divisible by p E.g. 126 and 507 are divisible by 3. Then, 507-126 = 381 is also divisible by 3.
Must Memorize Tables of 1 to 20
Squares of 1 to 100 Must Memorize squares of 1 to 30
Test of Prime Numbers
E.g. Test of Prime Numbers I. 137 12 2 = 144 > 137 prime numbers < 12 are 2, 3, 5, 7, 11 None of them divides 137. Thus it is a prime. II. 203 15 2 = 225 > 203 Prime numbers < 15 are 2, 3, 5, 7, 11, 13 203 is divisible by 7. Thus, it is not a prime.
Divisibility and Remainder
Methods to find Completely Divisible by another number Least number that can be subtracted to make it exactly divisible Answer = Remainder Least number that can be added to make it exactly divisible Answer = Divisor - Remainder
E.g. Find the least number, that must subtracted from and added to a given number 5029, to make it exactly divisible by 17. Also find the numbers in each case. Sol n 17) 5029 (295 34 162 153 99 85 14 Least number subtracted = remainder = 14 i.e. 5029 14 = 5015 Least number added = divisor remainder = 17 14 = 3 i.e. 5029 + 3 = 5032
Greatest n-digit and Least n-digit number exactly divisible by a number Greatest n-digit number exactly divisible by a divisor d Answer = Greatest n-digit no. Remainder Least n-digit number exactly divisible by a divisor d Answer = Least n-digit No. + (Divisor Remainder)
E.g. Find the Sol n (a) Greatest 3-digit number divisible by 13 (b) Least 3-digit number divisible by 13 13) 999 (76 13) 100 (7 91 91 89 9 78 11 Greatest 3-digit number = 999 11 = 988 Least 3-digit number = 100 + (13 9) = 104
Remainder Rules No. Type of Problem Rule 1 When a number is divided by x then leaves remainder R, when same number is divided by y, what will be the remainder? 2 If two different numbers a and b are divided by the same divisor leaves remainder r1 and r2, respectively, then their sum (a+b) if divided by same divisor will leave remainder R 3 When two numbers after being divided by the same divisor leave the same remainder, then the difference of those two numbers must be exactly divisible by the same divisor. R = (r 1 +r 2 ) divisor If R becomes negative, then R = r 1 +r 2 1. Find the difference of given two numbers 2. Find the factors of it. 3. Find the divisor according to n-digits asked
Remainder Rules No. Type of Problem Rule 4 If a given number is divided successively by the different factors of the divisor leaving remainders r 1, r 2 and r 3, respectively, then the true remainder is 5 When (x + 1) n is divided by x, then remainder is 6 When (x 1) n is divided by x, then remainder is True Remainder = (r 1 ) + (r 2 x d 1 ) +(r 3 x d 1 x r 2 ) Remainder is always 1. When x and n are naturals When n = even no, R = 1, When n = odd no, R = (x 1)
Sum Rules on Natural Numbers
Algebraic Formulas
Algebraic Formulas
Last digit (Unit s digit) of (xyz) n The given number is (xyz) n then last digit of a number is z. Based on this z, we, decide the last digit of a number when its power is calculated. Value of z Divide n Value of Remainder Last digit of z n 0, 1, 5, or 6 - - 0, 1, 5, or 6, respectively 4 or 9 By 2 1 0 2, 3, 7 or 8 By 4 1 2 3 4 z z 2 z z 2 z 3 z 4
Number of zeroes at the End of Product There are 2 reasons of 0 s at the end of product 1. If there is any 0 at the end of the number. E.g. 7 x 20 = 140 2. If 5 or multiple of 5 multiplied by any even no. E.g. 45 x 12 = 540 Steps 1. Find the factors of given number 2. Count number of 2 s and 5 s 3. Number of 0 s = Min (No. of 2 s and No. of 5 s)
E.g. Find the number of zeroes at the end of the product of 15 x 32 x 25 x 22 x 40 x 75 x 98 x 112 x 125 = (5x3) x (2 5 ) x (5 2 ) x (11x2) x (2 3 x5) x (5 2 x3) x (2x7 2 ) x (2 4 x7) x (5 3 ) No. of 2 s = (2 5+1+3+1+4 ) = 2 14 = 14 No. of 5 s = (5 1+2+1+2+3 ) = 5 9 = 9 Min(9,14) = 9 Hence, There are total 9 zeroes at the end of the product.
Practice sums 1. The difference between the local value and face value of 6 in the numeral 33186890 is (a) 6888 (b) 6886 (c) 5940 (d) None 2. The difference between place value s of two 4 in the numeral 32645149 is (a) 0 (b) 45130 (c) 39960 (d) None
Practice sums 3. Find the least value of * for which 7*5462 is divisible by 9. (a) 2 (b) 0 (c) 3 (d) 5 4. Find the least value of * for which 4832*18 is divisible by 11. (a) 1 (b) 5 (c) 7 (d) 9 5. Show that 52563744 is divisible by 24.
Practice sums 6. What least number must be subtracted from 1672 to obtain a number which is completely divisible by 17. (a) 3 (b) 4 (c) 6 (d) 5 7. What least number must be added to 2010 to obtain a number which is completely divisible by 17. (a) 2 (b) 4 (c) 7 (d) 9
Practice sums 8. On dividing 12401 by a certain number, we get 76 as quotient and 13 as remainder, What is the divisor? (a) 162 (b) 165 (c) 163 (d) 161 9. On dividing a certain number by 342, we get 47 as remainder. If the same number is divided by 18, what will be the remainder? (a) 1 (b) 3 (c) 5 (d) 11
Practice sums 10. What is the unit digit in the product (684 x 759 x 413 x 676) (a) 4 (b) 8 (c) 1 (d) 3 11.What is the unit digit in the product (3547) 153 x (251) 72? (a) 1 (b) 2 (c) 4 (d) 7 12. What is the unit digit in (264) 102 + (264) 103 (a) 4 (b) 0 (c) 3 (d) 1
Practice sums 13. Find the total number of prime factors in the product {(4) 11 x (7) 5 x (11) 2 }? (a) 22 (b) 25 (c) 29 (d) 27 14. A number when successively divided by 3, 5, and 8 leaves remainders 1, 4, and 7 respectively. Find the respective remainders if the order of divisors be reversed. (a) 4,2,6 (b) 6,4,2 (c) 2,4,6 (d) 6,2,4
Practice sums 15. Find the remainder when 2 31 is divided by 5. (a) 2 (b) 3 (c) 9 (d) 7 16. How many natural numbers between 17 and 80 are divisible by 6? (a) 12 (b) 16 (c) 11 (d) 14 17. (6 + 15 + 24 + 33 +.. + 105) =? (a) 666 (b) 667 (c) 678 (d) 677 18. Find the sum of all even natural numbers less than 75. (a) 1407 (b) 1466 (c) 1403 (d) 1406
Practice sums 19. What is the unit digit in 7 105 (a) 1 (b) 5 (c) 7 (d) 9 20. What is the unit digit in the product (3 65 x 6 59 x 7 71 )? (a) 1 (b) 2 (c) 4 (d) 6 21. What is the unit digit in {(6374) 1793 x (625) 317 x (341) 491? (a) 0 (b) 2 (c) 3 (d) 5
Practice sums 22. 587 x 999 (a) 586413 (b) 587523 (c) 614823 (d) 615173 23. 1904 x 1904 (a) 3654316 (b) 3632646 (c) 3625216 (d) 3623436 24. 107 x 107 + 93 x 93 (a) 19578 (b) 19418 (c) 20098 (d) 21908
Practice sums 25.Which one of following numbers is exactly divisible by 11? (a) 235641 (b) 245642 (c) 315624 (d) 415624 26. The sum of first 45 natural numbers is (a) 1035 (b) 1280 (c) 2070 (d) 2140 27. The sum of even numbers between 1 and 31 is (a) 6 (b) 128 (c) 240 (d) 512
Practice sums 28.What smallest number should be added to 4456 so that it is completely divisible by 6? (a) 4 (b) 3 (c) 2 (d) 1415624 29. The largest 4 digit number exactly divisible by 48 is (a) 9944 (b) 9768 (c) 9988 (d) 8888 30. The difference of two numbers is 1365. On dividing the larger number by the smaller, we get 6 as quotient and 15 as remainder. What is the smaller number? (a) 240 (b) 270 (c) 295 (d) 360