Park Forest Math Team. Meet #2. Number Theory. Self-study Packet
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1 Park Forest Math Team Meet #2 Number Theory Self-study Packet Problem Categories for this Meet: 1. Mystery: Problem solving 2. Geometry: Angle measures in plane figures including supplements and complements 3. Number Theory: Divisibility rules, factors, primes, composites 4. Arithmetic: Order of operations; mean, median, mode; rounding; statistics 5. Algebra: Simplifying and evaluating expressions; solving equations with 1 unknown including identities
2 Meet #2 Number Theory Ideas you should know: Prime Factorization: Every number 2,3,4, can be written as a product of prime number factors. For example, 12 = 2x2x3, or What is the prime factorization of 60? Answer: , or = = = = To the Zero Power: Any non-zero number to the zero power is one. 5 0 =1. This makes sense if you think that 5 3 5=5 2, and 5 2 5=5 1, so 5 1 5=5 0, which is the same as 5 5=5 0 =1. (0 0 is undefined, not 1.) 5 0 =1 5 1 =1x5 = =1x5x5=25 Least Common Multiple (LCM): LCM(a,b) is the least (smallest) number that is a multiple of both a and b. For example, LCM(6,10) = 30 because both 6 and 10 are factors of 30, and there is no smaller number than 30 that does this. One way of computing LCM(a,b) is by prime factoring a and b. Then, for each prime factor, take the larger of the two exponents. For example, 6= , and 10= The larger exponents: =30. LCM(2, 3) = 6 LCM(2,4) = 4 LCM(10,15) = 30 LCM(6,10) = 30 LCM(8,12) = 24 LCM(6,?) = 18 (?=9 or 18) Meet #2, Number Theory
3 Greatest Common Factor (GCF): GCF(a,b) is the greatest (largest) number that is a factor of both a and b. For example, GCF(6,10) = 2 because 2 is a factor of both 6 and 10, and there is no larger number that does this. One way of computing GCF(a,b) is by prime factoring a and b, and then, for each prime factor, take the smaller of the two exponents. For example, 6= , and 10= The smaller exponents: =2. Useful trick: GCF(a,b) x LCM(a,b) = a x b. GCF(2,3) = 1 GCF(4,6) = 2 GCF(12, 16) = 4 GCF(12,18)=6 GCF(17,24)=1 GCF(11, 22) = 11 GCF(10,?) x LCM(10,?) = 30 (? = 3, because GCFxLCM=3x10) Proper Factor: A factor of a number other than the number itself or one. The proper factors of 6 are 2 and 3, but not 1 or 6. There are no proper factors of prime numbers. Factors of 6: 1, 2, 3, 6 Proper Factors: 2, 3 Factors of 7: 1, 7 Proper Factors: None Relatively Prime: Two numbers are relatively prime if they have no common factors other than 1. Their GCF is 1. For example, 7 and 8 are relatively prime as they share no factors greater than 1. If the difference between two numbers is prime, then the numbers are relatively prime. If GCF(A,B)=1, then A and B are relatively prime. If A B = prime, then GCF(A,B)=1 Are 21 and 91 relatively prime? Are 10 and 21 relatively prime? No, GCF(21,91)=7 Yes, 2x5 and 3x7 share no factors. Meet #2, Number Theory
4 Number of Factors: 12 has 6 factors: 1,2,3,4,6,12 (we count 1 and 12). To count them, do prime factorization first. Take the exponents, add one to each, and multiply. For example, 12= , so the exponents are 2 and 1. Add one to each: 3 and 2. Multiply: 2x3=6. So, 12 has 6 factors, same as we listed above. How many factors does 1000 have? 1000= , so it has 4x4=16 factors. Another way to count the number of factors is to list them in pairs and be sure you got them all That s the hard part. 3+1=4 200= x3=12 factors 2+1=3 1 x200 2 x100 4 x 50 5 x 40 8 x 25 10x20 = 12 factors Perfect squares have an odd number of factors. 36=1x36, 2x18,3x12,4x9,6x6, or 9 distinct factors. 36=2 2 x3 2, (2+1)x(2+1)=9 factors. Factors of 49: 1, 7, 49 = 3 factors an odd number Factors of 36: 1, 2, 3, 4, 6, 9, 12, 18, 36 = 9 factors (odd) Euler s GCF Method (Fast way to compute Greatest Common Factor): If A>B, then GCF(A,B) = GCF(A-B,B). This works because if A and B have a common factor, then A-B has the same factor. Repeat until obvious. GCF(130,91) = GCF(130-91, 91) = GCF(39, 91) = GCF(91, 39) = GCF(91-39, 39) = GCF(52,39) = GCF(52-39, 39) = GCF(13,39) = 13 Meet #2, Number Theory
5 Category 3 Number Theory ""#$%&$$$$$$'"(")*"+$&,-,$ "# $%&'()'%*+*&)',-..-/012'(32*-4 &/5 6 7# 8%*9:*&'*)',-..-/;&<'-:=9,;>-4'?-/&'1:&2/1.@*:) () A&/5'%*(: 3:-51<'= >() # $%&'()'%*).&22*)'3-))(@2*) B# C/&4&:&?&DE&2&FDAB<-.*')&:*G()(@2*4:-.32&/*'H"I,-.*'J23%&()G()(@2**G*:DKD*&:)A&/5?&)2&)')**/(/7LLM#,-.*'N*'&()G()(@2**G*:DMD*&:)A&/5?&)2&)')**/(/7LLO#,-..*'9&..&()G()(@2**G*:DPD*&:)A&/5?&)2&)')**/(/7LLO# C/?%&'D*&:?(22&22'%:**<-.*')@*G()(@2*'-E*'%*:&E&(/ """#$%&'%#()*
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
7 Category 3 Number Theory Meet #2, December What is the Greatest Common Factor of 216 and 504? 2. The prime factorization of X is " # $ %. None of the values of & '& $&()*(+ is equal to 2. Only one of the four values is 1. All four values of & '& $&(,-.(+ are different. What is the smallest possible value of X? 3. The Least Common Multiple of positive integers and ' is 144. The Greatest Common Factor of and ' is 12. What is the value of ' / 01?
8 Solutions to Category 3 Number Theory Meet #2, December "# $ % & ' % and ()* $ % & ' + &, - The Greatest Common Factor of 216 and 504 is equal to % & ' + $, Since none of the values can be equal to 2,. and / should be 3 and 5 if we want X to be as small as possible (they can t be 1 since 1 isn t prime). Since we can use 1 just once, using it as the exponent of 5 will keep X smallest. That leaves the exponent for 3. The smallest value left to use is 4. So X =0' 1 & ( - $ 2" & ( $ *)(. Editor note: We can t use zero as no proper prime factorization has a zero as either a base or an exponent. Otherwise, there would be no unique prime factorization: 10 = or , etc. See the Fundamental Theorem of Arithmetic. 3. The LCM(.3 4) times the GCF(.3 4) will always be equal to the product of. and 4. So.4 $ " & "** $ ",2 and.4 5, $ ",2 5, $ #*. A faster way to compute that would be -+& $ 1&-11 7 $ 1&-8 - $ #*.
9 Category 3 Number Theory Meet #2, December Give the prime factorization of 792. You may use exponents or not, but you must list the primes from least to greatest. For example, the prime factorization of 60 can be written as or as The product of two numbers is 396. If the greatest common factor (GCF) of these two numbers is 3, what is the least common multiple (LCM) of these two numbers? 3. At the manufacturing plant of Gadgets & Gizmos, Inc., it takes 1 hour and 24 minutes to assemble a gadget and 1 hour and 52 minutes to assemble a gizmo. At 9:12 AM one morning, a new gadget and a new gizmo roll off the assembly lines simultaneously. Give the time of day, using AM or PM, for the next time that a new gadget and a new gizmo will roll off the assembly line simultaneously
10 Solutions to Category 3 Number Theory Meet #2, December or :48 PM 1. The prime factorization of 792 can be written in exponential form, with the primes listed from least to greatest as or Without exponents, we would write We will also accept the symbol for multiplication. 2. In general, the product of the GCF and the LCM of two numbers is equal to the product of the two numbers. We know the product of the two numbers, so if we divide by the GCF we will get the LCM: = 132. Students with correct answer in a cluster of 6 schools: 1. 30/ /36 3. Gadgets take 1 hour and 24 minutes, or = 84 minutes. Gizmos take 1 hour and 52 minutes, or = 112 minutes. We are looking for the least common multiple of 84 and 112. The prime factorizations are 84 = and 112 = Taking the greatest number of each prime factor, we find that the LCM is = 336. This means that after 336 minutes, a new gadget and a new gizmo will again roll off the assembly line simultaneously. This many minutes is 5 hours and 36 minutes, so we need to find the time of day that is 5 hours and 36 minutes after 9:12 AM. In military time, this would be 14:48. In regular time, it will be 2:48 PM /36
11 Category 3 Number Theory Meet #2, November Find the greatest common factor (GCF) of 5,409,149,074,560 and 37,644,750, given their prime factorizations below. 5,409,149,074,560 = ,644,750 = If LCM(a,b) = 90 and LCM(a,c) = 36, then what is the value of LCM(a,b,c)? Note: LCM(a,b) means the least common multiple of a and b. 3. If m is a proper factor of 208 and n is a proper factor of 288 and GCF(m,n) = 2, then what is the greatest possible value of m + n? Note: A proper factor is a factor of a number other than the number itself
12 Solutions to Category 3 Average team got points, or 0.9 questions correct Number Theory Meet #2, November The greatest common factor of the two numbers is the product of the primes that they have in common. For each prime factor, we use the lower exponent to create the GCF. Thus the GCF of the two numbers is = = = The LCM(a,b,c) is the least common multiple of the LCM(a,b) and the LCM(a,c). In other words, we need to find LCM(90,36). It is helpful to consider the prime factors of each number: 90 = and 36 = The LCM of these two numbers must have all the prime factors of each and no extras. If we start with the prime factorization of 90, we only need one more factor of 2 to create a multiple of 36. Thus the LCM of 90 and 36 and also of a, b, and c is 90 2 = The proper factors of 208 are 1, 2, 4, 8, 13, 16, 26, 52, and 104. The proper factors of 288 are 1, 2, 3, 4, 6, 8, 9, 12, 16, 18, 24, 32, 36, 48, 72, 96, and 144. Taking one number from each list and making sure their GCF is 2, we get the greatest possible sum from 144 and 26, namely
13 Category 3 Number Theory Meet #2 December What is the Least Common Multiple of and? 2. The Greatest Common Factor (GCF) of two natural numbers is, and their product ( ) is. What is the smallest possible sum of? 3. In a far away galaxy, 3 comets are visible from planet 51: Comet Alpha is visible every 6 years, and was last seen in Comet Beta is visible every 7 years, and was last seen in Commet Gamma is visible every 8 years, and was last seen in In what year will all three comets be visible together again?
14 Meet #2 December 2010 Solutions to Category 3 Number Theory 1. The Least Common Multiple (LCM) is the product of all prime factors with their highest powers: , The product of two numbers is equal to the product of their and :, which in our case is, so we know that. Since then only one of the numbers can have as a prime factor, not both of them. Both numbers have as a factor, but only one of them has as a factor (otherwise, the would have been ). So either, or The second pair has the smaller sum,. 3. For convenience we can deduct from all years: Alpha is visible in years: (remainder 1 when divided by 6) Beta is visible in years: (remainder 2 when divided by 7) Gamma is visible in years: (remainder 1 when divided by 8) So to find the year when all appear, we need to find a number that fits all three conditions. Since (the years for) Alpha and Gamma both should leave a remainder of 1 when divided by 6 or 8, our year should leave a remainder of 1 when divided by any multiple of 6 and 8, and specifically by their LCM,. So our year can be one of the numbers but also needs to leave a remainder of 2 when divided by 7. The first number in this series to fit the bill is. So our year is.
15 Category 3 Number Theory Meet #2, November/December Some IMLEM Clusters will take Meet #2 on Thursday, 12/06. Find the prime factorization of You can use exponents or not, but you must write the prime factors in order from least to greatest. 2. Grace was supposed to find the greatest common factor (GCF) of 330 and 462, but she found the greatest common prime factor (GCPF) instead. What is the ratio of the GCF of 330 and 462 and the GCPF that Grace found? 3. At the Gadgets and Gizmos factory, workers complete a gadget every 588 minutes and a gizmo every 882 minutes. The factory is open 24 hours a day, seven days a week, and the workers always complete the gadgets and gizmos on schedule. If it happens that a gadget and a gizmo are completed at the same time at 3:00 PM on Thursday, November 29, how many additional times will a gadget and a gizmo be completed at the same time before 3:00 PM on Thursday, December 6? times
16 Solutions to Category 3 Number Theory Meet #2, November/December A systematic way to find the prime factorization of a number is to divide out primes in order of the primes as shown in the so-called ladder at right. The prime factorization of 1206 is or, using exponents, it s or times 2. The prime factorization of 330 is and that of 462 is The GCF is = 66 and the GCPF is 11, so the desired ratio is 66/11 = 6. Editor note: The original problem asked How many times greater is the actual GCF of 330 and 462 than the GCPF that Grace found? This was changed here to remove any ambiguity. 3. The prime factorization of 588 is , and that of 882 is The LCM of these two numbers is = This means that a gadget and a gizmo are completed simultaneously every 1764 minutes. There are = 10,080 minutes in a week. Five times 1764 = 8820 and = 10584, so gadgets and gizmos will be completed simultaneously an additional 5 times in the next week.
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