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WIKIPEDIA HAS MANY MORE DIVISIBILITY RULES
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EXAMPLE 123452 Since 52=13(4) is divisible by 4, 123452 is divisible by 4 Since 452=56(8)+4 is not divisible by 8, 123452 is not divisible by 8 123452 - twice the last digit is 2(2)=4 and 12345-4=12341 12341 – twice the last digit is 2(1)=2 and 1234-2=1232 1232 – twice the last digit is 2(2) =4 and 123-4=119 119 – twice the last digit is 2(9)=18 and 11-18=-7 is divisible by 7 123452 IS DIVISIBLE BY 7
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EXAMPLE IS 1234567 DIVISIBLE BY 13? USE THE LIST 1,10,9,12,3,4 REPEATEDLY AS NEEDED 1x7 + 10x6 + 9x5 + 12x4 + 3x3 + 4x2 + (start over) + 1x1 = 7+60+45+48+9+8+1=67+93+17+1=160+18=178 NOW DO IT AGAIN! 1x8 + 10x7 + 9x1 = 8+70+9=70+17=87 NOW DO IT AGAIN! (DOESN’T HELP) 1x7+10x8=7+80=87 Since 87=6(13)+9 The remainder when dividing 87 by 13 is 9 and so the remainder when dividing 1234567 by 13 is also 9.
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The Euclidean Algorithm To Find Greatest Common Divisors WITHOUT FACTORING!
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IF YOU WANT TO FIND GCD(a,b) then Note that if any number D divides a and b then it will also divide a-Nb for any positive integer N. So this means that GCD(a,b)=GCD(b,a-Nb) We make these numbers smaller and continue the thinking!
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SO NOTE THE FOLLOWING! IN EVERY SLIDE WE WILL ASK A QUESTION WITH THE SAME ANSWER! THE QUESTIONS ARE GETTING EASIER AND EASIER! THIS IS COMMON IN MATHEMATICS – FOR EXAMPLE WE MIGHT ASK HOW DO YOU SOLVE 2X+3=19? WE CHANGE THE QUESTION TO HOW DO YOU SOLVE 2X=16? THEN HOW DO YOU SOLVE X=8? I.E. YOU KEEP GOING UNTIL THE ANSWER IS OBVIOUS!
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FIND GREATEST COMMON DIVISOR OF 15158 AND 6307 WHAT IS THE QUOTIENT AND REMAINDER WHEN DIVIDING 15158 BY 6307? 15158=2(6307)+2544
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NOW FIND GREATEST COMMON DIVISOR OF 6307 AND 2544 WHAT IS THE QUOTIENT AND REMAINDER WHEN DIVIDING 6307 BY 2544? 6307=2(2544)+1219
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NOW FIND GREATEST COMMON DIVISOR OF 2544 AND 1219 WHAT IS THE QUOTIENT AND REMAINDER WHEN DIVIDING 2544 BY 1219? 2544=2(1219)+106
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NOW FIND GREATEST COMMON DIVISOR OF 1219 AND 106 WHAT IS THE QUOTIENT AND REMAINDER WHEN DIVIDING 1219 BY 106? 1219=11(106)+53
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NOW FIND GREATEST COMMON DIVISOR OF 106 AND 53 WHAT IS THE QUOTIENT AND REMAINDER WHEN DIVIDING 106 BY 53? 106=2(53)+0 The zero says we are done so GCD(15158,6307)=53
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EXAMPLES FOR YOU TO TRY! FIND THE GCD OF 23 and 123. FIND the GCD of 12356 and 12346. FIND the GCD of TWO SOCIAL SECURITY NUMBERS.
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Divisibility Puzzle Form an integer by using each of {1,2,3,4,5,6,7,8,9} Exactly once so that The first k-digits are divisible by k for k=1,2,…,9
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Divisibility Puzzle EXAMPLE The first k-digits are divisible by k For Example 123456789 Partially works since 1 is divisible by 1 12 is divisible by 2 123 is divisible by 3 BUT 1234 is not divisible by 4.
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WIKIPEDIA HAS MANY MORE DIVISIBILITY RULES
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