magic of numbers
DESCRIPTION
About some of the ways one can play with numbers. Intended for those trying to learn/teach Arithmetic in a fun way.TRANSCRIPT
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Magic of NumbersMagic of Numbers
9474=94+44+74+44
548834=56+46
+86+86
+36+46
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Playing with NumbersFeynman and the Abacus
Raios cubicos!
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Numbers are toys.They are meant
to be played with, not feared of!!
You must know them!!
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Game 1 : Figurate numbers
You see?Patterns!
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Triangular Numbers
Formulaaaaa!!!!!!!!
n(n+1)
2
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Pascal's Triangle
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There are more ways!!
Moessner's magic
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
Squares
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 20
1 4 9 16 25 36 ............ and so on
For cubes???
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Moessner's magic
Triangular numbers1 2 3 4 5 61 3 6 10 15 21
Factorials
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 2 6 11 18 26 35 46 58 71 85
6 24 50 96 154 225 24 120 274
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Patterns they just don't stop
Counting numbers
and Hexagonal numbers
Its him.Fermat!!
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Game 2 : Representing Numbers
● Numerous ways to represent a single number
● e.g. 1729
– 1729 = = ● Particularly interesting in cases like these
– 153 = – 4150 =
103+93 123+13
13+53
+33
45+15
+55+05
A new puzzle;Time to trouble
friends!!
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Number with same digits
● 24 = 8 + 8 + 8 = 22 + 2 ; so far so good
● 24 =
– Now we are talking● What else can you think of ?
33−3
There is exactly one more way
for 3 digits
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24 puzzle
● 24 = (11 + 1)(1 + 1) = 3(3 x 3 – 3 / 3)
= 4(4 + 4) – (4 + 4) = (6+6)(6+6)/6
=
● Can we generalize it?
22+22/2
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Magical 24
● Solution for 7 digits
e.g.
nn+nn+n+nn
77+77+7+77
=24 It is not the only way though.
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Game 3 : Divisibility
● Divisibility tests
● Is there a test for every number?
● Are there more than one tests for a number?
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3 – not limited to sum of digits
● Case of 283524 (2 + 8 + 3 + 5 + 2 + 4 = 24)
● Summing 2 digits at a time
– 28 + 35 + 24 = 87● Summing 3 digits at a time
– 283 + 524 = 807
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What difference it makes?
● 9801 = 99 x 99 | 98 + 01 = 99
● Adding 2 digits at a time is test of 99
● What can be test for 999 then?
● Works for 3, 33, 333 etc. as well
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Puzzling 111
● Test of 11 is not too different
– Subtraction is a kind of addition (-ve integers)● Will similar generalization work for 11, 111 etc. ?
● 234543 = 111 x 2113
● 23|45|43 23-45+43 = 21; not working
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What are we missing?
● 9 = , 11 =
● 99 =
● 111 does not fit, 101 fits. Let's check!
● 596102 = 101 x 5902
● 59|61|02 59-61+02 = 0
101−1 101+1
102−1
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Curious case of divisibility by 3
● 13|2 13 – 2 x 2 = 9
● Seems interesting; check for others
● 8805
– 880|5– 880 – 5 x 2 = 870– 87|0– 87 = 3 x 29
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Curious case of divisibility by 3ददततीय
● 13|2 13 + 2 x 4 = 21
● 8805
– 880|5– 880 + 5 x 4 = 900
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7 and 13
● 182 = 7 x 26
– 18|2 18 – 2 x 2 = 14
● 5512 = 13 x 424
– 551|2 551 + 2 x 4 = 559– 55|9 55 + 9 x 4 = 91
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● Prime check
● Divisibility of 49, 51
● Fibonacci numbers
● Number of factorsFew more to think
by yourself