stthwn

Strange Things That Happen With Numbers
Part I

  1. 	Arrange the first eight digits in order, like this:

		12   3   4		56   7   8

	Now, we can add some symbols to make true facts:

		12 = 3 x 4		56 = 7 x 8


  2.	It is possible to make true and complete multiplication problems
	(that is, make the factors AND the product) in the two following
	unusual ways:

	  a)  Use only the first five digits once and only once;
	      that is, 1, 2, 3, 4, and 5.

	  b)  Use only the first five odd digits once and only once;
	      that is, 1, 3, 5, 7, and 9.

	Can you find the whole problem for each case?


  3.	Multiply 21978 by 4; then look at your answer to see a strange
	thing.


  4.	Multiply 10989 by 9; then look at your answer to see a strange
	thing.


  5.	Multiply 421,052,631,578,947,368 by 2; then look at your answer
	to see a strange thing.


  6.	Take the digits 1, 2, and 3 and make all the two-place numbers
	possible; use each digit only once per number.  (There will be
	six such numbers.)  Add up these numbers to see a strange thing.

	Do the same again, first using the digits 2, 4, and 6.  Then
	try 3, 6, and 9.

	Will this happen with any three different digits?  (No, there
	are no more in the 3-digit range.)


  7.	The year 1962 was a strange year.  To see just how strange, do
	the following steps as directed:

	  a)  Find 1/2 (one-half) of 1962;   it = __________.

	  b)  Find 1/3 (one-third) of 1962;  it = __________.

	  c)  Find 1/6 (one-sixth) of 1962;  it = __________.

	  d)  Add those three answers here. ----> __________.

	For an added strange bonus look at the individual digits that
	were in your three addends (a, b, and c).


Part II

  1.	Write the first ten prime numbers in order, as shown (Note: the
	11 is used twice):

	  2   3   5   7   11      11     13     17    19     23     29

	Now, by putting in some symbols for multiplication, addition,
	and squaring, we have

	  2 × 3 × 5 × 7 × 11      11² +  13² +  17² +  19² +  23²  + 29²

	Figure out the two parts (the left side and the right side) to
	see which side is larger in value.


  2.	Multiply 11,826 by itself and look at your answer to see a
	strange thing.

	The same strange thing also happens with 30,384.  But just
	what is the product anyway?


  3.	Take the number 153.  Find the cube (3rd power) of each of
	the three digits.  Add up these three values to see a strange
	thing.

	The same strange thing also happens with these numbers: 370,
	371, and 407.  Can you find any more?


  4.	Now we will try the same sort of thing with the following numbers.
	BUT this time you are to first find the fourth power of each digit
	before adding.  (Warning: only some of the numbers below actually
	work.  Which ones are they?)

	  a)   1634	b)  2451    c)  8208     d)  9474     e)  5072


  5.	Do you want to go for fifth powers now?  Okay, good. First, find
	the fifth power of each digit, then add up the resulting values.
	(Gee, aren't numbers strange acting sometimes?)

	  a)  4150    b)  54,748    c)  22,132   d)  4151    e) 1145

	Did they all work, or not?


Part III

  1.	Find the values of the following powers.  Then add up the digits
	of the final product to see a strange thing.
 
	  a)  17³       b)  18³       c)  27³       d)  26³

	(As an example of this idea, use 8³: 8³ = 512 and 5 + 1 + 2 = 8.
	Do you see it now?)

	Strange as this may be, it can even work with certain fourth
	powers, too.  Try it with 7, 22, and 25.

	Would you believe FIFTH powers, too?  By now, you'll probably
	believe anything, right?  Well, it's true!  Try it with these
	numbers: 28 and 35.

  2.	There is something very strange about these pairs of consecutive
	numbers.  To see what it is, first find the squares of each one
	in the pair, then look closely at the digits in the products.
	Strange, isn't it?

	  a)  13 & 14	    b)  157 & 158	c)  913 & 914


  3.	On we go with more strange things...these are rather easy.
	Just perform the indicated operations.  Then compare your
	final answer with what you started with.

	  a)  12²  +   33²  =		b)  88²  +  33²  =

	  c)  10²  +  100²  =		d)  588²  +  2353²  =


  4.	Here's a weird one, for sure.  Pay careful attention now.
	First, 	do the multiplication problems that are below.  Then,
	reverse the big factor (the 5-place number) and try to find a 
	one-place number that when it and the reversed factor are
	multiplied, you get the same product that you found the first
	time.  Try it---it's not so bad afterall.

	  a)  10989 × 9 =		d)  43956 × 6 =

	  b)  21978 × 8 =		e)  54945 × 5 =

	  c)  32967 × 7 =


Part IV

  1.	Here is another strange thing that involves all nine digits
	from 1 to 9.

	If you find the square of 567, the product will contain only
	the six other digits (1, 2, 3, 4, 8, and 9).  But, what is
	that product?

	The same kind of thing happens with 854.  What is the six-
	digit square number this time?


  2.	The square of 428 is 183,184.  This product has the strange
	property that if the six digits are separated into two halves,
	we have the consecutive 3-place numbers 183 and 184.

	This is a rare thing, to be sure.  In fact, the only numbers
	whose squares have this property are mixed into the list of
	numbers below.  Some of them work; some don't.

	So, tell me which ones work, and give the strange product.

	   573         625         727         846         904


  3.	Study this true number sentence for a moment:

		     1  + 2  + 6 = 4  +  5

	Now, believe it or not, if we square each number, then add,
	both sides will STILL be equal!  Look...

		     1² + 2² + 6² = 4² + 5²
		     1  + 4 + 36 = 16 + 25
			      41 = 41

	That, you will have to admit, is rather strange.

	Of course, by now you know these strange things just don't
	happen all the time.  So, below you will find several true
	number sentences.  BUT the square number versions may or may
	not be like the example above.

	So, for those that are true both ways, show me why they are
	(that is, find the squares and the equal totals).

		1 + 8 + 9 = 3 + 4 + 11

		7 + 9 + 12 = 6 + 10 + 13

		2 + 7 + 10 = 4 + 6 + 9

		2 + 7 + 9 = 3 + 5 + 10

		1 + 5 + 7 + 9 = 2 + 4 + 6 + 10

		5 + 7 + 7 + 8 = 3 + 4 + 6 + 14

		1 + 5 + 8 + 12 = 2 + 3 + 10 + 11


Part V

  1.	Try this.  Pick the name of any number you wish.  Count the
	number of letters that are in it.  Write that number as a
	word again.  Do the counting part again.  Keep on doing this
	until a surprise strikes you.

	Here is an example to explain the idea:

	  THIRTY-THREE ==> ELEVEN ==> SIX ==> (go on...)


	Do this with at least five different number names.  Be sure
	to try some "BIG" numbers.  What result(s) do you find?


  2.	Pick any number.  If it is even, cut it in half (divide by 2).
	If it is odd, multiply it by 3, then add 1.  Continue with
	these two rules with each new answer you get, until a surprise
	shows up.

	Here are two examples:

	  a)  13 ==> 40 ==> 20 ==> 10 ==> 5 ==> 16 ==> (go on...)


	  b) 106 ==> 53 ==> 160 ==> 80 ==> (go on...)


	Do this with five more numbers that you choose.  What result(s)
	do you find?


  3.	Pick any number.  Find the square of each of its digits; then
	add those digits.  Take the sum and continue the process, over
	and over, until a surprise shows up.

	Here are two examples:

	  a)  18     1     36     36      9     25
                  + 64   + 25   +  1   + 49   + 64   (go on...)

		    65     61     37     58     89


	  b)  1333    1      4     36
		      9   + 64   + 64    (go on...)
		      9     68    100
		    + 9
		     28

	Do this process with these six numbers and tell what results
	you find.  Then pick your own number (make it greater than
	1000) and do the process on it.

	  A)    92	B)   4208       C)   23

	  D)   153	E)  54,151	F)  657

	


tt(Jan & Feb/77)
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