Follow up to this question:
I want to calculate 1/1048576 and get the correct result, i.e. 0.00000095367431640625.
Using BigDecimal's / truncates the result:
require 'bigdecimal'
a = BigDecimal.new(1)
#=> #<BigDecimal:7fd8f18aaf80,'0.1E1',9(27)>
b = BigDecimal.new(2**20)
#=> #<BigDecimal:7fd8f189ed20,'0.1048576E7',9(27)>
n = a / b
#=> #<BigDecimal:7fd8f0898750,'0.9536743164 06E-6',18(36)>
n.to_s('F')
#=> "0.000000953674316406" <- should be ...625
This really surprised me, because I was under the impression that BigDecimal would just work.
To get the correct result, I have to use div with an explicit precision:
n = a.div(b, 100)
#=> #<BigDecimal:7fd8f29517a8,'0.9536743164 0625E-6',27(126)>
n.to_s('F')
#=> "0.00000095367431640625" <- correct
But I don't really understand that precision argument. Why do I have to specify it and what value do I have to use to get un-truncated results?
Does this even qualify as "arbitrary-precision floating point decimal arithmetic"?
Furthermore, if I calculate the above value via:
a = BigDecimal.new(5**20)
#=> #<BigDecimal:7fd8f20ab7e8,'0.9536743164 0625E14',18(27)>
b = BigDecimal.new(10**20)
#=> #<BigDecimal:7fd8f2925ab8,'0.1E21',9(36)>
n = a / b
#=> #<BigDecimal:7fd8f4866148,'0.9536743164 0625E-6',27(54)>
n.to_s('F')
#=> "0.00000095367431640625"
I do get the correct result. Why?
BigDecimal can perform arbitrary-precision floating point decimal arithmetic, however it cannot automatically determine the "correct" precision for a given calculation.
For example, consider
BigDecimal.new(1)/BigDecimal.new(3)
# <BigDecimal:1cfd748, '0.3333333333 33333333E0', 18(36)>
Arguably, there is no correct precision in this case; the right value to use depends on the accuracy required in your calculations. It's worth noting that in a mathematical sense†, almost all whole number divisions result in a number with an infinite decimal expansion, thus requiring rounding. A fraction only has a finite representation if, after reducing it to lowest terms, the denominator's only prime factors are 2 and 5.
So you have to specify the precision. Unfortunately the precision argument is a little weird, because it seems to be both the number of significant digits and the number of digits after the decimal point. Here's 1/1048576 for varying precision
1 0.000001
2 0.00000095
3 0.000000953
9 0.000000953
10 0.0000009536743164
11 0.00000095367431641
12 0.000000953674316406
18 0.000000953674316406
19 0.00000095367431640625
For any value less than 10, BigDecimal truncates the result to 9 digits which is why you get a sudden spike in accuracy at precision 10: at that point is switches to truncating to 18 digits (and then rounds to 10 significant digits).
† Depending on how comfortable you are comparing the sizes of countably infinite sets.
So this is weird. I'm in Ruby 1.9.3, and float addition is not working as I expect it would.
0.3 + 0.6 + 0.1 = 0.9999999999999999
0.6 + 0.1 + 0.3 = 1
I've tried this on another machine and get the same result. Any idea why this might happen?
Floating point operations are inexact: they round the result to nearest representable float value.
That means that each float operation is:
float(a op b) = mathematical(a op b) + rounding-error( a op b )
As suggested by above equation, the rounding error depends on operands a & b.
Thus, if you perform operations in different order,
float(float( a op b) op c) != float(a op (b op c))
In other words, floating point operations are not associative.
They are commutative though...
As other said, transforming a decimal representation 0.1 (that is 1/10) into a base 2 representation (that is 1/16 + 1/64 + ... ) would lead to an infinite serie of digits. So float(0.1) is not equal to 1/10 exactly, it also has a rounding-error and it leads to a long serie of binary digits, which explains that following operations have a non null rounding-error (mathematical result is not representable in floating point)
It has been said many times before but it bears repeating: Floating point numbers are by their very nature approximations of decimal numbers. There are some decimal numbers that cannot be represented precisely due to the way the floating point numbers are stored in binary. Small but perceptible rounding errors will occur.
To avoid this kind of mess, you should always format your numbers to an appropriate number of places for presentation:
'%.3f' % (0.3 + 0.6 + 0.1)
# => "1.000"
'%.3f' % (0.6 + 0.1 + 0.3)
# => "1.000"
This is why using floating point numbers for currency values is risky and you're generally encouraged to use fixed point numbers or regular integers for these things.
First, the numerals “0.3”, “.6”, and “.1” in the source text are converted to floating-point numbers, which I will call a, b, and c. These values are near .3, .6, and .1 but not equal to them, but that is not directly the reason you see different results.
In each floating-point arithmetic operation, there may be a little rounding error, some small number ei. So the exact mathematical results your two expressions calculate is:
(a + b + e0) + c + e1 and
(b + c + e2) + a + e3.
That is, in the first expression, a is added to b, and there is a slight rounding error e0. Then c is added, and there is a slight rounding error e1. In the second expression, b is added to c, and there is a slight rounding error e2. Finally, a is added, and there is a slight rounding error e3.
The reason your results differ is that e0 + e1 ≠ e2 + e3. That is, the rounding that was necessary when a and b were added was different from the rounding that was necessary when b and c were added and/or the roundings that were necessary in the second additions of the two cases were different.
There are rules that govern these errors. If you know the rules, you can make deductions about them that bound the size of the errors in final results.
This is a common limitation of floating point numbers, due to their being encoded in base 2 instead of base 10. It can be difficult to understand, but once you do, you can easily avoid problems like this. I recommend this guide, which goes in depth to explain it.
For this problem specifically, you might try rounding your result to the nearest millionths place:
result = (0.3+0.6+0.1)
=> 0.9999999999999999
(result*1000000.0).round/1000000.0
=> 1.0
As for why the order matters, it has to do with rounding. When those numbers are turned into floats, they are converted to binary, and all of them become repeating fractions, like ⅓ is in decimal. Since the result gets rounded during each addition, the final answer depends on the order of the additions. It appears that in one of those, you get a round-up, where in the other, you get a round-down. This explains the discrepancy.
It is worth noting what the actual difference is between those two answers: approximately 0.0000000000000001.
In view you can use also the number_with_precision helper:
result = 0.3 + 0.6 + 0.1
result = number_with_precision result, :precision => 3
Scroll down to see latest edit, I left all this text here just so that I don't invalidate the replies this question has received so far!
I have the following brain teaser I'd like to get a solution for, I have tried to solve this but since I'm not mathematically that much above average (that is, I think I'm very close to average) I can't seem wrap my head around this.
The problem: Given number x should be split to a serie of multipliers, where each multiplier <= y, y being a constant like 10 or 16 or whatever. In the serie (technically an array of integers) the last number should be added instead of multiplied to be able to convert the multipliers back to original number.
As an example, lets assume x=29 and y=10. In this case the expected array would be {10,2,9} meaning 10*2+9. However if y=5, it'd be {5,5,4} meaning 5*5+4 or if y=3, it'd be {3,3,3,2} which would then be 3*3*3+2.
I tried to solve this by doing something like this:
while x >= y, store y to multipliers, then x = x - y
when x < y, store x to multipliers
Obviously this didn't work, I also tried to store the "leftover" part separately and add that after everything else but that didn't work either. I believe my main problem is that I try to think this in a way too complex manner while the solution is blatantly obvious and simple.
To reiterate, these are the limits this algorithm should have:
has to work with 64bit longs
has to return an array of 32bit integers (...well, shorts are OK too)
while support for signed numbers (both + and -) would be nice, if it helps the task only unsigned numbers is a must
And while I'm doing this using Java, I'd rather take any possible code examples as pseudocode, I specifically do NOT want readily made answers, I just need a nudge (well, more of a strong kick) so that I can solve this at least partly myself. Thanks in advance.
Edit: Further clarification
To avoid some confusion, I think I should reword this a bit:
Every integer in the result array should be less or equal to y, including the last number.
Yes, the last number is just a magic number.
No, this is isn't modulus since then the second number would be larger than y in most cases.
Yes, there is multiple answers to most of the numbers available, however I'm looking for the one with least amount of math ops. As far as my logic goes, that means finding the maximum amount of as big multipliers as possible, for example x=1 000 000,y=100 is 100*100*100 even though 10*10*10*10*10*10 is equally correct answer math-wise.
I need to go through the given answers so far with some thought but if you have anything to add, please do! I do appreciate the interest you've already shown on this, thank you all for that.
Edit 2: More explanations + bounty
Okay, seems like what I was aiming for in here just can't be done the way I thought it could be. I was too ambiguous with my goal and after giving it a bit of a thought I decided to just tell you in its entirety what I'd want to do and see what you can come up with.
My goal originally was to come up with a specific method to pack 1..n large integers (aka longs) together so that their String representation is notably shorter than writing the actual number. Think multiples of ten, 10^6 and 1 000 000 are the same, however the representation's length in characters isn't.
For this I wanted to somehow combine the numbers since it is expected that the numbers are somewhat close to each other. I firsth thought that representing 100, 121, 282 as 100+21+161 could be the way to go but the saving in string length is neglible at best and really doesn't work that well if the numbers aren't very close to each other. Basically I wanted more than ~10%.
So I came up with the idea that what if I'd group the numbers by common property such as a multiplier and divide the rest of the number to individual components which I can then represent as a string. This is where this problem steps in, I thought that for example 1 000 000 and 100 000 can be expressed as 10^(5|6) but due to the context of my aimed usage this was a bit too flaky:
The context is Web. RESTful URL:s to be specific. That's why I mentioned of thinking of using 64 characters (web-safe alphanumberic non-reserved characters and then some) since then I could create seemingly random URLs which could be unpacked to a list of integers expressing a set of id numbers. At this point I thought of creating a base 64-like number system for expressing base 10/2 numbers but since I'm not a math genius I have no idea beyond this point how to do it.
The bounty
Now that I have written the whole story (sorry that it's a long one), I'm opening a bounty to this question. Everything regarding requirements for the preferred algorithm specified earlier is still valid. I also want to say that I'm already grateful for all the answers I've received so far, I enjoy being proven wrong if it's done in such a manner as you people have done.
The conclusion
Well, bounty is now given. I spread a few comments to responses mostly for future reference and myself, you can also check out my SO Uservoice suggestion about spreading bounty which is related to this question if you think we should be able to spread it among multiple answers.
Thank you all for taking time and answering!
Update
I couldn't resist trying to come up with my own solution for the first question even though it doesn't do compression. Here is a Python solution using a third party factorization algorithm called pyecm.
This solution is probably several magnitudes more efficient than Yevgeny's one. Computations take seconds instead of hours or maybe even weeks/years for reasonable values of y. For x = 2^32-1 and y = 256, it took 1.68 seconds on my core duo 1.2 ghz.
>>> import time
>>> def test():
... before = time.time()
... print factor(2**32-1, 256)
... print time.time()-before
...
>>> test()
[254, 232, 215, 113, 3, 15]
1.68499994278
>>> 254*232*215*113*3+15
4294967295L
And here is the code:
def factor(x, y):
# y should be smaller than x. If x=y then {y, 1, 0} is the best solution
assert(x > y)
best_output = []
# try all possible remainders from 0 to y
for remainder in xrange(y+1):
output = []
composite = x - remainder
factors = getFactors(composite)
# check if any factor is larger than y
bad_remainder = False
for n in factors.iterkeys():
if n > y:
bad_remainder = True
break
if bad_remainder: continue
# make the best factors
while True:
results = largestFactors(factors, y)
if results == None: break
output += [results[0]]
factors = results[1]
# store the best output
output = output + [remainder]
if len(best_output) == 0 or len(output) < len(best_output):
best_output = output
return best_output
# Heuristic
# The bigger the number the better. 8 is more compact than 2,2,2 etc...
# Find the most factors you can have below or equal to y
# output the number and unused factors that can be reinserted in this function
def largestFactors(factors, y):
assert(y > 1)
# iterate from y to 2 and see if the factors are present.
for i in xrange(y, 1, -1):
try_another_number = False
factors_below_y = getFactors(i)
for number, copies in factors_below_y.iteritems():
if number in factors:
if factors[number] < copies:
try_another_number = True
continue # not enough factors
else:
try_another_number = True
continue # a factor is not present
# Do we want to try another number, or was a solution found?
if try_another_number == True:
continue
else:
output = 1
for number, copies in factors_below_y.items():
remaining = factors[number] - copies
if remaining > 0:
factors[number] = remaining
else:
del factors[number]
output *= number ** copies
return (output, factors)
return None # failed
# Find prime factors. You can use any formula you want for this.
# I am using elliptic curve factorization from http://sourceforge.net/projects/pyecm
import pyecm, collections, copy
getFactors_cache = {}
def getFactors(n):
assert(n != 0)
# attempt to retrieve from cache. Returns a copy
try:
return copy.copy(getFactors_cache[n])
except KeyError:
pass
output = collections.defaultdict(int)
for factor in pyecm.factors(n, False, True, 10, 1):
output[factor] += 1
# cache result
getFactors_cache[n] = output
return copy.copy(output)
Answer to first question
You say you want compression of numbers, but from your examples, those sequences are longer than the undecomposed numbers. It is not possible to compress these numbers without more details to the system you left out (probability of sequences/is there a programmable client?). Could you elaborate more?
Here is a mathematical explanation as to why current answers to the first part of your problem will never solve your second problem. It has nothing to do with the knapsack problem.
This is Shannon's entropy algorithm. It tells you the theoretical minimum amount of bits you need to represent a sequence {X0, X1, X2, ..., Xn-1, Xn} where p(Xi) is the probability of seeing token Xi.
Let's say that X0 to Xn is the span of 0 to 4294967295 (the range of an integer). From what you have described, each number is as likely as another to appear. Therefore the probability of each element is 1/4294967296.
When we plug it into Shannon's algorithm, it will tell us what the minimum number of bits are required to represent the stream.
import math
def entropy():
num = 2**32
probability = 1./num
return -(num) * probability * math.log(probability, 2)
# the (num) * probability cancels out
The entropy unsurprisingly is 32. We require 32 bits to represent an integer where each number is equally likely. The only way to reduce this number, is to increase the probability of some numbers, and decrease the probability of others. You should explain the stream in more detail.
Answer to second question
The right way to do this is to use base64, when communicating with HTTP. Apparently Java does not have this in the standard library, but I found a link to a free implementation:
http://iharder.sourceforge.net/current/java/base64/
Here is the "pseudo-code" which works perfectly in Python and should not be difficult to convert to Java (my Java is rusty):
def longTo64(num):
mapping = "ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz0123456789-_"
output = ""
# special case for 0
if num == 0:
return mapping[0]
while num != 0:
output = mapping[num % 64] + output
num /= 64
return output
If you have control over your web server and web client, and can parse the entire HTTP requests without problem, you can upgrade to base85. According to wikipedia, url encoding allows for up to 85 characters. Otherwise, you may need to remove a few characters from the mapping.
Here is another code example in Python
def longTo85(num):
mapping = "ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz0123456789-_.~!*'();:#&=+$,/?%#[]"
output = ""
base = len(mapping)
# special case for 0
if num == 0:
return mapping[0]
while num != 0:
output = mapping[num % base] + output
num /= base
return output
And here is the inverse operation:
def stringToLong(string):
mapping = "ABCDEFGHIJKLMNOPQRSTUVWXYZabcdefghijklmnopqrstuvwxyz0123456789-_.~!*'();:#&=+$,/?%#[]"
output = 0
base = len(mapping)
place = 0
# check each digit from the lowest place
for digit in reversed(string):
# find the number the mapping of symbol to number, then multiply by base^place
output += mapping.find(digit) * (base ** place)
place += 1
return output
Here is a graph of Shannon's algorithm in different bases.
As you can see, the higher the radix, the less symbols are needed to represent a number. At base64, ~11 symbols are required to represent a long. At base85, it becomes ~10 symbols.
Edit after final explanation:
I would think base64 is the best solution, since there are standard functions that deal with it, and variants of this idea don't give much improvement. This was answered with much more detail by others here.
Regarding the original question, although the code works, it is not guaranteed to run in any reasonable time, as was answered as well as commented on this question by LFSR Consulting.
Original Answer:
You mean something like this?
Edit - corrected after a comment.
shortest_output = {}
foreach (int R = 0; R <= X; R++) {
// iteration over possible remainders
// check if the rest of X can be decomposed into multipliers
newX = X - R;
output = {};
while (newX > Y) {
int i;
for (i = Y; i > 1; i--) {
if ( newX % i == 0) { // found a divider
output.append(i);
newX = newX /i;
break;
}
}
if (i == 1) { // no dividers <= Y
break;
}
}
if (newX != 1) {
// couldn't find dividers with no remainder
output.clear();
}
else {
output.append(R);
if (output.length() < shortest_output.length()) {
shortest_output = output;
}
}
}
It sounds as though you want to compress random data -- this is impossible for information theoretic reasons. (See http://www.faqs.org/faqs/compression-faq/part1/preamble.html question 9.) Use Base64 on the concatenated binary representations of your numbers and be done with it.
The problem you're attempting to solve (you're dealing with a subset of the problem, given you're restriction of y) is called Integer Factorization and it cannot be done efficiently given any known algorithm:
In number theory, integer factorization is the breaking down of a composite number into smaller non-trivial divisors, which when multiplied together equal the original integer.
This problem is what makes a number of cryptographic functions possible (namely RSA which uses 128 bit keys - long is half of that.) The wiki page contains some good resources that should move you in the right direction with your problem.
So, your brain teaser is indeed a brain teaser... and if you solve it efficiently we can elevate your math skills to above average!
Updated after the full story
Base64 is most likely your best option. If you want a custom solution you can try implementing a Base 65+ system. Just remember that just because 10000 can be written as "10^4" doesn't mean that everything can be written as 10^n where n is an integer. Different base systems are the simplest way to write numbers and the higher the base the less digits the number requires. Plus most framework libraries contain algorithms for Base64 encoding. (What language you are using?).
One way to further pack the urls is the one you mentioned but in Base64.
int[] IDs;
IDs.sort() // So IDs[i] is always smaller or equal to IDs[i-1].
string url = Base64Encode(IDs[0]);
for (int i = 1; i < IDs.length; i++) {
url += "," + Base64Encode(IDs[i-1] - IDs[i]);
}
Note that you require some separator as the initial ID can be arbitrarily large and the difference between two IDs CAN be more than 63 in which case one Base64 digit is not enough.
Updated
Just restating that the problem is unsolvable. For Y = 64 you can't write 87681 in multipliers + remainder where each of these is below 64. In other words, you cannot write any of the numbers 87617..87681 with multipliers that are below 64. Each of these numbers has an elementary term over 64. 87616 can be written in elementary terms below 64 but then you'd need those + 65 and so the remainder will be over 64.
So if this was just a brainteaser, it's unsolvable. Was there some practical purpose for this which could be achieved in some way other than using multiplication and a remainder?
And yes, this really should be a comment but I lost my ability to comment at some point. :p
I believe the solution which comes closest is Yevgeny's. It is also easy to extend Yevgeny's solution to remove the limit for the remainder in which case it would be able to find solution where multipliers are smaller than Y and remainder as small as possible, even if greater than Y.
Old answer:
If you limit that every number in the array must be below the y then there is no solution for this. Given large enough x and small enough y, you'll end up in an impossible situation. As an example with y of 2, x of 12 you'll get 2 * 2 * 2 + 4 as 2 * 2 * 2 * 2 would be 16. Even if you allow negative numbers with abs(n) below y that wouldn't work as you'd need 2 * 2 * 2 * 2 - 4 in the above example.
And I think the problem is NP-Complete even if you limit the problem to inputs which are known to have an answer where the last term is less than y. It sounds quite much like the [Knapsack problem][1]. Of course I could be wrong there.
Edit:
Without more accurate problem description it is hard to solve the problem, but one variant could work in the following way:
set current = x
Break current to its terms
If one of the terms is greater than y the current number cannot be described in terms greater than y. Reduce one from current and repeat from 2.
Current number can be expressed in terms less than y.
Calculate remainder
Combine as many of the terms as possible.
(Yevgeny Doctor has more conscise (and working) implementation of this so to prevent confusion I've skipped the implementation.)
OP Wrote:
My goal originally was to come up with
a specific method to pack 1..n large
integers (aka longs) together so that
their String representation is notably
shorter than writing the actual
number. Think multiples of ten, 10^6
and 1 000 000 are the same, however
the representation's length in
characters isn't.
I have been down that path before, and as fun as it was to learn all the math, to save you time I will just point you to: http://en.wikipedia.org/wiki/Kolmogorov_complexity
In a nutshell some strings can be easily compressed by changing your notation:
10^9 (4 characters) = 1000000000 (10 characters)
Others cannot:
7829203478 = some random number...
This is a great great simplification of the article I linked to above, so I recommend that you read it instead of taking my explanation at face value.
Edit:
If you are trying to make RESTful urls for some set of unique data, why wouldn't you use a hash, such as MD5? Then include the hash as part of the URL, then look up the data based on the hash. Or am I missing something obvious?
The original method you chose (a * b + c * d + e) would be very difficult to find optimal solutions for simply due to the large search space of possibilities. You could factorize the number but it's that "+ e" that complicates things since you need to factorize not just that number but quite a few immediately below it.
Two methods for compression spring immediately to mind, both of which give you a much-better-than-10% saving on space from the numeric representation.
A 64-bit number ranges from (unsigned):
0 to
18,446,744,073,709,551,616
or (signed):
-9,223,372,036,854,775,808 to
9,223,372,036,854,775,807
In both cases, you need to reduce the 20-characters taken (without commas) to something a little smaller.
The first is to simply BCD-ify the number the base64 encode it (actually a slightly modified base64 since "/" would not be kosher in a URL - you should use one of the acceptable characters such as "_").
Converting it to BCD will store two digits (or a sign and a digit) into one byte, giving you an immediate 50% reduction in space (10 bytes). Encoding it base 64 (which turns every 3 bytes into 4 base64 characters) will turn the first 9 bytes into 12 characters and that tenth byte into 2 characters, for a total of 14 characters - that's a 30% saving.
The only better method is to just base64 encode the binary representation. This is better because BCD has a small amount of wastage (each digit only needs about 3.32 bits to store [log210], but BCD uses 4).
Working on the binary representation, we only need to base64 encode the 64-bit number (8 bytes). That needs 8 characters for the first 6 bytes and 3 characters for the final 2 bytes. That's 11 characters of base64 for a saving of 45%.
If you wanted maximum compression, there are 73 characters available for URL encoding:
ABCDEFGHIJKLMNOPQRSTUVWXYZ
abcdefghijklmnopqrstuvwxyz
0123456789$-_.+!*'(),
so technically you could probably encode base-73 which, from rough calculations, would still take up 11 characters, but with more complex code which isn't worth it in my opinion.
Of course, that's the maximum compression due to the maximum values. At the other end of the scale (1-digit) this encoding actually results in more data (expansion rather than compression). You can see the improvements only start for numbers over 999, where 4 digits can be turned into 3 base64 characters:
Range (bytes) Chars Base64 chars Compression ratio
------------- ----- ------------ -----------------
< 10 (1) 1 2 -100%
< 100 (1) 2 2 0%
< 1000 (2) 3 3 0%
< 10^4 (2) 4 3 25%
< 10^5 (3) 5 4 20%
< 10^6 (3) 6 4 33%
< 10^7 (3) 7 4 42%
< 10^8 (4) 8 6 25%
< 10^9 (4) 9 6 33%
< 10^10 (5) 10 7 30%
< 10^11 (5) 11 7 36%
< 10^12 (5) 12 7 41%
< 10^13 (6) 13 8 38%
< 10^14 (6) 14 8 42%
< 10^15 (7) 15 10 33%
< 10^16 (7) 16 10 37%
< 10^17 (8) 17 11 35%
< 10^18 (8) 18 11 38%
< 10^19 (8) 19 11 42%
< 2^64 (8) 20 11 45%
Update: I didn't get everything, thus I rewrote the whole thing in a more Java-Style fashion. I didn't think of the prime number case that is bigger than the divisor. This is fixed now. I leave the original code in order to get the idea.
Update 2: I now handle the case of the big prime number in another fashion . This way a result is obtained either way.
public final class PrimeNumberException extends Exception {
private final long primeNumber;
public PrimeNumberException(long x) {
primeNumber = x;
}
public long getPrimeNumber() {
return primeNumber;
}
}
public static Long[] decompose(long x, long y) {
try {
final ArrayList<Long> operands = new ArrayList<Long>(1000);
final long rest = x % y;
// Extract the rest so the reminder is divisible by y
final long newX = x - rest;
// Go into recursion, actually it's a tail recursion
recDivide(newX, y, operands);
} catch (PrimeNumberException e) {
// return new Long[0];
// or do whatever you like, for example
operands.add(e.getPrimeNumber());
} finally {
// Add the reminder to the array
operands.add(rest);
return operands.toArray(new Long[operands.size()]);
}
}
// The recursive method
private static void recDivide(long x, long y, ArrayList<Long> operands)
throws PrimeNumberException {
while ((x > y) && (y != 1)) {
if (x % y == 0) {
final long rest = x / y;
// Since y is a divisor add it to the list of operands
operands.add(y);
if (rest <= y) {
// the rest is smaller than y, we're finished
operands.add(rest);
}
// go in recursion
x = rest;
} else {
// if the value x isn't divisible by y decrement y so you'll find a
// divisor eventually
if (--y == 1) {
throw new PrimeNumberException(x);
}
}
}
}
Original: Here some recursive code I came up with. I would have preferred to code it in some functional language but it was required in Java. I didn't bother converting the numbers to integer but that shouldn't be that hard (yes, I'm lazy ;)
public static Long[] decompose(long x, long y) {
final ArrayList<Long> operands = new ArrayList<Long>();
final long rest = x % y;
// Extract the rest so the reminder is divisible by y
final long newX = x - rest;
// Go into recursion, actually it's a tail recursion
recDivide(newX, y, operands);
// Add the reminder to the array
operands.add(rest);
return operands.toArray(new Long[operands.size()]);
}
// The recursive method
private static void recDivide(long newX, long y, ArrayList<Long> operands) {
long x = newX;
if (x % y == 0) {
final long rest = x / y;
// Since y is a divisor add it to the list of operands
operands.add(y);
if (rest <= y) {
// the rest is smaller than y, we're finished
operands.add(rest);
} else {
// the rest can still be divided, go one level deeper in recursion
recDivide(rest, y, operands);
}
} else {
// if the value x isn't divisible by y decrement y so you'll find a divisor
// eventually
recDivide(x, y-1, operands);
}
}
Are you married to using Java? Python has an entire package dedicated just for this exact purpose. It'll even sanitize the encoding for you to be URL-safe.
Native Python solution
The standard module I'm recommending is base64, which converts arbitrary stings of chars into sanitized base64 format. You can use it in conjunction with the pickle module, which handles conversion from lists of longs (actually arbitrary size) to a compressed string representation.
The following code should work on any vanilla installation of Python:
import base64
import pickle
# get some long list of numbers
a = (854183415,1270335149,228790978,1610119503,1785730631,2084495271,
1180819741,1200564070,1594464081,1312769708,491733762,243961400,
655643948,1950847733,492757139,1373886707,336679529,591953597,
2007045617,1653638786)
# this gets you the url-safe string
str64 = base64.urlsafe_b64encode(pickle.dumps(a,-1))
print str64
>>> gAIoSvfN6TJKrca3S0rCEqMNSk95-F9KRxZwakqn3z58Sh3hYUZKZiePR0pRlwlfSqxGP05KAkNPHUo4jooOSixVFCdK9ZJHdEqT4F4dSvPY41FKaVIRFEq9fkgjSvEVoXdKgoaQYnRxAC4=
# this unwinds it
a64 = pickle.loads(base64.urlsafe_b64decode(str64))
print a64
>>> (854183415, 1270335149, 228790978, 1610119503, 1785730631, 2084495271, 1180819741, 1200564070, 1594464081, 1312769708, 491733762, 243961400, 655643948, 1950847733, 492757139, 1373886707, 336679529, 591953597, 2007045617, 1653638786)
Hope that helps. Using Python is probably the closest you'll get from a 1-line solution.
Wrt the original algorithm request: Is there a limit on the size of the last number (beyond that it must be stored in a 32b int)?
(The original request is all I'm able to tackle lol.)
The one that produces the shortest list is:
bool negative=(n<1)?true:false;
int j=n%y;
if(n==0 || n==1)
{
list.append(n);
return;
}
while((long64)(n-j*y)>MAX_INT && y>1) //R has to be stored in int32
{
y--;
j=n%y;
}
if(y<=1)
fail //Number has no suitable candidate factors. This shouldn't happen
int i=0;
for(;i<j;i++)
{
list.append(y);
}
list.append(n-y*j);
if(negative)
list[0]*=-1;
return;
A little simplistic compared to most answers given so far but it achieves the desired functionality of the original post... It's a little dirty but hopefully useful :)
Isn't this modulus?
Let / be integer division (whole numbers) and % be modulo.
int result[3];
result[0] = y;
result[1] = x / y;
result[2] = x % y;
Just set x:=x/n where n is the largest number that is less both than x and y. When you end up with x<=y, this is your last number in the sequence.
Like in my comment above, I'm not sure I understand exactly the question. But assuming integers (n and a given y), this should work for the cases you stated:
multipliers[0] = n / y;
multipliers[1] = y;
addedNumber = n % y;