2
votes
2answers
225 views

Get Integer portion of square root in Haskell

Say I have a large integral number of the type Integer. Does there exist a library function (in Prelude or elsewhere) which, when given an Integer X will return the integral portion of the square root ...
5
votes
3answers
440 views

BigDecimal precision explosion

I'm trying to do calculations in Scala (and/or Java) at a fixed precision larger than that of a double. I'm using BigDecimals with Scala's default MathContext, which has precision 34. Even though ...
11
votes
1answer
225 views

Compute the product a * b**2 * c**3 … efficiently

What is the most efficient way to compute the product a1 b2 c3 d4 e5 ... assuming that squaring costs about half as much as multiplication? The number of operands is less than 100. Is there a ...
2
votes
4answers
302 views

How do I find the largest integer fully supported by hardware arithmetics?

I am implementing a BigInt class that must support arbitrary-precision operations on integers. Quote from "The Algorithm Design Manual" by S.Skiena: What base should I do [editor's note: ...
3
votes
2answers
291 views

x86-64 Big Integer Representation?

How do high performance native big integer libraries on x86-64 represent a big integer in memory? (or does it vary? Is there a most common way?) Naively I was thinking about storing them as ...
2
votes
1answer
470 views

Multiplication using FFT in integer rings

I need to multiply long integer numbers with an arbitrary BASE of the digits using FFT in integer rings. Operands are always of length n = 2^k for some k, and the convolution vector has 2n components, ...
0
votes
2answers
595 views

Algorithm for solving decimal exponents without fractions

Could someone explain the steps involved in solving something like 2^2.2 if fractions couldn't be used, such as in an infinite precision calculation?
3
votes
2answers
416 views

How do pocket calculators simplify fractions and keep imprecise numbers as fractions?

Could someone explain how calculators (such as casio pocket ones) manage equations such as '500/12' and are able to return '125/3' as the result, alternately can someone name some algorithms which do ...
1
vote
3answers
964 views

Is there support for arbitrary precision arithmetic in C#

Does c# support arbitrary precision arithmetic, I think they are also called bignums? If it doesn't which libraries would you recommend that does support it?
3
votes
3answers
160 views

what options are there for representing numbers with more than 2^81 digits?

I came across an interesting math problem that would require me to do some artithmetic with numbers that have more than 281 digits. I know that its impossible to represent a number this large with a ...
8
votes
6answers
378 views

Python computing error

I’m using the API mpmath to compute the following sum Let us consider the serie u0, u1, u2 defined by: u0 = 3/2 = 1,5 u1 = 5/3 = 1,6666666… un+1 = 2003 - 6002/un + 4000/un un-1 The serie ...
1
vote
2answers
622 views

Big Integer Arithmetic in Java - Homework

So this is a homework assignment, and I've been working on it for about ~10 hours total. I'd just like some tips to see where I'm going wrong. So my assignment is to essentially make a calculator for ...
2
votes
1answer
367 views

Arbitrary Precision for decimals in C# help?

Here is my current code for computing Pi using the chudnovsky method in c#: using System; using System.Diagnostics; using System.IO; using java.math; namespace pi.chudnovsky { public class ...
5
votes
3answers
182 views

How to determine before hand if an unsigned calculation may possibly overflow?

As a personal project I am working on implementing an Arbitrary Precision number type for a pet project of mine. I already know about all the popular, tested and robust libraries out there that do ...
6
votes
5answers
5k views

numpy arbitrary precision linear algebra

I have a numpy 2d array [medium/large sized - say 500x500]. I want to find the eigenvalues of the element-wise exponent of it. The problem is that some of the values are quite negative (-800,-1000, ...
10
votes
2answers
840 views

Exact real arithmetic and lazy list performance in C++/Haskell

I recently came across the subject of exact real arithmetic after reading this paper and this paper. I have found a number of papers that discuss realizations of exact arithmetic using signed digit ...
3
votes
2answers
741 views

Restore a number from several its remainders (chinese remainder theorem)

I have a long integer number, but it is stored not in decimal form, but as set of remainders. So, I have not the N number, but set of such remainders: r_1 = N % 2147483743 r_2 = N % 2147483713 r_3 ...
0
votes
2answers
132 views

What library for arbitrary precision library should I use?

I need to program something that calculates a number to arbitrary precision... but I need it to output the digits that are already "certain" (ie below some error bound) to a file so that there are ...
1
vote
3answers
6k views

binary to decimal base shift

I need an algorithm that converts an arbitrarily sized unsigned integer (which is stored in binary format) to a decimal one. i.e. to make it human-readable ;) I currently use the maybe (or obviously) ...
1
vote
2answers
166 views

Creating a numerical data type exceeding its normal size

There is a calculator program that I have came across on Windows long ago. I couldn't recall its name, but one impressive thing about it is that it can calculate numbers up to 512 bytes size. ...
3
votes
2answers
904 views

Need Arbitrary-Precision-Arithmetic in C#

I'm in need of floating point calculations for C# that can correctly store up to maybe 500 digits/decimals. Is there any built-in-type for this, do I have to create it myself, any library available or ...
3
votes
5answers
1k views

Arbitrary precision arithmetic with Ruby

How the heck does Ruby do this? Does Jörg or anyone else know what's happening behind the scenes? Unfortunately I don't know C very well so bignum.c is of little help to me. I was just kind of ...
1
vote
1answer
263 views

Rounding using arbitrary precision libraries in PHP

I asked a question earlier about how to deal with rounding issues with floating point numbers in PHP, and was pointed to the bc and gmp libraries. I've looked at the functions in these libraries but ...
6
votes
2answers
723 views

What is the fastest semi-arbitrary precision math library?

I'm using long double in a C program to compute 2D images of the Mandelbrot Set but wish to have further precision to zoom deeper. Are there any performance gains to be had from an arbitrary ...
5
votes
8answers
826 views

Has arbitrary-precision arithmetic affected numerical analysis software?

Has arbitrary-precision arithmetic affected numerical analysis software? I feel that most numerical analysis software keeps on using the same floats and doubles. If I'm right, I'd love to know the ...