SPDX-License-Identifier: BSD-2-Clause
Copyright (c) 2018-2023 Gavin D. Howard and contributors.
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Link with \f[I]-lbcl\f[R], and on POSIX systems, \f[I]-lpthread\f[R] is also required.
\f[B]BclError bcl_start(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_end(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]BclError bcl_init(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_free(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]bool bcl_abortOnFatalError(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_setAbortOnFatalError(bool\f[R] \f[I]abrt\f[R]\f[B]);\f[R]
\f[B]bool bcl_leadingZeroes(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_setLeadingZeroes(bool\f[R] \f[I]leadingZeroes\f[R]\f[B]);\f[R]
\f[B]void bcl_gc(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]bool bcl_digitClamp(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_setDigitClamp(bool\f[R] \f[I]digitClamp\f[R]\f[B]);\f[R]
\f[B]struct BclCtxt;\f[R]
\f[B]typedef struct BclCtxt* BclContext;\f[R]
\f[B]BclContext bcl_ctxt_create(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_ctxt_free(BclContext\f[R] \f[I]ctxt\f[R]\f[B]);\f[R]
\f[B]BclError bcl_pushContext(BclContext\f[R] \f[I]ctxt\f[R]\f[B]);\f[R]
\f[B]void bcl_popContext(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]BclContext bcl_context(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_ctxt_freeNums(BclContext\f[R] \f[I]ctxt\f[R]\f[B]);\f[R]
\f[B]size_t bcl_ctxt_scale(BclContext\f[R] \f[I]ctxt\f[R]\f[B]);\f[R]
\f[B]void bcl_ctxt_setScale(BclContext\f[R] \f[I]ctxt\f[R]\f[B], size_t\f[R] \f[I]scale\f[R]\f[B]);\f[R]
\f[B]size_t bcl_ctxt_ibase(BclContext\f[R] \f[I]ctxt\f[R]\f[B]);\f[R]
\f[B]void bcl_ctxt_setIbase(BclContext\f[R] \f[I]ctxt\f[R]\f[B], size_t\f[R] \f[I]ibase\f[R]\f[B]);\f[R]
\f[B]size_t bcl_ctxt_obase(BclContext\f[R] \f[I]ctxt\f[R]\f[B]);\f[R]
\f[B]void bcl_ctxt_setObase(BclContext\f[R] \f[I]ctxt\f[R]\f[B], size_t\f[R] \f[I]obase\f[R]\f[B]);\f[R]
\f[B]typedef enum BclError BclError;\f[R]
\f[B]BclError bcl_err(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]typedef struct { size_t i; } BclNumber;\f[R]
\f[B]BclNumber bcl_num_create(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]void bcl_num_free(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]bool bcl_num_neg(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]void bcl_num_setNeg(BclNumber\f[R] \f[I]n\f[R]\f[B], bool\f[R] \f[I]neg\f[R]\f[B]);\f[R]
\f[B]size_t bcl_num_scale(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]BclError bcl_num_setScale(BclNumber\f[R] \f[I]n\f[R]\f[B], size_t\f[R] \f[I]scale\f[R]\f[B]);\f[R]
\f[B]size_t bcl_num_len(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_parse(const char *restrict\f[R] \f[I]val\f[R]\f[B]);\f[R]
\f[B]char* bcl_string(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]char* bcl_string_keep(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]BclError bcl_bigdig(BclNumber\f[R] \f[I]n\f[R]\f[B], BclBigDig *\f[R]\f[I]result\f[R]\f[B]);\f[R]
\f[B]BclError bcl_bigdig_keep(BclNumber\f[R] \f[I]n\f[R]\f[B], BclBigDig *\f[R]\f[I]result\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_bigdig2num(BclBigDig\f[R] \f[I]val\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_add(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_add_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_sub(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_sub_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_mul(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_mul_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_div(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_div_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_mod(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_mod_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_pow(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_pow_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_lshift(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_lshift_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_rshift(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_rshift_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_sqrt(BclNumber\f[R] \f[I]a\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_sqrt_keep(BclNumber\f[R] \f[I]a\f[R]\f[B]);\f[R]
\f[B]BclError bcl_divmod(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber *\f[R]\f[I]c\f[R]\f[B], BclNumber *\f[R]\f[I]d\f[R]\f[B]);\f[R]
\f[B]BclError bcl_divmod_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber *\f[R]\f[I]c\f[R]\f[B], BclNumber *\f[R]\f[I]d\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_modexp(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber\f[R] \f[I]c\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_modexp_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber\f[R] \f[I]c\f[R]\f[B]);\f[R]
\f[B]void bcl_zero(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]void bcl_one(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]ssize_t bcl_cmp(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B]);\f[R]
\f[B]BclError bcl_copy(BclNumber\f[R] \f[I]d\f[R]\f[B], BclNumber\f[R] \f[I]s\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_dup(BclNumber\f[R] \f[I]s\f[R]\f[B]);\f[R]
\f[B]#define BCL_SEED_ULONGS\f[R]
\f[B]#define BCL_SEED_SIZE\f[R]
\f[B]typedef unsigned long BclBigDig;\f[R]
\f[B]typedef unsigned long BclRandInt;\f[R]
\f[B]BclNumber bcl_irand(BclNumber\f[R] \f[I]a\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_irand_keep(BclNumber\f[R] \f[I]a\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_frand(size_t\f[R] \f[I]places\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_ifrand(BclNumber\f[R] \f[I]a\f[R]\f[B], size_t\f[R] \f[I]places\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_ifrand_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], size_t\f[R] \f[I]places\f[R]\f[B]);\f[R]
\f[B]BclError bcl_rand_seedWithNum(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]BclError bcl_rand_seedWithNum_keep(BclNumber\f[R] \f[I]n\f[R]\f[B]);\f[R]
\f[B]BclError bcl_rand_seed(unsigned char\f[R] \f[I]seed\f[R]\f[B][\f[R]\f[I]BCL_SEED_SIZE\f[R]\f[B]]);\f[R]
\f[B]void bcl_rand_reseed(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]BclNumber bcl_rand_seed2num(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]BclRandInt bcl_rand_int(\f[R]\f[I]void\f[R]\f[B]);\f[R]
\f[B]BclRandInt bcl_rand_bounded(BclRandInt\f[R] \f[I]bound\f[R]\f[B]);\f[R]
bcl(3) assumes that it is allowed to use the \f[B]bcl\f[R], \f[B]Bcl\f[R], \f[B]bc\f[R], and \f[B]Bc\f[R] prefixes for symbol names without collision.
All of the items in its interface are described below. See the documentation for each function for what each function can return.
\f[B]BclError bcl_start(\f[R]\f[I]void\f[R]\f[B])\f[R] Initializes this library. This function can be called multiple times, but \f[B]bcl_end()\f[R] must only be called \f[I]once\f[R]. This is to make it possible for multiple libraries and applications to initialize bcl(3) without problem.
It is suggested that client libraries call this function, but do not call \f[B]bcl_end()\f[R], and client applications should call both.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
This function must be the first one clients call. Calling any other function without calling this one first is undefined behavior.
\f[B]void bcl_end(\f[R]\f[I]void\f[R]\f[B])\f[R] Deinitializes this library. This function must only be called \f[I]once\f[R].
All data must have been freed before calling this function.
This function must be the last one clients call. Calling this function before calling any other function is undefined behavior.
\f[B]BclError bcl_init(\f[R]\f[I]void\f[R]\f[B])\f[R] Initializes the library for the current thread. This function can be called multiple times, but each call must be matched by a call to \f[B]bcl_free(\f[R]\f[I]void\f[R]\f[B])\f[R]. This is to make it possible for multiple libraries and applications to initialize threads for bcl(3) without problem.
This function \f[I]must\f[R] be called from the thread that it is supposed to initialize.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
This function must be the second one clients call. Calling any other function without calling \f[B]bcl_start()\f[R] and then this one first is undefined behavior, except in the case of new threads. New threads can safely call this function without calling \f[B]bcl_start()\f[R] if another thread has previously called \f[B]bcl_start()\f[R]. But this function must still be the first function in bcl(3) called by that new thread.
\f[B]void bcl_free(\f[R]\f[I]void\f[R]\f[B])\f[R] Decrements bcl(3)\[cq]s reference count and frees the data associated with it if the reference count is \f[B]0\f[R].
This function \f[I]must\f[R] be called from the thread that it is supposed to deinitialize.
This function must be the second to last one clients call. Calling this function before calling any other function besides \f[B]bcl_end()\f[R] is undefined behavior.
\f[B]bool bcl_abortOnFatalError(\f[R]\f[I]void\f[R]\f[B])\f[R] Queries and returns the current state of calling \f[B]abort()\f[R] on fatal errors. If \f[B]true\f[R] is returned, bcl(3) will cause a \f[B]SIGABRT\f[R] if a fatal error occurs.
If activated, clients do not need to check for fatal errors.
This value is \f[I]thread-local\f[R]; it applies to just the thread it is read on.
The default is \f[B]false\f[R].
\f[B]void bcl_setAbortOnFatalError(bool\f[R] \f[I]abrt\f[R]\f[B])\f[R] Sets the state of calling \f[B]abort()\f[R] on fatal errors. If \f[I]abrt\f[R] is \f[B]false\f[R], bcl(3) will not cause a \f[B]SIGABRT\f[R] on fatal errors after the call. If \f[I]abrt\f[R] is \f[B]true\f[R], bcl(3) will cause a \f[B]SIGABRT\f[R] on fatal errors after the call.
This value is \f[I]thread-local\f[R]; it applies to just the thread it is set on.
If activated, clients do not need to check for fatal errors.
\f[B]bool bcl_leadingZeroes(\f[R]\f[I]void\f[R]\f[B])\f[R] Queries and returns the state of whether leading zeroes are added to strings returned by \f[B]bcl_string()\f[R] when numbers are greater than \f[B]-1\f[R], less than \f[B]1\f[R], and not equal to \f[B]0\f[R]. If \f[B]true\f[R] is returned, then leading zeroes will be added.
This value is \f[I]thread-local\f[R]; it applies to just the thread it is read on.
The default is \f[B]false\f[R].
\f[B]void bcl_setLeadingZeroes(bool\f[R] \f[I]leadingZeroes\f[R]\f[B])\f[R] Sets the state of whether leading zeroes are added to strings returned by \f[B]bcl_string()\f[R] when numbers are greater than \f[B]-1\f[R], less than \f[B]1\f[R], and not equal to \f[B]0\f[R]. If \f[I]leadingZeroes\f[R] is \f[B]true\f[R], leading zeroes will be added to strings returned by \f[B]bcl_string()\f[R].
This value is \f[I]thread-local\f[R]; it applies to just the thread it is set on.
\f[B]bool bcl_digitClamp(\f[R]\f[I]void\f[R]\f[B])\f[R] Queries and returns the state of whether digits in number strings that are greater than or equal to the current \f[B]ibase\f[R] are clamped or not.
If \f[B]true\f[R] is returned, then digits are treated as though they are equal to the value of \f[B]ibase\f[R] minus \f[B]1\f[R]. If this is \f[I]not\f[R] true, then digits are treated as though they are equal to the value they would have if \f[B]ibase\f[R] was large enough. They are then multiplied by the appropriate power of \f[B]ibase\f[R].
For example, with clamping off and an \f[B]ibase\f[R] of \f[B]3\f[R], the string \[lq]AB\[rq] would equal \f[B]3\[ha]1*A+3\[ha]0*B\f[R], which is \f[B]3\f[R] times \f[B]10\f[R] plus \f[B]11\f[R], or \f[B]41\f[R], while with clamping on and an \f[B]ibase\f[R] of \f[B]3\f[R], the string \[lq]AB\[rq] would be equal to \f[B]3\[ha]1*2+3\[ha]0*2\f[R], which is \f[B]3\f[R] times \f[B]2\f[R] plus \f[B]2\f[R], or \f[B]8\f[R].
This value is \f[I]thread-local\f[R]; it applies to just the thread it is read on.
The default is \f[B]true\f[R].
\f[B]void bcl_setDigitClamp(bool\f[R] \f[I]digitClamp\f[R]\f[B])\f[R] Sets the state of whether digits in number strings that are greater than or equal to the current \f[B]ibase\f[R] are clamped or not. For more information, see the \f[B]bcl_digitClamp(\f[R]\f[I]void\f[R]\f[B])\f[R] function.
This value is \f[I]thread-local\f[R]; it applies to just the thread it is set on.
\f[B]void bcl_gc(\f[R]\f[I]void\f[R]\f[B])\f[R] Garbage collects cached instances of arbitrary-precision numbers. This only frees the memory of numbers that are \f[I]not\f[R] in use, so it is safe to call at any time.
\f[B]struct BclCtxt\f[R] A forward declaration for a hidden \f[B]struct\f[R] type. Clients cannot access the internals of the \f[B]struct\f[R] type directly. All interactions with the type are done through pointers. See \f[B]BclContext\f[R] below.
\f[B]BclContext\f[R] A typedef to a pointer of \f[B]struct BclCtxt\f[R]. This is the only handle clients can get to \f[B]struct BclCtxt\f[R].
A \f[B]BclContext\f[R] contains the values \f[B]scale\f[R], \f[B]ibase\f[R], and \f[B]obase\f[R], as well as a list of numbers.
\f[B]scale\f[R] is a value used to control how many decimal places calculations should use. A value of \f[B]0\f[R] means that calculations are done on integers only, where applicable, and a value of 20, for example, means that all applicable calculations return results with 20 decimal places. The default is \f[B]0\f[R].
\f[B]ibase\f[R] is a value used to control the input base. The minimum \f[B]ibase\f[R] is \f[B]2\f[R], and the maximum is \f[B]36\f[R]. If \f[B]ibase\f[R] is \f[B]2\f[R], numbers are parsed as though they are in binary, and any digits larger than \f[B]1\f[R] are clamped. Likewise, a value of \f[B]10\f[R] means that numbers are parsed as though they are decimal, and any larger digits are clamped. The default is \f[B]10\f[R].
\f[B]obase\f[R] is a value used to control the output base. The minimum \f[B]obase\f[R] is \f[B]0\f[R] and the maximum is \f[B]BC_BASE_MAX\f[R] (see the \f[B]LIMITS\f[R] section).
Numbers created in one context are not valid in another context. It is undefined behavior to use a number created in a different context. Contexts are meant to isolate the numbers used by different clients in the same application.
Different threads also have different contexts, so any numbers created in one thread are not valid in another thread. To pass values between contexts and threads, use \f[B]bcl_string()\f[R] to produce a string to pass around, and use \f[B]bcl_parse()\f[R] to parse the string. It is suggested that the \f[B]obase\f[R] used to create the string be passed around with the string and used as the \f[B]ibase\f[R] for \f[B]bcl_parse()\f[R] to ensure that the number will be the same.
\f[B]BclContext bcl_ctxt_create(\f[R]\f[I]void\f[R]\f[B])\f[R] Creates a context and returns it. Returns \f[B]NULL\f[R] if there was an error.
\f[B]void bcl_ctxt_free(BclContext\f[R] \f[I]ctxt\f[R]\f[B])\f[R] Frees \f[I]ctxt\f[R], after which it is no longer valid. It is undefined behavior to attempt to use an invalid context.
\f[B]BclError bcl_pushContext(BclContext\f[R] \f[I]ctxt\f[R]\f[B])\f[R] Pushes \f[I]ctxt\f[R] onto bcl(3)\[cq]s stack of contexts. \f[I]ctxt\f[R] must have been created with \f[B]bcl_ctxt_create(\f[R]\f[I]void\f[R]\f[B])\f[R].
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
There \f[I]must\f[R] be a valid context to do any arithmetic.
\f[B]void bcl_popContext(\f[R]\f[I]void\f[R]\f[B])\f[R] Pops the current context off of the stack, if one exists.
\f[B]BclContext bcl_context(\f[R]\f[I]void\f[R]\f[B])\f[R] Returns the current context, or \f[B]NULL\f[R] if no context exists.
\f[B]void bcl_ctxt_freeNums(BclContext\f[R] \f[I]ctxt\f[R]\f[B])\f[R] Frees all numbers in use that are associated with \f[I]ctxt\f[R]. It is undefined behavior to attempt to use a number associated with \f[I]ctxt\f[R] after calling this procedure unless such numbers have been created with \f[B]bcl_num_create(\f[R]\f[I]void\f[R]\f[B])\f[R] after calling this procedure.
\f[B]size_t bcl_ctxt_scale(BclContext\f[R] \f[I]ctxt\f[R]\f[B])\f[R] Returns the \f[B]scale\f[R] for given context.
\f[B]void bcl_ctxt_setScale(BclContext\f[R] \f[I]ctxt\f[R]\f[B], size_t\f[R] \f[I]scale\f[R]\f[B])\f[R] Sets the \f[B]scale\f[R] for the given context to the argument \f[I]scale\f[R].
\f[B]size_t bcl_ctxt_ibase(BclContext\f[R] \f[I]ctxt\f[R]\f[B])\f[R] Returns the \f[B]ibase\f[R] for the given context.
\f[B]void bcl_ctxt_setIbase(BclContext\f[R] \f[I]ctxt\f[R]\f[B], size_t\f[R] \f[I]ibase\f[R]\f[B])\f[R] Sets the \f[B]ibase\f[R] for the given context to the argument \f[I]ibase\f[R]. If the argument \f[I]ibase\f[R] is invalid, it clamped, so an \f[I]ibase\f[R] of \f[B]0\f[R] or \f[B]1\f[R] is clamped to \f[B]2\f[R], and any values above \f[B]36\f[R] are clamped to \f[B]36\f[R].
\f[B]size_t bcl_ctxt_obase(BclContext\f[R] \f[I]ctxt\f[R]\f[B])\f[R] Returns the \f[B]obase\f[R] for the given context.
\f[B]void bcl_ctxt_setObase(BclContext\f[R] \f[I]ctxt\f[R]\f[B], size_t\f[R] \f[I]obase\f[R]\f[B])\f[R] Sets the \f[B]obase\f[R] for the given context to the argument \f[I]obase\f[R].
\f[B]BclError\f[R] An \f[B]enum\f[R] of possible error codes. See the \f[B]ERRORS\f[R] section for a complete listing the codes.
\f[B]BclError bcl_err(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Checks for errors in a \f[B]BclNumber\f[R]. All functions that can return a \f[B]BclNumber\f[R] can encode an error in the number, and this function will return the error, if any. If there was no error, it will return \f[B]BCL_ERROR_NONE\f[R].
There must be a valid current context.
\f[B]BclNumber\f[R] A handle to an arbitrary-precision number. The actual number type is not exposed; the \f[B]BclNumber\f[R] handle is the only way clients can refer to instances of arbitrary-precision numbers.
\f[B]BclNumber bcl_num_create(\f[R]\f[I]void\f[R]\f[B])\f[R] Creates and returns a \f[B]BclNumber\f[R].
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]void bcl_num_free(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Frees \f[I]n\f[R]. It is undefined behavior to use \f[I]n\f[R] after calling this function.
\f[B]bool bcl_num_neg(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Returns \f[B]true\f[R] if \f[I]n\f[R] is negative, \f[B]false\f[R] otherwise.
\f[B]void bcl_num_setNeg(BclNumber\f[R] \f[I]n\f[R]\f[B], bool\f[R] \f[I]neg\f[R]\f[B])\f[R] Sets \f[I]n\f[R]\[cq]s sign to \f[I]neg\f[R], where \f[B]true\f[R] is negative, and \f[B]false\f[R] is positive.
\f[B]size_t bcl_num_scale(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Returns the \f[I]scale\f[R] of \f[I]n\f[R].
The \f[I]scale\f[R] of a number is the number of decimal places it has after the radix (decimal point).
\f[B]BclError bcl_num_setScale(BclNumber\f[R] \f[I]n\f[R]\f[B], size_t\f[R] \f[I]scale\f[R]\f[B])\f[R] Sets the \f[I]scale\f[R] of \f[I]n\f[R] to the argument \f[I]scale\f[R]. If the argument \f[I]scale\f[R] is greater than the \f[I]scale\f[R] of \f[I]n\f[R], \f[I]n\f[R] is extended. If the argument \f[I]scale\f[R] is less than the \f[I]scale\f[R] of \f[I]n\f[R], \f[I]n\f[R] is truncated.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[B]size_t bcl_num_len(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Returns the number of \f[I]significant decimal digits\f[R] in \f[I]n\f[R].
All procedures in this section without the \f[B]_keep\f[R] suffix in their name consume the given \f[B]BclNumber\f[R] arguments that are not given to pointer arguments. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[B]BclNumber bcl_parse(const char *restrict\f[R] \f[I]val\f[R]\f[B])\f[R] Parses a number string according to the current context\[cq]s \f[B]ibase\f[R] and returns the resulting number.
\f[I]val\f[R] must be non-\f[B]NULL\f[R] and a valid string. See \f[B]BCL_ERROR_PARSE_INVALID_STR\f[R] in the \f[B]ERRORS\f[R] section for more information.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]char* bcl_string(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Returns a string representation of \f[I]n\f[R] according the the current context\[cq]s \f[B]ibase\f[R]. The string is dynamically allocated and must be freed by the caller.
\f[I]n\f[R] is consumed; it cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[B]char* bcl_string_keep(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Returns a string representation of \f[I]n\f[R] according the the current context\[cq]s \f[B]ibase\f[R]. The string is dynamically allocated and must be freed by the caller.
\f[B]BclError bcl_bigdig(BclNumber\f[R] \f[I]n\f[R]\f[B], BclBigDig *\f[R]\f[I]result\f[R]\f[B])\f[R] Converts \f[I]n\f[R] into a \f[B]BclBigDig\f[R] and returns the result in the space pointed to by \f[I]result\f[R].
\f[I]a\f[R] must be smaller than \f[B]BC_OVERFLOW_MAX\f[R]. See the \f[B]LIMITS\f[R] section.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[I]n\f[R] is consumed; it cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[B]BclError bcl_bigdig_keep(BclNumber\f[R] \f[I]n\f[R]\f[B], BclBigDig *\f[R]\f[I]result\f[R]\f[B])\f[R] Converts \f[I]n\f[R] into a \f[B]BclBigDig\f[R] and returns the result in the space pointed to by \f[I]result\f[R].
\f[I]a\f[R] must be smaller than \f[B]BC_OVERFLOW_MAX\f[R]. See the \f[B]LIMITS\f[R] section.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[B]BclNumber bcl_bigdig2num(BclBigDig\f[R] \f[I]val\f[R]\f[B])\f[R] Creates a \f[B]BclNumber\f[R] from \f[I]val\f[R].
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
All procedures in this section without the \f[B]_keep\f[R] suffix in their name consume the given \f[B]BclNumber\f[R] arguments that are not given to pointer arguments. See the \f[B]Consumption and Propagation\f[R] subsection below.
All procedures in this section can return the following errors:
\f[B]BclNumber bcl_add(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Adds \f[I]a\f[R] and \f[I]b\f[R] and returns the result. The \f[I]scale\f[R] of the result is the max of the \f[I]scale\f[R]s of \f[I]a\f[R] and \f[I]b\f[R].
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_add_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Adds \f[I]a\f[R] and \f[I]b\f[R] and returns the result. The \f[I]scale\f[R] of the result is the max of the \f[I]scale\f[R]s of \f[I]a\f[R] and \f[I]b\f[R].
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_sub(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Subtracts \f[I]b\f[R] from \f[I]a\f[R] and returns the result. The \f[I]scale\f[R] of the result is the max of the \f[I]scale\f[R]s of \f[I]a\f[R] and \f[I]b\f[R].
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_sub_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Subtracts \f[I]b\f[R] from \f[I]a\f[R] and returns the result. The \f[I]scale\f[R] of the result is the max of the \f[I]scale\f[R]s of \f[I]a\f[R] and \f[I]b\f[R].
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_mul(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Multiplies \f[I]a\f[R] and \f[I]b\f[R] and returns the result. If \f[I]ascale\f[R] is the \f[I]scale\f[R] of \f[I]a\f[R] and \f[I]bscale\f[R] is the \f[I]scale\f[R] of \f[I]b\f[R], the \f[I]scale\f[R] of the result is equal to \f[B]min(ascale+bscale,max(scale,ascale,bscale))\f[R], where \f[B]min()\f[R] and \f[B]max()\f[R] return the obvious values.
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_mul_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Multiplies \f[I]a\f[R] and \f[I]b\f[R] and returns the result. If \f[I]ascale\f[R] is the \f[I]scale\f[R] of \f[I]a\f[R] and \f[I]bscale\f[R] is the \f[I]scale\f[R] of \f[I]b\f[R], the \f[I]scale\f[R] of the result is equal to \f[B]min(ascale+bscale,max(scale,ascale,bscale))\f[R], where \f[B]min()\f[R] and \f[B]max()\f[R] return the obvious values.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_div(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Divides \f[I]a\f[R] by \f[I]b\f[R] and returns the result. The \f[I]scale\f[R] of the result is the \f[I]scale\f[R] of the current context.
\f[I]b\f[R] cannot be \f[B]0\f[R].
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_div_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Divides \f[I]a\f[R] by \f[I]b\f[R] and returns the result. The \f[I]scale\f[R] of the result is the \f[I]scale\f[R] of the current context.
\f[I]b\f[R] cannot be \f[B]0\f[R].
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_mod(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Divides \f[I]a\f[R] by \f[I]b\f[R] to the \f[I]scale\f[R] of the current context, computes the modulus \f[B]a-(a/b)*b\f[R], and returns the modulus.
\f[I]b\f[R] cannot be \f[B]0\f[R].
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_mod_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Divides \f[I]a\f[R] by \f[I]b\f[R] to the \f[I]scale\f[R] of the current context, computes the modulus \f[B]a-(a/b)*b\f[R], and returns the modulus.
\f[I]b\f[R] cannot be \f[B]0\f[R].
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_pow(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Calculates \f[I]a\f[R] to the power of \f[I]b\f[R] to the \f[I]scale\f[R] of the current context. \f[I]b\f[R] must be an integer, but can be negative. If it is negative, \f[I]a\f[R] must be non-zero.
\f[I]b\f[R] must be an integer. If \f[I]b\f[R] is negative, \f[I]a\f[R] must not be \f[B]0\f[R].
\f[I]a\f[R] must be smaller than \f[B]BC_OVERFLOW_MAX\f[R]. See the \f[B]LIMITS\f[R] section.
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_pow_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Calculates \f[I]a\f[R] to the power of \f[I]b\f[R] to the \f[I]scale\f[R] of the current context. \f[I]b\f[R] must be an integer, but can be negative. If it is negative, \f[I]a\f[R] must be non-zero.
\f[I]b\f[R] must be an integer. If \f[I]b\f[R] is negative, \f[I]a\f[R] must not be \f[B]0\f[R].
\f[I]a\f[R] must be smaller than \f[B]BC_OVERFLOW_MAX\f[R]. See the \f[B]LIMITS\f[R] section.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_lshift(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Shifts \f[I]a\f[R] left (moves the radix right) by \f[I]b\f[R] places and returns the result. This is done in decimal. \f[I]b\f[R] must be an integer.
\f[I]b\f[R] must be an integer.
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_lshift_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Shifts \f[I]a\f[R] left (moves the radix right) by \f[I]b\f[R] places and returns the result. This is done in decimal. \f[I]b\f[R] must be an integer.
\f[I]b\f[R] must be an integer.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_rshift(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Shifts \f[I]a\f[R] right (moves the radix left) by \f[I]b\f[R] places and returns the result. This is done in decimal. \f[I]b\f[R] must be an integer.
\f[I]b\f[R] must be an integer.
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_rshift_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Shifts \f[I]a\f[R] right (moves the radix left) by \f[I]b\f[R] places and returns the result. This is done in decimal. \f[I]b\f[R] must be an integer.
\f[I]b\f[R] must be an integer.
\f[I]a\f[R] and \f[I]b\f[R] can be the same number.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_sqrt(BclNumber\f[R] \f[I]a\f[R]\f[B])\f[R] Calculates the square root of \f[I]a\f[R] and returns the result. The \f[I]scale\f[R] of the result is equal to the \f[B]scale\f[R] of the current context.
\f[I]a\f[R] cannot be negative.
\f[I]a\f[R] is consumed; it cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_sqrt_keep(BclNumber\f[R] \f[I]a\f[R]\f[B])\f[R] Calculates the square root of \f[I]a\f[R] and returns the result. The \f[I]scale\f[R] of the result is equal to the \f[B]scale\f[R] of the current context.
\f[I]a\f[R] cannot be negative.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclError bcl_divmod(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber *\f[R]\f[I]c\f[R]\f[B], BclNumber *\f[R]\f[I]d\f[R]\f[B])\f[R] Divides \f[I]a\f[R] by \f[I]b\f[R] and returns the quotient in a new number which is put into the space pointed to by \f[I]c\f[R], and puts the modulus in a new number which is put into the space pointed to by \f[I]d\f[R].
\f[I]b\f[R] cannot be \f[B]0\f[R].
\f[I]a\f[R] and \f[I]b\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
\f[I]c\f[R] and \f[I]d\f[R] cannot point to the same place, nor can they point to the space occupied by \f[I]a\f[R] or \f[I]b\f[R].
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[B]BclError bcl_divmod_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber *\f[R]\f[I]c\f[R]\f[B], BclNumber *\f[R]\f[I]d\f[R]\f[B])\f[R] Divides \f[I]a\f[R] by \f[I]b\f[R] and returns the quotient in a new number which is put into the space pointed to by \f[I]c\f[R], and puts the modulus in a new number which is put into the space pointed to by \f[I]d\f[R].
\f[I]b\f[R] cannot be \f[B]0\f[R].
\f[I]c\f[R] and \f[I]d\f[R] cannot point to the same place, nor can they point to the space occupied by \f[I]a\f[R] or \f[I]b\f[R].
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[B]BclNumber bcl_modexp(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber\f[R] \f[I]c\f[R]\f[B])\f[R] Computes a modular exponentiation where \f[I]a\f[R] is the base, \f[I]b\f[R] is the exponent, and \f[I]c\f[R] is the modulus, and returns the result. The \f[I]scale\f[R] of the result is equal to the \f[B]scale\f[R] of the current context.
\f[I]a\f[R], \f[I]b\f[R], and \f[I]c\f[R] must be integers. \f[I]c\f[R] must not be \f[B]0\f[R]. \f[I]b\f[R] must not be negative.
\f[I]a\f[R], \f[I]b\f[R], and \f[I]c\f[R] are consumed; they cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_modexp_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B], BclNumber\f[R] \f[I]c\f[R]\f[B])\f[R] Computes a modular exponentiation where \f[I]a\f[R] is the base, \f[I]b\f[R] is the exponent, and \f[I]c\f[R] is the modulus, and returns the result. The \f[I]scale\f[R] of the result is equal to the \f[B]scale\f[R] of the current context.
\f[I]a\f[R], \f[I]b\f[R], and \f[I]c\f[R] must be integers. \f[I]c\f[R] must not be \f[B]0\f[R]. \f[I]b\f[R] must not be negative.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]void bcl_zero(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Sets \f[I]n\f[R] to \f[B]0\f[R].
\f[B]void bcl_one(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Sets \f[I]n\f[R] to \f[B]1\f[R].
\f[B]ssize_t bcl_cmp(BclNumber\f[R] \f[I]a\f[R]\f[B], BclNumber\f[R] \f[I]b\f[R]\f[B])\f[R] Compares \f[I]a\f[R] and \f[I]b\f[R] and returns \f[B]0\f[R] if \f[I]a\f[R] and \f[I]b\f[R] are equal, \f[B]<0\f[R] if \f[I]a\f[R] is less than \f[I]b\f[R], and \f[B]>0\f[R] if \f[I]a\f[R] is greater than \f[I]b\f[R].
\f[B]BclError bcl_copy(BclNumber\f[R] \f[I]d\f[R]\f[B], BclNumber\f[R] \f[I]s\f[R]\f[B])\f[R] Copies \f[I]s\f[R] into \f[I]d\f[R].
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[B]BclNumber bcl_dup(BclNumber\f[R] \f[I]s\f[R]\f[B])\f[R] Creates and returns a new \f[B]BclNumber\f[R] that is a copy of \f[I]s\f[R].
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
By default, bcl(3) attempts to seed the PRNG with data from \f[B]/dev/urandom\f[R]. If that fails, it seeds itself with by calling \f[B]libc\f[R]\[cq]s \f[B]srand(time(NULL))\f[R] and then calling \f[B]rand()\f[R] for each byte, since \f[B]rand()\f[R] is only guaranteed to return \f[B]15\f[R] bits.
This should provide fairly good seeding in the standard case while also remaining fairly portable.
If necessary, the PRNG can be reseeded with one of the following functions:
All procedures in this section without the \f[B]_keep\f[R] suffix in their name consume the given \f[B]BclNumber\f[R] arguments that are not given to pointer arguments. See the \f[B]Consumption and Propagation\f[R] subsection below.
The following items allow clients to use the pseudo-random number generator. All procedures require a valid current context.
\f[B]BCL_SEED_ULONGS\f[R] The number of \f[B]unsigned long\f[R]\[cq]s in a seed for bcl(3)\[cq]s random number generator.
\f[B]BCL_SEED_SIZE\f[R] The size, in \f[B]char\f[R]\[cq]s, of a seed for bcl(3)\[cq]s random number generator.
\f[B]BclBigDig\f[R] bcl(3)\[cq]s overflow type (see the \f[B]PERFORMANCE\f[R] section).
\f[B]BclRandInt\f[R] An unsigned integer type returned by bcl(3)\[cq]s random number generator.
\f[B]BclNumber bcl_irand(BclNumber\f[R] \f[I]a\f[R]\f[B])\f[R] Returns a random number that is not larger than \f[I]a\f[R] in a new number. If \f[I]a\f[R] is \f[B]0\f[R] or \f[B]1\f[R], the new number is equal to \f[B]0\f[R]. The bound is unlimited, so it is not bound to the size of \f[B]BclRandInt\f[R]. This is done by generating as many random numbers as necessary, multiplying them by certain exponents, and adding them all together.
\f[I]a\f[R] must be an integer and non-negative.
\f[I]a\f[R] is consumed; it cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
This procedure requires a valid current context.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_irand_keep(BclNumber\f[R] \f[I]a\f[R]\f[B])\f[R] Returns a random number that is not larger than \f[I]a\f[R] in a new number. If \f[I]a\f[R] is \f[B]0\f[R] or \f[B]1\f[R], the new number is equal to \f[B]0\f[R]. The bound is unlimited, so it is not bound to the size of \f[B]BclRandInt\f[R]. This is done by generating as many random numbers as necessary, multiplying them by certain exponents, and adding them all together.
\f[I]a\f[R] must be an integer and non-negative.
This procedure requires a valid current context.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_frand(size_t\f[R] \f[I]places\f[R]\f[B])\f[R] Returns a random number between \f[B]0\f[R] (inclusive) and \f[B]1\f[R] (exclusive) that has \f[I]places\f[R] decimal digits after the radix (decimal point). There are no limits on \f[I]places\f[R].
This procedure requires a valid current context.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_ifrand(BclNumber\f[R] \f[I]a\f[R]\f[B], size_t\f[R] \f[I]places\f[R]\f[B])\f[R] Returns a random number less than \f[I]a\f[R] with \f[I]places\f[R] decimal digits after the radix (decimal point). There are no limits on \f[I]a\f[R] or \f[I]places\f[R].
\f[I]a\f[R] must be an integer and non-negative.
\f[I]a\f[R] is consumed; it cannot be used after the call. See the \f[B]Consumption and Propagation\f[R] subsection below.
This procedure requires a valid current context.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclNumber bcl_ifrand_keep(BclNumber\f[R] \f[I]a\f[R]\f[B], size_t\f[R] \f[I]places\f[R]\f[B])\f[R] Returns a random number less than \f[I]a\f[R] with \f[I]places\f[R] decimal digits after the radix (decimal point). There are no limits on \f[I]a\f[R] or \f[I]places\f[R].
\f[I]a\f[R] must be an integer and non-negative.
This procedure requires a valid current context.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclError bcl_rand_seedWithNum(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Seeds the PRNG with \f[I]n\f[R].
\f[I]n\f[R] is consumed.
This procedure requires a valid current context.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
Note that if \f[B]bcl_rand_seed2num(\f[R]\f[I]void\f[R]\f[B])\f[R] or \f[B]bcl_rand_seed2num_err(BclNumber)\f[R] are called right after this function, they are not guaranteed to return a number equal to \f[I]n\f[R].
\f[B]BclError bcl_rand_seedWithNum_keep(BclNumber\f[R] \f[I]n\f[R]\f[B])\f[R] Seeds the PRNG with \f[I]n\f[R].
This procedure requires a valid current context.
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
Note that if \f[B]bcl_rand_seed2num(\f[R]\f[I]void\f[R]\f[B])\f[R] or \f[B]bcl_rand_seed2num_err(BclNumber)\f[R] are called right after this function, they are not guaranteed to return a number equal to \f[I]n\f[R].
\f[B]BclError bcl_rand_seed(unsigned char\f[R] \f[I]seed\f[R]\f[B][\f[R]\f[I]BCL_SEED_SIZE\f[R]\f[B]])\f[R] Seeds the PRNG with the bytes in \f[I]seed\f[R].
If there was no error, \f[B]BCL_ERROR_NONE\f[R] is returned. Otherwise, this function can return:
\f[B]void bcl_rand_reseed(\f[R]\f[I]void\f[R]\f[B])\f[R] Reseeds the PRNG with the default reseeding behavior. First, it attempts to read data from \f[B]/dev/urandom\f[R] and falls back to \f[B]libc\f[R]\[cq]s \f[B]rand()\f[R].
This procedure cannot fail.
\f[B]BclNumber bcl_rand_seed2num(\f[R]\f[I]void\f[R]\f[B])\f[R] Returns the current seed of the PRNG as a \f[B]BclNumber\f[R].
This procedure requires a valid current context.
bcl(3) will encode an error in the return value, if there was one. The error can be queried with \f[B]bcl_err(BclNumber)\f[R]. Possible errors include:
\f[B]BclRandInt bcl_rand_int(\f[R]\f[I]void\f[R]\f[B])\f[R] Returns a random integer between \f[B]0\f[R] and \f[B]BC_RAND_MAX\f[R] (inclusive).
This procedure cannot fail.
\f[B]BclRandInt bcl_rand_bounded(BclRandInt\f[R] \f[I]bound\f[R]\f[B])\f[R] Returns a random integer between \f[B]0\f[R] and \f[I]bound\f[R] (exclusive). Bias is removed before returning the integer.
This procedure cannot fail.
This is to enable compact code like the following:
.EX BclNumber n = bcl_num_add(bcl_num_mul(a, b), bcl_num_div(c, d));If arguments to those functions were not consumed, memory would be leaked until reclaimed with \f[B]bcl_ctxt_freeNums(BclContext)\f[R].
When errors occur, they are propagated through. The result should always be checked with \f[B]bcl_err(BclNumber)\f[R], so the example above should properly be:
.EX BclNumber n = bcl_num_add(bcl_num_mul(a, b), bcl_num_div(c, d)); if (bcl_err(n) != BCL_ERROR_NONE) { // Handle the error. }\f[B]BCL_ERROR_NONE\f[R] Success; no error occurred.
\f[B]BCL_ERROR_INVALID_NUM\f[R] An invalid \f[B]BclNumber\f[R] was given as a parameter.
\f[B]BCL_ERROR_INVALID_CONTEXT\f[R] An invalid \f[B]BclContext\f[R] is being used.
\f[B]BCL_ERROR_MATH_NEGATIVE\f[R] A negative number was given as an argument to a parameter that cannot accept negative numbers, such as for square roots.
\f[B]BCL_ERROR_MATH_NON_INTEGER\f[R] A non-integer was given as an argument to a parameter that cannot accept non-integer numbers, such as for the second parameter of \f[B]bcl_num_pow()\f[R].
\f[B]BCL_ERROR_MATH_OVERFLOW\f[R] A number that would overflow its result was given as an argument, such as for converting a \f[B]BclNumber\f[R] to a \f[B]BclBigDig\f[R].
\f[B]BCL_ERROR_MATH_DIVIDE_BY_ZERO\f[R] A divide by zero occurred.
\f[B]BCL_ERROR_PARSE_INVALID_STR\f[R] An invalid number string was passed to a parsing function.
A valid number string can only be one radix (period). In addition, any lowercase ASCII letters, symbols, or non-ASCII characters are invalid. It is allowed for the first character to be a dash. In that case, the number is considered to be negative.
There is one exception to the above: one lowercase \f[B]e\f[R] is allowed in the number, after the radix, if it exists. If the letter \f[B]e\f[R] exists, the number is considered to be in scientific notation, where the part before the \f[B]e\f[R] is the number, and the part after, which must be an integer, is the exponent. There can be a dash right after the \f[B]e\f[R] to indicate a negative exponent.
\f[B]WARNING\f[R]: Both the number and the exponent in scientific notation are interpreted according to the current \f[B]ibase\f[R], but the number is still multiplied by \f[B]10\[ha]exponent\f[R] regardless of the current \f[B]ibase\f[R]. For example, if \f[B]ibase\f[R] is \f[B]16\f[R] and bcl(3) is given the number string \f[B]FFeA\f[R], the resulting decimal number will be \f[B]2550000000000\f[R], and if bcl(3) is given the number string \f[B]10e-4\f[R], the resulting decimal number will be \f[B]0.0016\f[R].
\f[B]BCL_ERROR_FATAL_ALLOC_ERR\f[R] bcl(3) failed to allocate memory.
If clients call \f[B]bcl_setAbortOnFatalError()\f[R] with an \f[B]true\f[R] argument, this error will cause bcl(3) to throw a \f[B]SIGABRT\f[R]. This behavior can also be turned off later by calling that same function with a \f[B]false\f[R] argument. By default, this behavior is off.
It is highly recommended that client libraries do \f[I]not\f[R] activate this behavior.
\f[B]BCL_ERROR_FATAL_UNKNOWN_ERR\f[R] An unknown error occurred.
If clients call \f[B]bcl_setAbortOnFatalError()\f[R] with an \f[B]true\f[R] argument, this error will cause bcl(3) to throw a \f[B]SIGABRT\f[R]. This behavior can also be turned off later by calling that same function with a \f[B]false\f[R] argument. By default, this behavior is off.
It is highly recommended that client libraries do \f[I]not\f[R] activate this behavior.
bcl(3) is not \f[I]async-signal-safe\f[R]. It was not possible to make bcl(3) safe with signals and also make it safe with multiple threads. If it is necessary to be able to interrupt bcl(3), spawn a separate thread to run the calculation.
It uses large integers to calculate more than \f[B]1\f[R] decimal digit at a time. If built in a environment where \f[B]BC_LONG_BIT\f[R] (see the \f[B]LIMITS\f[R] section) is \f[B]64\f[R], then each integer has \f[B]9\f[R] decimal digits. If built in an environment where \f[B]BC_LONG_BIT\f[R] is \f[B]32\f[R] then each integer has \f[B]4\f[R] decimal digits. This value (the number of decimal digits per large integer) is called \f[B]BC_BASE_DIGS\f[R].
In addition, this bcl(3) uses an even larger integer for overflow checking. This integer type depends on the value of \f[B]BC_LONG_BIT\f[R], but is always at least twice as large as the integer type used to store digits.
\f[B]BC_LONG_BIT\f[R] The number of bits in the \f[B]long\f[R] type in the environment where bcl(3) was built. This determines how many decimal digits can be stored in a single large integer (see the \f[B]PERFORMANCE\f[R] section).
\f[B]BC_BASE_DIGS\f[R] The number of decimal digits per large integer (see the \f[B]PERFORMANCE\f[R] section). Depends on \f[B]BC_LONG_BIT\f[R].
\f[B]BC_BASE_POW\f[R] The max decimal number that each large integer can store (see \f[B]BC_BASE_DIGS\f[R]) plus \f[B]1\f[R]. Depends on \f[B]BC_BASE_DIGS\f[R].
\f[B]BC_OVERFLOW_MAX\f[R] The max number that the overflow type (see the \f[B]PERFORMANCE\f[R] section) can hold. Depends on \f[B]BC_LONG_BIT\f[R].
\f[B]BC_BASE_MAX\f[R] The maximum output base. Set at \f[B]BC_BASE_POW\f[R].
\f[B]BC_SCALE_MAX\f[R] The maximum \f[B]scale\f[R]. Set at \f[B]BC_OVERFLOW_MAX-1\f[R].
\f[B]BC_NUM_MAX\f[R] The maximum length of a number (in decimal digits), which includes digits after the decimal point. Set at \f[B]BC_OVERFLOW_MAX-1\f[R].
\f[B]BC_RAND_MAX\f[R] The maximum integer (inclusive) returned by the \f[B]bcl_rand_int()\f[R] function. Set at \f[B]2\[ha]BC_LONG_BIT-1\f[R].
Exponent The maximum allowable exponent (positive or negative). Set at \f[B]BC_OVERFLOW_MAX\f[R].
These limits are meant to be effectively non-existent; the limits are so large (at least on 64-bit machines) that there should not be any point at which they become a problem. In fact, memory should be exhausted before these limits should be hit.
Note that the specification explicitly says that bc(1) only accepts numbers that use a period (\f[B].\f[R]) as a radix point, regardless of the value of \f[B]LC_NUMERIC\f[R]. This is also true of bcl(3).