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diff --git a/patches/mpfr/3.1.3/110-lngamma-and-doc.patch b/patches/mpfr/3.1.3/110-lngamma-and-doc.patch
deleted file mode 100644
index d7e1cbf..0000000
--- a/patches/mpfr/3.1.3/110-lngamma-and-doc.patch
+++ /dev/null
@@ -1,1117 +0,0 @@
-diff -Naurd mpfr-3.1.3-a/PATCHES mpfr-3.1.3-b/PATCHES
---- mpfr-3.1.3-a/PATCHES 2015-07-02 10:49:23.950112879 +0000
-+++ mpfr-3.1.3-b/PATCHES 2015-07-02 10:49:24.042113845 +0000
-@@ -0,0 +1 @@
-+lngamma-and-doc
-diff -Naurd mpfr-3.1.3-a/VERSION mpfr-3.1.3-b/VERSION
---- mpfr-3.1.3-a/VERSION 2015-06-19 19:55:09.000000000 +0000
-+++ mpfr-3.1.3-b/VERSION 2015-07-02 10:49:24.042113845 +0000
-@@ -1 +1 @@
--3.1.3
-+3.1.3-p1
-diff -Naurd mpfr-3.1.3-a/doc/mpfr.texi mpfr-3.1.3-b/doc/mpfr.texi
---- mpfr-3.1.3-a/doc/mpfr.texi 2015-06-19 19:55:11.000000000 +0000
-+++ mpfr-3.1.3-b/doc/mpfr.texi 2015-07-02 10:49:24.018113593 +0000
-@@ -810,13 +810,17 @@
- When the input point is in the closure of the domain of the mathematical
- function and an input argument is +0 (resp.@: @minus{}0), one considers
- the limit when the corresponding argument approaches 0 from above
--(resp.@: below). If the limit is not defined (e.g., @code{mpfr_log} on
--@minus{}0), the behavior is specified in the description of the MPFR function.
-+(resp.@: below), if possible. If the limit is not defined (e.g.,
-+@code{mpfr_sqrt} and @code{mpfr_log} on @minus{}0), the behavior is
-+specified in the description of the MPFR function, but must be consistent
-+with the rule from the above paragraph (e.g., @code{mpfr_log} on @pom{}0
-+gives @minus{}Inf).
-
- When the result is equal to 0, its sign is determined by considering the
- limit as if the input point were not in the domain: If one approaches 0
- from above (resp.@: below), the result is +0 (resp.@: @minus{}0);
--for example, @code{mpfr_sin} on +0 gives +0.
-+for example, @code{mpfr_sin} on @minus{}0 gives @minus{}0 and
-+@code{mpfr_acos} on 1 gives +0 (in all rounding modes).
- In the other cases, the sign is specified in the description of the MPFR
- function; for example @code{mpfr_max} on @minus{}0 and +0 gives +0.
-
-@@ -832,8 +836,8 @@
- @c that advantages in practice), like for any bug fix.
- Example: @code{mpfr_hypot} on (NaN,0) gives NaN, but @code{mpfr_hypot}
- on (NaN,+Inf) gives +Inf (as specified in @ref{Special Functions}),
--since for any finite input @var{x}, @code{mpfr_hypot} on (@var{x},+Inf)
--gives +Inf.
-+since for any finite or infinite input @var{x}, @code{mpfr_hypot} on
-+(@var{x},+Inf) gives +Inf.
-
- @node Exceptions, Memory Handling, Floating-Point Values on Special Numbers, MPFR Basics
- @comment node-name, next, previous, up
-@@ -1581,7 +1585,8 @@
- @deftypefunx int mpfr_add_z (mpfr_t @var{rop}, mpfr_t @var{op1}, mpz_t @var{op2}, mpfr_rnd_t @var{rnd})
- @deftypefunx int mpfr_add_q (mpfr_t @var{rop}, mpfr_t @var{op1}, mpq_t @var{op2}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to @math{@var{op1} + @var{op2}} rounded in the direction
--@var{rnd}. For types having no signed zero, it is considered unsigned
-+@var{rnd}. The IEEE-754 rules are used, in particular for signed zeros.
-+But for types having no signed zeros, 0 is considered unsigned
- (i.e., (+0) + 0 = (+0) and (@minus{}0) + 0 = (@minus{}0)).
- The @code{mpfr_add_d} function assumes that the radix of the @code{double} type
- is a power of 2, with a precision at most that declared by the C implementation
-@@ -1599,7 +1604,8 @@
- @deftypefunx int mpfr_sub_z (mpfr_t @var{rop}, mpfr_t @var{op1}, mpz_t @var{op2}, mpfr_rnd_t @var{rnd})
- @deftypefunx int mpfr_sub_q (mpfr_t @var{rop}, mpfr_t @var{op1}, mpq_t @var{op2}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to @math{@var{op1} - @var{op2}} rounded in the direction
--@var{rnd}. For types having no signed zero, it is considered unsigned
-+@var{rnd}. The IEEE-754 rules are used, in particular for signed zeros.
-+But for types having no signed zeros, 0 is considered unsigned
- (i.e., (+0) @minus{} 0 = (+0), (@minus{}0) @minus{} 0 = (@minus{}0),
- 0 @minus{} (+0) = (@minus{}0) and 0 @minus{} (@minus{}0) = (+0)).
- The same restrictions than for @code{mpfr_add_d} apply to @code{mpfr_d_sub}
-@@ -1615,7 +1621,7 @@
- Set @var{rop} to @math{@var{op1} @GMPtimes{} @var{op2}} rounded in the
- direction @var{rnd}.
- When a result is zero, its sign is the product of the signs of the operands
--(for types having no signed zero, it is considered positive).
-+(for types having no signed zeros, 0 is considered positive).
- The same restrictions than for @code{mpfr_add_d} apply to @code{mpfr_mul_d}.
- @end deftypefun
-
-@@ -1635,7 +1641,7 @@
- @deftypefunx int mpfr_div_q (mpfr_t @var{rop}, mpfr_t @var{op1}, mpq_t @var{op2}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to @math{@var{op1}/@var{op2}} rounded in the direction @var{rnd}.
- When a result is zero, its sign is the product of the signs of the operands
--(for types having no signed zero, it is considered positive).
-+(for types having no signed zeros, 0 is considered positive).
- The same restrictions than for @code{mpfr_add_d} apply to @code{mpfr_d_div}
- and @code{mpfr_div_d}.
- @end deftypefun
-@@ -1643,15 +1649,18 @@
- @deftypefun int mpfr_sqrt (mpfr_t @var{rop}, mpfr_t @var{op}, mpfr_rnd_t @var{rnd})
- @deftypefunx int mpfr_sqrt_ui (mpfr_t @var{rop}, unsigned long int @var{op}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to @m{\sqrt{@var{op}}, the square root of @var{op}}
--rounded in the direction @var{rnd} (set @var{rop} to @minus{}0 if @var{op} is
--@minus{}0, to be consistent with the IEEE 754 standard).
-+rounded in the direction @var{rnd}. Set @var{rop} to @minus{}0 if
-+@var{op} is @minus{}0, to be consistent with the IEEE 754 standard.
- Set @var{rop} to NaN if @var{op} is negative.
- @end deftypefun
-
- @deftypefun int mpfr_rec_sqrt (mpfr_t @var{rop}, mpfr_t @var{op}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to @m{1/\sqrt{@var{op}}, the reciprocal square root of @var{op}}
--rounded in the direction @var{rnd}. Set @var{rop} to +Inf if @var{op} is
--@pom{}0, +0 if @var{op} is +Inf, and NaN if @var{op} is negative.
-+rounded in the direction @var{rnd}. Set @var{rop} to +Inf if @var{op} is
-+@pom{}0, +0 if @var{op} is +Inf, and NaN if @var{op} is negative. Warning!
-+Therefore the result on @minus{}0 is different from the one of the rSqrt
-+function recommended by the IEEE 754-2008 standard (Section 9.2.1), which
-+is @minus{}Inf instead of +Inf.
- @end deftypefun
-
- @deftypefun int mpfr_cbrt (mpfr_t @var{rop}, mpfr_t @var{op}, mpfr_rnd_t @var{rnd})
-@@ -1832,7 +1841,9 @@
- @m{\log_2 @var{op}, log2(@var{op})} or
- @m{\log_{10} @var{op}, log10(@var{op})}, respectively,
- rounded in the direction @var{rnd}.
--Set @var{rop} to @minus{}Inf if @var{op} is @minus{}0
-+Set @var{rop} to +0 if @var{op} is 1 (in all rounding modes),
-+for consistency with the ISO C99 and IEEE 754-2008 standards.
-+Set @var{rop} to @minus{}Inf if @var{op} is @pom{}0
- (i.e., the sign of the zero has no influence on the result).
- @end deftypefun
-
-@@ -2003,8 +2014,11 @@
- @deftypefun int mpfr_lngamma (mpfr_t @var{rop}, mpfr_t @var{op}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to the value of the logarithm of the Gamma function on @var{op},
- rounded in the direction @var{rnd}.
--When @math{@minus{}2@var{k}@minus{}1 @le{} @var{op} @le{} @minus{}2@var{k}},
--@var{k} being a non-negative integer, @var{rop} is set to NaN.
-+When @var{op} is 1 or 2, set @var{rop} to +0 (in all rounding modes).
-+When @var{op} is an infinity or a nonpositive integer, set @var{rop} to +Inf,
-+following the general rules on special values.
-+When @math{@minus{}2@var{k}@minus{}1 < @var{op} < @minus{}2@var{k}},
-+@var{k} being a nonnegative integer, set @var{rop} to NaN@.
- See also @code{mpfr_lgamma}.
- @end deftypefun
-
-@@ -2012,10 +2026,11 @@
- Set @var{rop} to the value of the logarithm of the absolute value of the
- Gamma function on @var{op}, rounded in the direction @var{rnd}. The sign
- (1 or @minus{}1) of Gamma(@var{op}) is returned in the object pointed to
--by @var{signp}. When @var{op} is an infinity or a non-positive integer, set
--@var{rop} to +Inf. When @var{op} is NaN, @minus{}Inf or a negative integer,
--*@var{signp} is undefined, and when @var{op} is @pom{}0, *@var{signp} is
--the sign of the zero.
-+by @var{signp}.
-+When @var{op} is 1 or 2, set @var{rop} to +0 (in all rounding modes).
-+When @var{op} is an infinity or a nonpositive integer, set @var{rop} to +Inf.
-+When @var{op} is NaN, @minus{}Inf or a negative integer, *@var{signp} is
-+undefined, and when @var{op} is @pom{}0, *@var{signp} is the sign of the zero.
- @end deftypefun
-
- @deftypefun int mpfr_digamma (mpfr_t @var{rop}, mpfr_t @var{op}, mpfr_rnd_t @var{rnd})
-@@ -2064,7 +2079,10 @@
- @deftypefunx int mpfr_fms (mpfr_t @var{rop}, mpfr_t @var{op1}, mpfr_t @var{op2}, mpfr_t @var{op3}, mpfr_rnd_t @var{rnd})
- Set @var{rop} to @math{(@var{op1} @GMPtimes{} @var{op2}) + @var{op3}}
- (resp.@: @math{(@var{op1} @GMPtimes{} @var{op2}) - @var{op3}})
--rounded in the direction @var{rnd}.
-+rounded in the direction @var{rnd}. Concerning special values (signed zeros,
-+infinities, NaN), these functions behave like a multiplication followed by a
-+separate addition or subtraction. That is, the fused operation matters only
-+for rounding.
- @end deftypefun
-
- @deftypefun int mpfr_agm (mpfr_t @var{rop}, mpfr_t @var{op1}, mpfr_t @var{op2}, mpfr_rnd_t @var{rnd})
-@@ -2089,8 +2107,8 @@
- i.e., $\sqrt{x^2+y^2}$,
- @end tex
- rounded in the direction @var{rnd}.
--Special values are handled as described in Section F.9.4.3 of
--the ISO C99 and IEEE 754-2008 standards:
-+Special values are handled as described in the ISO C99 (Section F.9.4.3)
-+and IEEE 754-2008 (Section 9.2.1) standards:
- If @var{x} or @var{y} is an infinity, then +Inf is returned in @var{rop},
- even if the other number is NaN.
- @end deftypefun
-diff -Naurd mpfr-3.1.3-a/doc/mpfr.info mpfr-3.1.3-b/doc/mpfr.info
---- mpfr-3.1.3-a/doc/mpfr.info 2015-06-19 19:55:53.000000000 +0000
-+++ mpfr-3.1.3-b/doc/mpfr.info 2015-07-02 10:49:38.718267817 +0000
-@@ -1,4 +1,4 @@
--This is mpfr.info, produced by makeinfo version 5.2 from mpfr.texi.
-+This is mpfr.info, produced by makeinfo version 6.0 from mpfr.texi.
-
- This manual documents how to install and use the Multiple Precision
- Floating-Point Reliable Library, version 3.1.3.
-@@ -55,7 +55,7 @@
- MPFR Copying Conditions
- ***********************
-
--The GNU MPFR library (or MPFR for short) is "free"; this means that
-+The GNU MPFR library (or MPFR for short) is “free”; this means that
- everyone is free to use it and free to redistribute it on a free basis.
- The library is not in the public domain; it is copyrighted and there are
- restrictions on its distribution, but these restrictions are designed to
-@@ -418,7 +418,7 @@
- 4.2 Nomenclature and Types
- ==========================
-
--A "floating-point number", or "float" for short, is an arbitrary
-+A “floating-point number”, or “float” for short, is an arbitrary
- precision significand (also called mantissa) with a limited precision
- exponent. The C data type for such objects is ‘mpfr_t’ (internally
- defined as a one-element array of a structure, and ‘mpfr_ptr’ is the C
-@@ -432,7 +432,7 @@
- to the other functions supported by MPFR. Unless documented otherwise,
- the sign bit of a NaN is unspecified.
-
--The "precision" is the number of bits used to represent the significand
-+The “precision” is the number of bits used to represent the significand
- of a floating-point number; the corresponding C data type is
- ‘mpfr_prec_t’. The precision can be any integer between ‘MPFR_PREC_MIN’
- and ‘MPFR_PREC_MAX’. In the current implementation, ‘MPFR_PREC_MIN’ is
-@@ -446,7 +446,7 @@
- may abort, crash or have undefined behavior (depending on your C
- implementation).
-
--The "rounding mode" specifies the way to round the result of a
-+The “rounding mode” specifies the way to round the result of a
- floating-point operation, in case the exact result can not be
- represented exactly in the destination significand; the corresponding C
- data type is ‘mpfr_rnd_t’.
-@@ -499,14 +499,14 @@
- representable numbers, it is rounded to the one with the least
- significant bit set to zero. For example, the number 2.5, which is
- represented by (10.1) in binary, is rounded to (10.0)=2 with a precision
--of two bits, and not to (11.0)=3. This rule avoids the "drift"
-+of two bits, and not to (11.0)=3. This rule avoids the “drift”
- phenomenon mentioned by Knuth in volume 2 of The Art of Computer
- Programming (Section 4.2.2).
-
- Most MPFR functions take as first argument the destination variable,
- as second and following arguments the input variables, as last argument
- a rounding mode, and have a return value of type ‘int’, called the
--"ternary value". The value stored in the destination variable is
-+“ternary value”. The value stored in the destination variable is
- correctly rounded, i.e., MPFR behaves as if it computed the result with
- an infinite precision, then rounded it to the precision of this
- variable. The input variables are regarded as exact (in particular,
-@@ -572,15 +572,18 @@
- When the input point is in the closure of the domain of the
- mathematical function and an input argument is +0 (resp. −0), one
- considers the limit when the corresponding argument approaches 0 from
--above (resp. below). If the limit is not defined (e.g., ‘mpfr_log’ on
--−0), the behavior is specified in the description of the MPFR function.
-+above (resp. below), if possible. If the limit is not defined (e.g.,
-+‘mpfr_sqrt’ and ‘mpfr_log’ on −0), the behavior is specified in the
-+description of the MPFR function, but must be consistent with the rule
-+from the above paragraph (e.g., ‘mpfr_log’ on ±0 gives −Inf).
-
- When the result is equal to 0, its sign is determined by considering
- the limit as if the input point were not in the domain: If one
- approaches 0 from above (resp. below), the result is +0 (resp. −0); for
--example, ‘mpfr_sin’ on +0 gives +0. In the other cases, the sign is
--specified in the description of the MPFR function; for example
--‘mpfr_max’ on −0 and +0 gives +0.
-+example, ‘mpfr_sin’ on −0 gives −0 and ‘mpfr_acos’ on 1 gives +0 (in all
-+rounding modes). In the other cases, the sign is specified in the
-+description of the MPFR function; for example ‘mpfr_max’ on −0 and +0
-+gives +0.
-
- When the input point is not in the closure of the domain of the
- function, the result is NaN. Example: ‘mpfr_sqrt’ on −17 gives NaN.
-@@ -590,8 +593,8 @@
- numbers; such a case is always explicitly specified in *note MPFR
- Interface::. Example: ‘mpfr_hypot’ on (NaN,0) gives NaN, but
- ‘mpfr_hypot’ on (NaN,+Inf) gives +Inf (as specified in *note Special
--Functions::), since for any finite input X, ‘mpfr_hypot’ on (X,+Inf)
--gives +Inf.
-+Functions::), since for any finite or infinite input X, ‘mpfr_hypot’ on
-+(X,+Inf) gives +Inf.
-
- 
- File: mpfr.info, Node: Exceptions, Next: Memory Handling, Prev: Floating-Point Values on Special Numbers, Up: MPFR Basics
-@@ -1253,8 +1256,9 @@
- mpfr_rnd_t RND)
- -- Function: int mpfr_add_q (mpfr_t ROP, mpfr_t OP1, mpq_t OP2,
- mpfr_rnd_t RND)
-- Set ROP to OP1 + OP2 rounded in the direction RND. For types
-- having no signed zero, it is considered unsigned (i.e., (+0) + 0 =
-+ Set ROP to OP1 + OP2 rounded in the direction RND. The IEEE-754
-+ rules are used, in particular for signed zeros. But for types
-+ having no signed zeros, 0 is considered unsigned (i.e., (+0) + 0 =
- (+0) and (−0) + 0 = (−0)). The ‘mpfr_add_d’ function assumes that
- the radix of the ‘double’ type is a power of 2, with a precision at
- most that declared by the C implementation (macro
-@@ -1280,8 +1284,9 @@
- mpfr_rnd_t RND)
- -- Function: int mpfr_sub_q (mpfr_t ROP, mpfr_t OP1, mpq_t OP2,
- mpfr_rnd_t RND)
-- Set ROP to OP1 - OP2 rounded in the direction RND. For types
-- having no signed zero, it is considered unsigned (i.e., (+0) − 0 =
-+ Set ROP to OP1 - OP2 rounded in the direction RND. The IEEE-754
-+ rules are used, in particular for signed zeros. But for types
-+ having no signed zeros, 0 is considered unsigned (i.e., (+0) − 0 =
- (+0), (−0) − 0 = (−0), 0 − (+0) = (−0) and 0 − (−0) = (+0)). The
- same restrictions than for ‘mpfr_add_d’ apply to ‘mpfr_d_sub’ and
- ‘mpfr_sub_d’.
-@@ -1300,7 +1305,7 @@
- mpfr_rnd_t RND)
- Set ROP to OP1 times OP2 rounded in the direction RND. When a
- result is zero, its sign is the product of the signs of the
-- operands (for types having no signed zero, it is considered
-+ operands (for types having no signed zeros, 0 is considered
- positive). The same restrictions than for ‘mpfr_add_d’ apply to
- ‘mpfr_mul_d’.
-
-@@ -1327,21 +1332,24 @@
- mpfr_rnd_t RND)
- Set ROP to OP1/OP2 rounded in the direction RND. When a result is
- zero, its sign is the product of the signs of the operands (for
-- types having no signed zero, it is considered positive). The same
-+ types having no signed zeros, 0 is considered positive). The same
- restrictions than for ‘mpfr_add_d’ apply to ‘mpfr_d_div’ and
- ‘mpfr_div_d’.
-
- -- Function: int mpfr_sqrt (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- -- Function: int mpfr_sqrt_ui (mpfr_t ROP, unsigned long int OP,
- mpfr_rnd_t RND)
-- Set ROP to the square root of OP rounded in the direction RND (set
-- ROP to −0 if OP is −0, to be consistent with the IEEE 754
-- standard). Set ROP to NaN if OP is negative.
-+ Set ROP to the square root of OP rounded in the direction RND. Set
-+ ROP to −0 if OP is −0, to be consistent with the IEEE 754 standard.
-+ Set ROP to NaN if OP is negative.
-
- -- Function: int mpfr_rec_sqrt (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- Set ROP to the reciprocal square root of OP rounded in the
- direction RND. Set ROP to +Inf if OP is ±0, +0 if OP is +Inf, and
-- NaN if OP is negative.
-+ NaN if OP is negative. Warning! Therefore the result on −0 is
-+ different from the one of the rSqrt function recommended by the
-+ IEEE 754-2008 standard (Section 9.2.1), which is −Inf instead of
-+ +Inf.
-
- -- Function: int mpfr_cbrt (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- -- Function: int mpfr_root (mpfr_t ROP, mpfr_t OP, unsigned long int K,
-@@ -1515,8 +1523,10 @@
- -- Function: int mpfr_log2 (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- -- Function: int mpfr_log10 (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- Set ROP to the natural logarithm of OP, log2(OP) or log10(OP),
-- respectively, rounded in the direction RND. Set ROP to −Inf if OP
-- is −0 (i.e., the sign of the zero has no influence on the result).
-+ respectively, rounded in the direction RND. Set ROP to +0 if OP is
-+ 1 (in all rounding modes), for consistency with the ISO C99 and
-+ IEEE 754-2008 standards. Set ROP to −Inf if OP is ±0 (i.e., the
-+ sign of the zero has no influence on the result).
-
- -- Function: int mpfr_exp (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- -- Function: int mpfr_exp2 (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
-@@ -1649,17 +1659,21 @@
-
- -- Function: int mpfr_lngamma (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- Set ROP to the value of the logarithm of the Gamma function on OP,
-- rounded in the direction RND. When −2K−1 <= OP <= −2K, K being a
-- non-negative integer, ROP is set to NaN. See also ‘mpfr_lgamma’.
-+ rounded in the direction RND. When OP is 1 or 2, set ROP to +0 (in
-+ all rounding modes). When OP is an infinity or a nonpositive
-+ integer, set ROP to +Inf, following the general rules on special
-+ values. When −2K−1 < OP < −2K, K being a nonnegative integer, set
-+ ROP to NaN. See also ‘mpfr_lgamma’.
-
- -- Function: int mpfr_lgamma (mpfr_t ROP, int *SIGNP, mpfr_t OP,
- mpfr_rnd_t RND)
- Set ROP to the value of the logarithm of the absolute value of the
- Gamma function on OP, rounded in the direction RND. The sign (1 or
- −1) of Gamma(OP) is returned in the object pointed to by SIGNP.
-- When OP is an infinity or a non-positive integer, set ROP to +Inf.
-- When OP is NaN, −Inf or a negative integer, *SIGNP is undefined,
-- and when OP is ±0, *SIGNP is the sign of the zero.
-+ When OP is 1 or 2, set ROP to +0 (in all rounding modes). When OP
-+ is an infinity or a nonpositive integer, set ROP to +Inf. When OP
-+ is NaN, −Inf or a negative integer, *SIGNP is undefined, and when
-+ OP is ±0, *SIGNP is the sign of the zero.
-
- -- Function: int mpfr_digamma (mpfr_t ROP, mpfr_t OP, mpfr_rnd_t RND)
- Set ROP to the value of the Digamma (sometimes also called Psi)
-@@ -1703,7 +1717,10 @@
- -- Function: int mpfr_fms (mpfr_t ROP, mpfr_t OP1, mpfr_t OP2, mpfr_t
- OP3, mpfr_rnd_t RND)
- Set ROP to (OP1 times OP2) + OP3 (resp. (OP1 times OP2) - OP3)
-- rounded in the direction RND.
-+ rounded in the direction RND. Concerning special values (signed
-+ zeros, infinities, NaN), these functions behave like a
-+ multiplication followed by a separate addition or subtraction.
-+ That is, the fused operation matters only for rounding.
-
- -- Function: int mpfr_agm (mpfr_t ROP, mpfr_t OP1, mpfr_t OP2,
- mpfr_rnd_t RND)
-@@ -1717,9 +1734,10 @@
- RND)
- Set ROP to the Euclidean norm of X and Y, i.e., the square root of
- the sum of the squares of X and Y, rounded in the direction RND.
-- Special values are handled as described in Section F.9.4.3 of the
-- ISO C99 and IEEE 754-2008 standards: If X or Y is an infinity, then
-- +Inf is returned in ROP, even if the other number is NaN.
-+ Special values are handled as described in the ISO C99 (Section
-+ F.9.4.3) and IEEE 754-2008 (Section 9.2.1) standards: If X or Y is
-+ an infinity, then +Inf is returned in ROP, even if the other number
-+ is NaN.
-
- -- Function: int mpfr_ai (mpfr_t ROP, mpfr_t X, mpfr_rnd_t RND)
- Set ROP to the value of the Airy function Ai on X, rounded in the
-@@ -2670,7 +2688,7 @@
- 5.16 Internals
- ==============
-
--A "limb" means the part of a multi-precision number that fits in a
-+A “limb” means the part of a multi-precision number that fits in a
- single word. Usually a limb contains 32 or 64 bits. The C data type
- for a limb is ‘mp_limb_t’.
-
-@@ -3140,7 +3158,7 @@
- 0. PREAMBLE
-
- The purpose of this License is to make a manual, textbook, or other
-- functional and useful document "free" in the sense of freedom: to
-+ functional and useful document “free” in the sense of freedom: to
- assure everyone the effective freedom to copy and redistribute it,
- with or without modifying it, either commercially or
- noncommercially. Secondarily, this License preserves for the
-@@ -3655,9 +3673,9 @@
- * Menu:
-
- * mpfr_abs: Basic Arithmetic Functions.
-- (line 160)
--* mpfr_acos: Special Functions. (line 51)
--* mpfr_acosh: Special Functions. (line 115)
-+ (line 165)
-+* mpfr_acos: Special Functions. (line 53)
-+* mpfr_acosh: Special Functions. (line 117)
- * mpfr_add: Basic Arithmetic Functions.
- (line 6)
- * mpfr_add_d: Basic Arithmetic Functions.
-@@ -3670,15 +3688,15 @@
- (line 8)
- * mpfr_add_z: Basic Arithmetic Functions.
- (line 14)
--* mpfr_agm: Special Functions. (line 210)
--* mpfr_ai: Special Functions. (line 226)
--* mpfr_asin: Special Functions. (line 52)
--* mpfr_asinh: Special Functions. (line 116)
-+* mpfr_agm: Special Functions. (line 219)
-+* mpfr_ai: Special Functions. (line 236)
-+* mpfr_asin: Special Functions. (line 54)
-+* mpfr_asinh: Special Functions. (line 118)
- * mpfr_asprintf: Formatted Output Functions.
- (line 193)
--* mpfr_atan: Special Functions. (line 53)
--* mpfr_atan2: Special Functions. (line 63)
--* mpfr_atanh: Special Functions. (line 117)
-+* mpfr_atan: Special Functions. (line 55)
-+* mpfr_atan2: Special Functions. (line 65)
-+* mpfr_atanh: Special Functions. (line 119)
- * mpfr_buildopt_decimal_p: Miscellaneous Functions.
- (line 162)
- * mpfr_buildopt_gmpinternals_p: Miscellaneous Functions.
-@@ -3690,7 +3708,7 @@
- * mpfr_can_round: Rounding Related Functions.
- (line 39)
- * mpfr_cbrt: Basic Arithmetic Functions.
-- (line 108)
-+ (line 113)
- * mpfr_ceil: Integer Related Functions.
- (line 7)
- * mpfr_check_range: Exception Related Functions.
-@@ -3735,18 +3753,18 @@
- (line 27)
- * mpfr_cmp_z: Comparison Functions.
- (line 11)
--* mpfr_const_catalan: Special Functions. (line 237)
--* mpfr_const_euler: Special Functions. (line 236)
--* mpfr_const_log2: Special Functions. (line 234)
--* mpfr_const_pi: Special Functions. (line 235)
-+* mpfr_const_catalan: Special Functions. (line 247)
-+* mpfr_const_euler: Special Functions. (line 246)
-+* mpfr_const_log2: Special Functions. (line 244)
-+* mpfr_const_pi: Special Functions. (line 245)
- * mpfr_copysign: Miscellaneous Functions.
- (line 109)
--* mpfr_cos: Special Functions. (line 29)
--* mpfr_cosh: Special Functions. (line 95)
--* mpfr_cot: Special Functions. (line 47)
--* mpfr_coth: Special Functions. (line 111)
--* mpfr_csc: Special Functions. (line 46)
--* mpfr_csch: Special Functions. (line 110)
-+* mpfr_cos: Special Functions. (line 31)
-+* mpfr_cosh: Special Functions. (line 97)
-+* mpfr_cot: Special Functions. (line 49)
-+* mpfr_coth: Special Functions. (line 113)
-+* mpfr_csc: Special Functions. (line 48)
-+* mpfr_csch: Special Functions. (line 112)
- * mpfr_custom_get_exp: Custom Interface. (line 75)
- * mpfr_custom_get_kind: Custom Interface. (line 65)
- * mpfr_custom_get_significand: Custom Interface. (line 70)
-@@ -3756,47 +3774,47 @@
- * mpfr_custom_move: Custom Interface. (line 82)
- * MPFR_DECL_INIT: Initialization Functions.
- (line 74)
--* mpfr_digamma: Special Functions. (line 166)
-+* mpfr_digamma: Special Functions. (line 172)
- * mpfr_dim: Basic Arithmetic Functions.
-- (line 166)
-+ (line 171)
- * mpfr_div: Basic Arithmetic Functions.
-- (line 72)
-+ (line 74)
- * mpfr_divby0_p: Exception Related Functions.
- (line 134)
- * mpfr_div_2exp: Compatibility with MPF.
- (line 49)
- * mpfr_div_2si: Basic Arithmetic Functions.
-- (line 181)
-+ (line 186)
- * mpfr_div_2ui: Basic Arithmetic Functions.
-- (line 179)
-+ (line 184)
- * mpfr_div_d: Basic Arithmetic Functions.
-- (line 84)
-+ (line 86)
- * mpfr_div_q: Basic Arithmetic Functions.
-- (line 88)
-+ (line 90)
- * mpfr_div_si: Basic Arithmetic Functions.
-- (line 80)
-+ (line 82)
- * mpfr_div_ui: Basic Arithmetic Functions.
-- (line 76)
-+ (line 78)
- * mpfr_div_z: Basic Arithmetic Functions.
-- (line 86)
-+ (line 88)
- * mpfr_d_div: Basic Arithmetic Functions.
-- (line 82)
-+ (line 84)
- * mpfr_d_sub: Basic Arithmetic Functions.
-- (line 35)
--* mpfr_eint: Special Functions. (line 133)
-+ (line 36)
-+* mpfr_eint: Special Functions. (line 135)
- * mpfr_eq: Compatibility with MPF.
- (line 28)
- * mpfr_equal_p: Comparison Functions.
- (line 59)
- * mpfr_erangeflag_p: Exception Related Functions.
- (line 137)
--* mpfr_erf: Special Functions. (line 177)
--* mpfr_erfc: Special Functions. (line 178)
--* mpfr_exp: Special Functions. (line 23)
--* mpfr_exp10: Special Functions. (line 25)
--* mpfr_exp2: Special Functions. (line 24)
--* mpfr_expm1: Special Functions. (line 129)
--* mpfr_fac_ui: Special Functions. (line 121)
-+* mpfr_erf: Special Functions. (line 183)
-+* mpfr_erfc: Special Functions. (line 184)
-+* mpfr_exp: Special Functions. (line 25)
-+* mpfr_exp10: Special Functions. (line 27)
-+* mpfr_exp2: Special Functions. (line 26)
-+* mpfr_expm1: Special Functions. (line 131)
-+* mpfr_fac_ui: Special Functions. (line 123)
- * mpfr_fits_intmax_p: Conversion Functions.
- (line 150)
- * mpfr_fits_sint_p: Conversion Functions.
-@@ -3815,20 +3833,20 @@
- (line 147)
- * mpfr_floor: Integer Related Functions.
- (line 8)
--* mpfr_fma: Special Functions. (line 203)
-+* mpfr_fma: Special Functions. (line 209)
- * mpfr_fmod: Integer Related Functions.
- (line 92)
--* mpfr_fms: Special Functions. (line 205)
-+* mpfr_fms: Special Functions. (line 211)
- * mpfr_fprintf: Formatted Output Functions.
- (line 157)
- * mpfr_frac: Integer Related Functions.
- (line 76)
--* mpfr_free_cache: Special Functions. (line 244)
-+* mpfr_free_cache: Special Functions. (line 254)
- * mpfr_free_str: Conversion Functions.
- (line 137)
- * mpfr_frexp: Conversion Functions.
- (line 45)
--* mpfr_gamma: Special Functions. (line 148)
-+* mpfr_gamma: Special Functions. (line 150)
- * mpfr_get_d: Conversion Functions.
- (line 7)
- * mpfr_get_decimal64: Conversion Functions.
-@@ -3887,7 +3905,7 @@
- (line 56)
- * mpfr_greater_p: Comparison Functions.
- (line 55)
--* mpfr_hypot: Special Functions. (line 218)
-+* mpfr_hypot: Special Functions. (line 227)
- * mpfr_inexflag_p: Exception Related Functions.
- (line 136)
- * mpfr_inf_p: Comparison Functions.
-@@ -3922,21 +3940,21 @@
- (line 31)
- * mpfr_integer_p: Integer Related Functions.
- (line 119)
--* mpfr_j0: Special Functions. (line 182)
--* mpfr_j1: Special Functions. (line 183)
--* mpfr_jn: Special Functions. (line 184)
-+* mpfr_j0: Special Functions. (line 188)
-+* mpfr_j1: Special Functions. (line 189)
-+* mpfr_jn: Special Functions. (line 190)
- * mpfr_lessequal_p: Comparison Functions.
- (line 58)
- * mpfr_lessgreater_p: Comparison Functions.
- (line 64)
- * mpfr_less_p: Comparison Functions.
- (line 57)
--* mpfr_lgamma: Special Functions. (line 157)
--* mpfr_li2: Special Functions. (line 143)
--* mpfr_lngamma: Special Functions. (line 152)
-+* mpfr_lgamma: Special Functions. (line 162)
-+* mpfr_li2: Special Functions. (line 145)
-+* mpfr_lngamma: Special Functions. (line 154)
- * mpfr_log: Special Functions. (line 16)
- * mpfr_log10: Special Functions. (line 18)
--* mpfr_log1p: Special Functions. (line 125)
-+* mpfr_log1p: Special Functions. (line 127)
- * mpfr_log2: Special Functions. (line 17)
- * mpfr_max: Miscellaneous Functions.
- (line 22)
-@@ -3947,29 +3965,29 @@
- * mpfr_modf: Integer Related Functions.
- (line 82)
- * mpfr_mul: Basic Arithmetic Functions.
-- (line 51)
-+ (line 53)
- * mpfr_mul_2exp: Compatibility with MPF.
- (line 47)
- * mpfr_mul_2si: Basic Arithmetic Functions.
-- (line 174)
-+ (line 179)
- * mpfr_mul_2ui: Basic Arithmetic Functions.
-- (line 172)
-+ (line 177)
- * mpfr_mul_d: Basic Arithmetic Functions.
-- (line 57)
-+ (line 59)
- * mpfr_mul_q: Basic Arithmetic Functions.
-- (line 61)
-+ (line 63)
- * mpfr_mul_si: Basic Arithmetic Functions.
-- (line 55)
-+ (line 57)
- * mpfr_mul_ui: Basic Arithmetic Functions.
-- (line 53)
-+ (line 55)
- * mpfr_mul_z: Basic Arithmetic Functions.
-- (line 59)
-+ (line 61)
- * mpfr_nanflag_p: Exception Related Functions.
- (line 135)
- * mpfr_nan_p: Comparison Functions.
- (line 39)
- * mpfr_neg: Basic Arithmetic Functions.
-- (line 159)
-+ (line 164)
- * mpfr_nextabove: Miscellaneous Functions.
- (line 15)
- * mpfr_nextbelow: Miscellaneous Functions.
-@@ -3983,13 +4001,13 @@
- * mpfr_overflow_p: Exception Related Functions.
- (line 133)
- * mpfr_pow: Basic Arithmetic Functions.
-- (line 116)
-+ (line 121)
- * mpfr_pow_si: Basic Arithmetic Functions.
-- (line 120)
-+ (line 125)
- * mpfr_pow_ui: Basic Arithmetic Functions.
-- (line 118)
-+ (line 123)
- * mpfr_pow_z: Basic Arithmetic Functions.
-- (line 122)
-+ (line 127)
- * mpfr_prec_round: Rounding Related Functions.
- (line 13)
- * ‘mpfr_prec_t’: Nomenclature and Types.
-@@ -3999,7 +4017,7 @@
- * mpfr_print_rnd_mode: Rounding Related Functions.
- (line 71)
- * mpfr_rec_sqrt: Basic Arithmetic Functions.
-- (line 103)
-+ (line 105)
- * mpfr_regular_p: Comparison Functions.
- (line 43)
- * mpfr_reldiff: Compatibility with MPF.
-@@ -4021,11 +4039,11 @@
- * ‘mpfr_rnd_t’: Nomenclature and Types.
- (line 34)
- * mpfr_root: Basic Arithmetic Functions.
-- (line 109)
-+ (line 114)
- * mpfr_round: Integer Related Functions.
- (line 9)
--* mpfr_sec: Special Functions. (line 45)
--* mpfr_sech: Special Functions. (line 109)
-+* mpfr_sec: Special Functions. (line 47)
-+* mpfr_sech: Special Functions. (line 111)
- * mpfr_set: Assignment Functions.
- (line 9)
- * mpfr_setsign: Miscellaneous Functions.
-@@ -4100,57 +4118,57 @@
- (line 49)
- * mpfr_signbit: Miscellaneous Functions.
- (line 99)
--* mpfr_sin: Special Functions. (line 30)
--* mpfr_sinh: Special Functions. (line 96)
--* mpfr_sinh_cosh: Special Functions. (line 101)
--* mpfr_sin_cos: Special Functions. (line 35)
-+* mpfr_sin: Special Functions. (line 32)
-+* mpfr_sinh: Special Functions. (line 98)
-+* mpfr_sinh_cosh: Special Functions. (line 103)
-+* mpfr_sin_cos: Special Functions. (line 37)
- * mpfr_si_div: Basic Arithmetic Functions.
-- (line 78)
-+ (line 80)
- * mpfr_si_sub: Basic Arithmetic Functions.
-- (line 31)
-+ (line 32)
- * mpfr_snprintf: Formatted Output Functions.
- (line 180)
- * mpfr_sprintf: Formatted Output Functions.
- (line 170)
- * mpfr_sqr: Basic Arithmetic Functions.
-- (line 69)
-+ (line 71)
- * mpfr_sqrt: Basic Arithmetic Functions.
-- (line 96)
-+ (line 98)
- * mpfr_sqrt_ui: Basic Arithmetic Functions.
-- (line 97)
-+ (line 99)
- * mpfr_strtofr: Assignment Functions.
- (line 80)
- * mpfr_sub: Basic Arithmetic Functions.
-- (line 25)
-+ (line 26)
- * mpfr_subnormalize: Exception Related Functions.
- (line 60)
- * mpfr_sub_d: Basic Arithmetic Functions.
-- (line 37)
-+ (line 38)
- * mpfr_sub_q: Basic Arithmetic Functions.
-- (line 43)
-+ (line 44)
- * mpfr_sub_si: Basic Arithmetic Functions.
-- (line 33)
-+ (line 34)
- * mpfr_sub_ui: Basic Arithmetic Functions.
-- (line 29)
-+ (line 30)
- * mpfr_sub_z: Basic Arithmetic Functions.
-- (line 41)
--* mpfr_sum: Special Functions. (line 252)
-+ (line 42)
-+* mpfr_sum: Special Functions. (line 262)
- * mpfr_swap: Assignment Functions.
- (line 150)
- * ‘mpfr_t’: Nomenclature and Types.
- (line 6)
--* mpfr_tan: Special Functions. (line 31)
--* mpfr_tanh: Special Functions. (line 97)
-+* mpfr_tan: Special Functions. (line 33)
-+* mpfr_tanh: Special Functions. (line 99)
- * mpfr_trunc: Integer Related Functions.
- (line 10)
- * mpfr_ui_div: Basic Arithmetic Functions.
-- (line 74)
-+ (line 76)
- * mpfr_ui_pow: Basic Arithmetic Functions.
-- (line 126)
-+ (line 131)
- * mpfr_ui_pow_ui: Basic Arithmetic Functions.
-- (line 124)
-+ (line 129)
- * mpfr_ui_sub: Basic Arithmetic Functions.
-- (line 27)
-+ (line 28)
- * mpfr_underflow_p: Exception Related Functions.
- (line 132)
- * mpfr_unordered_p: Comparison Functions.
-@@ -4181,61 +4199,61 @@
- (line 182)
- * mpfr_vsprintf: Formatted Output Functions.
- (line 171)
--* mpfr_y0: Special Functions. (line 193)
--* mpfr_y1: Special Functions. (line 194)
--* mpfr_yn: Special Functions. (line 195)
-+* mpfr_y0: Special Functions. (line 199)
-+* mpfr_y1: Special Functions. (line 200)
-+* mpfr_yn: Special Functions. (line 201)
- * mpfr_zero_p: Comparison Functions.
- (line 42)
--* mpfr_zeta: Special Functions. (line 171)
--* mpfr_zeta_ui: Special Functions. (line 172)
-+* mpfr_zeta: Special Functions. (line 177)
-+* mpfr_zeta_ui: Special Functions. (line 178)
- * mpfr_z_sub: Basic Arithmetic Functions.
-- (line 39)
-+ (line 40)
-
-
- 
- Tag Table:
- Node: Top775
- Node: Copying2007
--Node: Introduction to MPFR3766
--Node: Installing MPFR5880
--Node: Reporting Bugs11323
--Node: MPFR Basics13353
--Node: Headers and Libraries13669
--Node: Nomenclature and Types16828
--Node: MPFR Variable Conventions18874
--Node: Rounding Modes20418
--Ref: ternary value21544
--Node: Floating-Point Values on Special Numbers23526
--Node: Exceptions26572
--Node: Memory Handling29749
--Node: MPFR Interface30894
--Node: Initialization Functions33008
--Node: Assignment Functions40318
--Node: Combined Initialization and Assignment Functions49673
--Node: Conversion Functions50974
--Node: Basic Arithmetic Functions60035
--Node: Comparison Functions69200
--Node: Special Functions72687
--Node: Input and Output Functions86672
--Node: Formatted Output Functions88644
--Node: Integer Related Functions98431
--Node: Rounding Related Functions105051
--Node: Miscellaneous Functions108888
--Node: Exception Related Functions117568
--Node: Compatibility with MPF124386
--Node: Custom Interface127127
--Node: Internals131526
--Node: API Compatibility133066
--Node: Type and Macro Changes134995
--Node: Added Functions137844
--Node: Changed Functions141132
--Node: Removed Functions145545
--Node: Other Changes145973
--Node: Contributors147576
--Node: References150219
--Node: GNU Free Documentation License151973
--Node: Concept Index174562
--Node: Function and Type Index180659
-+Node: Introduction to MPFR3770
-+Node: Installing MPFR5884
-+Node: Reporting Bugs11327
-+Node: MPFR Basics13357
-+Node: Headers and Libraries13673
-+Node: Nomenclature and Types16832
-+Node: MPFR Variable Conventions18894
-+Node: Rounding Modes20438
-+Ref: ternary value21568
-+Node: Floating-Point Values on Special Numbers23554
-+Node: Exceptions26813
-+Node: Memory Handling29990
-+Node: MPFR Interface31135
-+Node: Initialization Functions33249
-+Node: Assignment Functions40559
-+Node: Combined Initialization and Assignment Functions49914
-+Node: Conversion Functions51215
-+Node: Basic Arithmetic Functions60276
-+Node: Comparison Functions69777
-+Node: Special Functions73264
-+Node: Input and Output Functions87862
-+Node: Formatted Output Functions89834
-+Node: Integer Related Functions99621
-+Node: Rounding Related Functions106241
-+Node: Miscellaneous Functions110078
-+Node: Exception Related Functions118758
-+Node: Compatibility with MPF125576
-+Node: Custom Interface128317
-+Node: Internals132716
-+Node: API Compatibility134260
-+Node: Type and Macro Changes136189
-+Node: Added Functions139038
-+Node: Changed Functions142326
-+Node: Removed Functions146739
-+Node: Other Changes147167
-+Node: Contributors148770
-+Node: References151413
-+Node: GNU Free Documentation License153167
-+Node: Concept Index175760
-+Node: Function and Type Index181857
- 
- End Tag Table
-
-diff -Naurd mpfr-3.1.3-a/src/lngamma.c mpfr-3.1.3-b/src/lngamma.c
---- mpfr-3.1.3-a/src/lngamma.c 2015-06-19 19:55:10.000000000 +0000
-+++ mpfr-3.1.3-b/src/lngamma.c 2015-07-02 10:49:24.018113593 +0000
-@@ -603,16 +603,17 @@
- mpfr_get_prec (y), mpfr_log_prec, y, inex));
-
- /* special cases */
-- if (MPFR_UNLIKELY (MPFR_IS_SINGULAR (x)))
-+ if (MPFR_UNLIKELY (MPFR_IS_SINGULAR (x) ||
-+ (MPFR_IS_NEG (x) && mpfr_integer_p (x))))
- {
-- if (MPFR_IS_NAN (x) || MPFR_IS_NEG (x))
-+ if (MPFR_IS_NAN (x))
- {
- MPFR_SET_NAN (y);
- MPFR_RET_NAN;
- }
-- else /* lngamma(+Inf) = lngamma(+0) = +Inf */
-+ else /* lngamma(+/-Inf) = lngamma(nonpositive integer) = +Inf */
- {
-- if (MPFR_IS_ZERO (x))
-+ if (!MPFR_IS_INF (x))
- mpfr_set_divby0 ();
- MPFR_SET_INF (y);
- MPFR_SET_POS (y);
-@@ -620,8 +621,8 @@
- }
- }
-
-- /* if x < 0 and -2k-1 <= x <= -2k, then lngamma(x) = NaN */
-- if (MPFR_IS_NEG (x) && (unit_bit (x) == 0 || mpfr_integer_p (x)))
-+ /* if -2k-1 < x < -2k <= 0, then lngamma(x) = NaN */
-+ if (MPFR_IS_NEG (x) && unit_bit (x) == 0)
- {
- MPFR_SET_NAN (y);
- MPFR_RET_NAN;
-diff -Naurd mpfr-3.1.3-a/src/mpfr.h mpfr-3.1.3-b/src/mpfr.h
---- mpfr-3.1.3-a/src/mpfr.h 2015-06-19 19:55:10.000000000 +0000
-+++ mpfr-3.1.3-b/src/mpfr.h 2015-07-02 10:49:24.038113803 +0000
-@@ -27,7 +27,7 @@
- #define MPFR_VERSION_MAJOR 3
- #define MPFR_VERSION_MINOR 1
- #define MPFR_VERSION_PATCHLEVEL 3
--#define MPFR_VERSION_STRING "3.1.3"
-+#define MPFR_VERSION_STRING "3.1.3-p1"
-
- /* Macros dealing with MPFR VERSION */
- #define MPFR_VERSION_NUM(a,b,c) (((a) << 16L) | ((b) << 8) | (c))
-diff -Naurd mpfr-3.1.3-a/src/version.c mpfr-3.1.3-b/src/version.c
---- mpfr-3.1.3-a/src/version.c 2015-06-19 19:55:10.000000000 +0000
-+++ mpfr-3.1.3-b/src/version.c 2015-07-02 10:49:24.042113845 +0000
-@@ -25,5 +25,5 @@
- const char *
- mpfr_get_version (void)
- {
-- return "3.1.3";
-+ return "3.1.3-p1";
- }
-diff -Naurd mpfr-3.1.3-a/tests/tlngamma.c mpfr-3.1.3-b/tests/tlngamma.c
---- mpfr-3.1.3-a/tests/tlngamma.c 2015-06-19 19:55:10.000000000 +0000
-+++ mpfr-3.1.3-b/tests/tlngamma.c 2015-07-02 10:49:24.018113593 +0000
-@@ -33,7 +33,7 @@
- special (void)
- {
- mpfr_t x, y;
-- int inex;
-+ int i, inex;
-
- mpfr_init (x);
- mpfr_init (y);
-@@ -46,25 +46,29 @@
- exit (1);
- }
-
-- mpfr_set_inf (x, -1);
-+ mpfr_set_inf (x, 1);
-+ mpfr_clear_flags ();
- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (!mpfr_nan_p (y))
-+ if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0 || __gmpfr_flags != 0)
- {
-- printf ("Error for lngamma(-Inf)\n");
-+ printf ("Error for lngamma(+Inf)\n");
- exit (1);
- }
-
-- mpfr_set_inf (x, 1);
-+ mpfr_set_inf (x, -1);
-+ mpfr_clear_flags ();
- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0)
-+ if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0 || __gmpfr_flags != 0)
- {
-- printf ("Error for lngamma(+Inf)\n");
-+ printf ("Error for lngamma(-Inf)\n");
- exit (1);
- }
-
- mpfr_set_ui (x, 0, MPFR_RNDN);
-+ mpfr_clear_flags ();
- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0)
-+ if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0 ||
-+ __gmpfr_flags != MPFR_FLAGS_DIVBY0)
- {
- printf ("Error for lngamma(+0)\n");
- exit (1);
-@@ -72,32 +76,58 @@
-
- mpfr_set_ui (x, 0, MPFR_RNDN);
- mpfr_neg (x, x, MPFR_RNDN);
-+ mpfr_clear_flags ();
- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (!mpfr_nan_p (y))
-+ if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0 ||
-+ __gmpfr_flags != MPFR_FLAGS_DIVBY0)
- {
- printf ("Error for lngamma(-0)\n");
- exit (1);
- }
-
- mpfr_set_ui (x, 1, MPFR_RNDN);
-+ mpfr_clear_flags ();
- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (MPFR_IS_NAN (y) || mpfr_cmp_ui (y, 0) || MPFR_IS_NEG (y))
-+ if (mpfr_cmp_ui0 (y, 0) || MPFR_IS_NEG (y))
- {
- printf ("Error for lngamma(1)\n");
- exit (1);
- }
-
-- mpfr_set_si (x, -1, MPFR_RNDN);
-- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (!mpfr_nan_p (y))
-+ for (i = 1; i <= 5; i++)
- {
-- printf ("Error for lngamma(-1)\n");
-- exit (1);
-+ int c;
-+
-+ mpfr_set_si (x, -i, MPFR_RNDN);
-+ mpfr_clear_flags ();
-+ mpfr_lngamma (y, x, MPFR_RNDN);
-+ if (!mpfr_inf_p (y) || mpfr_sgn (y) < 0 ||
-+ __gmpfr_flags != MPFR_FLAGS_DIVBY0)
-+ {
-+ printf ("Error for lngamma(-%d)\n", i);
-+ exit (1);
-+ }
-+ if (i & 1)
-+ {
-+ mpfr_nextabove (x);
-+ c = '+';
-+ }
-+ else
-+ {
-+ mpfr_nextbelow (x);
-+ c = '-';
-+ }
-+ mpfr_lngamma (y, x, MPFR_RNDN);
-+ if (!mpfr_nan_p (y))
-+ {
-+ printf ("Error for lngamma(-%d%cepsilon)\n", i, c);
-+ exit (1);
-+ }
- }
-
- mpfr_set_ui (x, 2, MPFR_RNDN);
- mpfr_lngamma (y, x, MPFR_RNDN);
-- if (MPFR_IS_NAN (y) || mpfr_cmp_ui (y, 0) || MPFR_IS_NEG (y))
-+ if (mpfr_cmp_ui0 (y, 0) || MPFR_IS_NEG (y))
- {
- printf ("Error for lngamma(2)\n");
- exit (1);
-@@ -127,7 +157,7 @@
- mpfr_set_str (x, CHECK_X2, 10, MPFR_RNDN);
- mpfr_lngamma (y, x, MPFR_RNDN);
- mpfr_set_str (x, CHECK_Y2, 10, MPFR_RNDN);
-- if (MPFR_IS_NAN (y) || mpfr_cmp (y, x))
-+ if (mpfr_cmp0 (y, x))
- {
- printf ("mpfr_lngamma("CHECK_X2") is wrong:\n"
- "expected ");
-@@ -143,7 +173,7 @@
- mpfr_lngamma (y, x, MPFR_RNDU);
- mpfr_set_prec (x, 175);
- mpfr_set_str_binary (x, "0.1010001100011101101011001101110010100001000001000001110011000001101100001111001001000101011011100100010101011110100111110101010100010011010010000101010111001100011000101111E7");
-- if (MPFR_IS_NAN (y) || mpfr_cmp (x, y))
-+ if (mpfr_cmp0 (x, y))
- {
- printf ("Error in mpfr_lngamma (1)\n");
- exit (1);
-@@ -155,7 +185,7 @@
- mpfr_lngamma (x, y, MPFR_RNDZ);
- mpfr_set_prec (y, 21);
- mpfr_set_str_binary (y, "0.111000101000001100101E9");
-- if (MPFR_IS_NAN (x) || mpfr_cmp (x, y))
-+ if (mpfr_cmp0 (x, y))
- {
- printf ("Error in mpfr_lngamma (120)\n");
- printf ("Expected "); mpfr_print_binary (y); puts ("");
-@@ -169,7 +199,7 @@
- inex = mpfr_lngamma (y, x, MPFR_RNDN);
- mpfr_set_prec (x, 206);
- mpfr_set_str_binary (x, "0.10000111011000000011100010101001100110001110000111100011000100100110110010001011011110101001111011110110000001010100111011010000000011100110110101100111000111010011110010000100010111101010001101000110101001E13");
-- if (MPFR_IS_NAN (y) || mpfr_cmp (x, y))
-+ if (mpfr_cmp0 (x, y))
- {
- printf ("Error in mpfr_lngamma (768)\n");
- exit (1);
-@@ -185,7 +215,7 @@
- mpfr_set_str_binary (x, "0.1100E-66");
- mpfr_lngamma (y, x, MPFR_RNDN);
- mpfr_set_str_binary (x, "0.1100E6");
-- if (MPFR_IS_NAN (y) || mpfr_cmp (x, y))
-+ if (mpfr_cmp0 (x, y))
- {
- printf ("Error for lngamma(0.1100E-66)\n");
- exit (1);
-@@ -199,7 +229,7 @@
- mpfr_lngamma (y, x, MPFR_RNDN);
- mpfr_set_prec (x, 32);
- mpfr_set_str_binary (x, "-0.10001000111011111011000010100010E207");
-- if (MPFR_IS_NAN (y) || mpfr_cmp (x, y))
-+ if (mpfr_cmp0 (x, y))
- {
- printf ("Error for lngamma(-2^199+0.5)\n");
- printf ("Got ");
generated by cgit v0.10.2-6-g49f6 at 2024-05-02 23:58:57 (GMT)