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-version 1.1.1.2, 2000/09/09 14:12:18
+version 1.1.1.3, 2000/12/01 05:44:46
 Line 26  versions, except that this permission notice may be st
 Line 26  versions, except that this permission notice may be st
 Line 26  versions, except that this permission notice may be st
  translation approved by the Foundation.
+ File: gmp.info,  Node: Integer Division,  Next: Integer Exponentiation,  Prev: Integer Arithmetic,  Up: Integer Functions
+ Division Functions
+ ==================
+    Division is undefined if the divisor is zero, and passing a zero
+ divisor to the divide or modulo functions, as well passing a zero mod
+ argument to the `mpz_powm' and `mpz_powm_ui' functions, will make these
+ functions intentionally divide by zero.  This lets the user handle
+ arithmetic exceptions in these functions in the same manner as other
+ arithmetic exceptions.
+    There are three main groups of division functions:
+    * Functions that truncate the quotient towards 0.  The names of
+      these functions start with `mpz_tdiv'.  The `t' in the name is
+      short for `truncate'.
+    * Functions that round the quotient towards -infinity).  The names
+      of these routines start with `mpz_fdiv'.  The `f' in the name is
+      short for `floor'.
+    * Functions that round the quotient towards +infinity.  The names of
+      these routines start with `mpz_cdiv'.  The `c' in the name is
+      short for `ceil'.
+    For each rounding mode, there are a couple of variants.  Here `q'
+ means that the quotient is computed, while `r' means that the remainder
+ is computed.  Functions that compute both the quotient and remainder
+ have `qr' in the name.
+  - Function: void mpz_tdiv_q (mpz_t Q, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_tdiv_q_ui (mpz_t Q, mpz_t N,
+           unsigned long int D)
+      Set Q to [N/D], truncated towards 0.
+      The function `mpz_tdiv_q_ui' returns the absolute value of the true
+      remainder.
+  - Function: void mpz_tdiv_r (mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_tdiv_r_ui (mpz_t R, mpz_t N,
+           unsigned long int D)
+      Set R to (N - [N/D] * D), where the quotient is truncated towards
+.  Unless R becomes zero, it will get the same sign as N.
+      The function `mpz_tdiv_r_ui' returns the absolute value of the
+      remainder.
+  - Function: void mpz_tdiv_qr (mpz_t Q, mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_tdiv_qr_ui (mpz_t Q, mpz_t R, mpz_t
+           N, unsigned long int D)
+      Set Q to [N/D], truncated towards 0.  Set R to (N - [N/D] * D).
+      Unless R becomes zero, it will get the same sign as N.  If Q and R
+      are the same variable, the results are undefined.
+      The function `mpz_tdiv_qr_ui' returns the absolute value of the
+      remainder.
+  - Function: unsigned long int mpz_tdiv_ui (mpz_t N, unsigned long int
+           D)
+      Like `mpz_tdiv_r_ui', but the remainder is not stored anywhere; its
+      absolute value is just returned.
+  - Function: void mpz_fdiv_q (mpz_t Q, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_fdiv_q_ui (mpz_t Q, mpz_t N,
+           unsigned long int D)
+      Set Q to N/D, rounded towards -infinity.
+      The function `mpz_fdiv_q_ui' returns the remainder.
+  - Function: void mpz_fdiv_r (mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_fdiv_r_ui (mpz_t R, mpz_t N,
+           unsigned long int D)
+      Set R to (N - N/D * D), where the quotient is rounded towards
+      -infinity.  Unless R becomes zero, it will get the same sign as D.
+      The function `mpz_fdiv_r_ui' returns the remainder.
+  - Function: void mpz_fdiv_qr (mpz_t Q, mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_fdiv_qr_ui (mpz_t Q, mpz_t R, mpz_t
+           N, unsigned long int D)
+      Set Q to N/D, rounded towards -infinity.  Set R to (N - N/D * D).
+      Unless R becomes zero, it will get the same sign as D.  If Q and R
+      are the same variable, the results are undefined.
+      The function `mpz_fdiv_qr_ui' returns the remainder.
+  - Function: unsigned long int mpz_fdiv_ui (mpz_t N, unsigned long int
+           D)
+      Like `mpz_fdiv_r_ui', but the remainder is not stored anywhere; it
+      is just returned.
+  - Function: void mpz_cdiv_q (mpz_t Q, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_cdiv_q_ui (mpz_t Q, mpz_t N,
+           unsigned long int D)
+      Set Q to N/D, rounded towards +infinity.
+      The function `mpz_cdiv_q_ui' returns the negated remainder.
+  - Function: void mpz_cdiv_r (mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_cdiv_r_ui (mpz_t R, mpz_t N,
+           unsigned long int D)
+      Set R to (N - N/D * D), where the quotient is rounded towards
+      +infinity.  Unless R becomes zero, it will get the opposite sign
+      as D.
+      The function `mpz_cdiv_r_ui' returns the negated remainder.
+  - Function: void mpz_cdiv_qr (mpz_t Q, mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_cdiv_qr_ui (mpz_t Q, mpz_t R, mpz_t
+           N, unsigned long int D)
+      Set Q to N/D, rounded towards +infinity.  Set R to (N - N/D * D).
+      Unless R becomes zero, it will get the opposite sign as D.  If Q
+      and R are the same variable, the results are undefined.
+      The function `mpz_cdiv_qr_ui' returns the negated remainder.
+  - Function: unsigned long int mpz_cdiv_ui (mpz_t N, unsigned long int
+           D)
+      Like `mpz_tdiv_r_ui', but the remainder is not stored anywhere; its
+      negated value is just returned.
+  - Function: void mpz_mod (mpz_t R, mpz_t N, mpz_t D)
+  - Function: unsigned long int mpz_mod_ui (mpz_t R, mpz_t N, unsigned
+           long int D)
+      Set R to N `mod' D.  The sign of the divisor is ignored; the
+      result is always non-negative.
+      The function `mpz_mod_ui' returns the remainder.
+  - Function: void mpz_divexact (mpz_t Q, mpz_t N, mpz_t D)
+      Set Q to N/D.  This function produces correct results only when it
+      is known in advance that D divides N.
+      Since mpz_divexact is much faster than any of the other routines
+      that produce the quotient (*note References:: Jebelean), it is the
+      best choice for instances in which exact division is known to
+      occur, such as reducing a rational to lowest terms.
+  - Function: void mpz_tdiv_q_2exp (mpz_t Q, mpz_t N, unsigned long int
+           D)
+      Set Q to N divided by 2 raised to D.  The quotient is truncated
+      towards 0.
+  - Function: void mpz_tdiv_r_2exp (mpz_t R, mpz_t N, unsigned long int
+           D)
+      Divide N by (2 raised to D), rounding the quotient towards 0, and
+      put the remainder in R.  Unless it is zero, R will have the same
+      sign as N.
+  - Function: void mpz_fdiv_q_2exp (mpz_t Q, mpz_t N, unsigned long int
+           D)
+      Set Q to N divided by 2 raised to D, rounded towards -infinity.
+      This operation can also be defined as arithmetic right shift D bit
+      positions.
+  - Function: void mpz_fdiv_r_2exp (mpz_t R, mpz_t N, unsigned long int
+           D)
+      Divide N by (2 raised to D), rounding the quotient towards
+      -infinity, and put the remainder in R.  The sign of R will always
+      be positive.  This operation can also be defined as masking of the
+      D least significant bits.
  File: gmp.info,  Node: Integer Exponentiation,  Next: Integer Roots,  Prev: Integer Division,  Up: Integer Functions
  Exponentiation Functions
-Line 577  Miscellaneous Functions
+Line 740  Miscellaneous Functions
 Line 577  Miscellaneous Functions
 Line 740  Miscellaneous Functions
   - Function: double mpq_get_d (mpq_t OP)
       Convert OP to a double.
-  - Function: double mpq_set_d (mpq_t ROP, double D)
+  - Function: void mpq_set_d (mpq_t ROP, double D)
       Set ROP to the value of d, without rounding.
     These functions assign between either the numerator or denominator

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