cxg2015.a
来自「用于进行gcc测试」· A 代码 · 共 687 行 · 第 1/2 页
A
687 行
-- Calculate the first model number nearest to, but above (or equal) -- to the expected result: while Real'Model (Model_Expected_High) /= Model_Expected_High loop -- Try the next machine number higher: Model_Expected_High := Real'Adjacent(Model_Expected_High, 100.0); end loop; if Actual < Model_Expected_Low or Actual > Model_Expected_High then Accuracy_Error_Reported := True; if Actual < Model_Expected_Low then Report.Failed (Test_Name & " actual: " & Real'Image (Actual) & " expected low: " & Real'Image (Model_Expected_Low) & " expected high: " & Real'Image (Model_Expected_High) & " difference: " & Real'Image (Actual - Expected_Low)); else Report.Failed (Test_Name & " actual: " & Real'Image (Actual) & " expected low: " & Real'Image (Model_Expected_Low) & " expected high: " & Real'Image (Model_Expected_High) & " difference: " & Real'Image (Expected_High - Actual)); end if; elsif Verbose then Report.Comment (Test_Name & " passed"); end if; end Check_Exact; procedure Exact_Result_Test is begin -- A.5.1(38) Check_Exact (Arcsin (0.0), 0.0, 0.0, "arcsin(0)"); Check_Exact (Arcsin (0.0, 45.0), 0.0, 0.0, "arcsin(0,45)"); -- A.5.1(39) Check_Exact (Arccos (1.0), 0.0, 0.0, "arccos(1)"); Check_Exact (Arccos (1.0, 75.0), 0.0, 0.0, "arccos(1,75)"); -- G.2.4(11-13) Check_Exact (Arcsin (1.0), Half_PI_Low, Half_PI_High, "arcsin(1)"); Check_Exact (Arcsin (1.0, 360.0), 90.0, 90.0, "arcsin(1,360)"); Check_Exact (Arcsin (-1.0), -Half_PI_High, -Half_PI_Low, "arcsin(-1)"); Check_Exact (Arcsin (-1.0, 360.0), -90.0, -90.0, "arcsin(-1,360)"); Check_Exact (Arccos (0.0), Half_PI_Low, Half_PI_High, "arccos(0)"); Check_Exact (Arccos (0.0, 360.0), 90.0, 90.0, "arccos(0,360)"); Check_Exact (Arccos (-1.0), PI_Low, PI_High, "arccos(-1)"); Check_Exact (Arccos (-1.0, 360.0), 180.0, 180.0, "arccos(-1,360)"); exception when Constraint_Error => Report.Failed ("Constraint_Error raised in Exact_Result Test"); when others => Report.Failed ("Exception in Exact_Result Test"); end Exact_Result_Test; procedure Arcsin_Taylor_Series_Test is -- the following range is chosen so that the Taylor series -- used will produce a result accurate to machine precision. -- -- The following formula is used for the Taylor series: -- TS(x) = x { 1 + (xsq/2) [ (1/3) + (3/4)xsq { (1/5) + -- (5/6)xsq [ (1/7) + (7/8)xsq/9 ] } ] } -- where xsq = x * x -- A : constant := -0.125; B : constant := 0.125; X : Real; Y, Y_Sq : Real; Actual, Sum, Xm : Real; -- terms in Taylor series K : constant Integer := Integer ( Log ( Real (Real'Machine_Radix) ** Real'Machine_Mantissa, 10.0)) + 1; begin Accuracy_Error_Reported := False; -- reset for I in 1..Max_Samples loop -- make sure there is no error in x-1, x, and x+1 X := (B - A) * Real (I) / Real (Max_Samples) + A; Y := X; Y_Sq := Y * Y; Sum := 0.0; Xm := Real (K + K + 1); for M in 1 .. K loop Sum := Y_Sq * (Sum + 1.0/Xm); Xm := Xm - 2.0; Sum := Sum * (Xm /(Xm + 1.0)); end loop; Sum := Sum * Y; Actual := Y + Sum; Sum := (Y - Actual) + Sum; if not Real'Machine_Rounds then Actual := Actual + (Sum + Sum); end if; Check (Actual, Arcsin (X), "Taylor Series test" & Integer'Image (I) & ": arcsin(" & Real'Image (X) & ") ", Minimum_Error); if Accuracy_Error_Reported then -- only report the first error in this test in order to keep -- lots of failures from producing a huge error log return; end if; end loop; exception when Constraint_Error => Report.Failed ("Constraint_Error raised in Arcsin_Taylor_Series_Test" & " for X=" & Real'Image (X)); when others => Report.Failed ("exception in Arcsin_Taylor_Series_Test" & " for X=" & Real'Image (X)); end Arcsin_Taylor_Series_Test; procedure Arccos_Taylor_Series_Test is -- the following range is chosen so that the Taylor series -- used will produce a result accurate to machine precision. -- -- The following formula is used for the Taylor series: -- TS(x) = x { 1 + (xsq/2) [ (1/3) + (3/4)xsq { (1/5) + -- (5/6)xsq [ (1/7) + (7/8)xsq/9 ] } ] } -- arccos(x) = pi/2 - TS(x) A : constant := -0.125; B : constant := 0.125; C1, C2 : Real; X : Real; Y, Y_Sq : Real; Actual, Sum, Xm, S : Real; -- terms in Taylor series K : constant Integer := Integer ( Log ( Real (Real'Machine_Radix) ** Real'Machine_Mantissa, 10.0)) + 1; begin if Real'Digits > 23 then -- constants in this section only accurate to 23 digits Error_Low_Bound := 0.00000_00000_00000_00000_001; Report.Comment ("arctan accuracy checked to 23 digits"); end if; -- C1 + C2 equals Pi/2 accurate to 23 digits if Real'Machine_Radix = 10 then C1 := 1.57; C2 := 7.9632679489661923132E-4; else C1 := 201.0 / 128.0; C2 := 4.8382679489661923132E-4; end if; Accuracy_Error_Reported := False; -- reset for I in 1..Max_Samples loop -- make sure there is no error in x-1, x, and x+1 X := (B - A) * Real (I) / Real (Max_Samples) + A; Y := X; Y_Sq := Y * Y; Sum := 0.0; Xm := Real (K + K + 1); for M in 1 .. K loop Sum := Y_Sq * (Sum + 1.0/Xm); Xm := Xm - 2.0; Sum := Sum * (Xm /(Xm + 1.0)); end loop; Sum := Sum * Y; -- at this point we have arcsin(x). -- We compute arccos(x) = pi/2 - arcsin(x). -- The following code segment is translated directly from -- the CELEFUNT FORTRAN implementation S := C1 + C2; Sum := ((C1 - S) + C2) - Sum; Actual := S + Sum; Sum := ((S - Actual) + Sum) - Y; S := Actual; Actual := S + Sum; Sum := (S - Actual) + Sum; if not Real'Machine_Rounds then Actual := Actual + (Sum + Sum); end if; Check (Actual, Arccos (X), "Taylor Series test" & Integer'Image (I) & ": arccos(" & Real'Image (X) & ") ", Minimum_Error); -- only report the first error in this test in order to keep -- lots of failures from producing a huge error log exit when Accuracy_Error_Reported; end loop; Error_Low_Bound := 0.0; -- reset exception when Constraint_Error => Report.Failed ("Constraint_Error raised in Arccos_Taylor_Series_Test" & " for X=" & Real'Image (X)); when others => Report.Failed ("exception in Arccos_Taylor_Series_Test" & " for X=" & Real'Image (X)); end Arccos_Taylor_Series_Test; procedure Identity_Test is -- test the identity arcsin(-x) = -arcsin(x) -- range chosen to be most of the valid range of the argument. A : constant := -0.999; B : constant := 0.999; X : Real; begin Accuracy_Error_Reported := False; -- reset for I in 1..Max_Samples loop -- make sure there is no error in x-1, x, and x+1 X := (B - A) * Real (I) / Real (Max_Samples) + A; Check (Arcsin(-X), -Arcsin (X), "Identity test" & Integer'Image (I) & ": arcsin(" & Real'Image (X) & ") ", 8.0); -- 2 arcsin evaluations => twice the error bound if Accuracy_Error_Reported then -- only report the first error in this test in order to keep -- lots of failures from producing a huge error log return; end if; end loop; end Identity_Test; procedure Exception_Test is X1, X2 : Real := 0.0; begin begin X1 := Arcsin (1.1); Report.Failed ("no exception for Arcsin (1.1)"); exception when Constraint_Error => Report.Failed ("Constraint_Error instead of " & "Argument_Error for Arcsin (1.1)"); when Ada.Numerics.Argument_Error => null; -- expected result when others => Report.Failed ("wrong exception for Arcsin(1.1)"); end; begin X2 := Arccos (-1.1); Report.Failed ("no exception for Arccos (-1.1)"); exception when Constraint_Error => Report.Failed ("Constraint_Error instead of " & "Argument_Error for Arccos (-1.1)"); when Ada.Numerics.Argument_Error => null; -- expected result when others => Report.Failed ("wrong exception for Arccos(-1.1)"); end; -- optimizer thwarting if Report.Ident_Bool (False) then Report.Comment (Real'Image (X1 + X2)); end if; end Exception_Test; procedure Do_Test is begin Special_Value_Test; Exact_Result_Test; Arcsin_Taylor_Series_Test; Arccos_Taylor_Series_Test; Identity_Test; Exception_Test; end Do_Test; end Generic_Check; ----------------------------------------------------------------------- ----------------------------------------------------------------------- -- These expressions must be truly static, which is why we have to do them -- outside of the generic, and we use the named numbers. Note that we know -- that PI is not a machine number (it is irrational), and it should be -- represented to more digits than supported by the target machine. Float_Half_PI_Low : constant := Float'Adjacent(PI/2.0, 0.0); Float_Half_PI_High : constant := Float'Adjacent(PI/2.0, 10.0); Float_PI_Low : constant := Float'Adjacent(PI, 0.0); Float_PI_High : constant := Float'Adjacent(PI, 10.0); package Float_Check is new Generic_Check (Float, Half_PI_Low => Float_Half_PI_Low, Half_PI_High => Float_Half_PI_High, PI_Low => Float_PI_Low, PI_High => Float_PI_High); -- check the floating point type with the most digits type A_Long_Float is digits System.Max_Digits; A_Long_Float_Half_PI_Low : constant := A_Long_Float'Adjacent(PI/2.0, 0.0); A_Long_Float_Half_PI_High : constant := A_Long_Float'Adjacent(PI/2.0, 10.0); A_Long_Float_PI_Low : constant := A_Long_Float'Adjacent(PI, 0.0); A_Long_Float_PI_High : constant := A_Long_Float'Adjacent(PI, 10.0); package A_Long_Float_Check is new Generic_Check (A_Long_Float, Half_PI_Low => A_Long_Float_Half_PI_Low, Half_PI_High => A_Long_Float_Half_PI_High, PI_Low => A_Long_Float_PI_Low, PI_High => A_Long_Float_PI_High); ----------------------------------------------------------------------- -----------------------------------------------------------------------begin Report.Test ("CXG2015", "Check the accuracy of the ARCSIN and ARCCOS functions"); if Verbose then Report.Comment ("checking Standard.Float"); end if; Float_Check.Do_Test; if Verbose then Report.Comment ("checking a digits" & Integer'Image (System.Max_Digits) & " floating point type"); end if; A_Long_Float_Check.Do_Test; Report.Result;end CXG2015;⌨️ 快捷键说明
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