Integral (a.) is	108.5552812121273689	 using 4138159	function calls in the calculation,
which corresponds to 2069080.0	intervals, 1034540.0	 separate error bounds
and a resulting final accuracy of plus or minus 1.0345e-10	.

Integral (b.) is	-1724.9669830093305336	 using 8163643	function calls in the calculation,
which corresponds to 4081822.0	intervals, 2040911.0	 separate error bounds
and a resulting final accuracy of plus or minus 2.0409e-10	.

Integral (c.) is	-15.3063079856474964	 using 3175515	function calls in the calculation,
which corresponds to 1587758.0	intervals, 793879.0	 separate error bounds
and a resulting final accuracy of plus or minus 7.9388e-11	.

Integral (d.) is	-18.9459493046368443	 using 3760287	function calls in the calculation,
which corresponds to 1880144.0	intervals, 940072.0	 separate error bounds
and a resulting final accuracy of plus or minus 9.4007e-11	.

Integral (e.) is	1.1455808340997566	 using 995883	function calls in the calculation,
which corresponds to 497942.0	intervals, 248971.0	 separate error bounds
and a resulting final accuracy of plus or minus 2.4897e-11	.

Integral (f.) is	0.6738321005150805	 using 1106835	function calls in the calculation,
which corresponds to 553418.0	intervals, 276709.0	 separate error bounds
and a resulting final accuracy of plus or minus 2.7671e-11	.

Integral (g.) is	0.6666666666698596	 using 345567	function calls in the calculation,
which corresponds to 172784.0	intervals, 86392.0	 separate error bounds
and a resulting final accuracy of plus or minus 8.6392e-12	.

Integral (h.) is	0.6666666666698597	 using 345567	function calls in the calculation,
which corresponds to 172784.0	intervals, 86392.0	 separate error bounds
and a resulting final accuracy of plus or minus 8.6392e-12	.

Integral (i.) is	0.8000000000035694	 using 370863	function calls in the calculation,
which corresponds to 185432.0	intervals, 92716.0	 separate error bounds
and a resulting final accuracy of plus or minus 9.2716e-12	.