| /* |
| * Copyright (c) 2003, 2015, Oracle and/or its affiliates. All rights reserved. |
| * DO NOT ALTER OR REMOVE COPYRIGHT NOTICES OR THIS FILE HEADER. |
| * |
| * This code is free software; you can redistribute it and/or modify it |
| * under the terms of the GNU General Public License version 2 only, as |
| * published by the Free Software Foundation. |
| * |
| * This code is distributed in the hope that it will be useful, but WITHOUT |
| * ANY WARRANTY; without even the implied warranty of MERCHANTABILITY or |
| * FITNESS FOR A PARTICULAR PURPOSE. See the GNU General Public License |
| * version 2 for more details (a copy is included in the LICENSE file that |
| * accompanied this code). |
| * |
| * You should have received a copy of the GNU General Public License version |
| * 2 along with this work; if not, write to the Free Software Foundation, |
| * Inc., 51 Franklin St, Fifth Floor, Boston, MA 02110-1301 USA. |
| * |
| * Please contact Oracle, 500 Oracle Parkway, Redwood Shores, CA 94065 USA |
| * or visit www.oracle.com if you need additional information or have any |
| * questions. |
| */ |
| |
| /* |
| * @test |
| * @bug 8136874 |
| * @summary Tests for StrictMath.pow |
| * @author Joseph D. Darcy |
| */ |
| |
| /** |
| * The tests in ../Math/PowTests.java test properties that should |
| * hold for any pow implementation, including the FDLIBM-based one |
| * required for StrictMath.pow. Therefore, the test cases in |
| * ../Math/PowTests.java are run against both the Math and |
| * StrictMath versions of pow. The role of this test is to verify |
| * that the FDLIBM pow algorithm is being used by running golden |
| * file tests on values that may vary from one conforming pow |
| * implementation to another. |
| */ |
| |
| public class PowTests { |
| private PowTests(){} |
| |
| private static final double INFINITY = Double.POSITIVE_INFINITY; |
| |
| public static void main(String... args) { |
| int failures = 0; |
| |
| failures += testPow(); |
| |
| if (failures > 0) { |
| System.err.println("Testing pow incurred " |
| + failures + " failures."); |
| throw new RuntimeException(); |
| } |
| } |
| |
| private static int testPow() { |
| int failures = 0; |
| |
| double [][] testCases = { |
| // Probe near decision points of the fdlibm algorithm |
| |
| {0x1.00000_0000_0001p1, // |x| > 1.0 |
| INFINITY, // infinity |
| INFINITY // 0 |
| }, |
| |
| |
| {0x1.fffffp-1, // |x| = 0.9999995231628418 |
| 0x1.0p31, // 2^31 |
| 0.0 // 0 |
| }, |
| |
| {0x1.ffffe_ffffffffp-1, // |x| < 0.9999995231628418 |
| 0x1.0p31, // 2^31 |
| 0.0 // 0 |
| }, |
| |
| {-0x1.ffffe_ffffffffp-1, // |x| < 0.9999995231628418 |
| 0x1.0p31, // 2^31 |
| 0.0 // 0 |
| }, |
| |
| {0x1.fffffp-1, // |x| = 0.9999995231628418 |
| 0x1.0000000000001p31, // nextUp(2^31) |
| 0.0 // 0 |
| }, |
| |
| {0x1.fffffp-1, // |x| = 0.9999995231628418 |
| 0x1.0p31 + 1.0, // 2^31 + 1, odd integer |
| 0.0 // 0 |
| }, |
| |
| {0x1.fffffp-1, // |x| = 0.9999995231628418 |
| 0x1.0p31 + 2.0, // 2^31 + 2, even integer |
| 0.0 // 0 |
| }, |
| |
| {0x1.ffffe_ffffffffp-1, // |x| < 0.9999995231628418 |
| 0x1.0000000000001p31, // nextUp(2^31) |
| 0.0 // 0 |
| }, |
| |
| {-0x1.ffffe_ffffffffp-1, // |x| < 0.9999995231628418 |
| 0x1.0000000000001p31, // nextUp(2^31) |
| Double.NaN // 0 |
| }, |
| |
| {-0x1.ffffe_ffffffffp-1, // |x| < 0.9999995231628418 |
| 0x1.0p31 + 1.0, // 2^31 + 1, odd integer |
| -0.0 // 0 |
| }, |
| |
| {-0x1.ffffe_ffffffffp-1, // |x| < 0.9999995231628418 |
| 0x1.0p31 + 2.0, // 2^31 + 2, even integer |
| 0.0 // 0 |
| }, |
| |
| {0x1.0000000000001p0, // nextUp(1) |
| 0x1.0000000000001p31, // nextUp(2^31) |
| 0x1.00000800002p0 |
| }, |
| |
| {0x1.0000000000001p0, // nextUp(1) |
| -0x1.0000000000001p31, // -nextUp(2^31) |
| 0x1.fffff000004p-1 |
| }, |
| |
| {-0x1.0000000000001p0, // -nextUp(1) |
| -0x1.0000000000001p31, // -nextUp(2^31) |
| Double.NaN |
| }, |
| |
| {-0x1.0000000000001p0, // -nextUp(1) |
| 0x1.0p31 + 1.0, // 2^31 + 1, odd integer |
| -0x1.0000080000201p0 |
| }, |
| |
| {-0x1.0000000000001p0, // -nextUp(1) |
| 0x1.0p31 + 2.0, // 2^31 + 2, even integer |
| 0x1.0000080000202p0 |
| }, |
| |
| {0x1.00000_ffff_ffffp0, |
| 0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| // Huge y, |y| > 0x1.00000_ffff_ffffp31 ~2**31 is a decision point |
| |
| // First y = 0x1.00001_0000_0000p31 |
| {0x1.fffff_ffff_ffffp-1, |
| 0x1.00001_0000_0000p31, |
| 0x1.fffff7ffff9p-1 |
| }, |
| |
| {0x1.fffff_ffff_fffep-1, |
| 0x1.00001_0000_0000p31, |
| 0x1.ffffefffff4p-1 |
| }, |
| |
| {0x1.fffff_0000_0000p-1, |
| 0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| // Cycle through decision points on x values |
| |
| {0x1.fffff_0000_0000p-1, |
| 0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| {-0x1.fffff_0000_0000p-1, |
| 0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| {0x1.ffffe_ffff_ffffp-1, |
| 0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| {-0x1.ffffe_ffff_ffffp-1, |
| 0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| {0x1.00000_ffff_ffffp0, |
| 0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| |
| {0x1.00001_0000_0000p0, |
| 0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| {-0x1.00000_ffff_ffffp0, |
| 0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| |
| {-0x1.00001_0000_0000p0, |
| 0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| // Now y = -0x1.00001_0000_0000p31 |
| |
| {0x1.fffff_0000_0000p-1, |
| -0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| {-0x1.fffff_0000_0000p-1, |
| 0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| {0x1.ffffe_ffff_ffffp-1, |
| -0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| {-0x1.ffffe_ffff_ffffp-1, |
| -0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| {0x1.00000_ffff_ffffp0, |
| -0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| |
| {0x1.00001_0000_0000p0, |
| -0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| {-0x1.00000_ffff_ffffp0, |
| -0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| |
| {-0x1.00001_0000_0000p0, |
| -0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| //----------------------- |
| |
| {0x1.ffffe_ffff_ffffp-1, |
| -0x1.00001_0000_0000p31, |
| INFINITY |
| }, |
| |
| {0x1.00001_0000_0000p0, |
| -0x1.00001_0000_0000p31, |
| 0.0 |
| }, |
| |
| |
| {0x1.0000000000002p0, // 1.0000000000000004 |
| 0x1.f4add4p30, // 2.1E9 |
| 0x1.00000fa56f1a6p0 // 1.0000009325877754 |
| }, |
| |
| // Verify no early overflow |
| {0x1.0000000000002p0, // 1.0000000000000004 |
| 0x1.0642acp31, // 2.2E9 |
| 0x1.000010642b465p0, // 1.0000009769967388 |
| }, |
| |
| // Verify proper overflow |
| {0x1.0000000000002p0, // 1.0000000000000004 |
| 0x1.62e42fefa39fp60, // 1.59828858065033216E18 |
| 0x1.ffffffffffd9fp1023, // 1.7976931348621944E308 |
| }, |
| |
| }; |
| |
| for (double[] testCase: testCases) |
| failures += testPowCase(testCase[0], testCase[1], testCase[2]); |
| |
| return failures; |
| } |
| |
| private static int testPowCase(double input1, double input2, double expected) { |
| int failures = 0; |
| failures += Tests.test("StrictMath.pow(double)", input1, input2, |
| StrictMath.pow(input1, input2), expected); |
| return failures; |
| } |
| } |