public void GCDByStein_TakesTwoNumsAndTimeParameters_PositiveTestResult(uint num1, uint num2, uint expected) { uint actual = FindGCD.GCDByStein(num1, num2, out _time); Assert.AreEqual(expected, actual); Assert.IsTrue(_time != TimeSpan.FromSeconds(0)); }
public void EuclideanBinaryAlgorithmMethod_paramsGCD_returned10(int expected, params int[] a) { int actual; string time; (actual, time) = FindGCD.EuclideanAlgorithmMethod(a); Assert.AreEqual(expected, actual); Assert.Pass(); }
public void EuclidGCD_34_68() { int firstNumber = 34; int secondNumber = 68; int expected = 34; int actual = FindGCD.FindEuclidGCD(firstNumber, secondNumber); Assert.AreEqual(expected, actual); }
public void EuclidGCD_17_8() { int firstNumber = 17; int secondNumber = 8; int expected = 1; int actual = FindGCD.FindEuclidGCD(firstNumber, secondNumber); Assert.AreEqual(expected, actual); }
public void EuclidGCD_24_16() { int firstNumber = 24; int secondNumber = 16; int expected = 8; int actual = FindGCD.FindEuclidGCD(firstNumber, secondNumber); Assert.AreEqual(expected, actual); }
public void EuclideanBinaryAlgorithmMethod_numberOneandnumberTwo_returned10(int expected, int numberOne, int numberTwo) { int actual; string time; (actual, time) = FindGCD.EuclideanBinaryAlgorithmMethod(numberOne, numberTwo); Assert.AreEqual(expected, actual); Assert.Pass(); }
public void EuclidGCD_minus10_15() { int firstNumber = -10; int secondNumber = 15; int expected = 5; int actual = FindGCD.FindEuclidGCD(firstNumber, secondNumber); Assert.AreEqual(expected, actual); }
public void EuclidGCD_0_0() { int firstNumber = 0; int secondNumber = 0; int expected = 0; int actual = FindGCD.FindEuclidGCD(firstNumber, secondNumber); Assert.AreEqual(expected, actual); }
public void SteinGCD_10_15_20() { int firstNumber = 10; int secondNumber = 15; int thirdNumber = 20; int expected = 5; int actual = FindGCD.FindSteinGCD(firstNumber, secondNumber, thirdNumber); Assert.AreEqual(expected, actual); }
public void SteinGCD_minus12_18_36() { int firstNumber = -12; int secondNumber = 18; int thirdNumber = 36; int expected = 6; int actual = FindGCD.FindSteinGCD(firstNumber, secondNumber, thirdNumber); Assert.AreEqual(expected, actual); }
public void SteinGCD_0_14_0() { int firstNumber = 0; int secondNumber = 14; int thirdNumber = 0; int expected = 14; int actual = FindGCD.FindSteinGCD(firstNumber, secondNumber, thirdNumber); Assert.AreEqual(expected, actual); }
public void EuclideanBinaryAlgorithmMethod_3and10_1_GCD_Returned() { int expected = 1; int actual; string time; (actual, time) = FindGCD.EuclideanBinaryAlgorithmMethod(3, 10); Assert.AreEqual(expected, actual); }
public void EuclideanAlgorithmMethod_10and20and160and40_10_GCD_Returned() { int expected = 10; int actual; string time; (actual, time) = FindGCD.EuclideanAlgorithmMethod(10, 20, 160, 40); Assert.AreEqual(expected, actual); }
public void SteinGCD_minus10_minus14_minus20() { int firstNumber = -10; int secondNumber = -14; int thirdNumber = -20; int expected = 2; int actual = FindGCD.FindSteinGCD(firstNumber, secondNumber, thirdNumber); Assert.AreEqual(expected, actual); }
public void binary_GCD_test() { // arrange int[] a = { 100, 22, 44, 2, 1000 }; int expected = 2; // act int actual = FindGCD.MyBinaryGCD(a); // assert Assert.AreEqual(actual, expected); }
public void SteinGCD_8_12_28_32() { int firstNumber = 8; int secondNumber = 12; int thirdNumber = 28; int forthNumber = 32; int expected = 4; int actual = FindGCD.FindSteinGCD(firstNumber, secondNumber, thirdNumber, forthNumber); Assert.AreEqual(expected, actual); }
public void Delegate_EuclidGCD_minus10_minus14_minus20() { int firstNumber = 24; int secondNumber = 16; int expected = 8; Func <int, int, int> solver = new Func <int, int, int>(FindGCD.FindEuclidGCD); int actual = FindGCD.FindGcdByDelegate(firstNumber, secondNumber, solver); Assert.AreEqual(expected, actual); }
public void TestMethodForEuclideanGCDWithTwoParameters() { first = random.Next(-1000, 1000); // first random input parametr second = random.Next(-1001, 1001); // second random input parametr result = FindGCD.EuclideanGCD(first, second, out double time); // result of GCD calculation if (VerifyGCD(result, first, second)) // verifying result GCD { ok = true; } else { ok = false; } Assert.IsTrue(ok); // if ok is true, then test passed }
public void TestMethodForEuclideanGCDWithThreeParameters() { first = random.Next(-1002, 1002); // first random input parametr second = random.Next(-1003, 1003); // second random input parametr third = random.Next(-1004, 1004); // third random input parametr result = FindGCD.EuclideanGCD(first, second, third); // result of GCD calculation if (VerifyGCD(result, first, second, third)) // verifying result GCD { ok = true; } else { ok = false; } Assert.IsTrue(ok); // if ok is true, then test passed }
public void TestMethodForEuclideanGCDWithFourParameters() { first = random.Next(-1005, 1005); // first random input parametr second = random.Next(-1006, 1006); // second random input parametr third = random.Next(-1007, 1007); // third random input parametr fourth = random.Next(-1008, 1008); // fourth random input parametr result = FindGCD.EuclideanGCD(first, second, third, fourth); // result of GCD calculation if (VerifyGCD(result, first, second, third, fourth)) // verifying result GCD { ok = true; } else { ok = false; } Assert.IsTrue(ok); // if ok is true, then test passed }
static void Main(string[] args) { var tuple1 = FindGCD.SteinaGCDTime(8, 16); Console.WriteLine($"Received result: {tuple1.correctGCD} \t Execution time: {tuple1.time}"); var tuple2 = FindGCD.SteinaGCDTime(36, 45, 81, 9, 54, 3); Console.WriteLine($"Received result: {tuple2.correctGCD} \t Execution time: {tuple2.time}"); var tuple3 = FindGCD.SteinaGCDTime(14, 28, 56, 112); Console.WriteLine($"Received result: {tuple3.correctGCD} \t Execution time: {tuple3.time}"); var tuple4 = FindGCD.EuclideanGCDTime(8, 16); Console.WriteLine($"Received result: {tuple4.correctGCD} \t Execution time: {tuple4.time}"); var tuple5 = FindGCD.EuclideanGCDTime(36, 45, 81, 9, 54, 3); Console.WriteLine($"Received result: {tuple5.correctGCD} \t Execution time: {tuple5.time}"); var tuple6 = FindGCD.EuclideanGCDTime(14, 28, 56, 112); Console.WriteLine($"Received result: {tuple6.correctGCD} \t Execution time: {tuple6.time}"); Console.ReadKey(); }
public void GCDByEuclid_TakeZeroParameters_ThrowsArgumentException(uint num1, uint num2) { Assert.ThrowsException <ArgumentException>(() => FindGCD.GCDByEuclid(num1, num2)); }
public long SearchByEuclidTest(long x, long y) { var findGCD = new FindGCD(); return(findGCD.SearchByEuclid(x, y)); }
public long SearchByEuclidTest(long[] array) { var findGCD = new FindGCD(); return(findGCD.SearchByEuclid(array)); }
public long SearchBySteinTest(long x, long y) { var findGCD = new FindGCD(); return(findGCD.SearchByStein(x, y)); }
public long SearchBySteinTest(long[] array) { var findGCD = new FindGCD(); return(findGCD.SearchByStein(array)); }
public void GCDByEuclid_TakesFiveParameters_PositiveTestResult(uint num1, uint num2, uint num3, uint num4, uint num5, uint expected) { Assert.AreEqual(expected, FindGCD.GCDByEuclid(num1, num2, num3, num4, num5)); }
public void CompareExecMethodsTime_TakesTwoParameters_PositiveTestResult(uint num1, uint num2) { Assert.IsTrue(FindGCD.CompareExecMethodsTime(num1, num2) != (TimeSpan.FromSeconds(0), TimeSpan.FromSeconds(0))); }
public void GCDByEuclid_TakesThreeParameters_PositiveTestResult(uint num1, uint num2, uint num3, uint expected) => Assert.AreEqual(expected, FindGCD.GCDByEuclid(num1, num2, num3));
public int GCDSteinAlgorithm_FindGCD_ReturnsCorrectGCD(int[] number) { return(FindGCD.GCDUseSteinaAlgorithm(number)); }