/// <summary> /// Two-sided or one-sided test for a single mean /// /// A two-sided hypothesis with threshold of alpha (i.e. significance level) is equivalent to a confidence interval of CL (i.e. confidence level) = 1 - alpha /// A one-sided hypothesis with threshold of alpha is equivalent to a confidence interval of CL = 1 - alpha * 2 /// /// If H_0 is rejected, a confidence interval that agrees with the result of the hypothesis test should not include the null_value /// If H_0 is failed to be rejected, a confidence interval that agrees with the result of the hypothesis should include the null_value /// </summary> /// <param name="values">value sample for the varabiel</param> /// <param name="null_value">The null hypothesis value that true population mean, mu = null_value</param> /// <param name="significance_level"></param> /// <param name="one_sided">True if the test is one-sided</param> /// <returns>True if the null hypothesis H_0 : (mu == null_value) is rejected</returns> public bool RejectH0_ByCI(double[] values, double null_value, double significance_level = 0.05, bool one_sided = false) { double confidence_level = 1 - significance_level * (one_sided ? 2 : 1); double[] confidence_interval = ConfidenceInterval.GetConfidenceInterval(values, confidence_level); return(null_value < confidence_interval[0] || null_value > confidence_interval[1]); }
/// <summary> /// Two-sided test for whether statitics of two variables are equal in the true population, var1 and var2 are independent /// /// Hypotheses are: /// H_0: mu_var1 = mu_var2 /// H_1: mu_var1 != mu_var2 /// /// The hypotheses can be written as /// H_0: mu_var1 - mu_var2 = 0 /// H_1: mu_var1 - mu_var2 != 0 /// /// By Central Limt Theorem: /// sample_mean_var1 - sample_mean_var2 ~ N(0, SE), where null_value = 0 and SE is the standard error of the sampling distribution /// </summary> /// <param name="sample_for_var1">value sample for variable 1</param> /// <param name="sample_for_var2">value sample for variable 2</param> /// <param name="significance_level"></param> /// <returns></returns> public bool RejectH0_ByCI(double[] sample_for_var1, double[] sample_for_var2, double significance_level = 0.05, bool one_sided = false) { double confidence_level = 1 - significance_level * (one_sided ? 2 : 1); double[] confidence_interval = ConfidenceInterval.GetConfidenceIntervalForDiff(sample_for_var1, sample_for_var2, confidence_level); double null_value = 0; return(null_value < confidence_interval[0] || null_value > confidence_interval[1]); }
/// <summary> /// Two-sided or one-sided test for whether statitics of two variables are equal in the true population, var1 and var2 are paired and dependent /// /// Hypotheses are: /// H_0: mu_var1 = mu_var2 /// H_1: mu_var1 != mu_var2 /// /// The hypotheses can be written as /// H_0: mu_var1 - mu_var2 = 0 /// H_1: mu_var1 - mu_var2 != 0 /// /// By Central Limt Theorem: /// sample_mean_var1 - sample_mean_var2 ~ N(0, SE), where null_value = 0 and SE is the standard error of the sampling distribution /// </summary> /// <param name="sample_for_paired_data">a random sample consisting data paired together, var1 and var2, var1 and var2 are not independent</param> /// <param name="one_sided">True if the test is one-sided</param> /// <param name="significance_level"></param> /// <returns></returns> public bool RejectH0_PairedData_ByCI(Tuple <double, double>[] sample_for_paired_data, double significance_level = 0.05, bool one_sided = false) { int sample_size = sample_for_paired_data.Length; double[] diff = new double[sample_size]; for (int i = 0; i < sample_size; ++i) { diff[i] = sample_for_paired_data[i].Item1 - sample_for_paired_data[i].Item2; } double confidence_level = 1 - significance_level * (one_sided ? 2 : 1); double[] confidence_interval = ConfidenceInterval.GetConfidenceInterval(diff, confidence_level); double null_value = 0; return(null_value < confidence_interval[0] || null_value > confidence_interval[1]); }
/// <summary> /// Check whether variable 1 is truely less than variable 2 at 0.95 statistical significance confidence level /// </summary> /// <param name="sample_for_var1">value sample for variable 1</param> /// <param name="sample_for_var2">value sample for variable 2</param> /// <param name="confidence_level"></param> /// <returns></returns> public bool AreLessThan(double[] sample_for_var1, double[] sample_for_var2, double confidence_level = 0.95) { double[] confidence_interval_for_var1 = ConfidenceInterval.GetConfidenceInterval(sample_for_var1, confidence_level); double[] confidence_interval_for_var2 = ConfidenceInterval.GetConfidenceInterval(sample_for_var2, confidence_level); return(confidence_interval_for_var1[1] < confidence_interval_for_var2[0]); }
/// <summary> /// Check whether variable 1 is truely greater than variable 2 at 0.95 statistical significance confidence level, var1 and var2 are independent /// </summary> /// <param name="sample_for_var1">value sample for variable 1</param> /// <param name="sample_for_var2">value sample for variable 2</param> /// <param name="confidence_level"></param> /// <returns></returns> public bool AreGreater(double[] sample_for_var1, double[] sample_for_var2, double confidence_level = 0.95) { double[] confidence_interval_for_var1 = ConfidenceInterval.GetConfidenceInterval(sample_for_var1, confidence_level); double[] confidence_interval_for_var2 = ConfidenceInterval.GetConfidenceInterval(sample_for_var2, confidence_level); return(confidence_interval_for_var1[0] > confidence_interval_for_var2[1]); }