Calculating Statistical Significance and Confidence Intervals

Calculating Statistical Significance and Confidence Intervals Bioterrorism Epidemiology Module 12 Missouri Department of Health And Senior Services

Tests of Significance (p values) • Used to determine how likely it is that the observed results could have occurred by chance • Study population is a sample from a population • In the source population the amount of disease is the same for exposed and unexposed people

Tests of Significance (p values) • This hypothesis is known as the null hypothesis • The minimum accepted p value for significance is 0.05 • The most frequently used significant test in epidemiology is the chi-square test

Chi-Square (Χ2) (t-1) (ad-bc)2 (v1) (v0) (h1) (h0) Diseased Non-Diseased a b h1 Exposed c h0 d Non-Exposed v1v0 t

Chi-Square (Χ2) Calculate the Chi-Square for this data and determine the p value from Table 8 Cases Controls 100 100 Exposed Non-Exposed 50 350

Chi-Square (Χ2) (t-1) (ad-bc)2 (v1) (v0) (h1) (h0) Cases Controls Exposed 100 100 200 50 350 Non-Exposed 400 150 450 600 (599) (35,000-5,000)2 \ 5,400,000,000 = 99.83(p<.001)

95% Confidence Interval of an Odds Ratio and a Relative Risk There is a 95% likelihood that the true Risk Ratio falls between the lower and upper portion of the 95% confidence interval

95% CI for Relative Risk (RR) RR = (A/A+B) / (C/C+D) Upper 95% limit InRR = InRR+ 1.96 * SE(InRR) Lower 95% limit InRR = InRR- 1.96 * SE(InRR) Upper limit RR = e upper limit lnRR Lower limit RR = e lower limit lnRR Standard error of the natural log (RR) = (variance In)½ Variance of In = ((B/A) / (A+B)) + ((D/C) / (C+D)) DiseasedNot Diseased A B Exposed C D Non-Exposed

Relative Risk Cohort Study Iexp = 10 / 1,000 X 100,000 = 1,000 per 100,000 Inexp = 5 / 3,000 X 100,000 = 167 per 100,000 RR = Iexp / Inexp = 1,000 / 167 = 6.00 DiseasedNon Diseased Exposed 10 990 Non-Exposed 5 2,995

95% CI for Relative Risk (RR) Upper 95% limit InRR = InRR+ 1.96 * SE(InRR) Lower 95% limit InRR = InRR- 1.96 * SE(InRR) Upper limit RR = e upper limit lnRR Lower limit RR = e lower limit lnRR Standard error of the normal log (RR) = (variance In)½ Variance of In (RR ) = ((B/A) / (A+B)) + ((D/C) / (C+D)) Upper 95% limit InRR = 1.79+ (1.96 * .547) = 2.86 Lower 95% limit InRR = 1.79– (1.96 * .547) = .72 Upper limit RR = e 2.86 = 17.46 Lower limit RR = e .72 = 2.05 Standard error of the normal log (RR) = (.299)½ = .547 Variance of In (RR) = 99 / 1000 + 599 / 3000 = .299 DiseasedNot Diseased 10 990 Exposed 5 2995 Non-Exposed

95% CI for Odds Ratio (OR) OR = (A/B) / (C/D) Upper limit InOR = InOR+ 1.96 * SE(InOR) Lower limit InOR = InOR- 1.96 * SE(InOR) Upper limit OR = e upper limit lnOR Lower limit OR = e lower limit lnOR Standard error of the natural log (OR) = (variance In)½ Variance of InOR =(1/A) + (1/B) + (1/C) + (1/D) CasesControls A B Exposed C D Non-Exposed

Odds Ratios Case Control Study ODDS OF EXPOSUREcases = 100 / 50 = 2.0 ODDS OF EXPOSUREcontrols = 100 / 350 = 0.29 OR = ODDScases / ODDScontrols = 2 / 0.29 = 6.90 Cases Controls 100 100 Exposed Non-Exposed 50 350

95% CI for Odds Ratio (OR) Upper limit InOR = InOR+ 1.96 * SE(InOR) Lower limit InOR = InOR- 1.96 * SE(InOR) Upper limit OR = e upper limit lnOR Lower limit OR = e lower limit lnOR SE (lnOR) = (variance InOR)½ Variance of InOR =(1/A) + (1/B) + (1/C) + (1/D) Upper limit InOR = 1.93+(1.96 * .21) = 2.34 Lower limit InOR = 1.93– (1.96 * .21) = 1.52 Upper limit OR = e 2.34 = 10.38 Lower limit OR = e 1.52 = 4.57 SE (lnOR) = (.043)½ = .21 Variance of InOR =(.01) + (.01) + (.02) + (.003) = .043 Cases Controls 100 100 Exposed Non-Exposed 50 350

Calculating Statistical Significance and Confidence Intervals