Statistics Advanced concepts 1 Multiple Choice Question test This document should be completed during the course and submitted by the specified date Student name: Date submitted: Other information that may be relevant (optional): Important information In the table below please indicate the correct option(s) for each question. Some questions have more than one correct response if that is the case please ensure you indicate all the correct responses for example if a and c are the correct ones show this by a, c. MCQ number 1 2 3 4 5 6 7 8 9 10 11 12 13 14 15 16 17 18 19 Survival analysis Logistic regression Multiple regression 1. Survival analysis 1 Multiple choice Questions 1. Burton and Walls 1987 investigated the survival of patients on one of three types of renal replacement therapy, peritoneal dialysis, heamodialysis and transplantation details given opposite. What is the usual name for the exponential coefficient column? (one correct choice) a. b. c. d. e. Hazard Hazard Hazard Hazard Hazard Rate (HR) Ratio (HR) probability proportion logarithm 2. Considering the results from Burton and Walls 1987 given opposite. Which is the most appropriate way of interpreting the values in the exponential coefficient column (one correct choice) a. b. c. d. e. Odds Probability Time to event Proportion failing Odds ratio Burton P R, Walls J 1987 Selection-adjusted comparison of life-expectancy of patients on continuous ambulatory peritoneal dialysis, haemodialysis, and renal transplantation Variables that significantly influenced probability of survival Variable Exponential coefficient (risk multiplying factor) Statistical significance Age (each additional decade) 1.68 p<0.0001 Amyloidosis 8.26 p<0.0001 Acute or acute-on-chronic presentation 2.73 p<0.005 Ischaemic heart disease 1.65 p<0.025 3.17 p<0.03 Male sex 0.48 p<0.001 Parenthood 0.45 p<0.001 Pyelonephritis 0.48 p<0.02 0.64 p<0.05 Adverse Convulsions Beneficial: Residence in Leicestershire 3. Considering the results from Burton and Walls 1987 given above. Which variable represents the greatest hazard (one correct choice) a. b. c. d. e. Age (in decades) Amyloidosis Convulsions Ischaemic heart disease Acute or acute on chronic presentation 4. Considering the results from Burton and Walls 1987 given above. Which variable represents the greatest benefit (one correct choice) a. b. c. d. e. Male sex Parenthood Pyenonephritis Residence in Leicestershire Absence of Ischaemic heart disease 5. Considering the results from Burton and Walls 1987 given above. If anyone were considering dropping a variable from the model which one would it most likely be? (one correct choice) a. b. c. d. e. Male sex Parenthood Pyenonephritis Residence in Leicestershire Absence of Ischaemic heart disease 6. Considering the results from Burton and Walls 1987 given above. What is the Exponential coefficient value likely going to be for the female sex? (one correct choice) a. b. c. d. e. 0 .5 1 1- 0.48 1+ 0.48 7. Considering the results from Rait et al 2010 given opposite. What is the more usual term for the x axis? (one correct choice) a. b. c. d. e. Survival function S(t) Logit Inverse hazard Actuarial survival Proportion censored 8. Considering the results from Rait et al 2010 given opposite. The cohort detail below the x axis are? (one correct choice) a. b. c. d. e. Irrelevant and should not be shown Confuse the issues More important than the graph Provide useful additional information Can be calculated from the graph 9. When gathering the failure times to calculate the Kaplan Meier plot which of the following statements is correct? (one correct choice) a. b. c. d. e. Its accurate measurement is of minimal importance Can be grouped into equal intervals Can be calculated from other measures Its accurate measurement is of major importance It is best to collect then at the end of the study period only 10. Censored observations do not include . . .? (one correct choice) a. b. c. d. e. Those Those Those Those Those who experience the event during the followup period of the study that are lost to followup that fail to provide event data subjects whose survival time is less than the followup period of the study who experience the event after the followup period of the study 11. Censored observations are . . .? (one correct choice) a. b. c. d. e. More important than non-censored ones in survival analysis Are assumed to be normally distributed over time Are assumed to have the same survival chances as uncensored observations Are essential to allow calculation of the Kaplan Meier plot Are allocated to the baseline survival curve 12. A Cox regression analysis . . .(one correct choice) a. b. c. d. e. Is used to analyse survival data when individuals in the study are followed for varying lengths of time. Can only be used when there are censored data Always assumes that the relative hazard for a particular variable is constant at all times Uses the logrank statistic to compare two survival curves Relies on the assumption that the explanatory variables (covariates) in the model are Normally distributed. (taken from p. 210) 2. Logistic Regression Multiple choice Questions 1. In Simple Logistic regression the predictor . . .? (one correct choice) a. b. c. d. e. is interval/ratio data must undergo a logarithmic transformation before undergoing logistic regression be in the range of 0 to 1 represent ranked scores be a binary variable 2. A logistic regression model was used to assess the association between CVD and obesity. P is defined to be the probability that the people have CVD, obesity was coded as 0=non obese, 1=obese. log(P/(1-P)) = -2 + 0.7(obesity) What is the log odds ratio for CVD in persons who are obese as compared to not obese? (one correct choice) a. b. c. d. e. 0.7 -2 2.7 Exp(0.7) Exp(2) 3. Which of the following formula produces the correct value for the probability of having CVD (Cardio Vascular Disease) from the logistic regression equation log(P/(1-P)) = -2 + 0.7(obesity) where Pi=1/1+exp(-zi) where zi is the linear Predictor (LP) (one correct choice) a. b. c. d. e. Pcvd= exp(-2+.7)/1- exp(-(-2+.7)) Pcvd= exp(-2+.7)/ 1+ exp(-2+.7) Pcvd= exp(-2+.7)/ 1+ exp(-(-2 x .7)) Pcvd= exp(-2 x.7)/ 1+ exp(-(-2+.7)) Pcvd= exp(-2+.7)/ 1+ exp(-(-2+.7)) 4. In logistic regression the logit is . . . : (one correct choice) a. b. c. d. the natural logarithm of the odds ratio. an instruction to record the data. a logarithm of a digit. the cube root of the sample size. 5. In binomial logistic regression the dependent (or criterion) variable: (one correct choice) a. b. c. d. is a random variable is like the median and is split the data into two equal halves. consists of two categories. is expressed in bits. 6. A model in binomial logistic regression is: (one correct choice) a. b. c. d. a set of predictors which classify cases on the dependent or criterion variable. another name for a contingency table a miniature version of the analysis based on a small number of participants. the most common score 7. Like linear regression logistic regression . . .: (one correct choice) a. b. c. d. does have an independent variable. provides a value directly from the equation for the dependent variable estimates b weights. has a dependent variable. 8. A classification table: (one correct choice) a. b. c. d. helps the researcher assess statistical significance. indicates how well a model has predicted group membership. indicates how well the independent variable(s) correlate with the dependent variable. provides a basis for calculating the exp(b) value 9. In simple logistic regression the traditional goodness of fit measure, -2(log likelihood of current model – log likelihood of previous model) is : (one correct choice) a. b. c. d. a statistic that does not follow a Chi square PDF. indicates the spread of answers to a question. an index of how closely the analysis reaches statistical significance. how close the predicted findings are to actual findings. 10. Step 0 in simple logistic regression is: (one correct choice) a. b. c. d. when there is no correlation between the predictors and the outcome variables. when there is 0 spread around the regression line. when there are no predictors only a constant term in the model. when all the predictor variables are included in the model 11. In simple logistic regression the pseudo R square values . . . (one correct choice) a. b. c. d. e. Provide a greater degree of accuracy than those provided in linear regression Should not be thought of a affect size measures Are not based on the -2Log Likelihood values You should only consider the rough magnitude of them Provide the most appropriate method a assessing parameters 12. Likelihood (In the statistical sense) . . (one correct choice) a. b. c. d. Is the same as a p value Is the probability of observing a particular parameter value given a set of data attempts to find the parameter value which is the most likely given the observed data. minimises the difference between the model and the data 13. A Maximun Likelihood Estimator (in the statistical sense) . . (one correct choice) a. b. c. d. Is the same as a p value Is the probability of observing a particular parameter value given a set of data attempts to find the parameter value which is the most likely given the observed data. Is the same as R Square 14. In simple logistic regression analysis in both SPSS and R which of the following is produced in a standard output (one correct choice): a. b. c. d. e. Likelihoods (rather than -2log likelihoods) F statistic B (natural log odds ratio) for each parameter T statistic and associated P value Hazard function The table below is from a simple logistic regression analysis, for each of the boxes pointing to a place in the table select the option that correctly names and explains the column. 1 2 Variables in the Equation 3 B Step 1a df Sig. 4 95% C.I.for EXP(B) S.E. Wald time -0.015683 0.007256 4.671430 1.000000 0.030668 Exp(B) 0.984440 Constant 12.727363 5.803108 4.810116 1.000000 0.028293 336839.852549 Lower 0.970539 Upper 0.998540 a. Variable(s) entered on step 1: time. 15. Box one is pointing to . . . (one correct choice): a. b. c. d. e. -2log likelihoods Akaike's information criterion The value of the natural log odds ratio for the parameter estimate The value of the odds ratio for the parameter estimate The standard deviation of the estimated B sampling distribution 16. Box two is pointing to . . . (one correct choice): a. b. c. d. e. -2log likelihoods The standard error of the Logistic function The value of the natural log odds ratio for the parameter estimate The mean of the estimated B sampling distribution The standard deviation of the estimated B sampling distribution 17. Box three is pointing to . . . (one correct choice): a. b. c. d. e. P value associated with the linear predictor (LP) P value associated with the Wald statistic for a specific parameter estimate P value associated with the Wald statistic for all parameters combined P value associated with the Wald statistic for the confidence interval for the specific parameter estimate P value associated with none of the above 18. Box four is pointing to . . . (one correct choice): a. b. c. d. e. -2log likelihoods Akaike's information criterion The value of the natural log odds ratio for the parameter estimate The value of the odds ratio for the parameter estimate The standard deviation of the estimated B sampling distribution 19. A logistic regression reports a Exp(B) value of .9844 for a time variable along with a p value of <.03 You would interpret the p value, remembering that the p value is a conditional probability, where the null parameter value is zero . .. . . (one correct choice): a. You would obtain a result like this or one more extreme three times in a hundred given that there was a strong relationship between time and the predictor variable b. You would obtain a result like this or one more extreme three times in a hundred given that there was not relationship between time and the predictor variable c. You would obtain a result like this or one less extreme three times in a hundred given that there was not relationship between time and the predictor variable d. You would obtain a result like this or one less extreme three times in a hundred given that there was a strong relationship between time and the predictor variable e. You would obtain a result like this at least 97 times (i.e. 1-.03) in a hundred given that the alternative hypothesis is true 3. Multiple Regression 1. A partial correlation . . . . .(one correct answer) a. b. c. d. e. Controls for influence on the first of the variables being correlated Controls for influence on the second of the variables being correlated Controls for influence on both of the variables being correlated Divides the influence of the specified suppressor variable(s), equally across the X and Y variables Suppresses the influence of the specified suppressor variable(s), equally across the X and Y variables 2. A part correlation . . . . .(one correct answer) a. b. c. d. e. Controls for influence on the first of the variables being correlated Controls for influence on the second of the variables being correlated Controls for influence on both of the variables being correlated Controls for influence on either the first or second of the variables being correlated Suppresses the influence of the specified suppressor variable(s), equally across the X and Y variables 3. Linear multiple regression which only involves nominal predictors (inputs/independent) variables is traditionally analysed using . . . . .(one correct answer) a. b. c. d. e. Analysis of variance (ANOVA) Analysis of covariance (ANCOVA) Survival analysis Generalised Estimating Equations (gee) Logistic regression 4. Linear multiple regression which involves both nominal and interval/ratio (continuous) predictors (inputs/independent) variables is traditionally analysed using . . . . .(one correct answer) a. b. c. d. e. Analysis of variance (ANOVA) Analysis of covariance (ANCOVA) Survival analysis Generalised Estimating Equations (gee) Logistic regression 5. The linear multiple regression approach over ANOVA provides the following advantage. .(one correct answer) a. b. c. d. e. Allows analysis of non normally distributed samples Parameter estimation (B's and β's). Missing data analysis Copes better with smaller sample sizes Reduced error estimates 6. The squared part correlation for each of the parameter estimates in multiple linear regression represents . . . . .(one correct answer) a. b. c. d. e. increase in accuracy for that particular variable Percentage of error attributed to the parameter increase in R2 for that particular parameter (unique contribution to the model) Level of normality exhibited by the parameter estimate Alternative to the R2 measure 7. What does the term collinearity or multicollinearity mean with regard to multiple linear regression? . .(one correct answer) a. b. c. d. e. A desirable situation where there is a low correlation between one or more predictors (input variables) A undesirable situation where there is a low correlation between one or more predictors (input variables) A desirable situation where there is a high correlation between one or more predictors (input variables) A undesirable situation where there is a high correlation between one or more predictors (input variables) A undesirable situation where there is no correlation between the predictors (input variables) 8. Ross NA, Wolfson MC, Dunn JR, Berthelot J-M, Kaplan GA, Lynch JW. Relation between income inequality and mortality in Canada and in the United States: cross-sectional assessment using census data and vital statistics. BMJ 2000; 320: 898–902 Ross et al. regressed mortality in working aged men against median share of income (i.e. the proportion of total income accruing to the less well off 50% of households) in 282 USA metropolitan areas and 53 Canadian metropolitan areas. The median income for the areas was included as an explanatory variable. They found the difference in slopes significant (p < 0.01), R2 = 0.51. Example courtesy of Micheal Campbell. (please select the THREE correct/true answers) The model is yi = a + b1X1i + b2X2i + b3X3i + b4X4i yi is the mortality per 100 000 for metropolitan area i, i = 1…335 X1i takes the value 1 for the USA and 0 for Canada X2i is median share of income for area i (defined above) X3i = Xi1.X2i (the product of X1i and X2i) X4i is median income for area i a. b. c. d. Mortality is assumed to have a Normal distribution. The test to compare slopes is a t test with 330 degrees of freedom. The relationship between mortality and median income is assumed to be different for the USA and Canada. The relationship between mortality and median share of income is assumed linear. e. The variability of the residuals is assumed the same for the USA and Canada. 9. Example courtesy of Micheal Campbell. In a multiple regression equation y = a + b1X1 + b2X2, (please select the TWO correct/true answers) a. b. c. d. e. The independent’ variables X1 and X2 must be continuous The leverage depends on the values of y. The slope b2 is unaffected by values of X1. If X2 is a categorical variable with three categories, it is modelled by two dummy variables. If there are 100 points in the data set, then there are 97 degrees of freedom for testing b1. [end of document]