Online Companion to Using Simulation to Help Manage the Pace of Play in Golf

Online Companion to Using Simulation to Help Manage the Pace of Play in Golf MoonSoo Choi Industrial Engineering and Operations Research, Columbia University, New York, NY, USA {moonsoo.choi@columbia.edu} Qi Fu Credit Suisse, Eleven Madison Avenue, New York, NY, USA {qf2112@columbia.edu} Ward Whitt Industrial Engineering and Operations Research, Columbia University New York, NY, USA {ww2040@columbia.edu} April 30, 2017 Abstract (from the main paper) To help design and manage golf courses, Whitt (2015) developed a new stochastic queueing network model of a conventional 18-hole golf course and characterized the capacity of each hole. The primitives in that model are the random times required for each group of golfersto play each stage on each hole, where a stage is an appropriateset of steps. The model is relatively high level, but the model still captures the important property that multiple groups can play at the same time on the longer holes, subject to precedence constraints. In this paper, we develop a flexible and efficient simulation algorithm of that model and apply it to study important operational issues in golf. We substantiate the characterization of hole capacities and study: (i) the costs and benefits of a wave-up rule designed to increase the pace of play and (ii) the costs and benefits of alternative tee schedules, i.e., the intervals between successive groups starting play on the first hole. We estimate that the wave-up rule can increase the daily number of groups that can play each day by about 13%, while a two-level tee schedule rule can increase the daily number of groups that can play each day by about 3%. We show that the costs of making the tee interval too short tend to be far greater than the costs of making it too long. Keywords: pace of play in golf, queueing models of golf, using simulation to manage golf courses, waving up in golf, alternative tee schedules on golf courses 1

1 Overview This is an online companion to the main paper, Choi et al. (2017), which we will refer to that way. We present additional in which we present material supporting and elaborating upon our findings in the main paper. The online companion is organized into four sections beyond this introduction section. Section 2 elaborates on our simulation algorithm. In particular, we discuss (i) the overall structure of our simulation algorithm, (ii) methodology for calculating statistical estimates, and (iii) efficiency of our algorithm design. Section 3 presents more data visualization figures like Figure 4 of the main paper. These provide a holistic perspective of how various parameters such as tee times, the presence of the wave-up rule, and different course designs affect the throughput levels of a golf course, and how they effect the sojourn and departure times of each playing group. Section 4 provides additional waiting time statistics to portray a clearer context of the impact of making the course under-loaded. Section 5 shows the various throughput levels attained in golf courses that are balanced but have different hole sequences, thereby showing that hole sequence does not have a significant impact on the throughput as long as the courses are balanced. Again, we use the notation P3, P3WU, SP3, P4, and P5 respectively, to denote the five hole types considered, namely, par-3 hole (unscaled par-3 without the wave-up rule), par-3 hole with wave-up, scaled par-3 hole, par-4 hole, and par-5 hole. 2 Simulation Algorithm: Design and Methodology This section describes the simulation algorithm for the stochastic group play model reviewed in 2 of the main paper. We expand on the brief overview given in 1.2 of the main paper. The basic goal was to develop a simulation algorithm that is flexible and scalable in implementing variety of golf course models, as well as variety of parameters associated with the golf courses. Our simulation algorithm provides flexibility by allowing users to choose various parameters, including but not limited to (i) hole sequence, (ii) number of playing groups per day, (iii) number of simulation replications, (iv) playing time parameters and distributions, (v) arrival time distributions, and (vi) hole types. Our simulation algorithm also is scalabile, because the algorithm can handle large numbers of playing groups and simulation replications of a complex golf course model. In order to make our simulation efficient, our simulation model makes use of matrices, as opposed to loops, to provider a faster means of tracking and calculating golf performance statistics 2

of multiple playing groups. In addition, our simulation algorithm allows the simulation results to be statistically analyzed in multiple ways. The model breaks down playing times and waiting times by each stage in each hole for all playing groups; such breakdown structure allows us to analyze each playing group s performance on a hole-by-hole, stage-by-stage basis. Additionally, the algorithm provides a platform for the simulation optimization algorithm presented in Section 4 of the main paper, which the tee interval that maximizes the throughput in the golf course subject to constraints. 2.1 Algorithm Design and Methodology We now provide an overview of the simulation algorithm. We first describe the data structure of the algorithm, and then we specify the algorithm steps. A graphic overview of the simulation process is shown in Figure 1. 2.1.1 Data Structure We now describe the key variables and their data structure. Here are the user-specified variables (with our common choice are in parentheses): n grp: number of groups playing in the course (102 groups) Wenormallysetn gtobeslightlylargerthantheactualnumberofgroupstobeanalyzed. The reason is because each playing group s stage playing times depend on those of the precedent and the subsequent groups. For example, the playing times of the 100th group at the P3WU holes depend on those of the 99th and the 101st group. Therefore, even though we target to analyze the performance of only the first 100 groups, we set n g to be larger, e.g. 102. n rep: number of simulation replications (2000 replications) Playing time distribution parameters: m, a For our simulations, we used the triangular distribution to generate random playing times. 3

m is the vector of mean stage playing time parameters and is different for each hole type. As outlined in 2.1 of the main paper, Par-3 and Par-4 holes have 3 stage, whereas P5 holes have 5 stages. m (3) =(mu1 P3,mu2 P3,mu3 P3): mean stage playing times for Par-3 stages m (4) =(mu1 P4,mu2 P4,mu3 P4): mean stage playing times for Par-4 stages m (5) =(mu1 P5,mu2 P5,mu3 P5,mu4 P5,mu5 P5): mean stage playing times for Par- 5 stages a is the variability parameter that indicates the spread in the triangular distribution. For each of the hole types above, we set the mean parameters to be (3.50, 2.00, 2.67), (4.00, 2.00, 4.00) and (4.00, 2.00, 2.00, 1.33, 4.00), respectively. However, afterwards we made minor adjustments to achieve a balanced course, as described in 2.2 of the main paper. More detailed description on generating random playing times via triangular distribution is available in the Section 2.2 of the main paper. Lost ball parameters: p and L p: Probability of a playing group losing a ball during the first shot for each hole L: The alternative longer playing time required for a group to play on the first stage of a hole due to the lost ball intv array: an array that establishes tee interval schedule settings for the arrival times. This array may contain multiple values; for example, with intv array= [5.0, 5.5, 6.0, 6.5, 7.0], the simulation program will run 5 rounds of golf play simulation, each with different tee schedule policy (and with n rep number of replications). Hole Parameters: seq, n h and n s seq: an 1 by n h array that records the sequence of holes in the golf course (this array can be scaled to contain fewer than 18 holes in the course). n h: Number of holes (18 holes) 4

n s: Number of stages (60 stages). n s is calculated by adding the number of stages in each of the n h holes. In particular, n s= 3 (Number of Par-3 and Par-4 holes) + 5 (Number of Par-5 holes). Please refer to Section 2.1 of the main paper for stage diagrams for Par-3, Par-4 and Par-5 holes (3-stage diagram for Par-3 and Par-4 holes, and 5-stage diagram for Par-5 holes). Here is the list of output variables in each replication of the simulation: A-matrix: an (n g) by 1 array that recordseach playing group s arrival time at thegolf course. P-matrix: an (n g) by (n s+2 n h) records each playing group s stage clearing time after finishing each stage. As mentioned in the description for n s, there are 3 stages in Par-3 and Par-4 holes and 5 stages in Par-5 holes. We add 2 18 columns in the P-matrix to record (i) hole arrival times of each group n (denoted by A n ) and (ii) beginning times of each group n (i.e. tee-off times, denoted by B n ). Please refer to 2.1 in the main paper for more details on performance measures. Since there are n h number of holes in the course (typically 18), we multiply these two times by n h, or 18. w h,1 and w h,2 : n g by 18 arrays that respectively record the first and second moments of waiting times of each group before beginning the play at each hole. The waiting times are calculated from subtracting A n, the arrival time of group n at the hole, from B n, the time that group n begins playing in the hole. x 1 and x 2 : n g by 18 n i arrays that respectively record the first and second moments of i=1 playing times of each group. The playing times are calculated from subtracting B n, the time that group n begins playing in the hole, from G n, the time that group n clears the green and departs from the hole. wtotal 1 and w2 total : n g by 1 arrays that records the first and second moments of total waiting times of each group in the entire golf course, averaged over n rep number of replications. 5

x 1 total and x2 total : n g by 1 arrays that records the first and second moments of total playing times of each group in the entire golf course, averaged over n rep number of replications. TSO, TSO 2, ETSO: these arrays, each with a size of n g by 1, respectively denote the first moment of the sojourn times of each playing group, the second moments, and the average sojourn times for n g groups. Sojourn times are calculated by subtracting the first column of the P-matrix (the arrival times of the groups at the first hole) from the last column of the P-matrix (the clearing times of the groups at the last hole). TSO 2 is the square of the first-moment array, ETSO is the average of the TSO arrays generated in n rep number of replications. Similarly as above, sample variance of the sojourn times can be generated from subtracting (TSO) 2 from (TSO 2). 2.1.2 Calculating Statistical Estimates In this section, we indicate how the algorithm calculates the statistical estimates of sample means and variances for 2000 samples of waiting and playing times of each playing group. As mentioned previously, 2000 is our common parameter choice for n rep, or the number of simulation replications, because we found that it is large enough to provide good statistical precision. The samples of waiting and playing times for each group come from running 2000 simulation replications. Furthermore, we provide two-sided confidence intervals with 95% confidence over 2000 replications for waiting and playing times. We remark that, since the sample size is sufficiently large, there is no need to calculate Student t-statistic, even when the variance is unknown. Estimating w h,1 and w h,2 : For variables w h,1 and w h,2 at hole h ( h = 1,...,n h) for group j ( j = 1,...,n g) over n r i.i.d. replications, we provide the estimates as n r w j h,1 [ ] w j h,1 k/(n r), and k=1 n r w j h,2 [ ] w j h,2 k/(n r) k=1 6

With the above estimates, the simulation calculates the difference ŵj h,2 (ŵj h,1 )2 to yield variance s 2 w and subsequently calculates the square root of the value to yield standard deviation s w, again for each group i at hole j. To compute half-width of the 95% confidence interval for the waiting times, we calculate 1.96s w / n r. Because our default setting for n rep is 2000, the half-width would then be 1.96s w / 2000. Estimating x 1 and x 2 : Similarly as the estimates of x 1 and x 2, for variables x 1 and x 2 at hole h ( h = 1,...,18) for group j ( j = 1,...,n g) over n r i.i.d. replications, we provide the estimates as n r [ x 1 x 1 (j,h) ] k/(n r), and k=1 n r [ x 2 x 2 (j,h) ] k/(n r) k=1 With the above estimates, the simulation calculates the difference x 2 ( x1) 2 to yield variance s 2 x and subsequently calculates the square root of the value to yield standard deviation s x, again for each group j at hole h. To compute half-width of the 95% confidence interval for the waiting times, we calculate 1.96s x / n r. Because our default setting for n r is 2000, the half-width would then be 1.96s x / 2000. Estimating w 1 total and w2 total : The total waiting time for group j ( j = 1,...,n g) across all the holes h ( h = 1,...,18) in the course is calculated as 18 w j h,1 for each replication k. Similarly, w2 total is defined h=1 as the sum of the second moments (i.e. 18 w j h,2 h=1 moments of the total waiting time are estimated as [ n r ( 18 ] )] ŵtotal 1 = /(n r), and k=1 h=1 [ŵj h,1 k ). Subsequently, the first and second 7

[ n r ŵtotal 2 = k=1 ( 18 h=1 [ŵj h,2 ] k )] /(n r) Estimating x 1 total and x2 total : The total playing time for group j ( j = 1,...,n g) across all the holes h ( h = 1,...,18) in the course is calculated as 18 [ x 1 (j,h) ] k for each replication k. Similarly, x2 total is j=1 defined as the sum of the second moments (i.e. and second moments of the total playing time are estimated as: [ n r ( 18 x 1 total = [ x 1 (j,h) ] )] /(n r), and k 2.1.3 Algorithm Steps k=1 h=1 18 j=1 n r x 2 total = 18 [ x 2 (j,h) ] /(n r) k k=1 j=1 [ x 2 (j,h) ] ). Subsequently, the first k Below is a list of steps in the simulation algorithm. An overview of the steps listed below is also presented in Figure 1. (i) First, seq, or the hole sequence array, with a dimension of 1 n h (n h is the number of holes in the course) is defined in the simulation algorithm. Again, our common parameter choice for n h is 18. (ii) Next, all relevant parameters such as n g (the number of playing group), tee intervals, playing/waiting time distributions are declared and defined. (iii) Once all the relevant parameters are defined, the algorithm initiates the first replication of the simulation by generating A (array of arrival times of all the playing groups) according to the tee schedule policy defined in the simulation model (with a dimension of N 1, in which n g denotes the number of playing groups). For example, setting an even deterministic tee schedule at 5 minutes means that the groups would arrive at times 0, 5, 10, 15, etc. 8

(iv) Once the arrival time array is generated, the algorithm begins generating stage playing times for each playing group at each of the stages in the first hole. For generating stage playing times, the algorithm calls a different sub-function for each hole type (P3/SP3, P3WU, P 4, and P 5). Each sub-function entails the recursive mathematical representation of the stochastic models of group play, which are outlined in Section 2 of the main paper. (v) Subsequently, the main function of the simulation algorithm will supply the type of playing time distribution and relevant parameter values to the appropriate sub-function based on the hole type of the first hole. The sub-function will recursively compute and record hole arrival, waiting, and playing times for each stage in the first hole, for all n g groups. (vi) The playing time matrix, which has a dimension of n g by n 1 (the number of playing stages at hole 1), is returned to the main function of the algorithm.then, the hole departure times from the matrix (i.e. the last column) are copied to the arrival time array to begin simulations for the second hole. (vii) Subsequently, Step 4 to 6 is repeated for the next 17 holes until the last playing group departs from the last hole in the sequence. The stage playing time arrays for 18 holes are augmented to create P-matrix : a n g by 18 n i matrix that records the stage playing times of each playing group. i=1 (viii) The entire simulation, from steps 1 to 7, is then run for multiple independent and identically distributed replications. The simulation model is currently set to run n sim (e.g. 2000) replications, which we found is sufficient to yield a reasonably high level of statistical precision. (ix) Finally, the golf simulator concludes with computation of various statistics, including means, second moments, and variances of sojourn times, waiting times, and playing times. Please refer to Sec 2.1.2 for more details on our methodology for calculating statistical estimates. In regards to the steps above, we make one concluding remark. In the P-matrix, we calculate and populate the playing times group-by-group before doing so hole-by-hole. The reason we cannot populate the matrix the other way (i.e. populating playing times for group 1 hole-by-hole for 18 holes beforedoing sofor group 2and subsequent groups)is becauseof the wave-up rulefor P3WU holes. The wave-up rule stipulates that each group s playing time depends not only on that of the precedent group, but also on that of the subsequent group. 9

1 2 3 Define a golf course (1 x 18 array) Define all the parameters, including: N (number of groups), playing and waiting time distributions, and tee schedule policy Generate an arrival matrix based on the tee schedule Generate random playing times for the first group 1 2 3 A 6 2000 Replications 4 5 4 3 4 4 3 4 4 5 4 3 4 4 4 5 5 4 5 P-matrix (100 groups x Number of stage playing times) 4 Recursively generate the playing times for the subsequent groups, according to the stochastic modelsof play with precedent constraints outlined in Section 2. Subsequently, calculate and record the waiting times. 5 Repeat Steps 3 and 4 for the next 17 holes, while populating the P-matrix, or the stage playing time recording matrix. n N 6 Repeat for the next 2000 replications 4 Figure 1: an overview of the data structure and steps of the simulation algorithm. 2.2 Advantages of Our Simulation Algorithm Design Because of the complexity of golf course simulations and because of the large number of replications (i.e. 2000) run during each round of simulation we have made our simulation design as efficient as possible. There are several aspects of our simulation design that help us achieve the goal. 2.2.1 Computation Scale of the Simulation Experiments We now elaborate upon 1.2 of the main paper and provide a more detailed context of the scale of running our simulation algorithm. Overall, the scale of our simulation experiment is fairly large in terms of run length, and the large scale can be attributed to several factors. Primarily, the run length of our simulation experiment can be determined by three factors: (i) the number of i.i.d. replications, (ii) stage playing times generated per day of golf play, and (iii) various design factors considered. First, thenumberof i.i.d. replications (or, as denotedabove, n r)plays akey roleindetermining the run length of the simulation. Our common choice for the parameter n r) is 2000, which, we believe, is sufficient to provide robust statistical precision for various variable estimates. Indeed, 10

the statistical precision is evidenced by the small values of half-widths displayed in the bottom row of Table 3 in 3.1 of the main paper. Second, we consider the number of stage playing times generated per day of golf play. As stipulated above in the list of input variables for our simulation experiments, our common parameter choice for n s, which denotes the number of stage playing times, is 60. For all course designs, we have three stage playing times for 3 Par-3 and 12 Par-4 holes, and five stage playing times for three Par-5 holes; thus, the total number of stage playing times sum up to 60. Since the common parameter choice for the number of groups is set to be 102, each simulation replication, then, will generate 6120 stage playing times. Third, we also consider a number of various design factors. There are at least three additional design factors when we run the simulation experiment: (i) the number of course designs, (ii) the number of alternative tee intervals and (iii) the number of Par-3 hole types. As mentioned in the introduction to 3 of the main paper, golf courses commonly have 12 identical Par-4 holes, 3 identical Par-3 holes and 3 identical Par-5 holes. However, each golf course has a different combination of hole sequence; using the combinatoric formula, there is a total of 18! 3! 12! 3! = 371,280 different combinations available. Practically speaking, we do recognize that the possible number of hole combinations in the real world is roughly 20, but the number can be easily larger. We also consider the number of alternative tee intervals (also denoted as n t). For each course design and for each Par-3 hole type, we obtain the simulation results for 30 different tee time intervals. Lastly, as mentioned in the previous paragraph, we also consider the three different types of Par-3 hole types. Considering these three design factors, we conclude that total number of design factors to be considered, at the minimum, equals to 20 30 3 = 1800. Furthermore, we note that the scale of our simulation experiments can become larger for twolevel tee intervals (see 5 of the main paper for more details), for which we consider various combinations of multiple tee parameters. We considered 3 cut-offs (i.e. the group number at which the tee interval increases), 3 types of Par-3 holes for 93 combinations of two-level tee intervals. We also have run our simulation experiment for 5 different course designs. This gives us additional 4185 scenarios to consider in addition to the 1800 cases mentioned above. Considering all of the factors mentioned above, we can calculate the total number of stage playing times generated, which is 6120 5985 2000 7.3 10 10 (or approximately 73 billion stage playing times). To portray a clearer picture of the required computational capacity to run our simulation 11

experiment, we note that the entire simulation experiment is estimated to take approximately 1.8 million seconds or approximately 500 full hours, based on our observations of time performance measurements of the MATLAB software. An important remark is that the above 500-hour requirement meets the bare minimum amount of time required to conduct our research. The time requirement does not include other efforts in designing our simulation experiment; we have run additional simulation runs to carefully choose and test our parameter choices, evaluate robustness of our model, etc. We plan on extending our simulation study to carefully study the impact of slow groups in the golf course. 2.2.2 Other Advantages of the Simulation There also are other advantages of our simulation design. First, our simulation program is modularized into individual functions. In our simulation algorithm, the main function is designed as the main underlying framework for running different types of golf play scenarios. The random playing times for each hole are generated not in themain function, butin one of the following sub-functions: (i) P3 hole (also includes SP3 holes), (ii) P3WU hole, (iii) P4 hole, and (iv) P5 hole. Allocating various parts of the simulation algorithm to different functions helps us to quickly identify certain parts that need improvements. Second, we have minimized the usage of loops by extensively using arrays. The clear advantage of running simulations with arrays is that doing so helps the simulation program to run faster than running loops does since dealing with arrays often involve fewer lines of codes. Furthermore, we have divided the columns of time-stamp array P more granularly by different playing stages rather than holes. Such array construction indeed provides a more detailed analysis of playing and waiting times for each stage; but more importantly, it helps us to easily identify bottleneck stages. 12

3 Data Visualization A significant component of the simulation algorithm is creating data-visualization figures that help reveal important insights about system performance. One such data visualization figure was illustrated in Figure 3 of the main paper. We present others now. These figures show how sojourn times and departure times vary with different tee interval times and playing groups. In 4.1 of the main paper, we formulated an optimization framework that aims to maximize the throughput (i.e. the number of groups that can play per day) subject to (i) sojourn time constraint and (ii) departure time constraint. The visualization figures in this section provide a comprehensive view of sojourn time and departure time trends across a wide range of tee times. We created the visualization figures to better understand how the throughput levels change as tee interval changes, and to understand the behaviors of sojourn time convergence at each tee interval: at which group sojourn times converge, and what value they converge to. Through depicting this dynamic interaction behavior, the visualization figures in this section seek to visually depict the tradeoff between sojourn times and departure times in the optimization framework in 4.1 of the main paper. 13

Groups / Tee 10 20 30 40 50 60 70 80 90 100 Groups / Tee 10 20 30 40 50 60 70 80 90 100 5.0 5.5 6.0 6.5 7.0 7.1 7.2 7.3 7.4 7.5 7.6 7.7 7.8 7.9 8.0 8.1 8.2 8.3 8.4 8.5 9.0 9.5 188.03 188.23 188.17 188.14 188.27 188.00 188.07 188.23 188.30 188.39 188.24 188.16 188.24 188.27 188.06 188.08 188.32 188.19 188.05 187.97 188.05 188.12 195.59 195.29 194.65 194.06 193.77 193.67 193.45 193.54 193.40 193.31 193.35 193.12 193.02 193.06 192.73 192.69 192.85 192.51 192.34 192.36 192.03 191.38 201.56 200.66 199.53 198.50 197.66 197.19 197.07 197.14 197.03 196.52 196.55 196.38 196.27 196.02 195.60 195.53 195.48 195.15 194.96 194.93 194.07 193.33 206.72 205.32 203.57 202.21 200.68 200.31 200.03 199.91 199.54 199.21 199.22 198.68 198.61 198.11 197.92 197.55 197.37 197.28 196.79 196.70 195.61 194.48 211.35 209.63 207.37 205.40 203.44 202.99 202.58 202.27 202.01 201.47 201.20 200.65 200.68 199.87 199.61 199.39 198.86 198.52 198.35 197.91 196.45 195.03 215.85 213.56 210.84 208.29 205.94 205.46 204.91 204.49 204.19 203.39 203.15 202.52 202.21 201.58 201.13 200.95 200.28 199.89 199.47 198.89 197.14 195.44 220.07 217.35 214.17 211.00 208.23 207.64 206.96 206.58 206.08 205.32 204.93 204.13 203.64 203.04 202.53 202.33 201.45 200.96 200.59 199.76 197.75 195.94 224.19 221.07 217.44 213.74 210.34 209.64 208.97 208.56 207.98 206.92 206.46 205.70 205.00 204.26 203.71 203.35 202.51 201.85 201.60 200.53 198.23 196.20 228.35 224.65 220.44 216.34 212.49 211.47 210.88 210.37 209.61 208.60 207.95 207.21 206.38 205.41 204.92 204.32 203.57 202.82 202.18 201.25 198.60 196.42 232.28 228.06 223.52 218.75 214.46 213.53 212.75 212.12 211.27 210.23 209.49 208.43 207.63 206.64 205.93 205.33 204.40 203.58 202.87 201.92 198.92 196.44 236.26 231.46 226.46 221.05 216.51 215.51 214.57 213.78 212.82 211.68 210.92 209.65 208.58 207.71 206.84 206.07 205.13 204.38 203.44 202.55 199.07 196.47 240.27 234.85 229.59 223.46 218.37 217.32 216.28 215.32 214.34 213.15 212.14 210.87 209.78 208.66 207.89 206.91 205.93 204.98 203.99 202.97 199.38 196.40 244.05 238.29 232.51 226.00 220.42 219.11 217.93 216.96 215.82 214.43 213.44 212.13 210.87 209.78 208.71 207.56 206.72 205.75 204.48 203.47 199.65 196.55 248.02 241.71 235.25 228.51 222.33 220.91 219.54 218.55 217.32 215.91 214.71 213.45 211.99 210.81 209.50 208.44 207.42 206.32 204.93 203.90 199.81 196.54 251.89 244.87 238.12 230.72 224.21 222.78 221.00 220.04 218.68 217.38 216.05 214.55 213.20 211.76 210.38 209.23 208.02 206.74 205.52 204.32 199.97 196.50 255.75 248.25 240.91 233.02 226.09 224.58 222.69 221.51 220.20 218.62 217.26 215.74 214.10 212.63 210.99 209.91 208.74 207.30 205.97 204.74 200.08 196.50 259.58 251.57 243.62 235.36 227.77 226.22 224.37 223.08 221.59 219.91 218.40 216.85 215.19 213.51 211.72 210.65 209.33 207.90 206.43 205.10 200.18 196.56 263.26 254.78 246.33 237.63 229.51 227.93 226.03 224.56 222.95 221.19 219.55 217.90 216.07 214.36 212.47 211.43 210.03 208.25 206.90 205.49 200.29 196.59 267.03 258.00 249.22 239.92 231.29 229.73 227.77 226.02 224.22 222.50 220.78 218.96 217.04 215.25 213.30 212.07 210.62 208.68 207.41 205.81 200.30 196.59 270.80 261.26 251.90 242.27 232.96 231.33 229.42 227.55 225.44 223.79 221.99 219.73 218.00 216.02 214.16 212.86 211.12 209.21 207.83 206.16 200.39 196.42 274.55 264.58 254.52 244.61 234.80 232.98 230.96 228.93 226.80 224.97 223.03 220.85 218.96 216.77 215.03 213.57 211.64 209.65 208.28 206.56 200.51 196.35 278.31 267.79 257.31 246.80 236.59 234.56 232.36 230.40 228.11 226.02 224.22 222.01 219.85 217.65 215.73 214.26 212.17 210.28 208.67 206.79 200.49 196.44 282.06 271.00 259.98 248.92 238.43 236.14 233.78 231.91 229.43 227.27 225.26 222.88 220.79 218.51 216.59 214.90 212.87 210.68 209.01 207.06 200.60 196.47 285.69 274.32 262.79 251.12 240.18 237.80 235.39 233.12 230.75 228.42 226.22 223.99 221.76 219.47 217.35 215.45 213.38 211.20 209.44 207.48 200.66 196.55 289.48 277.48 265.42 253.28 241.87 239.35 236.84 234.40 232.06 229.64 227.22 225.15 222.66 220.22 218.07 216.05 213.87 211.62 209.86 207.72 200.74 196.88 293.19 280.74 268.14 255.48 243.63 240.87 238.26 235.67 233.38 230.76 228.41 226.06 223.54 221.01 218.81 216.74 214.30 212.14 210.03 207.96 200.80 196.87 296.89 283.94 270.80 257.87 245.35 242.53 239.74 237.06 234.65 232.03 229.55 226.99 224.37 221.87 219.61 217.35 214.81 212.46 210.34 208.19 200.79 196.89 300.50 287.02 273.61 259.99 247.02 244.08 241.23 238.38 236.00 233.20 230.63 227.88 225.29 222.51 220.28 217.89 215.23 212.80 210.73 208.43 200.85 196.82 304.20 290.28 276.14 262.18 248.69 245.56 242.67 239.79 237.24 234.38 231.68 228.90 226.07 223.34 221.16 218.49 215.84 213.32 210.92 208.57 200.95 196.80 307.88 293.50 278.93 264.28 250.32 247.05 244.10 241.14 238.65 235.52 232.84 229.79 226.87 224.07 221.73 219.10 216.25 213.69 211.34 208.79 201.07 196.82 311.60 296.71 281.54 266.55 251.94 248.68 245.57 242.40 239.78 236.70 233.89 230.80 227.75 224.77 222.24 219.66 216.74 214.03 211.74 208.92 201.04 196.82 315.22 299.87 284.20 268.70 253.43 250.11 246.98 243.84 241.13 237.95 235.09 231.78 228.70 225.66 222.92 220.22 217.14 214.40 212.01 209.26 200.86 196.75 318.82 302.97 286.84 270.86 255.11 251.74 248.41 245.28 242.38 239.16 236.14 232.74 229.60 226.46 223.45 220.69 217.71 214.64 212.29 209.37 200.73 196.73 322.52 306.06 289.63 272.99 256.66 253.26 249.95 246.79 243.62 240.44 237.15 233.65 230.60 227.29 224.09 221.43 218.14 215.05 212.72 209.70 200.89 196.80 326.23 309.23 292.25 275.04 258.39 254.92 251.33 248.19 245.11 241.53 238.27 234.62 231.37 228.12 224.72 221.91 218.53 215.43 212.96 209.83 200.82 196.75 329.82 312.38 294.85 277.15 260.04 256.58 252.75 249.57 246.36 242.57 239.33 235.56 232.36 228.91 225.37 222.46 219.02 216.01 213.32 210.15 201.05 196.65 333.44 315.41 297.59 279.23 261.64 257.93 254.21 250.91 247.61 243.68 240.39 236.48 233.19 229.65 226.00 223.05 219.56 216.28 213.54 210.45 201.09 196.76 336.99 318.56 300.19 281.41 263.30 259.44 255.62 252.04 248.87 244.77 241.50 237.39 234.08 230.36 226.60 223.59 219.94 216.76 213.70 210.74 201.03 196.76 340.65 321.61 302.84 283.58 264.96 260.85 257.08 253.42 250.11 245.94 242.41 238.27 234.95 231.00 227.27 224.04 220.40 217.14 214.20 210.93 201.11 196.67 344.41 324.81 305.46 285.78 266.62 262.45 258.49 254.78 251.25 246.98 243.34 239.20 235.70 231.68 227.89 224.48 220.94 217.52 214.57 211.19 201.06 196.73 348.02 327.95 308.16 287.87 268.09 263.93 259.99 256.05 252.39 248.24 244.42 240.15 236.50 232.47 228.57 225.03 221.43 217.82 214.77 211.41 200.94 196.78 351.73 331.06 310.74 290.00 269.78 265.64 261.50 257.36 253.53 249.40 245.38 241.08 237.30 233.21 229.22 225.60 221.86 218.17 214.92 211.60 201.01 196.86 355.24 334.22 313.30 292.10 271.55 267.12 262.88 258.71 254.74 250.50 246.36 241.93 238.17 233.94 229.83 226.09 222.27 218.35 215.11 211.88 200.84 197.01 358.84 337.32 315.91 294.14 273.06 268.54 264.29 260.13 255.89 251.54 247.36 242.87 238.93 234.58 230.43 226.63 222.66 218.72 215.39 212.15 200.86 196.98 362.47 340.43 318.54 296.19 274.70 270.08 265.82 261.51 257.05 252.61 248.30 243.82 239.76 235.27 231.10 227.16 223.09 219.21 215.60 212.28 200.84 197.02 366.06 343.51 321.21 298.21 276.17 271.68 267.17 262.79 258.39 253.54 249.16 244.69 240.44 235.96 231.68 227.78 223.51 219.51 215.79 212.44 200.90 196.92 369.72 346.50 323.79 300.37 277.77 273.19 268.55 264.10 259.86 254.61 250.31 245.74 241.41 236.57 232.29 228.26 224.04 219.72 216.07 212.56 201.00 196.85 373.15 349.69 326.45 302.46 279.37 274.66 269.93 265.37 261.07 255.81 251.24 246.70 242.21 237.34 232.89 228.78 224.46 220.06 216.24 212.75 201.07 196.74 376.71 352.82 329.04 304.65 280.88 276.33 271.22 266.63 262.11 256.87 252.26 247.68 242.97 238.16 233.42 229.24 224.94 220.37 216.55 212.89 201.02 196.73 380.27 355.87 331.58 306.66 282.50 277.84 272.64 267.97 263.42 257.90 253.14 248.57 243.81 238.80 233.96 229.77 225.36 220.63 216.74 213.00 201.05 196.75 383.86 359.00 334.19 308.69 284.21 279.39 274.07 269.23 264.62 259.07 254.15 249.42 244.54 239.63 234.64 230.23 225.79 220.88 216.93 213.16 201.08 196.88 387.36 361.99 336.78 310.74 285.76 280.74 275.39 270.47 265.76 260.25 255.18 250.28 245.37 240.24 235.34 230.74 226.23 221.25 217.25 213.45 201.16 196.82 390.94 365.13 339.40 312.93 287.35 282.25 276.83 271.66 266.94 261.32 256.26 251.15 246.12 240.94 235.99 231.30 226.61 221.63 217.43 213.63 201.26 196.70 394.47 368.15 341.90 315.03 288.98 283.64 278.31 272.93 267.98 262.54 257.26 252.11 246.89 241.63 236.60 231.83 226.99 221.96 217.62 213.81 201.22 196.71 398.06 371.26 344.45 316.95 290.59 285.14 279.60 274.20 269.20 263.59 258.21 253.07 247.69 242.29 237.19 232.28 227.33 222.34 217.91 213.94 201.37 196.82 401.80 374.26 347.10 319.03 292.24 286.61 281.03 275.62 270.34 264.71 259.22 253.79 248.63 242.84 237.74 232.86 227.67 222.55 218.08 214.23 201.31 196.85 405.34 377.30 349.65 321.09 293.87 288.01 282.43 276.84 271.51 265.73 260.23 254.61 249.32 243.61 238.31 233.26 228.12 222.90 218.41 214.35 201.43 196.79 408.95 380.39 352.41 323.18 295.31 289.55 283.83 278.24 272.65 266.82 261.19 255.50 250.16 244.30 238.93 233.78 228.48 223.18 218.63 214.51 201.36 196.81 412.48 383.57 355.00 325.27 296.97 291.02 285.14 279.52 273.81 267.89 262.41 256.38 250.90 244.96 239.50 234.31 228.90 223.51 218.81 214.64 201.32 196.70 416.04 386.57 357.63 327.37 298.48 292.57 286.54 280.81 275.10 268.93 263.39 257.27 251.71 245.70 240.11 234.83 229.24 223.88 219.12 214.65 201.30 196.79 419.66 389.58 360.16 329.38 300.07 293.95 287.96 281.99 276.34 270.05 264.42 258.10 252.40 246.33 240.70 235.30 229.53 224.10 219.33 214.72 201.42 196.90 423.34 392.84 362.71 331.46 301.67 295.51 289.27 283.06 277.58 271.12 265.38 259.05 253.27 246.96 241.17 235.63 230.03 224.45 219.53 214.86 201.45 196.85 426.90 395.89 365.11 333.73 303.11 296.97 290.66 284.32 278.76 272.14 266.30 259.86 254.13 247.63 241.66 236.10 230.45 224.66 219.77 215.05 201.39 196.73 430.61 398.86 367.67 335.88 304.81 298.38 292.06 285.58 279.76 273.27 267.34 260.82 254.84 248.27 242.21 236.57 230.70 225.00 220.09 215.23 201.36 196.82 434.15 401.99 370.11 337.84 306.40 299.79 293.39 286.90 280.94 274.34 268.31 261.67 255.59 248.95 242.69 237.14 231.12 225.23 220.28 215.35 201.35 196.82 437.71 405.08 372.68 339.92 307.96 301.22 294.74 288.25 282.27 275.38 269.34 262.50 256.29 249.59 243.28 237.61 231.41 225.56 220.39 215.56 201.22 196.75 441.25 408.15 375.27 341.98 309.55 302.59 296.11 289.58 283.39 276.47 270.28 263.42 257.12 250.30 243.87 238.04 231.69 225.78 220.67 215.71 201.18 196.69 444.75 411.20 377.81 343.96 310.99 304.08 297.53 290.90 284.63 277.60 271.25 264.26 257.80 250.99 244.49 238.42 232.07 226.03 220.77 215.86 201.25 196.86 448.44 414.26 380.41 346.02 312.58 305.49 298.87 292.22 285.74 278.60 272.20 265.15 258.43 251.72 245.12 238.82 232.50 226.38 220.91 215.89 201.32 196.86 451.94 417.24 383.13 348.11 314.31 306.87 300.05 293.47 286.82 279.66 273.29 265.98 259.27 252.38 245.66 239.42 232.85 226.77 221.07 215.94 201.21 196.67 455.53 420.26 385.67 350.18 315.87 308.33 301.42 294.74 288.02 280.85 274.30 266.94 259.99 253.10 246.24 239.91 233.14 227.11 221.29 216.02 201.19 196.64 459.16 423.38 388.28 352.20 317.46 309.85 302.78 296.00 289.24 281.88 275.24 267.70 260.72 253.75 246.87 240.38 233.45 227.46 221.56 216.14 201.13 196.62 462.71 426.45 390.76 354.33 319.06 311.41 304.11 297.30 290.34 282.95 276.22 268.48 261.49 254.37 247.47 240.82 233.80 227.74 221.71 216.32 201.17 196.64 466.19 429.55 393.47 356.19 320.60 312.85 305.36 298.54 291.48 284.09 277.15 269.43 262.21 255.00 247.93 241.21 234.20 227.99 221.98 216.28 201.33 196.73 469.74 432.55 395.94 358.39 322.17 314.32 306.70 299.66 292.63 285.04 278.14 270.35 263.09 255.70 248.47 241.64 234.60 228.24 222.18 216.51 201.23 196.72 473.26 435.62 398.67 360.32 323.71 315.84 308.09 300.93 293.88 286.17 279.06 271.14 263.77 256.38 249.06 242.07 235.14 228.42 222.45 216.61 201.32 196.57 476.81 438.68 401.10 362.42 325.24 317.11 309.57 302.25 294.94 287.26 279.97 271.84 264.62 257.14 249.70 242.46 235.50 228.93 222.71 216.72 201.24 196.73 480.42 441.75 403.63 364.52 326.91 318.61 310.93 303.54 296.30 288.31 280.77 272.66 265.31 257.94 250.23 242.99 235.79 229.27 222.91 216.84 201.16 196.72 484.07 444.79 406.12 366.50 328.42 320.09 312.26 304.80 297.49 289.32 281.68 273.56 266.04 258.56 250.85 243.53 236.15 229.36 223.04 217.05 201.17 196.72 487.59 447.84 408.65 368.52 329.96 321.59 313.64 306.01 298.75 290.37 282.63 274.43 266.82 259.10 251.36 244.02 236.53 229.61 223.19 217.09 201.15 196.78 491.13 450.94 411.13 370.59 331.46 323.10 314.95 307.40 299.78 291.40 283.61 275.15 267.58 259.68 251.94 244.43 236.94 229.99 223.34 217.19 201.21 196.88 494.68 454.01 413.74 372.65 332.93 324.50 316.13 308.69 300.89 292.41 284.48 276.09 268.25 260.32 252.39 244.71 237.32 230.29 223.49 217.30 201.17 196.86 498.17 457.03 416.31 374.68 334.58 326.01 317.52 309.86 302.04 293.41 285.39 276.83 269.00 260.96 252.93 245.31 237.66 230.49 223.73 217.38 201.19 196.73 501.78 460.02 418.98 376.80 336.10 327.39 318.79 311.21 303.13 294.39 286.45 277.78 269.65 261.62 253.47 245.87 237.94 230.82 223.86 217.46 201.13 196.67 505.43 463.13 421.56 378.92 337.76 328.86 320.14 312.40 304.23 295.50 287.36 278.66 270.32 262.29 253.99 246.29 238.26 231.11 223.94 217.61 201.12 196.63 509.07 466.16 424.05 380.97 339.22 330.28 321.44 313.64 305.45 296.57 288.37 279.56 271.17 262.82 254.62 246.68 238.63 231.47 224.17 217.73 201.22 196.78 512.56 469.18 426.68 383.06 340.85 331.68 322.72 314.76 306.61 297.69 289.30 280.53 271.85 263.56 255.06 247.21 238.94 231.73 224.27 217.87 201.14 196.92 516.15 472.42 429.19 385.00 342.23 333.06 323.99 315.98 307.73 298.75 290.20 281.33 272.63 264.20 255.71 247.67 239.34 232.00 224.44 217.98 201.18 196.77 519.65 475.36 431.63 387.02 343.61 334.48 325.40 317.15 308.68 299.71 291.11 282.14 273.37 264.82 256.10 248.07 239.79 232.18 224.73 218.06 201.29 196.76 523.12 478.40 434.16 389.26 345.14 335.84 326.68 318.34 309.83 300.67 291.92 282.91 274.12 265.59 256.70 248.50 240.09 232.43 224.90 218.09 201.26 196.68 526.58 481.45 436.67 391.32 346.67 337.33 327.89 319.58 310.97 301.65 292.90 283.77 274.94 266.14 257.29 248.89 240.38 232.67 225.05 218.04 201.29 196.73 530.12 484.53 439.17 393.42 348.37 338.83 329.41 320.87 312.08 302.76 293.83 284.58 275.76 266.81 257.69 249.42 240.70 233.03 225.18 218.32 201.19 196.74 533.70 487.65 441.66 395.43 349.93 340.21 330.75 322.13 313.30 303.79 294.82 285.36 276.56 267.47 258.30 249.90 240.97 233.26 225.31 218.47 201.16 196.88 537.22 490.68 444.30 397.38 351.33 341.62 332.16 323.28 314.42 304.82 295.92 286.11 277.32 268.05 258.78 250.31 241.26 233.52 225.65 218.42 201.07 196.82 540.62 493.62 446.85 399.39 352.85 343.11 333.60 324.51 315.62 305.80 296.80 287.05 277.93 268.62 259.32 250.65 241.57 233.79 225.75 218.47 201.01 196.90 544.14 496.60 449.38 401.39 354.45 344.57 334.99 325.74 316.78 306.86 297.71 288.00 278.67 269.21 259.94 251.03 241.88 233.98 225.93 218.57 201.13 196.80 547.74 499.51 451.87 403.44 355.97 345.99 336.40 326.98 317.87 307.76 298.72 288.78 279.52 269.91 260.60 251.44 242.23 234.36 226.02 218.53 201.17 196.85 551.30 502.50 454.40 405.44 357.44 347.47 337.71 328.14 319.12 308.78 299.66 289.63 280.13 270.52 261.15 251.95 242.57 234.47 226.26 218.66 201.20 196.78 554.78 505.58 456.80 407.48 358.97 348.88 339.10 329.37 320.32 309.63 300.57 290.51 280.94 271.20 261.71 252.54 242.78 234.75 226.44 218.75 201.35 196.75 558.36 508.59 459.37 409.43 360.53 350.33 340.36 330.65 321.27 310.66 301.54 291.33 281.65 271.84 262.14 252.95 243.04 235.04 226.60 218.78 201.33 196.79 5.0 5.5 6.0 6.5 7.0 7.1 7.2 7.3 7.4 7.5 7.6 7.7 7.8 7.9 8.0 8.1 8.2 8.3 8.4 8.5 9.0 9.5 188.03 188.23 188.17 188.14 188.27 188.00 188.07 188.23 188.30 188.39 188.24 188.16 188.24 188.27 188.06 188.08 188.32 188.19 188.05 187.97 188.05 188.12 200.59 200.79 200.65 200.56 200.77 200.77 200.65 200.84 200.80 200.81 200.95 200.82 200.82 200.96 200.73 200.79 201.05 200.81 200.74 200.86 201.03 200.88 211.56 211.66 211.53 211.50 211.66 211.39 211.47 211.74 211.83 211.52 211.75 211.78 211.87 211.82 211.60 211.73 211.88 211.75 211.76 211.93 212.07 212.33 221.72 221.82 221.57 221.71 221.68 221.61 221.63 221.81 221.74 221.71 222.02 221.78 222.01 221.81 221.92 221.85 221.97 222.18 221.99 222.20 222.61 222.98 231.35 231.63 231.37 231.40 231.44 231.39 231.38 231.47 231.61 231.47 231.60 231.45 231.88 231.47 231.61 231.79 231.66 231.72 231.95 231.91 232.45 233.03 240.85 241.06 240.84 240.79 240.94 240.96 240.91 240.99 241.19 240.89 241.15 241.02 241.21 241.08 241.13 241.45 241.28 241.39 241.47 241.39 242.14 242.94 250.07 250.35 250.17 250.00 250.23 250.24 250.16 250.38 250.48 250.32 250.53 250.33 250.44 250.44 250.53 250.93 250.65 250.76 250.99 250.76 251.75 252.94 259.19 259.57 259.44 259.24 259.34 259.34 259.37 259.66 259.78 259.42 259.66 259.60 259.60 259.56 259.71 260.05 259.91 259.95 260.40 260.03 261.23 262.70 268.35 268.65 268.44 268.34 268.49 268.27 268.48 268.77 268.81 268.60 268.75 268.81 268.78 268.61 268.92 269.12 269.17 269.22 269.38 269.25 270.60 272.42 277.28 277.56 277.52 277.25 277.46 277.43 277.55 277.82 277.87 277.73 277.89 277.73 277.83 277.74 277.93 278.23 278.20 278.28 278.47 278.42 279.92 281.94 286.26 286.46 286.46 286.05 286.51 286.51 286.57 286.78 286.82 286.68 286.92 286.65 286.58 286.71 286.84 287.07 287.13 287.38 287.44 287.55 289.07 291.47 295.27 295.35 295.59 294.96 295.37 295.42 295.48 295.62 295.74 295.65 295.74 295.57 295.58 295.56 295.89 296.01 296.13 296.28 296.39 296.47 298.38 300.90 304.05 304.29 304.51 304.00 304.42 304.31 304.33 304.56 304.62 304.43 304.64 304.53 304.47 304.58 304.71 304.76 305.12 305.35 305.28 305.47 307.65 310.55 313.02 313.21 313.25 313.01 313.33 313.21 313.14 313.45 313.52 313.41 313.51 313.55 313.39 313.51 313.50 313.74 314.02 314.22 314.13 314.40 316.81 320.04 321.89 321.87 322.12 321.72 322.21 322.18 321.80 322.24 322.28 322.38 322.45 322.35 322.40 322.36 322.38 322.63 322.82 322.94 323.12 323.32 325.97 329.50 330.75 330.75 330.91 330.52 331.09 331.08 330.69 331.01 331.20 331.12 331.26 331.24 331.10 331.13 330.99 331.41 331.74 331.80 331.97 332.24 335.08 339.00 339.58 339.57 339.62 339.36 339.77 339.82 339.57 339.88 339.99 339.91 340.00 340.05 339.99 339.91 339.72 340.25 340.53 340.70 340.83 341.10 344.18 348.56 348.26 348.28 348.33 348.13 348.51 348.63 348.43 348.66 348.75 348.69 348.75 348.80 348.67 348.66 348.47 349.13 349.43 349.35 349.70 349.99 353.29 358.09 357.03 357.00 357.22 356.92 357.29 357.53 357.37 357.42 357.42 357.50 357.58 357.56 357.44 357.45 357.30 357.87 358.22 358.08 358.61 358.81 362.30 367.59 365.80 365.76 365.90 365.77 365.96 366.23 366.22 366.25 366.04 366.29 366.39 366.03 366.20 366.12 366.16 366.76 366.92 366.91 367.43 367.66 371.39 376.92 374.55 374.58 374.52 374.61 374.80 374.98 374.96 374.93 374.80 374.97 375.03 374.85 374.96 374.77 375.03 375.57 375.64 375.65 376.28 376.56 380.51 386.35 383.31 383.29 383.31 383.30 383.59 383.66 383.56 383.70 383.51 383.52 383.82 383.71 383.65 383.55 383.73 384.36 384.37 384.58 385.07 385.29 389.49 395.94 392.06 392.00 391.98 391.92 392.43 392.34 392.18 392.51 392.23 392.27 392.46 392.28 392.39 392.31 392.59 393.10 393.27 393.28 393.81 394.06 398.60 405.47 400.69 400.82 400.79 400.62 401.18 401.10 400.99 401.02 400.95 400.92 401.02 401.09 401.16 401.17 401.35 401.75 401.98 402.10 402.64 402.98 407.66 415.05 409.48 409.48 409.42 409.28 409.87 409.75 409.64 409.60 409.66 409.64 409.62 409.95 409.86 409.82 410.07 410.45 410.67 410.82 411.46 411.72 416.74 424.88 418.19 418.24 418.14 417.98 418.63 418.37 418.26 418.17 418.38 418.26 418.41 418.56 418.54 418.51 418.81 419.24 419.30 419.64 420.03 420.46 425.80 434.37 426.89 426.94 426.80 426.87 427.35 427.13 426.94 426.86 427.05 427.03 427.15 427.19 427.17 427.27 427.61 427.95 428.01 428.26 428.74 429.19 434.79 443.89 435.50 435.52 435.61 435.49 436.02 435.78 435.63 435.48 435.80 435.70 435.83 435.78 435.89 435.81 436.28 436.59 436.63 436.90 437.53 437.93 443.85 453.32 444.20 444.28 444.14 444.18 444.69 444.36 444.27 444.19 444.44 444.38 444.48 444.50 444.47 444.54 445.16 445.29 445.44 445.72 446.12 446.57 452.95 462.80 452.88 453.00 452.93 452.78 453.32 452.95 452.90 452.84 453.25 453.02 453.24 453.09 453.07 453.17 453.73 454.00 454.05 454.39 454.94 455.29 462.07 472.32 461.60 461.71 461.54 461.55 461.94 461.68 461.57 461.40 461.78 461.70 461.89 461.80 461.75 461.77 462.24 462.66 462.74 463.03 463.74 463.92 471.04 481.82 470.22 470.37 470.20 470.20 470.43 470.21 470.18 470.14 470.53 470.45 470.69 470.48 470.50 470.56 470.92 471.32 471.34 471.70 472.41 472.76 479.86 491.25 478.82 478.97 478.84 478.86 479.11 478.94 478.81 478.88 479.18 479.16 479.34 479.14 479.20 479.26 479.45 479.89 480.11 480.24 481.09 481.37 488.73 500.73 487.52 487.56 487.63 487.49 487.66 487.56 487.55 487.69 487.82 487.94 487.95 487.75 488.00 487.99 488.09 488.73 488.74 488.95 489.92 490.20 497.89 510.30 496.23 496.23 496.25 496.04 496.39 496.32 496.13 496.39 496.71 496.53 496.67 496.42 496.57 496.72 496.72 497.31 497.33 497.63 498.56 498.83 506.82 519.75 504.82 504.88 504.85 504.65 505.04 505.08 504.75 505.07 505.36 505.07 505.33 505.06 505.36 505.41 505.37 505.96 506.02 506.51 507.32 507.65 516.05 529.15 513.44 513.41 513.59 513.23 513.64 513.53 513.41 513.71 514.01 513.68 513.99 513.68 513.99 514.05 514.00 514.65 514.76 515.08 515.94 516.45 525.09 538.76 521.99 522.06 522.19 521.91 522.30 522.14 522.02 522.14 522.67 522.27 522.70 522.29 522.68 522.66 522.60 523.29 523.34 523.86 524.50 525.24 534.03 548.26 530.65 530.61 530.84 530.58 530.96 530.65 530.68 530.82 531.31 530.94 531.21 530.87 531.35 531.20 531.27 531.84 532.00 532.54 533.40 533.93 543.11 557.67 539.41 539.31 539.46 539.28 539.62 539.35 539.29 539.48 539.85 539.48 539.74 539.50 539.90 539.78 539.89 540.38 540.74 541.22 542.17 542.69 552.06 567.23 548.02 547.95 548.16 547.87 548.09 547.93 547.99 548.05 548.39 548.24 548.42 548.15 548.50 548.47 548.57 549.03 549.43 549.82 550.77 551.41 560.94 576.78 556.73 556.56 556.74 556.50 556.78 556.74 556.70 556.66 556.93 556.90 556.98 556.78 557.10 557.11 557.22 557.70 558.06 558.47 559.32 560.10 570.01 586.36 565.24 565.22 565.30 565.10 565.55 565.32 565.28 565.31 565.54 565.50 565.56 565.33 565.77 565.74 565.83 566.29 566.67 566.95 567.91 568.88 578.84 596.01 573.84 573.82 573.91 573.64 574.06 573.84 573.89 574.03 574.09 574.04 574.16 573.97 574.33 574.28 574.43 574.93 575.26 575.62 576.59 577.65 587.86 605.48 582.47 582.43 582.54 582.19 582.70 582.48 582.62 582.71 582.65 582.61 582.70 582.62 582.96 582.87 583.10 583.56 583.89 584.41 585.20 586.28 596.84 615.02 591.06 591.01 591.21 590.71 591.17 591.18 591.17 591.29 591.39 591.04 591.16 591.19 591.44 591.46 591.68 592.28 592.51 593.01 593.79 594.94 605.90 624.42 599.72 599.50 599.79 599.37 599.77 599.79 599.75 599.90 600.26 599.61 599.91 599.94 600.21 599.97 600.29 600.86 601.24 601.52 602.47 603.56 615.00 633.85 608.15 608.19 608.45 607.96 608.37 608.36 608.33 608.47 608.87 608.31 608.44 608.60 608.81 608.64 608.89 609.48 609.86 610.16 611.04 612.25 624.07 643.24 616.71 616.82 617.04 616.65 616.88 617.13 616.82 617.03 617.31 616.87 617.06 617.28 617.37 617.36 617.42 618.04 618.54 618.77 619.75 620.89 633.02 652.73 625.27 625.37 625.58 625.16 625.50 625.74 625.44 625.67 626.02 625.40 625.54 625.87 626.01 625.90 625.96 626.67 627.16 627.33 628.34 629.50 642.05 662.25 633.86 634.00 634.19 633.69 634.21 634.39 634.07 634.23 634.62 634.07 634.15 634.42 634.54 634.63 634.64 635.23 635.79 635.88 636.93 638.16 651.08 671.88 642.36 642.49 642.78 642.24 642.76 642.84 642.59 642.77 643.16 642.75 642.78 642.98 643.17 643.14 643.34 643.84 644.43 644.55 645.65 646.95 660.16 681.32 650.94 651.13 651.40 650.93 651.35 651.45 651.23 651.26 651.74 651.32 651.46 651.55 651.72 651.74 651.99 652.50 653.01 653.23 654.23 655.63 669.26 690.70 659.47 659.65 659.90 659.53 659.98 659.94 659.91 659.83 660.18 660.04 660.06 660.21 660.29 660.33 660.60 661.13 661.59 661.86 662.82 664.31 678.22 700.21 668.06 668.26 668.45 667.95 668.59 668.54 668.40 668.40 668.80 668.59 668.61 668.87 668.89 668.89 669.19 669.68 670.13 670.54 671.51 672.94 687.37 709.82 676.80 676.76 677.10 676.53 677.24 677.11 677.03 677.12 677.34 677.21 677.22 677.29 677.63 677.34 677.74 678.36 678.67 679.05 680.08 681.73 696.31 719.35 685.34 685.30 685.65 685.09 685.87 685.61 685.63 685.64 685.91 685.73 685.83 685.81 686.12 686.01 686.31 686.86 687.32 687.70 688.81 690.35 705.43 728.79 693.95 693.89 694.41 693.68 694.31 694.25 694.23 694.34 694.45 694.32 694.39 694.40 694.76 694.60 694.93 695.48 695.88 696.28 697.43 699.01 714.36 738.31 702.48 702.57 703.00 702.27 702.97 702.82 702.74 702.92 703.01 702.89 703.21 702.98 703.30 703.16 703.50 704.11 704.50 704.91 706.01 707.64 723.32 747.70 711.04 711.07 711.63 710.87 711.48 711.47 711.34 711.51 711.70 711.43 711.79 711.57 711.91 711.80 712.11 712.73 713.04 713.58 714.72 716.15 732.30 757.29 719.66 719.58 720.16 719.38 720.07 719.95 719.96 719.99 720.34 720.05 720.42 720.10 720.40 720.33 720.70 721.30 721.53 722.10 723.33 724.72 741.42 766.90 728.34 728.34 728.71 727.96 728.67 728.61 728.47 728.36 728.98 728.62 728.98 728.75 729.07 728.86 729.17 729.73 730.23 730.75 731.93 733.36 750.45 776.35 736.90 736.89 737.11 736.73 737.11 737.17 737.06 736.92 737.56 737.14 737.50 737.26 737.73 737.43 737.66 738.30 738.85 739.26 740.57 742.05 759.39 785.73 745.61 745.36 745.67 745.38 745.81 745.68 745.66 745.48 745.96 745.77 746.14 745.92 746.24 745.97 746.21 746.87 747.30 747.90 749.29 750.73 768.36 795.32 754.15 753.99 754.11 753.84 754.40 754.19 754.19 754.10 754.54 754.34 754.71 754.47 754.79 754.55 754.69 755.54 755.92 756.43 757.88 759.35 777.35 804.82 762.71 762.58 762.68 762.42 762.96 762.72 762.74 762.75 763.27 762.88 763.34 763.00 763.29 763.09 763.28 764.11 764.41 765.06 766.39 768.06 786.22 814.25 771.25 771.15 771.27 770.98 771.55 771.19 771.31 771.38 771.79 771.47 771.88 771.62 771.92 771.70 771.87 772.64 772.89 773.58 775.07 776.71 795.18 823.69 779.75 779.70 779.81 779.46 779.99 779.78 779.93 780.00 780.43 780.10 780.45 780.16 780.40 780.29 780.49 781.12 781.47 782.13 783.57 785.36 804.25 833.36 788.44 788.26 788.41 788.02 788.58 788.29 788.47 788.62 788.94 788.60 789.00 788.75 788.83 788.92 789.12 789.62 790.10 790.78 792.11 793.89 813.32 842.86 796.94 796.74 797.13 796.61 797.31 796.77 796.85 797.17 797.42 797.16 797.69 797.28 797.47 797.48 797.66 798.32 798.65 799.47 800.67 802.44 822.21 852.17 805.53 805.26 805.67 805.18 805.87 805.33 805.42 805.74 806.02 805.85 806.30 805.94 805.99 806.10 806.24 806.91 807.14 808.11 809.29 811.02 831.19 861.64 814.16 813.88 814.28 813.70 814.46 813.95 813.98 814.30 814.64 814.38 814.84 814.40 814.52 814.65 814.87 815.48 815.65 816.76 817.96 819.64 840.13 871.12 822.71 822.45 822.76 822.33 823.06 822.61 822.51 822.90 823.14 822.95 823.42 822.88 823.09 823.17 823.47 824.02 824.20 825.34 826.51 828.32 849.17 880.64 831.19 831.05 831.47 830.69 831.60 831.15 830.96 831.44 831.68 831.59 831.95 831.53 831.61 831.70 831.93 832.51 832.80 833.89 835.18 836.78 858.33 890.23 839.74 839.55 839.94 839.39 840.17 839.72 839.50 839.86 840.23 840.04 840.54 840.15 840.29 840.30 840.47 841.04 841.40 842.44 843.78 845.51 867.23 899.72 848.26 848.12 848.67 847.82 848.71 848.34 848.09 848.43 848.88 848.67 849.06 848.64 848.77 848.88 849.06 849.57 850.14 850.92 852.45 854.11 876.32 909.07 856.81 856.68 857.10 856.42 857.24 856.71 856.77 857.05 857.34 857.26 857.57 857.04 857.42 857.54 857.70 858.06 858.70 859.73 861.11 862.72 885.24 918.73 865.42 865.25 865.63 865.02 865.91 865.31 865.33 865.64 866.10 865.81 865.97 865.56 865.91 866.24 866.23 866.69 867.19 868.37 869.71 871.34 894.16 928.22 874.07 873.79 874.12 873.50 874.42 873.89 873.86 874.20 874.69 874.32 874.48 874.16 874.44 874.76 874.85 875.33 875.75 876.76 878.24 880.05 903.17 937.72 882.59 882.34 882.65 882.02 882.96 882.49 882.44 882.71 883.35 882.87 883.03 882.73 883.02 883.20 883.36 883.92 884.33 885.31 886.79 888.59 912.15 947.28 891.13 890.94 891.13 890.59 891.46 891.10 890.95 891.40 891.78 891.40 891.61 891.15 891.58 891.68 891.94 892.43 892.94 893.99 895.34 897.19 921.21 956.88 899.68 899.51 899.74 899.15 899.93 899.60 899.33 899.99 900.29 899.91 900.08 899.79 900.05 900.22 900.39 900.81 901.52 902.59 903.89 905.80 930.17 966.36 908.17 908.03 908.31 907.68 908.58 908.21 907.92 908.46 908.84 908.41 908.59 908.23 908.60 908.76 908.93 909.51 910.06 911.09 912.53 914.38 939.19 975.73 916.78 916.52 916.98 916.30 917.10 916.69 916.39 917.11 917.33 916.89 917.25 916.88 917.05 917.32 917.47 918.17 918.54 919.72 921.06 922.96 948.13 985.17 925.43 925.13 925.56 924.92 925.76 925.26 924.94 925.60 925.83 925.50 925.76 925.46 925.52 925.89 925.99 926.69 927.06 928.31 929.54 931.61 957.12 994.63 934.07 933.66 934.05 933.47 934.22 933.78 933.44 934.14 934.45 934.07 934.37 934.06 934.17 934.32 934.62 935.18 935.63 936.97 938.17 940.23 966.22 1004.28 942.56 942.18 942.68 942.06 942.85 942.28 941.92 942.56 943.01 942.69 942.90 942.73 942.65 942.96 943.06 943.81 944.14 945.53 946.67 948.87 975.14 1013.92 951.15 950.92 951.19 950.50 951.23 950.76 950.39 951.08 951.53 951.25 951.40 951.23 951.23 951.50 951.71 952.37 952.74 954.10 955.24 957.48 984.18 1023.27 959.65 959.36 959.63 959.02 959.61 959.28 959.00 959.55 959.88 959.71 959.91 959.74 959.77 960.02 960.10 960.87 961.39 962.58 963.93 966.06 993.29 1032.76 968.12 967.90 968.16 967.76 968.14 967.74 967.48 968.04 968.43 968.17 968.32 968.21 968.32 968.69 968.70 969.40 969.89 971.13 972.50 974.59 1002.26 1042.18 976.58 976.45 976.67 976.32 976.67 976.33 975.89 976.58 976.97 976.65 976.90 976.77 976.94 977.14 977.29 977.89 978.38 979.67 981.05 983.04 1011.29 1051.73 985.12 985.03 985.17 984.92 985.37 984.93 984.61 985.17 985.48 985.26 985.43 985.28 985.56 985.71 985.69 986.52 986.90 988.33 989.58 991.82 1020.19 1061.24 993.70 993.65 993.66 993.43 993.93 993.41 993.15 993.73 994.10 993.79 994.02 993.76 994.16 994.27 994.30 995.10 995.37 996.86 998.11 1000.47 1029.16 1070.88 1002.22 1002.18 1002.30 1001.88 1002.33 1001.92 1001.76 1002.18 1002.62 1002.32 1002.72 1002.21 1002.72 1002.75 1002.78 1003.61 1003.86 1005.42 1006.85 1008.92 1038.07 1080.32 1010.62 1010.62 1010.85 1010.39 1010.85 1010.51 1010.40 1010.71 1011.22 1010.80 1011.20 1010.85 1011.13 1011.22 1011.32 1012.05 1012.37 1013.99 1015.35 1017.47 1047.01 1089.90 1019.14 1019.10 1019.38 1018.89 1019.45 1019.07 1018.99 1019.24 1019.78 1019.36 1019.71 1019.50 1019.67 1019.71 1019.94 1020.53 1020.88 1022.48 1023.93 1026.07 1056.13 1099.30 1027.74 1027.51 1027.87 1027.44 1027.97 1027.59 1027.60 1027.78 1028.27 1027.76 1028.32 1027.98 1028.32 1028.31 1028.60 1029.04 1029.43 1031.16 1032.42 1034.53 1065.17 1108.85 1036.30 1036.00 1036.40 1035.94 1036.44 1036.17 1036.11 1036.24 1036.92 1036.28 1036.86 1036.53 1036.73 1036.82 1037.15 1037.65 1037.97 1039.57 1041.06 1043.16 1074.20 1118.28 1044.78 1044.58 1044.80 1044.48 1044.97 1044.68 1044.70 1044.77 1045.52 1044.63 1045.37 1045.11 1045.34 1045.40 1045.71 1046.34 1046.38 1048.15 1049.64 1051.75 1083.35 1127.75 1053.36 1053.09 1053.37 1052.93 1053.53 1053.23 1053.16 1053.35 1053.87 1053.16 1053.94 1053.63 1053.85 1053.94 1054.14 1054.85 1054.84 1056.74 1058.20 1060.28 1092.33 1137.29 Figure 2: Sojourn times (above) and departure times (below) as a function of the group and the tee interval for a golf course with P3 holes (without the wave-up rule) in the base course. 14