Change Analysis

Introduction

This document presents change analysis of a GRTS survey design. The resource employed in the analysis is rivers and streams in the 48 contiguous United States. Data was obtained from two surveys conducted by the U.S. Environmental Protection Agency: (1) the Wadeable Streams Assessment (WSA) in 2004 (U.S. Environmental Protection Agency 2006) and (2) the National Rivers and Streams Survey (NRSA) in 2008 and 2009 (U.S. Environmental Protection Agency 2016). Change analysis measures the difference between response variables that were estimated in two surveys. Both continuous and categorical response variables can be employed for change analysis. For a categorical response variable, change is estimated by the difference in category estimates for the two surveys, where a category estimate is the estimated proportion of values in a category. Note that a separate change estimate is calculated for each category of a categorical response variable. For a continuous response variable, change can be estimated for the mean, the median, or for both the mean and median. For a continuous response variable using the mean, change is estimated by the difference in estimated mean values for the two surveys. For change estimates using the median, the first step is to calculate an estimate of the median for the first survey. The estimated median from the first survey is then used to define two categories: (1) values that are less than or equal to the estimated median and (2) values that are greater than the estimated median. Once the categories are defined, change analysis for the median is identical to change analysis for a categorical variable, i.e., change is estimated by the difference in category estimates for the two surveys.

Preliminaries

The initial step is to use the library function to load the spsurvey package. After the package is loaded, a message is printed to the R console indicating that the spsurvey package was loaded successfully.

library(spsurvey)
library(sf)

Load the survey design and analytical variables data set

The original data file contains more than 2,400 records for change estimation. To produce a more manageable number of records, rivers and streams located in the Western Mountains Level III Ecoregion (Omernik 1987) were retained in the data that will be analyzed, which produced a data set containing 668 records.

The next step is to load the data set, which includes both survey design variables and analytical variables. The data function is used to load the data set and assign it to a data frame named NRSA_2009. The nrow function is used to determine the number of rows in the NRSA_2009 data frame, and the resulting value is assigned to an object named nr. Finally, the initial six lines and the final six lines in the NRSA_2009 data frame are printed using the head and tail functions, respectively.

Load the survey design and analytical variables data set

data(NRSA_2009)
nr <- nrow(NRSA_2009)

Display the initial six lines in the data file:

head(NRSA_2009)
#>        siteID   xcoord  ycoord       wgt Survey Revisit_Site Stream_Size NTL
#> 1 WAZP99-0833 -1369578 1345072  17.17660    WSA            Y       Small 119
#> 2 WAZP99-0545 -1221990 1291197  17.17660    WSA            Y       Small 324
#> 3 WAZP99-0687 -1231441 1275327  13.70593    WSA            Y       Small  55
#> 4 WCAP99-0991 -2038942 2002946 572.18276    WSA            Y       Small  55
#> 5 WCAP99-0587 -2264511 2285650 100.41211    WSA            Y       Small 509
#> 6 WCAP99-0503 -2035060 1880456 457.74621    WSA            Y       Small  63
#>   PTL Benthic_MMI NTL_Cond PTL_Cond Benthic_MMI_Cond
#> 1   8    46.78965     Good     Good             Fair
#> 2  92    27.15364     Poor     Poor             Poor
#> 3  39    19.12938     Good     Fair             Poor
#> 4   2    61.76663     Good     Good             Good
#> 5  27    49.32376     Poor     Fair             Fair
#> 6   1    68.57991     Good     Good             Good

Display the final six lines in the data file:

tail(NRSA_2009)
#>        siteID     xcoord  ycoord       wgt Survey Revisit_Site Stream_Size NTL
#> 663 FW08WY041  -868099.9 2401874 1543.3105   NRSA            N       Small 452
#> 664 FW08WY042  -688555.9 2408900  171.6259   NRSA            N       Large 343
#> 665 FW08WY081 -1113106.7 2377400 4876.7431   NRSA            N       Small 301
#> 666 FW08WY085 -1079717.5 2471045  936.4642   NRSA            N       Small  34
#> 667 FW08WY089  -900074.7 2444794 1543.3105   NRSA            N       Small 124
#> 668 FW08WY092 -1181999.6 2221639 1543.3105   NRSA            N       Small 540
#>          PTL Benthic_MMI NTL_Cond PTL_Cond Benthic_MMI_Cond
#> 663  48.4950       28.72     Poor     Poor             Poor
#> 664  13.3113        4.90     Poor     Good             Poor
#> 665  69.6469       38.50     Poor     Poor             Fair
#> 666  58.7781       44.43     Good     Poor             Fair
#> 667  45.3413       17.83     Good     Poor             Poor
#> 668 191.2206       10.92     Poor     Poor             Poor

The location of rivers and streams that were sampled in the Western Mountains Ecoregion is displayed below. The sample sites are displayed using a unique color for each survey.

Change Analysis

Change analysis will be investigated by examining three continuous response variables and three categorical response variables. The continuous response variables are total phosphorus concentration, total nitrogen concentration, and benthic macroinvertebrate multimetric index (MMI) score. The categorical response variables are condition class variables for each of the continuous response variables. Condition classes are created by grouping values for a continuous response variable into categories that reflect the impact of a response value on the overall ecological condition of a site. Categories used for condition classes are: “Good”, “Fair” and “Poor”.

The change.analysis function will be used to calculate change estimates. Six data frames constitute the primary input to the change.analysis function. The site ID provides the unique identifier for each sample site and is used to connect records among the data frames. The siteID variable in the NRSA_2009 data frame is assigned to the siteID variable (or variables in one case) in the data frames. The six data frames that will be created are named as follows: sites, repeats, subpop, design, data.cat, and data.cont. In order to obtain change estimates for the continuous variables using both the mean and median, the test argument of the change.analysis function is assigned the following value: c(“mean”, “median”). Note that the default value for the test argument is “mean”.

The sites data frame identifies sites to use in the analysis and contains three variables: (1) siteID - site ID values, (2) Survey1 - a logical vector identifying sites for survey one, and (3) Survey2 - a logical vector identifying sites for survey two. The Survey1 variable is created by assigning the value TRUE to every site for which the Survey variable in the NRSA_2009 data frame equals the value “WSA”. Similarly, the Survey2 variable is created by assigning the value TRUE to every site for which the Survey variable in the NRSA_2009 data frame equals the value “NRSA”.

The repeats data frame identifies repeat visit sites and contains two variables: (1) siteID_1 - the site ID value for survey one and (2) siteID_2 - the site ID value for survey two. The siteID_1 variable is created by selecting values of the siteID variable in the NRSA_2009 data frame for which the the Survey variable in the NRSA_2009 data frame equals the value “WSA” and the Revisit_Site variable in the NRSA_2009 data frame equals “Y”. The siteID_2 variable is created using an analogous process. For each row of the repeats data frame, the two site ID values must correspond to the same site. Note that the NRSA_2009 data frame has been organized so that repeat visit sites for WSA occur in the same order as repeat visit sites for NRSA.

The subpop data frame defines populations and, optionally, subpopulations for which estimates are desired. Unlike the sites and design data frames, the subpop data frame can contain an arbitrary number of columns. The first variable in the subpop data frame identifies site ID values and each subsequent variable identifies a type of population, where the variable name is used to identify type. A type variable identifies each site with a character value. If the number of unique values for a type variable is greater than one, then the set of values represent subpopulations of that type. When a type variable consists of a single unique value, then the type does not contain subpopulations. For this analysis, the subpop data frame contains three variables: (1) siteID - site ID values, (2) Western_Mountains - which will be used to calculate estimates for all of the sample sites combined, and (3) Stream_Size - which will be used to calculate estimates for each of the two classes of stream size (large and small). The rep (repeat) function is used to assign values to the Western_Mountains variable in the subpop data frame, and the Stream_Size variable in the NRSA_2009 data frame is assigned to the Stream_Size variable in the subpop data frame. Recall that nr, which is included in the call to the rep function, is an object containing the number of rows in the NRSA_2009 data frame.

The design data frame consists of survey design variables. For the analysis under consideration, the design data frame contains the following variables: (1) siteID - site ID values; (2) wgt - survey design weights; (3) xcoord - x-coordinates for location; and (4) ycoord - y-coordinates for location. The wgt, xcoord, and ycoord variables in the design data frame are assigned values using variables with the same names in the NRSA_2009 data frame.

The final two data frames, data.cat and data.cont, provide values of categorical response variables and continuous response variables, respectively. Like the subpop data frame, the data.cat and data.cont data frames can contain an arbitrary number of columns. The first variable in the data.cat data frame identifies site ID values and each subsequent variable identifies a categorical response response variable. For this analysis, the categorical response variables are Nitrogen_Condition, Phosphorus_Condition, and Benthic_MMI_Condition, which are assigned, respectively, variables NTL_cond, PTL_cond, and Benthic_MMI_cond in the NRSA_2009 data frame. For benthic MMI score, there are four sites (three in WSA and one in NRSA) for which the MMI score could not be calculated. Those sites are coded as NA for the Benthic_MMI variable and as category “Not Assessed” for the Benthic_MMI_cond variable.

The data.cont data frame is organized analogous to the data.cat data frame. The first variable in the data frame identifies site ID values and each subsequent variable identifies a continuous response response variable. For this analysis, the continuous response variables are Log_Total_Nitrogen, Log_Total_Phosphorus, and Benthic_MMI, which are assigned, respectively, variables NTL, PTL, and Benthic_MMI in the NRSA_2009 data frame. Note that total nitrogen and total phosphorus are analyzed using the base ten log scale, which are created by use of the log10 function.

Create the sites data frame:

sites <- data.frame(siteID=NRSA_2009$siteID, Survey1=NRSA_2009$Survey == "WSA",
Survey2=NRSA_2009$Survey == "NRSA") Create the repeats data frame: repeats <- data.frame(siteID_1=NRSA_2009$siteID[NRSA_2009$Survey == "WSA" & NRSA_2009$Revisit_Site == "Y"], siteID_2=NRSA_2009$siteID[NRSA_2009$Survey == "NRSA" & NRSA_2009$Revisit_Site == "Y"]) Create the subpop data frame: subpop <- data.frame(siteID=NRSA_2009$siteID, Western_Mountains=rep("Western Mountains", nr), Stream_Size=NRSA_2009$Stream_Size) Create the design data frame: design <- data.frame(siteID=NRSA_2009$siteID,
wgt=NRSA_2009$wgt, xcoord=NRSA_2009$xcoord,
ycoord=NRSA_2009$ycoord) Create the data.cat data frame: data.cat <- data.frame(siteID=NRSA_2009$siteID,
Nitrogen_Condition=NRSA_2009$NTL_Cond, Phosphorus_Condition=NRSA_2009$PTL_Cond,
Benthic_MMI_Condition=NRSA_2009$Benthic_MMI_Cond) Create the data.cont data frame: data.cont <- data.frame(siteID=NRSA_2009$siteID,
Log_Total_Phosphorus=log10(NRSA_2009$PTL+1), Log_Total_Nitrogen=log10(NRSA_2009$NTL+1),
Benthic_MMI=NRSA_2009$Benthic_MMI) Calculate change estimates: Change_Estimates <- change.analysis(sites, repeats, subpop, design, data.cat, data.cont, test=c("mean", "median")) #> During execution of the program, 37 warning messages were generated. The warning #> messages are stored in a data frame named 'warn.df'. Enter the following #> command to view the warning messages: warnprnt() #> To view a subset of the warning messages (say, messages number 1, 3, and 5), #> enter the following command: warnprnt(m=c(1,3,5)) Like other functions in the spsurvey package, the change.analysis function generates warning messages when certain situations are encountered in the data. When warning messages are generated, the functions print a message to the R console window stating the number of warning messages and explaining the procedure for recovering the messages. The call to the change.analysis function generated thirty-seven warning messages. These messages fall into two categories: (1) cases where the number of repeat visit sites was less than two and (2) cases where a category level was not present among the repeat visit sites in one of the surveys. For both cases, covariance among the revisited sites was not included in calculation of the standard error estimate. The warnprnt function is used to display two of the warning messages. warnprnt(m = c(1, 3)) #> Warning Message 1 #> Function: change.est #> Population Type: Stream_Size #> Subpopulation: Large #> Indicator: Nitrogen_Condition #> Warning: The number of nonmissing repeat visit sites was less than two in one of the #> surveys. #> Action: Covariance among the revisited sites was not included in calculation of #> the standard error estimate. #> #> Warning Message 3 #> Function: changevar.prop #> Population Type: Western_Mountains #> Subpopulation: Western Mountains #> Indicator: Benthic_MMI_Condition #> Warning: Category level "Not Assessed" was not present among the repeat visit sites #> in one of the surveys. #> Action: Covariance among the repeat visit sites was not included in calculation of #> the standard error estimate. #>  The change estimates are displayed using the print function. For categorical response variables and continuous response variables using the median, change estimates are printed for the complete set of sites only. For continuous response variables using the mean, all change estimates are printed. The object produced by change.analysis is a list composed of three data frames. The first data frame, named catsum, contains estimates for categorical response variables. The second data frame, named contsum_mean, contains estimates for continuous response variables using the mean. The third data frame, named contsum_median, contains estimates for continuous response variables using the median. The catsum and contsum_median data frames will be described first. The initial four columns in those data frames identify the population (Type), subpopulation (Subpopulation), response variable (Indicator), and category of the response variable (Category). The next four columns provide results for change estimates using the percent scale: the change estimate (DiffEst.P), standard error of the estimate (StdError.P), lower confidence bound (LCB95Pct.P), and upper confidence bound (UCB95Pct.P). Argument conf for change.analysis allows control of the confidence bound level. The default value for conf is 95, hence the column names for confidence bounds contain the value 95. Supplying a different value to the conf argument will be reflected in the confidence bound names. Confidence bounds are obtained using the standard error and the Normal distribution multiplier corresponding to the confidence level. The next four columns provide results for change estimates using the size (units scale): the change estimate (DiffEst.U), standard error of the estimate (StdError.U), lower confidence bound (LCB95Pct.U), and upper confidence bound (UCB95Pct.U). For this data, the units are kilometers of stream length. The next nine columns provide estimates for survey one: the first column is the number of response values for a category (NResp); the next four columns contain survey one estimates, standard errors, and confidence bounds in the percent scale; and the final four columns contain survey one estimates, standard errors, and confidence bounds in the units scale. The final nine columns of the catsum data frame provide estimates for survey two using the format described for survey one. Description of the contsum_mean data frame follows. The initial four columns in that data frame identify the population (Type), subpopulation (Subpopulation), response variable (Indicator), and statistic employed for the change estmate (Statistic). The Statistic column contains the value “Mean” as a reminder that change estimates for continuous response variable use the mean. The next four columns provide results for the change estimates: the change estimate (DiffEst), standard error of the estimate (StdError), lower confidence bound (LCB95Pct), and upper confidence bound (UCB95Pct). The next five columns provide estimates for survey one: the first column is the number of response values for a category (NResp); the next four columns contain survey one estimates, standard errors, and confidence bounds. The final five columns of the contsum_mean data frame provide estimates for survey two using the format described for survey one. # Print Western Mountains change estimates for categorical variables print(subset(Change_Estimates$catsum, Type == "Western_Mountains"))
#>                 Type     Subpopulation             Indicator     Category
#> 1  Western_Mountains Western Mountains    Nitrogen_Condition         Fair
#> 2  Western_Mountains Western Mountains    Nitrogen_Condition         Good
#> 3  Western_Mountains Western Mountains    Nitrogen_Condition         Poor
#> 10 Western_Mountains Western Mountains  Phosphorus_Condition         Fair
#> 11 Western_Mountains Western Mountains  Phosphorus_Condition         Good
#> 12 Western_Mountains Western Mountains  Phosphorus_Condition         Poor
#> 19 Western_Mountains Western Mountains Benthic_MMI_Condition         Fair
#> 20 Western_Mountains Western Mountains Benthic_MMI_Condition         Good
#> 21 Western_Mountains Western Mountains Benthic_MMI_Condition Not Assessed
#> 22 Western_Mountains Western Mountains Benthic_MMI_Condition         Poor
#>      DiffEst.P StdError.P LCB95Pct.P UCB95Pct.P  DiffEst.U StdError.U
#> 1   -8.5432080   3.810749 -16.012138  -1.074278 -17946.688   8395.978
#> 2    8.0514935   4.619531  -1.002621  17.105608  21684.775  16484.007
#> 3    0.4917145   3.251915  -5.881922   6.865351   2026.684   7167.314
#> 10  -8.0018563   3.842896 -15.533795  -0.469918 -16614.900   8735.346
#> 11 -12.0570460   5.499675 -22.836211  -1.277881 -23754.653  14805.495
#> 12  20.0589023   5.143497   9.977833  30.139972  46134.325  12423.393
#> 19   0.4641174   5.209334  -9.745990  10.674225   2633.944  13136.374
#> 20   3.1916027   5.386772  -7.366276  13.749482  10016.622  13816.453
#> 21  -0.6911747   1.273905  -3.187982   1.805633  -1470.634   2840.759
#> 22  -2.9645454   3.397343  -9.623216   3.694125  -5415.160   7693.388
#>    LCB95Pct.U UCB95Pct.U NResp_1 Estimate.P_1 StdError.P_1 LCB95Pct.P_1
#> 1  -34402.502 -1490.8736     118    23.563946     2.610170     18.44811
#> 2  -10623.285 53992.8360     303    60.554135     2.706990     55.24853
#> 3  -12020.993 16074.3613     101    15.881919     1.646566     12.65471
#> 10 -33735.863   506.0627     119    25.445973     2.796803     19.96434
#> 11 -52772.889  5263.5834     315    60.551675     2.842622     54.98024
#> 12  21784.922 70483.7282      88    14.002353     1.934169     10.21145
#> 19 -23112.877 28380.7644     112    27.497661     2.781613     22.04580
#> 20 -17063.127 37096.3719     262    48.649879     2.801831     43.15839
#> 21  -7038.419  4097.1511       3     1.582266     1.012512      0.00000
#> 22 -20493.924  9663.6033     145    22.270194     2.334555     17.69455
#>    UCB95Pct.P_1 Estimate.U_1 StdError.U_1 LCB95Pct.U_1 UCB95Pct.U_1 NResp_2
#> 1     28.679786    51889.065     5996.625     40135.90    63642.234      30
#> 2     65.859737   133343.431     8129.499    117409.91   149276.957      76
#> 3     19.109130    34972.831     3513.873     28085.77    41859.896      40
#> 10    30.927605    56033.388     6798.708     42708.17    69358.609      34
#> 11    66.123112   133338.013     6904.461    119805.52   146870.509      51
#> 12    17.793254    30833.927     4439.806     22132.07    39535.786      61
#> 19    32.949522    60551.314     6778.412     47265.87    73836.757      29
#> 20    54.141366   107129.625     6320.259     94742.14   119517.106      66
#> 21     3.566754     3484.235     2255.171         0.00     7904.288       1
#> 22    26.845839    49040.154     5477.911     38303.65    59776.661      50
#>    Estimate.P_2 StdError.P_2 LCB95Pct.P_2 UCB95Pct.P_2 Estimate.U_2
#> 1    15.0207384    2.9277034     9.282545     20.75893     33942.38
#> 2    68.6056284    3.9698939    60.824779     76.38648    155028.21
#> 3    16.3736332    2.9533868    10.585102     22.16216     36999.52
#> 10   17.4441164    2.7560875    12.042284     22.84595     39418.49
#> 11   48.4946287    5.0086922    38.677772     58.31148    109583.36
#> 12   34.0612550    4.9066246    24.444447     43.67806     76968.25
#> 19   27.9617781    4.6008866    18.944206     36.97935     63185.26
#> 20   51.8414817    4.7868394    42.459449     61.22351    117146.25
#> 21    0.8910915    0.7730795     0.000000      2.40630      2013.60
#> 22   19.3056487    2.6390704    14.133166     24.47813     43624.99
#>    StdError.U_2 LCB95Pct.U_2 UCB95Pct.U_2
#> 1      6203.537     21783.67    46101.087
#> 2     15236.562    125165.09   184891.320
#> 3      6561.709     24138.80    49860.229
#> 10     5753.495     28141.84    50695.131
#> 11    14240.877     81671.75   137494.966
#> 12    11908.016     53628.97   100307.534
#> 19    11717.757     40218.88    86151.639
#> 20    12850.603     91959.53   142332.968
#> 21     1727.460         0.00     5399.359
#> 22     5751.028     32353.19    54896.801

# Print change estimates for continuous variables using the mean
print(Change_Estimates$contsum_mean) #> Type Subpopulation Indicator Statistic #> 1 Western_Mountains Western Mountains Log_Total_Phosphorus Mean #> 2 Stream_Size Large Log_Total_Phosphorus Mean #> 3 Stream_Size Small Log_Total_Phosphorus Mean #> 4 Western_Mountains Western Mountains Log_Total_Nitrogen Mean #> 5 Stream_Size Large Log_Total_Nitrogen Mean #> 6 Stream_Size Small Log_Total_Nitrogen Mean #> 7 Western_Mountains Western Mountains Benthic_MMI Mean #> 8 Stream_Size Large Benthic_MMI Mean #> 9 Stream_Size Small Benthic_MMI Mean #> DiffEst StdError LCB95Pct UCB95Pct NResp_1 Estimate_1 #> 1 0.28048779 0.05511323 0.1724678 0.38850773 522 1.077315 #> 2 0.06992848 0.16844500 -0.2602176 0.40007461 8 1.592550 #> 3 0.28496217 0.05607767 0.1750520 0.39487238 514 1.067896 #> 4 -0.13898630 0.04683131 -0.2307740 -0.04719862 522 2.095254 #> 5 0.18594596 0.15987119 -0.1273958 0.49928775 8 2.291269 #> 6 -0.14385707 0.04793736 -0.2378126 -0.04990158 514 2.091671 #> 7 0.66121946 1.53852011 -2.3542245 3.67666346 519 49.014131 #> 8 -13.22855538 10.14257203 -33.1076313 6.65052052 8 44.325181 #> 9 0.87835322 1.54413067 -2.1480873 3.90479371 511 49.101251 #> StdError_1 LCB95Pct_1 UCB95Pct_1 NResp_2 Estimate_2 StdError_2 LCB95Pct_2 #> 1 0.02708917 1.024221 1.130409 146 1.357803 0.05122909 1.257396 #> 2 0.15404633 1.290625 1.894475 24 1.662479 0.06814282 1.528921 #> 3 0.02724145 1.014504 1.121289 122 1.352859 0.05216151 1.250624 #> 4 0.01536527 2.065139 2.125369 146 1.956268 0.04603932 1.866032 #> 5 0.14757094 2.002035 2.580503 24 2.477215 0.06149485 2.356687 #> 6 0.01552844 2.061236 2.122106 122 1.947814 0.04702752 1.855641 #> 7 1.03521685 46.985144 51.043119 145 49.675351 1.25700084 47.211675 #> 8 8.86140780 26.957140 61.693221 24 31.096625 4.93429015 21.425594 #> 9 1.04319033 47.056636 51.145866 121 49.979604 1.25059598 47.528481 #> UCB95Pct_2 #> 1 1.458210 #> 2 1.796036 #> 3 1.455093 #> 4 2.046503 #> 5 2.597743 #> 6 2.039986 #> 7 52.139027 #> 8 40.767656 #> 9 52.430727 # Print change estimates for continuous variables using the median print(subset(Change_Estimates$contsum_median, Type == "Western_Mountains"))
#>                 Type     Subpopulation            Indicator            Category
#> 1  Western_Mountains Western Mountains Log_Total_Phosphorus Greater_Than_Median
#> 2  Western_Mountains Western Mountains Log_Total_Phosphorus    Less_Than_Median
#> 7  Western_Mountains Western Mountains   Log_Total_Nitrogen Greater_Than_Median
#> 8  Western_Mountains Western Mountains   Log_Total_Nitrogen    Less_Than_Median
#> 13 Western_Mountains Western Mountains          Benthic_MMI Greater_Than_Median
#> 14 Western_Mountains Western Mountains          Benthic_MMI    Less_Than_Median
#>     DiffEst.P StdError.P LCB95Pct.P UCB95Pct.P   DiffEst.U StdError.U
#> 1   19.993073   5.329139   9.548152  30.437994  48065.0542   15968.94
#> 2  -19.993073   5.329139 -30.437994  -9.548152 -42300.2824   12852.20
#> 7   -9.172204   5.218530 -19.400334   1.055926 -17837.0098   11977.46
#> 8    9.172204   5.218530  -1.055926  19.400334  23601.7816   16267.11
#> 13   1.921212   5.488400  -8.835855  12.678278   7953.6486   14054.77
#> 14  -1.921212   5.488400 -12.678278   8.835855   -718.2427   14693.78
#>    LCB95Pct.U UCB95Pct.U NResp_1 Estimate.P_1 StdError.P_1 LCB95Pct.P_1
#> 1   16766.500  79363.608     270     50.07461     2.796763     44.59306
#> 2  -67490.127 -17110.438     252     49.92539     2.796763     44.44383
#> 7  -41312.402   5638.382     265     50.12217     2.831757     44.57202
#> 8   -8281.173  55484.736     257     49.87783     2.831757     44.32769
#> 13 -19593.202  35500.499     264     50.45979     2.809366     44.95353
#> 14 -29517.523  28081.038     255     49.54021     2.809366     44.03396
#>    UCB95Pct.P_1 Estimate.U_1 StdError.U_1 LCB95Pct.U_1 UCB95Pct.U_1 NResp_2
#> 1      55.55617     110267.0     7655.957     95261.56     125272.4     113
#> 2      55.40694     109938.4     6795.463     96619.50     123257.2      33
#> 7      55.67231     110371.7     6862.229     96921.96     123821.4      80
#> 8      55.42798     109833.6     7717.698     94707.24     124960.1      66
#> 13     55.96604     109357.0     6322.352     96965.42     121748.6      67
#> 14     55.04647     107364.1     7836.067     92005.68     122722.5      78
#>    Estimate.P_2 StdError.P_2 LCB95Pct.P_2 UCB95Pct.P_2 Estimate.U_2
#> 1      70.06769     4.536281     61.17674     78.95863    158332.02
#> 2      29.93231     4.536281     21.04137     38.82326     67638.08
#> 7      40.94996     4.383401     32.35865     49.54127     92534.67
#> 8      59.05004     4.383401     50.45873     67.64135    133435.43
#> 13     52.38100     4.714870     43.14002     61.62197    117310.65
#> 14     47.61900     4.714870     38.37803     56.85998    106645.85
#>    StdError.U_2 LCB95Pct.U_2 UCB95Pct.U_2
#> 1     14014.046    130864.99    185799.04
#> 2     10908.743     46257.34     89018.82
#> 7      9816.791     73294.11    111775.23
#> 8     14319.779    105369.18    161501.68
#> 13    12552.471     92708.26    141913.04
#> 14    12429.933     82283.63    131008.07

The write.csv function is used to store the change estimates as comma-separated value (csv) files. Files in csv format can be read by programs such as Microsoft Excel. The three data frames created by the change.analysis function are stored in separate files.

write.csv(Change_Estimates$catsum, file="Change_Estimates_Categorical.csv", row.names=FALSE) write.csv(Change_Estimates$contsum_mean, file="Change_Estimates_Continuous_Mean.csv", row.names=FALSE)
write.csv(Change_Estimates\$contsum_median, file="Change_Estimates_Continuous_Median.csv", row.names=FALSE)

References

Omernik, J. M. 1987. “Ecoregions of the Conterminous United States.” Annals of the Association of American Geographers 77: 118–25.

U.S. Environmental Protection Agency. 2006. “Wadeable Streams Assessment: A Collaborative Survey of the Nation’s Streams.” U.S. Environmental Protection Agency, Office of Research; Development; Office of Water.

———. 2016. “National Rivers and Streams Assessment 2008-2009: A Collaborative Survey.” U.S. Environmental Protection Agency, Office of Water; Office of Research; Development.