data/nist/Rat42.dat - ceres-solver - Git at Google

 NIST/ITL StRD
 Dataset Name:  Rat42             (Rat42.dat)

 File Format:   ASCII
                Starting Values   (lines 41 to 43)
                Certified Values  (lines 41 to 48)
                Data              (lines 61 to 69)

 Procedure:     Nonlinear Least Squares Regression

 Description:   This model and data are an example of fitting
                sigmoidal growth curves taken from Ratkowsky (1983).
                The response variable is pasture yield, and the
                predictor variable is growing time.


 Reference:     Ratkowsky, D.A. (1983).
                Nonlinear Regression Modeling.
                New York, NY:  Marcel Dekker, pp. 61 and 88.


 Data:          1 Response  (y = pasture yield)
                1 Predictor (x = growing time)
                9 Observations
                Higher Level of Difficulty
                Observed Data

 Model:         Exponential Class
                3 Parameters (b1 to b3)

                y = b1 / (1+exp[b2-b3*x])  +  e


           Starting Values                  Certified Values

         Start 1     Start 2           Parameter     Standard Deviation
   b1 =   100         75            7.2462237576E+01  1.7340283401E+00
   b2 =     1          2.5          2.6180768402E+00  8.8295217536E-02
   b3 =     0.1        0.07         6.7359200066E-02  3.4465663377E-03

 Residual Sum of Squares:                    8.0565229338E+00
 Residual Standard Deviation:                1.1587725499E+00
 Degrees of Freedom:                                6
 Number of Observations:                            9


 Data:   y              x
        8.930E0        9.000E0
       10.800E0       14.000E0
       18.590E0       21.000E0
       22.330E0       28.000E0
       39.350E0       42.000E0
       56.110E0       57.000E0
       61.730E0       63.000E0
       64.620E0       70.000E0
       67.080E0       79.000E0
	NIST/ITL StRD
	Dataset Name: Rat42 (Rat42.dat)

	File Format: ASCII
	Starting Values (lines 41 to 43)
	Certified Values (lines 41 to 48)
	Data (lines 61 to 69)

	Procedure: Nonlinear Least Squares Regression

	Description: This model and data are an example of fitting
	sigmoidal growth curves taken from Ratkowsky (1983).
	The response variable is pasture yield, and the
	predictor variable is growing time.


	Reference: Ratkowsky, D.A. (1983).
	Nonlinear Regression Modeling.
	New York, NY: Marcel Dekker, pp. 61 and 88.





	Data: 1 Response (y = pasture yield)
	1 Predictor (x = growing time)
	9 Observations
	Higher Level of Difficulty
	Observed Data

	Model: Exponential Class
	3 Parameters (b1 to b3)

	y = b1 / (1+exp[b2-b3*x]) + e



	Starting Values Certified Values

	Start 1 Start 2 Parameter Standard Deviation
	b1 = 100 75 7.2462237576E+01 1.7340283401E+00
	b2 = 1 2.5 2.6180768402E+00 8.8295217536E-02
	b3 = 0.1 0.07 6.7359200066E-02 3.4465663377E-03

	Residual Sum of Squares: 8.0565229338E+00
	Residual Standard Deviation: 1.1587725499E+00
	Degrees of Freedom: 6
	Number of Observations: 9











	Data: y x
	8.930E0 9.000E0
	10.800E0 14.000E0
	18.590E0 21.000E0
	22.330E0 28.000E0
	39.350E0 42.000E0
	56.110E0 57.000E0
	61.730E0 63.000E0
	64.620E0 70.000E0
	67.080E0 79.000E0