第二章 简单线性回归模型 2.1
(1) ①首先分析人均寿命与人均GDP的数量关系,用Eviews分析: Dependent Variable: Y Method: Least Squares Date: 12/27/14 Time: 21:00 Sample: 1 22 Included observations: 22 Variable Coefficient Std. Error t-Statistic Prob. C 56.64794 1.960820 28.88992 0.0000 X1 0.128360 0.027242 4.711834 0.0001 R-squared 0.526082 Mean dependent var 62.50000 Adjusted R-squared 0.502386 S.D. dependent var 10.08889 S.E. of regression 7.116881 Akaike info criterion 6.849324 Sum squared resid 1013.000 Schwarz criterion 6.948510 Log likelihood -73.34257 Hannan-Quinn criter. 6.872689 F-statistic 22.20138 Durbin-Watson stat 0.629074 Prob(F-statistic) 0.000134 有上可知,关系式为y=56.64794+0.128360x1 ②关于人均寿命与成人识字率的关系,用Eviews分析如下:
Dependent Variable: Y Method: Least Squares Date: 11/26/14 Time: 21:10 Sample: 1 22 Included observations: 22 Variable Coefficient Std. Error t-Statistic Prob. C 38.79424 3.532079 10.98340 0.0000 X2 0.331971 0.046656 7.115308 0.0000 R-squared 0.716825 Mean dependent var 62.50000 Adjusted R-squared 0.702666 S.D. dependent var 10.08889 S.E. of regression 5.501306 Akaike info criterion 6.334356 Sum squared resid 605.2873 Schwarz criterion 6.433542 Log likelihood -67.67792 Hannan-Quinn criter. 6.357721 F-statistic 50.62761 Durbin-Watson stat 1.846406 Prob(F-statistic) 0.000001 由上可知,关系式为y=38.79424+0.331971x2
③关于人均寿命与一岁儿童疫苗接种率的关系,用Eviews分析如下:Dependent Variable: Y Method: Least Squares Date: 11/26/14 Time: 21:14 Sample: 1 22
Included observations: 22 Variable Coefficient Std. Error t-Statistic Prob. C 31.79956 6.536434 4.864971 0.0001
X3 0.387276 0.080260 4.825285 0.0001 R-squared 0.537929 Mean dependent var 62.50000 Adjusted R-squared 0.514825 S.D. dependent var 10.08889 S.E. of regression 7.027364 Akaike info criterion 6.824009 Sum squared resid 987.6770 Schwarz criterion 6.923194 Log likelihood -73.06409 Hannan-Quinn criter. 6.847374 F-statistic 23.28338 Durbin-Watson stat 0.952555
Prob(F-statistic) 0.000103 由上可知,关系式为y=31.79956+0.387276x3
(2)①关于人均寿命与人均GDP模型,由上可知,可决系数为0.526082,说明所建模型整体上对样本数据拟合较好。
对于回归系数的t检验:t(β1)=4.711834>t0.025(20)=2.086,对斜率系数的显著性检验表明,人均GDP对人均寿命有显著影响。
②关于人均寿命与成人识字率模型,由上可知,可决系数为0.716825,说明所建模型整体上对样本数据拟合较好。
对于回归系数的t检验:t(β2)=7.115308>t0.025(20)=2.086,对斜率系数的显著性检验表明,成人识字率对人均寿命有显著影响。
③关于人均寿命与一岁儿童疫苗的模型,由上可知,可决系数为0.537929,说明所建模型整体上对样本数据拟合较好。
对于回归系数的t检验:t(β3)=4.825285>t0.025(20)=2.086,对斜率系数的显著性检验表明,一岁儿童疫苗接种率对人均寿命有显著影响。 2.2
(1)
①对于浙江省预算收入与全省生产总值的模型,用Eviews分析结果如下: Dependent Variable: Y
Method: Least Squares Date: 12/03/14 Time: 17:00 Sample (adjusted): 1 33
Included observations: 33 after adjustments Variable Coefficient Std. Error t-Statistic Prob. X 0.176124 0.004072 43.25639 0.0000
C -154.3063 39.08196 -3.948274 0.0004 R-squared 0.983702 Mean dependent var 902.5148 Adjusted R-squared 0.983177 S.D. dependent var 1351.009 S.E. of regression 175.2325 Akaike info criterion 13.22880 Sum squared resid 951899.7 Schwarz criterion 13.31949 Log likelihood -216.2751 Hannan-Quinn criter. 13.25931 F-statistic 1871.115 Durbin-Watson stat 0.100021 Prob(F-statistic) 0.000000
②由上可知,模型的参数:斜率系数0.176124,截距为—154.3063
③关于浙江省财政预算收入与全省生产总值的模型,检验模型的显著性: 1)可决系数为0.983702,说明所建模型整体上对样本数据拟合较好。
2)对于回归系数的t检验:t(β2)=43.25639>t0.025(31)=2.0395,对斜率系数的显著性检验表明,全省生产总值对财政预算总收入有显著影响。 ④用规范形式写出检验结果如下: Y=0.176124X—154.3063 (0.004072) (39.08196)
t= (43.25639) (-3.948274) R2=0.983702 F=1871.115 n=33
⑤经济意义是:全省生产总值每增加1亿元,财政预算总收入增加0.176124亿元。 (2)当x=32000时,
①进行点预测,由上可知Y=0.176124X—154.3063,代入可得: Y= Y=0.176124*32000—154.3063=5481.6617 ②进行区间预测:
先由Eviews分析:
由上表可知,
∑x2=∑(Xi—X)2=δ2x(n—1)= 7608.0212 x (33—1)=1852223.473 (Xf—X)2=(32000— 6000.441)2=675977068.2 当Xf=32000时,将相关数据代入计算得到:
5481.6617—2.0395x175.2325x√1/33+1852223.473/675977068.2≤ Yf≤5481.6617+2.0395x175.2325x√1/33+1852223.473/675977068.2 即Yf的置信区间为(5481.6617—64.9649, 5481.6617+64.9649)
(3) 对于浙江省预算收入对数与全省生产总值对数的模型,由Eviews分析结果如下: Dependent Variable: LNY Method: Least Squares Date: 12/03/14 Time: 18:00 Sample (adjusted): 1 33
Included observations: 33 after adjustments Variable Coefficient Std. Error t-Statistic Prob. LNX 0.980275 0.034296 28.58268 0.0000 C -1.918289 0.268213 -7.152121 0.0000
R-squared 0.963442 Mean dependent var 5.573120
Adjusted R-squared 0.962263 S.D. dependent var 1.684189 S.E. of regression 0.327172 Akaike info criterion 0.662028 Sum squared resid 3.318281 Schwarz criterion 0.752726 Log likelihood -8.923468 Hannan-Quinn criter. 0.692545 F-statistic 816.9699 Durbin-Watson stat 0.096208 Prob(F-statistic) 0.000000
①模型方程为:lnY=0.980275lnX-1.918289②由上可知,模型的参数:斜率系数为0.980275,截距为-1.918289
③关于浙江省财政预算收入与全省生产总值的模型,检验其显著性: 1)可决系数为0.963442,说明所建模型整体上对样本数据拟合较好。
2)对于回归系数的t检验:t(β2)=28.58268>t0.025(31)=2.0395,对斜率系数的显著性检验表明,全省生产总值对财政预算总收入有显著影响。
④经济意义:全省生产总值每增长1%,财政预算总收入增长0.980275% 2.4
(1)对建筑面积与建造单位成本模型,用Eviews分析结果如下: Dependent Variable: Y Method: Least Squares Date: 12/01/14 Time: 12:40 Sample: 1 12
Included observations: 12 Variable Coefficient Std. Error t-Statistic Prob. X -64.18400 4.809828 -13.34434 0.0000
C 1845.475 19.26446 95.79688 0.0000 R-squared 0.946829 Mean dependent var 1619.333 Adjusted R-squared 0.941512 S.D. dependent var 131.2252 S.E. of regression 31.73600 Akaike info criterion 9.903792 Sum squared resid 10071.74 Schwarz criterion 9.984610 Log likelihood -57.42275 Hannan-Quinn criter. 9.873871 F-statistic 178.0715 Durbin-Watson stat 1.172407
Prob(F-statistic) 0.000000 由上可得:建筑面积与建造成本的回归方程为: Y=1845.475--64.18400X
(2)经济意义:建筑面积每增加1万平方米,建筑单位成本每平方米减少64.18400元。 (3)
①首先进行点预测,由Y=1845.475--64.18400X得,当x=4.5,y=1556.647
②再进行区间估计:
由上表可知,
∑x2=∑(Xi—X)2=δ2x(n—1)= 1.9894192 x (12—1)=43.5357 (Xf—X)2=(4.5— 3.523333)2=0.95387843
当Xf=4.5时,将相关数据代入计算得到:
1556.647—2.228x31.73600x√1/12+43.5357/0.95387843≤ Yf≤1556.647+2.228x31.73600x√1/12+43.5357/0.95387843
即Yf的置信区间为(1556.647—478.1231, 1556.647+478.1231) 3.1
(1)对百户拥有家用汽车量建立计量经济模型,用Eviews分析如下: ??Dependent Variable: Y Method: Least Squares Date: 05/24/15 Time: 22:28 Sample: 1 31 Included observations: 31
C 246.8540 51.97500 4.749476 0.0001 X2 5.996865 1.406058 4.265020 0.0002 X3 -0.524027 0.179280 -2.922950 0.0069 X4 -2.265680 0.518837 -4.366842 0.0002 R-squared 0.666062 Mean dependent var 16.77355
Adjusted R-squared 0.628957 S.D. dependent var 8.252535 S.E. of regression 5.026889 Akaike info criterion 6.187394 Sum squared resid 682.2795 Schwarz criterion 6.372424 Log likelihood -91.90460 Hannan-Quinn criter. 6.247709 F-statistic 17.95108 Durbin-Watson stat 1.147253 Prob(F-statistic) 0.000001
得到模型为
Y=246.8540+5.996865X2—0.524027X3—2.265680X4 对模型进行检验
1)可决系数是0.666062,修正的可决系数为0.628957,说明模型对样本拟合较好 2)F检验,F=17.95108>F(3.27)=3.65,回归方程显著。 3)t检验,t统计量分别为4.749476,4.265050,-2.922950,-4.366843,均大于t(27)=2,0518,所以这些系数都是显著的。 依据
1)可决系数越大,说明拟合程度越好
2)F的值与临界值比较,若大于临界值,则否定原假设,回归方程是显著的;若小于临界值,则接受原假设,回归方程不显著。
3)t的值与临界值比较,若大于临界值,则否定原假设,系数都是显著的;若小于临界值,则接受原假设,系数不显著。
(2)经济意义:人均GDP增加一万元,百户拥有家用汽车增加5.996865辆,城镇人口比重增加一个百分点,百户拥有家用汽车减少0.524047辆,交通工具消费价格指数每上升1,百户拥有家用汽车减少2.265680辆。
(3)模型改进:收集其他年份的截面数据进行分析 3.2
(1)对出口货物总额计量经济模型,用Eviews分析结果如下:: Dependent Variable: Y Method: Least Squares Date: 12/01/14 Time: 20:25 Sample: 1994 2011
Included observations: 18 Variable Coefficient Std. Error t-Statistic Prob. X2 0.135474 0.012799 10.58454 0.0000
X3 18.85348 9.776181 1.928512 0.0729
C -18231.58 8638.216 -2.110573 0.0520 R-squared 0.985838 Mean dependent var 6619.191 Adjusted R-squared 0.983950 S.D. dependent var 5767.152 S.E. of regression 730.6306 Akaike info criterion 16.17670 Sum squared resid 8007316. Schwarz criterion 16.32510 Log likelihood -142.5903 Hannan-Quinn criter. 16.19717 F-statistic 522.0976 Durbin-Watson stat 1.173432 Prob(F-statistic) 0.000000 ①由上可知,模型为: Y = 0.135474X2 + 18.85348X3 - 18231.58 ②对模型进行检验:
1)可决系数是0.985838,修正的可决系数为0.983950,说明模型对样本拟合较好 2)F检验,F=522.0976>F(2,15)=4.77,回归方程显著
计量经济学第三版庞皓课后习题答案
