Wednesday, July 31, 2019
Analysis of Environmental Issues and Economic Performance
Analysis of environmental issues and economic performance and population density Executive summary The main goal with the report was to analyse the relationship from 16 different countries on how, if any, CO2 emission per capita is getting affected by population density and GDP per capita by using descriptive statistics and regression. The conclusion is that CO2 emission per capita is affected by changes in GDP per capita and that population density has no significant relation to CO2 emission per capita. Introduction Global warming is one of the biggest problems in the international societies today.The politician keeps discussing how they can find solutions together to decrease the CO2 emissions worldwide. In this report we will try to examine if well-established countries have a higher CO2 emissions and we will examine how population density are affecting emission in our society today. Aim The aim with this report is first to examine the relationship with GDP per capita and CO2 emis sion and population density and CO2 emission. Then we will examine if high GDP per capita leads to higher CO2 emission per capita and if countries with low population density are polluting more than countries with high population density.Hypothesis 1. 1 I believe that a country with high GDP are more likely to have a higher CO2 emission per capita since a country with high GDP are more likely to have higher productivity achieved through higher energy use. We will then start with measuring the linear association between these variables. H0: ? 0 1 GDP? 0 (Correlation) H1: ? 0=? 1 GDP=0 (No correlation) Hypothesis 1. 2 I believe that a country with high population density are more likely to have a lower CO2 emission per capita since the inhabitants need travel shorter and less often.We will therefor measure the linear association for CO2 emission per capita and population density. H0: ? 0 2 pop. density? 0 (Correlation) H1: ? 0=? 2 pop. density=0 (No correlation) Main hypothesis We wan t to find out how much linear association the two variables has on CO2 per capita. This can be done with this model: CO2per capita = ? 0+ ? 1 GDP+? 2 pop. density+ ? H0: ? 1 GDP? 0 H1: ? 1 GDP=0 H0: ? 2 pop. density? 0 H1: ? 2 pop. density=0 We can then see how strong the association these two variables are against the dependent variable CO2 emission per capita. Further on we want to test the significance of these variables.Data and descriptive statistics The data (GDP per capita, CO2 per capita and population density) in this report is a sample of 16 different countries and are downloaded from the International Monetary Fund, US department of Energy and OECD. All the data are ratio scale and are continuous. Some potential problems with the associated data is: * Some countries may have a high productivity achieved by the efficient labour force and not trough higher energy use. Both ways of high productivity leads to higher GDP per capita, its unlikely to achieve it by efficient labo ur force, but it can occur. Some countries (e. g. Australia) may have low population density although they mainly have big populated cities since they have a large amount of landmass that is not suitable for life. * The different data is not from the same years. CO2 emission per capita is from 2004, population density is from various years and GDP per capita is from 2010. To get an idea of how the dataset looks like we need to use descriptive analysis. Mean: x=xn Median: x=n+12th S. D: sx=x2-nx2n-1 Sample variance: s2=x2-nx2n-1 Range=xh-xlFor Co2 per capita the mean is 9,285 and the median is 9,49, this will suggest that the data is normally distributed and we can see in the graph in the appendix that there are 8 countries on each side of the mean. The skewness is 0,71, since the number is positive it will imply that Co2 emission per capita is slightly skewed to the right. The mean (26226) and median (27407) for GDP per capita show that this data is normally distributed as well. We can also here see that there are 8 countries on both side of the mean. The skewness for GDP per capita is close to zero (0,08) and therefor the distribution is close to symmetric.For population density we have 10 countries underneath the mean. This will imply that the data is not perfectly normally distributed. We can also see that mean (151) and the median (118) differs a bit too much too be normally distributed. Since the mean is higher than the media it suggest that the mean is affected by the high extreme values in the distribution like South Korea. The skewness for population density is 0,94, this show that the distribution is skewed to the right. It is important to remember that the data sample is less than 30 and therefor it makes it difficult to determine if the data is normally distributed or not.In all the 3 different dataââ¬â¢s we see that the range is high, this is due extreme values on both sides of the mean (countries in totally different stages when it comes to wea lth, industry, population, size and general development). The high spread within the distribution will therefor lead to and high S. D, itââ¬â¢s also important to notice that the sample is relative small and will not give a totally correct picture. Correlation First we will start with to calculate the Pearson correlation coefficient to measure the linear association between the two variables in hypothesis 1. 1 and 1. 2.After that we will test the significant of the correlation coefficient. The reason we will use the Pearson correlation coefficient instead of Spearman correlation coefficient is that the data are continuous and in ratio scale. sx=x2-nx2n-1 sy=y2-ny2n-1 sxy=i=1n(xi-x)(yi-y)n-1 rxy= sxysxsy t=r1-r2n-2~tn-2 For the calculation see table 1 and 2 in the appendix. The table and the graph 1. 1 show that there is a strong relationship between Co2 emission per capita and GDP (0,7319). In graph 1,2 and the table we see that Co2 and population density have a weak negative corr elation (-0,3118).Further on we will need to use a t-test in order to determine the significant of the correlation coefficient and to find out if we are going to keep or reject our hypothesis 1. 1 and 1. 2. critical value of t: t(n-2,? 2)=t(14,0. 25)=à ±2,145 (with 95% confidence interval) The t value in the table shows that there is a significant relationship between Co2 emission per capita and GDP since 2,145
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