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Statistics Help Desk
Econometrics Assignment Help
Alex Gerg
Statisticshelpdesk
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Econometrics Assignment Help:
About Econometrics Assignment: Statisticshelpdesk
offers online econometrics assignment help in all topics
related to econometrics. Whether its background,
terminology, numericals, our tutors make students grasp the
concepts and understand the topics thoroughly. Our
econometrics assignment help services comprises of all
solution to complex problems associated with econometrics.
Our step by step approach helps students to understand the
solution themselves. We provide econometrics Assignment
help through email where a student can quickly upload his econometrics Homework on our
website and get it done before the due date.
Econometrics Assignment Illustrations and Solutions
Question: 1
Using the scatter diagram method, draw the two regression lines associated with the
following data both separately and jointly.
Variable X
:
Variable Y
:
40
30
50
30
60
50
40
35
45
30
50
40
70
50
50
40
55
35
Solution:
(i) Diagrammatic representation of the regression line of Y on X
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
(ii) Diagrammatic representation of the regression line of X on Y
(iii) Diagrammatic representation of both the regression lines.
From the intersection point of the two regression in the above graph, it must be seen that
the given mean value of X variable is 51 and that of the Y variable is 38 approx. This can be
verified by the algebraic method of arithmetic average as follows:
𝑋 =
𝑋
𝑁
= 460/9 = 51 approx, and
𝑌 =
𝑌
𝑁
= 340/9 = 38 approx.
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
If, we wish to estimate any value of Y for a given value of X, we can do so easily by drawing
a perpendicular from the required value point of the X axis to the point at which it cuts the
regression line of Y on X, and then by drawing a perpendicular there from to Y axis. The
point at which the perpendicular touches the Y axis is the required value of Y axis. The point
at which the perpendicular touches the Y axis is the required value of Y for the given value
of X. Thus, in the above graph it may be seen that when X = 70, Y = 45.
In the similar manner we can estimate the value of X for any value of Y with reference to
the regression line of X and Y. Thus, in the above graph when Y = 20, X = 30.
(b) Method of Least square. This method is development over the scatter diagram
method discussed above in which we face a lot of difficulties in drawing the regression lines
accurately in a free-hand manner.
Under this method we are to draw the lines of best fit as the lines of regression. These, lines
of regression are called the lines of the best fit because, with reference to these lines we
can get the best estimates of the values of one variable for the specified values of the other
variable. Further, this method is called as such because, under this method the sum of the
squares of the deviations between the given values of a variable and its estimated values
given by the concerned line of regression is the least or minimum possible.
Under this method, the line of the best fit for Y on X (i.e., the regression lines of Y on X) is
obtained by finding the value of Y for any two (preferably the extreme ones) values of X
through the following linear equation :
Y = a + bX,
Where a and b are the two constants whose values are to be determined by solving
simultaneously the following two normal equations:
𝑌 = Na + b 𝑋 ….(i)
𝑋𝑌 = a 𝑋 + b 𝑋
2
….(ii)
Where, X and Y represent the given values of the X and Y variables respectively.
Further, the line of the best fit for X on Y (i.e., the regression line of X on Y) is obtained by
finding the values of X for any two (preferably the extreme ones) values of Y through the
following linear equation :
X = a + bY,
where, the values of the two constants a and b are determined by solving simultaneously
the following two normal equations :
𝑋 = Na + b 𝑌 ….(i)
𝑋𝑌 = a 𝑌 + b 𝑌
2
….(ii)
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
As pointed out earlier, in order to determine the value of Y for a given value of X, we will
draw a perpendicular from the given value point of the X axis to the Y axis via the point at
which it cuts the regression line of Y on X. The point at which the Y axis is touched by such
perpendicular will indicate the required value of Y for the given value of X. In the similar
manner, the required value of X for any given value of Y can be determined by drawing a
perpendicular from the concerned point of the Y axis to the X axis via the point at which it
cuts the regression line of X on Y.
Question: 2
Draw the two regression lines for the data given below using the method of least square.
Variable X :
Variable Y :
5
20
10
40
15
30
20
60
25
50
Solution:
Determination of the regression lines by the method of least square
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
X Y X2
Y2
XY
5
10
15
20
25
20
40
30
60
50
25
100
225
400
625
400
1600
900
3600
2500
100
400
450
1200
1250
(i)Regression line of Y on X
This is given by Y = a + bX
where a and b are the two constants which are found by solving simultaneously the two
normal equations as follows:
𝑌 = Na + b 𝑋 ….(i)
𝑋𝑌 = a 𝑋 + b 𝑋
2
….(ii)
Substituting the given values in the above equations we get,
200 = 5a + 75b ….(i)
3400 = 75a + 1375b ….(ii)
Multiplying the eqn. (i) by 15 under the eqn. (iii) and subtracting the same from the eqn.
(ii) we get,
3400 = 75a + 1375b
Thus, (-) 3000 = 75a + 1125b/400 = 250b
b = 400/250 = 1.6
Putting the above value of b in the eqn. (i) we get,
200 = 5a + 75(1.6)
or 5a = 200 – 120
or a = 80/5 = 16.
Thus, a = 16, and b = 1.6
Putting these values in the equation Y = a + bX we get
Y = 16 + 1.6X
With this equation, the estimated values of Y for the two extreme values of X will be :
when X = 5, Y = 16 + 1.6(50 = 24
and when x = 25, Y = 16 + 1.6(25) = 56
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
With these two pairs of values viz. (5, 24) and (25, 56) the regression line of Y on X will be
drawn as under:
(ii) Regression line of X on Y
This is given by X = a + bY
Where a and b are the two constants whose values are determined by solving the two
normal equations as follows :
𝑋 = Na + b 𝑌 ….(i)
𝑋𝑌 = a 𝑌 + b 𝑌2
….(ii)
Substituting the given values in the above equations we get,
75 = 5a + 200b
3400 = 200a + 9000b
Multiplying the eqn. (i) by 40 under the eqn. (iii) and getting the same subtracted from the
eqn. (ii) we get,
3400 = 200a + 90000b
Thus, (-)3000 = 200a + 80000b/400 = 1000b
∴ b = 400/1000 = 0.4
Putting the above value b in the equation (i) we get
75 = 5a + 200(.4)
or 5a = 75 – 80 = -5
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
a = -5/5 = -1.
Hence, a = -1, and b = 0.4
Putting these values in the equation X = a + bY we get
X = -1 + 0.4 Y
With this equation, the estimated values of X for the two extreme values of Y will be :
When Y = 20, X = -1 + 0.4(20) = 7
and When Y = 60, X = -1 + 0.4(60) = 23
With these two pairs of values viz., (20, 7) and (60, 23) the regression line of X on Y will be
drawn as follows :
Regression line of X on Y
When both the regression lines of Y on X, and X on Y will be represented together, the
graph will appear as under:
Regression lines of Y on X, and of X on Y
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
Characteristics of a Straight Line of Regression
The chief characteristics of a straight line of regression fitted by the method of least square
explained as above may be noted as follows :
(i) It goes through the overall Mean of a variable.
(ii) It gives the best fit to the data because the sum of the squared deviations from the
line is smaller than they would be from any other straight line.
(iii)The sum of the positive and negative deviations from this line is zero.
(iv)This line gives the best estimate of the population regression when the data
represent a sample drawn from a large population.
2. Algebraic Method
Under this method the two regression equations are formulated to represent the two
regression lines, or the lines of estimates respectively viz.,
(i) The regression line of X on Y and
(ii) The regression line of Y on X.
To obtain such equations we are to apply any of the following algebraic methods :
(i) Normal equation method.
(ii) Method of deviation from the actual Means ; and
(iii)Method of deviation from the assumed Means.
The procedure of each of the above methods is explained in detail as under :
1. Normal Equation Method
This method is just similar to that of the method of least square explained above except
that the required values of a variable are estimated directly by the formulated equations
rather than through the lines of estimates drawn on a graph paper.
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
Thus, under this method, the two regression equations viz. :
(i) Y = a + bX and (ii) X = a + bY
are obtained basis of the two normal equations cited under the method of least square
explained earlier. Here, the regression equation. Ye = a + bX is constructed to compute the
estimated values of the Y variable for any given values of the X variable.
In this formula the various factors carry the meanings as follows :
Ye = estimated value of Y variable
a = Y-intercept at which the regression line crosses the Y-axis i.e., the vertical axis. Its
value remains constant for any given straight line.
b = Slope of the straight line and it represents a change in the Y variable for a unit change
in the X variable. Its value remains constant for any given straight line.
X = a given value of the X variable for which the value of Y is to be computed.
The above equation Ye = a + bX is to be formulated on the basis of the following two normal
equations:
𝑌 = Na + b 𝑋
𝑋𝑌 = a 𝑋 + b 𝑋2
In these formulae,
𝑌 = total of the given values of Y variable,
𝑋 = total of the given values of X variable,
𝑋2
= total of the squares of the given values of X variable,
𝑋𝑌 = total of the product of the given values of X and Y variable, and
a and b = the two constants explained above.
The above two normal equations are to be solved simultaneously to determine the value of
the two constants a and b that appear as the essential factors in the regression equation
Ye = a + bX.
Similarly, the other equation, Xe = a + bY is developed to compute the estimated values of
the X variable for any given values of the Y variable.
In this formula,
Xe = estimated value of the X variable,
Statisticshelpdesk
Copyright © 2012 Statisticshelpdesk.com, All rights reserved
a = X-intercept at which the regression line crosses the X-axis i.e., the horizontal
axis. Its value remains constant for any given straight line.
B = Slope of the straight line and it represents a change in the X variable for a unit
change in the
variable. Its value also remains constant for any given straight line, and
Y = a given value of the Y variable for which the value of X is to be computed.
The above equation Xe = a + bY is to be formulated on the basis of the following two normal
equations:
𝑋 = Na + b 𝑌
𝑋𝑌 = a 𝑌 + b 𝑌
2
In these formulae, the various factors involved carry the same meaning as explained earlier
and
𝑌2
= total of the squares of the given values of the Y variable.
Statisticshelpdesk
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Econometrics assignment help

  • 1. Statistics Help Desk Econometrics Assignment Help Alex Gerg
  • 2. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved Econometrics Assignment Help: About Econometrics Assignment: Statisticshelpdesk offers online econometrics assignment help in all topics related to econometrics. Whether its background, terminology, numericals, our tutors make students grasp the concepts and understand the topics thoroughly. Our econometrics assignment help services comprises of all solution to complex problems associated with econometrics. Our step by step approach helps students to understand the solution themselves. We provide econometrics Assignment help through email where a student can quickly upload his econometrics Homework on our website and get it done before the due date. Econometrics Assignment Illustrations and Solutions Question: 1 Using the scatter diagram method, draw the two regression lines associated with the following data both separately and jointly. Variable X : Variable Y : 40 30 50 30 60 50 40 35 45 30 50 40 70 50 50 40 55 35 Solution: (i) Diagrammatic representation of the regression line of Y on X
  • 3. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved (ii) Diagrammatic representation of the regression line of X on Y (iii) Diagrammatic representation of both the regression lines. From the intersection point of the two regression in the above graph, it must be seen that the given mean value of X variable is 51 and that of the Y variable is 38 approx. This can be verified by the algebraic method of arithmetic average as follows: 𝑋 = 𝑋 𝑁 = 460/9 = 51 approx, and 𝑌 = 𝑌 𝑁 = 340/9 = 38 approx.
  • 4. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved If, we wish to estimate any value of Y for a given value of X, we can do so easily by drawing a perpendicular from the required value point of the X axis to the point at which it cuts the regression line of Y on X, and then by drawing a perpendicular there from to Y axis. The point at which the perpendicular touches the Y axis is the required value of Y axis. The point at which the perpendicular touches the Y axis is the required value of Y for the given value of X. Thus, in the above graph it may be seen that when X = 70, Y = 45. In the similar manner we can estimate the value of X for any value of Y with reference to the regression line of X and Y. Thus, in the above graph when Y = 20, X = 30. (b) Method of Least square. This method is development over the scatter diagram method discussed above in which we face a lot of difficulties in drawing the regression lines accurately in a free-hand manner. Under this method we are to draw the lines of best fit as the lines of regression. These, lines of regression are called the lines of the best fit because, with reference to these lines we can get the best estimates of the values of one variable for the specified values of the other variable. Further, this method is called as such because, under this method the sum of the squares of the deviations between the given values of a variable and its estimated values given by the concerned line of regression is the least or minimum possible. Under this method, the line of the best fit for Y on X (i.e., the regression lines of Y on X) is obtained by finding the value of Y for any two (preferably the extreme ones) values of X through the following linear equation : Y = a + bX, Where a and b are the two constants whose values are to be determined by solving simultaneously the following two normal equations: 𝑌 = Na + b 𝑋 ….(i) 𝑋𝑌 = a 𝑋 + b 𝑋 2 ….(ii) Where, X and Y represent the given values of the X and Y variables respectively. Further, the line of the best fit for X on Y (i.e., the regression line of X on Y) is obtained by finding the values of X for any two (preferably the extreme ones) values of Y through the following linear equation : X = a + bY, where, the values of the two constants a and b are determined by solving simultaneously the following two normal equations : 𝑋 = Na + b 𝑌 ….(i) 𝑋𝑌 = a 𝑌 + b 𝑌 2 ….(ii)
  • 5. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved As pointed out earlier, in order to determine the value of Y for a given value of X, we will draw a perpendicular from the given value point of the X axis to the Y axis via the point at which it cuts the regression line of Y on X. The point at which the Y axis is touched by such perpendicular will indicate the required value of Y for the given value of X. In the similar manner, the required value of X for any given value of Y can be determined by drawing a perpendicular from the concerned point of the Y axis to the X axis via the point at which it cuts the regression line of X on Y. Question: 2 Draw the two regression lines for the data given below using the method of least square. Variable X : Variable Y : 5 20 10 40 15 30 20 60 25 50 Solution: Determination of the regression lines by the method of least square
  • 6. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved X Y X2 Y2 XY 5 10 15 20 25 20 40 30 60 50 25 100 225 400 625 400 1600 900 3600 2500 100 400 450 1200 1250 (i)Regression line of Y on X This is given by Y = a + bX where a and b are the two constants which are found by solving simultaneously the two normal equations as follows: 𝑌 = Na + b 𝑋 ….(i) 𝑋𝑌 = a 𝑋 + b 𝑋 2 ….(ii) Substituting the given values in the above equations we get, 200 = 5a + 75b ….(i) 3400 = 75a + 1375b ….(ii) Multiplying the eqn. (i) by 15 under the eqn. (iii) and subtracting the same from the eqn. (ii) we get, 3400 = 75a + 1375b Thus, (-) 3000 = 75a + 1125b/400 = 250b b = 400/250 = 1.6 Putting the above value of b in the eqn. (i) we get, 200 = 5a + 75(1.6) or 5a = 200 – 120 or a = 80/5 = 16. Thus, a = 16, and b = 1.6 Putting these values in the equation Y = a + bX we get Y = 16 + 1.6X With this equation, the estimated values of Y for the two extreme values of X will be : when X = 5, Y = 16 + 1.6(50 = 24 and when x = 25, Y = 16 + 1.6(25) = 56
  • 7. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved With these two pairs of values viz. (5, 24) and (25, 56) the regression line of Y on X will be drawn as under: (ii) Regression line of X on Y This is given by X = a + bY Where a and b are the two constants whose values are determined by solving the two normal equations as follows : 𝑋 = Na + b 𝑌 ….(i) 𝑋𝑌 = a 𝑌 + b 𝑌2 ….(ii) Substituting the given values in the above equations we get, 75 = 5a + 200b 3400 = 200a + 9000b Multiplying the eqn. (i) by 40 under the eqn. (iii) and getting the same subtracted from the eqn. (ii) we get, 3400 = 200a + 90000b Thus, (-)3000 = 200a + 80000b/400 = 1000b ∴ b = 400/1000 = 0.4 Putting the above value b in the equation (i) we get 75 = 5a + 200(.4) or 5a = 75 – 80 = -5
  • 8. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved a = -5/5 = -1. Hence, a = -1, and b = 0.4 Putting these values in the equation X = a + bY we get X = -1 + 0.4 Y With this equation, the estimated values of X for the two extreme values of Y will be : When Y = 20, X = -1 + 0.4(20) = 7 and When Y = 60, X = -1 + 0.4(60) = 23 With these two pairs of values viz., (20, 7) and (60, 23) the regression line of X on Y will be drawn as follows : Regression line of X on Y When both the regression lines of Y on X, and X on Y will be represented together, the graph will appear as under: Regression lines of Y on X, and of X on Y
  • 9. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved Characteristics of a Straight Line of Regression The chief characteristics of a straight line of regression fitted by the method of least square explained as above may be noted as follows : (i) It goes through the overall Mean of a variable. (ii) It gives the best fit to the data because the sum of the squared deviations from the line is smaller than they would be from any other straight line. (iii)The sum of the positive and negative deviations from this line is zero. (iv)This line gives the best estimate of the population regression when the data represent a sample drawn from a large population. 2. Algebraic Method Under this method the two regression equations are formulated to represent the two regression lines, or the lines of estimates respectively viz., (i) The regression line of X on Y and (ii) The regression line of Y on X. To obtain such equations we are to apply any of the following algebraic methods : (i) Normal equation method. (ii) Method of deviation from the actual Means ; and (iii)Method of deviation from the assumed Means. The procedure of each of the above methods is explained in detail as under : 1. Normal Equation Method This method is just similar to that of the method of least square explained above except that the required values of a variable are estimated directly by the formulated equations rather than through the lines of estimates drawn on a graph paper.
  • 10. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved Thus, under this method, the two regression equations viz. : (i) Y = a + bX and (ii) X = a + bY are obtained basis of the two normal equations cited under the method of least square explained earlier. Here, the regression equation. Ye = a + bX is constructed to compute the estimated values of the Y variable for any given values of the X variable. In this formula the various factors carry the meanings as follows : Ye = estimated value of Y variable a = Y-intercept at which the regression line crosses the Y-axis i.e., the vertical axis. Its value remains constant for any given straight line. b = Slope of the straight line and it represents a change in the Y variable for a unit change in the X variable. Its value remains constant for any given straight line. X = a given value of the X variable for which the value of Y is to be computed. The above equation Ye = a + bX is to be formulated on the basis of the following two normal equations: 𝑌 = Na + b 𝑋 𝑋𝑌 = a 𝑋 + b 𝑋2 In these formulae, 𝑌 = total of the given values of Y variable, 𝑋 = total of the given values of X variable, 𝑋2 = total of the squares of the given values of X variable, 𝑋𝑌 = total of the product of the given values of X and Y variable, and a and b = the two constants explained above. The above two normal equations are to be solved simultaneously to determine the value of the two constants a and b that appear as the essential factors in the regression equation Ye = a + bX. Similarly, the other equation, Xe = a + bY is developed to compute the estimated values of the X variable for any given values of the Y variable. In this formula, Xe = estimated value of the X variable,
  • 11. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved a = X-intercept at which the regression line crosses the X-axis i.e., the horizontal axis. Its value remains constant for any given straight line. B = Slope of the straight line and it represents a change in the X variable for a unit change in the variable. Its value also remains constant for any given straight line, and Y = a given value of the Y variable for which the value of X is to be computed. The above equation Xe = a + bY is to be formulated on the basis of the following two normal equations: 𝑋 = Na + b 𝑌 𝑋𝑌 = a 𝑌 + b 𝑌 2 In these formulae, the various factors involved carry the same meaning as explained earlier and 𝑌2 = total of the squares of the given values of the Y variable.
  • 12. Statisticshelpdesk Copyright © 2012 Statisticshelpdesk.com, All rights reserved Contact Us: Mail Us: info@statisticshelpdesk.com Web: http://www.statisticshelpdesk.com/ Facebook: https://www.facebook.com/Statshelpdesk Twitter: https://twitter.com/statshelpdesk Blog: http://statistics-help-homework.blogspot.com/ Phone: +44-793-744-3379