Chapter 1 - Section 1.2 - Mathematical Models: A Catalog of Essential Functions. - 1.2 Exercises - Page 35: 27

(a) See the image below for the scatter plot. The linear model is appropriate for the data. (b) The graph is shown on the image below. The linear equation is :$y=1117x+60188$ (c) In $2002$, it is estimated that there was an oil consumption of $79177$ thousand barrels per day and in $2012$, $90347$ thousand barrels per day.

(a) See the image for the scatter plot. The linear model is appropriate for the data, as the data makes almost a straight line. (b) Using the data provided and a regression line calculator, we will get the following: $m=1117$ $b=60188$ So we have the linear equation: $y=1117x+60188$ (c) In our equation, $x$ stands for years passed since $1985$ and inputting the value gives us $y$, which is oil consumption per day. For year $2002$; $x=2002-1985=17$ $y=1117\times17 + 60188$ $y=79177$ So in 2002, it is estimated that there was an oil consumption of $79177$ thousand barrels per day. For year $2012$; $x=2012-1989=27$ $y=1117\times27 + 60188$ $y=90347$ And in 2012 it is estimated that there was an oil consumption of $90347$ thousand barrels per day.