This question i am doing most of part, also I atteched the graph image, I need help only Question No 2). a, Question and 3). part C, D and E, please help within two hours, please plese

The following are 13 world record times for men and women in the mile race as ratified by the International Association of Athletics Federations. The mile is the only non-metric distance that is recognized for record purposes. The times are given in minutes and seconds. Notice times prior to 1981 are accurate to a tenth of a second. Beginning in 1981, IAAF began recognizing times to a hundredth of a second. Also notice that the years of the records are not the same for men and women. (Data from Wikipedia.org/wiki/mile_run_world_record_progression)

 

Year	Men's Times	Times in Seconds	Athlete's Nationality
1965	3:53.6		France
1966	3:51.3		US
1967	3:51.1		US
1975	3:51.0		Tanzania
1975	3:49.4		New Zealand
1979	3:49.0		UK
1980	3:48.8		UK
1981	3:48.53		UK
1981	3:48.40		UK
1981	3:47.33		UK
1985	3:46.32		UK
1993	3:44.39		Algeria
1999	3:43.13		Morocco
Year	Women's Times	Times in Seconds	Athlete's Nationality
1967	4:37.0		UK
1969	4:36.8		Netherlands
1971	4:35.3		West Germany
1973	4:29.5		Italy
1977	4:23.8		Romania
1979	4:22.09		Romania
1980	4:21.68		US
1981	4:20.89		Soviet Union
1982	4:18.08		US
1982	4:17.44		Romania
1985	4:16.71		US
1989	4:15.61		Romania
1996	4:12.56		Russia

 

The purpose of this project is for you to apply concepts we have discussed in class, such as modeling with the TI-83/84 calculator, drawing scatter plots, making predictions, and solving systems of linear equations. The process you are to use is outlined below. Once you have completed the project, you should upload a neatly written PDF summary of your results using the Assignments tool in Sakai. Each question should be numbered as shown below, with all graphs, math work, and explanations shown clearly. You may work with other students in the class and discuss your findings.

 

Using the Desmos graphing calculator or graph paper (which may be printed from an online image), complete the following steps:

 

1. Visualize the data

 

1. Use the horizontal axis (x) to represent the year. Begin with year 1960 and continue through year 2050. Choose an appropriate scale for the x-axis to model the data.

 

1. Convert all the times to unrounded seconds instead of minutes and seconds; list these times in the table under “Times in Seconds.”

 

1. Use the vertical axis (y) to represent the times, in seconds. Begin with 200 seconds and continue to 300 seconds. Choose an appropriate scale for the y-axis to model the data.

 

1. Use an “x” to represent the data for men and plot the points on the grid using the year as the x-coordinate and the times for men as the y-coordinate. Use an “o” to represent the data for women and plot the points on the same grid using the year as the x-coordinate and the times for women as the y-coordinate.

 

1. e) Title your graph and label the x and y Insert your graph below.

 

 

 

 

 

1. Find the models

 

1. Using the years as x and the times in seconds for men as y, enter the mens’ data in your calculator in L₁ and L₂, respectively. Do the same for women, except use L₃ and L₄ . Set up the plots in your calculator to display L₁ and L₂ as Plot1. Set up Plot2 to display L₃ and L₄. [Recall that the setup for plots is done with 2^nd, Y=. Make sure that each plot uses a different mark so that you can distinguish between the two.] Use Zoom 9 to view the scatter plot once you have set up the plots. Then adjust the window to match the grid on your graph paper and insert a picture of your calculator graph below. It should resemble the one you created by hand.

 

 

 

1. Using the Calculate menu under Stats, find a linear regression model for L₁ and L₂. Write the corresponding equation, rounding to three decimal places for a and b.

 

 

 

1. Using the Calculate menu under Stats, find a linear regression model for L₃ and L₄. Note that the format will be LinReg (y=ax+b) (L₃,L₄). Write the corresponding equation, rounding to three decimal places for a and b.

 

 

 

1. d) Draw the two lines whose equations you found in parts b) and c) on the

graph you produced in part 1. Where do the lines appear to intersect? Give approximate coordinates, based on the grid, as integers.

 

Question 3.

c) Use your models to predict the world record times for men and women

in 2020, 2050, and 2270. Give your answer for each year in minutes and seconds, rounded to the nearest second. Are the predictions reasonable? Why or why not?

 

 

 

d) Find and interpret the slopes of both regression lines. (What does the

      slope of each equation mean in the context of the given data?) Based on

      the slopes, whose times are improving more as the years go by, men’s’ or women’s’?

 

 

 

e). Find and interpret the y-intercepts of the models. Do the y-intercepts give any meaningful information? Why or why not?

 

Transcribed Image Text:

Times for Men and Women in the Mile Race desmos World Records Charral O (185, 236.71) OLasel %23 O (1950,25.61) Ou O (1996,252.56) N y--0.281x + 783.960 X last- N y=-0.973r +2190495 (2032.565, 212.809 Years 100 180 2000 2013 2000 2030 240 250 Tighes in Becoonds

Transcribed Image Text:

Times for Men and Women in the Mile Race 290 285 280 275 270 265 260- 255 250 245 240 235 Xx 230 *** 225 220 215 210 Year 205 1970 1975 1980 1985 1900 1os 2005 2010 2015 2020 2025 2030 2040 201 2000 2035