Girls from four different soccer teams are to be tested for mean goals scored per game. The entries in the table are the goals per game for the different teams. The one-way ANOVA results are shown in the table below.
Team 1 | Team 2 | Team 3 | Team 4 |
---|---|---|---|
1 | 2 | 0 | 3 |
2 | 3 | 1 | 4 |
0 | 2 | 1 | 4 |
3 | 4 | 0 | 3 |
2 | 4 | 0 | 2 |
What is the F statistic? (Round your answer to two decimal places.)
Girls from four different soccer teams are to be tested for mean goals scored per game....
Girls from four different soccer teams are to be tested for mean goals scored per game. The entries in the table are the goals per game for the different teams. At the 0.10 level of significance, are the mean goals scored similar among the different teams? Team 1 Team 2 Team 3 Team 4 4 1 2 0 3 2 3 1 4 0 2 1 4 3 4 0 2 4 0 2 How many teams are we looking...
(20) 1. Complete the ANOVA table (9 points), state the null and alternate hypothesis in symbols and in words (6 points). Copy the results using technology and use words to describe how f relates to the p value and what the results indicate (5 points). Girls from four different soccer teams are to be tested for mean goals scored per game. The entries in the table are the goals per game for the different teams as shown in the table...
PROBLEM 2 Two teams A and B play a soccer match. The number of goals scored by Team A is modeled by a Poisson process Ni(t) with rate l1 = 0.02 goals per minute, and the number of goals scored by Team B is modeled by a Poisson process N2(t) with rate 12 = 0.03 goals per minute. The two processes are assumed to be independent. Let N(t) be the total number of goals in the game up to and...
The goals scored by two soccer teams are approximately normally distributed and independent random samples of 8 games played by each team this season are given in the following table. 2 3 2 1 2 2 3 2 Peabody Dragons Worchester Tree Frogs 2 1 2 1 2 2 1 At the .01 significance level, does the evidence support the claim that the mean number of goals scored by the Dragons this season is greater than the mean number of...
Let the random variable X be the number of goals scored in a soccer game, and assume it follows Poisson distribution with parameter λ = 2,t = 1, i.e. X~Poisson(λ = 2,t = 1). Recall that the PMF of the Poisson distribution is P(Xx)- at-, x = 0,1,2, a) Determine the probability that no goals are scored in the game. b) Determine the probability that at least 3 goals are scored in the game. c) Consider the event that the...
Imagine we were interested in the effect of supporters singing on the number of goals scored by soccer teams. We took 10 groups of supporters of 10 different soccer teams and asked them to attend three home games, one at which they were instructed to sing in support of their team (e.g., ‘Come on, you reds!’), one at which they were instructed to sing negative songs towards the opposition (e.g., ‘You’re getting sacked in the morning!’) and one at which...
Groups of men from three different areas of the country are to be tested for mean weight. The entries in the table are the weights for the different groups. The One-Way ANOVA results are shown in Table 13.13. Group 1 Group 2 Group 3 216 202 170 198 213 165 240 284 182 187 228 197 176 210 201 Table 13.13 What is the Sum of Squares Error?
The Dutch sports media company Infostrada collected data on the goals scored in every English Premier League soccer game in ten seasons, from the 2001/02 season through the 2010/11 season (3,800 total games). The table below displays a summary of their findings. To assist you in reading the table: the first entry in the table, "8.34" indicates the final score was 0-0 in 8.34% of games the top entry in the "Total" column, "23.55" indicates the home team scored 0...
bc Let (X, Y) denote the numbers of goals scored by teams A and B respectively during a soccer match. Assume that X and Y are independent Poisson random variables with means λθ/2 and (A/d)/2 respectively, where λ > 0, θ > 0. Note that θ-1 indicates evenly matched teams, while θ > 1 indicates that team A is stronger than team B. The parameter λ indicates the total number of goals expected for evenly matched teams (a) Find the...
Question 8 (1.1 points) The following table presents the number of goals scored by the winning team in a sample of championship games in the World Cup soccer tournament. Goals 1 2 3 45 Frequency 3 4 4 41 Consider these games to be a population. Let Xbe the number of goals scored in a game randomly chosen from this population. Compute the population standard deviation. Write only a number as your answer. Round to two decimal place (for example:...