There is a positive, linear relationship between the correct and guessed calories. The guessed calories for 5 oz. of spaghetti with tomato sauce and the cream-filled snack cake are unusually high and do not appear to fit the overall pattern displayed for the other foods. The correlation is r = 0.825 . This agrees with the positive association observed in the plot; it is not closer to 1 because of the unusual guessed calories for spaghetti and cake. The fact that the guesses are all higher than the true calorie count does not influence the correlation. The correlation r would not change if every guess were 100 calories higher. The correlation r does not change if a constant is added to all values of a variable because the standardized values would be unchanged. The correlation without these two foods is r = 0.984 . The correlation is closer to 1 because the relationship is much stronger without these two foods.
Answer: 9.43%
Step-by-step explanation:
The formula to calculate the percent error is given by :-
[tex]\% \text{ error}=\dfrac{|\text{Estimated value - Actual value}|}{\text{Actual value}}}\times100[/tex]
Given : The manager at Food Town estimates that the store sold 325 jars of spaghetti sauce last week. The store actually sold 297 jars of spaghetti sauce.
i.e. Estimated value = 325
Actual value = 297
Then , the percentage error would be :-
[tex]\% \text{ error}=\dfrac{|325-297|}{297}\times100\\\\=\dfrac{|28|}{297}\times100\\\\=\dfrac{28}{297}\times100=9.42760942761\approx9.43\%[/tex]
hence, the manager’s percent error is approximately 9.43% .
