Also, can the prediction be correct? What is wrong with predicting the weight in this case?A) The prediction cannot be correct because a negative weight does not make sense. The width in this case is beyond the scope of the available same dataB) The prediction cannot be correct because a negative weight does not make sense and because this is not sufficient evidence of a linear correlation.C) The prediction cannot be correct because there is not sufficient evidence of a linear correlation. The width in this case is beyond the scope of the available sample data.D) The prediction can be correct. There id nothing wrong with predicting the weight in this case.

Find the regression equation, letting overhead width be the predictor (x) variable. Find the best predicted weight of a seal if the overhead width measured from a photograph is 1.8 cm. Can the prediction be correct? What is wrong with predicting the weight in this case? Use a significance level of 0.05. Overhead Width (cm) 7.9 7.4 9.8 8.3 8.9 7.7 Weight (kg) 161 170 265 176 223 180 Click the icon to view the critical values of the Pearson correlation coefficient r. The regression equation is y =]+x (Round to one decimal place as needed.) The best predicted weight for an overhead width of 1.8 cm is kg. (Round to one decimal place as needed.)