Police sometimes measure Shoe prints at crime scenes so that they can learn something about criminals . Listed below are shoe print lengths , foot lengths , and heights of males . Construct a scatterplot , find the value of the linear correlation coefficient , , and find the P-value of 1. Determine whether there is sufficient evidence to support a claim of linear correlation between the two variables . Based on these results , does it appear that police can use a shoe print length to estimate the height of a male ? Use a significance level of * = 0.01 . Shoe Print ( cm )\\ \\29.4 29.3 30. 2 32.9 28.1 Foot Length ( cm ) | 24.9 25.3 27.6 26.5 24.3 Height ( cm ) 171.9 181 . 6 18.8 181.5 170.3 Construct a scatterplot . Choose the correct graph below ! OA. OB. OC. OD. CUNT CLNUT Q Q Q Q Height ( [m ) Height I cmi) Height ( cm ) Height ([m) 160 + 25 3.5 25 35 25 3.5 25 3.5 Shoe Print [m ) Shoe Print ( [mi ) Shoe Print ([m ) ShoE Print ( am ) Click to select your answer ( 5) ?Police sometimes measure shoe prints at crime scenes so that they can learn something about criminals . Listed below are shoe print lengths , foot lengths , and heights of males . Construct a scatterplot , find the value of the linear correlation coefficient , , and find the P-value of 1 . Determine whether there is sufficient Evidence to support a claim of linear correlation between the two variables . Based on these results , does it appear that police can use a shoe print length to estimate the height of a male ? Use a significance level of * = 0. 01 . Shoe Print ( cm )\\ \\29.4 29.3 30. 2 32.9 28.1 Foot Length ( cm ) | 24.9 25.3 27.6 26.5 24.3 Height ( cm ) 171.9 181.6 18.8 181.5 170.3 The linear correlation coefficient r is \\\\ ( Round to three decimal places as needed . ) Determine the null and alternative hypotheses* HO : P| + | HI : P | | | | (Type integers or decimals . Do not round . ) The test statistic is | |.variables . Based on these results , does it appear that police can use a shoe print length to Estimate the height of a male ? Use a significance level of * = 0.01 . Shoe Print ( cm )| 29.4 29.3 30. 2 32.9 28.1 {` Foot Length ( cm )\\ 24.9 25.3 27.6 26.5 24.3 Height ( cm ) 171.9 181.6 18.8 181.5 170. 3 The P-value is \\\\ ( Round to three decimal places as needed . ) Because the P- value of the linear correlation coefficient is* *\\ the significance level , there\\* sufficient evidence to support the claim that there is a linear correlation between shoe print lengths and heights of males* Based on these results , does it appear that police can use a shoe print length to estimate the height of a male ?" O A. No, because shoe print length and height appear to be correlated . OB . Yes , because shoe print length and height do not appear to be correlated
