Answer to Question #186039 in Quantitative Methods for Olivia Padula

"Average \\ consumption \\ for\\ 17-20-year-old\\ in\\ Canada\\ is\\ \\mu =298 \\ calories" \\

To test if the average calorie consumption for students at John Abbott will be less than the national average ."\\Rightarrow H_0:\\mu\\le298.\\\\\n\nSample \\ size \\ n= 35 (large \\ sample, \\because n\\gt 30)"

Sample mean "\\bar x" = 280

Sample standard deviation (s)=18

"Let \\ the \\ null\\ hypothesis \\ be \\ H_0:\\mu\\le298\\\\\nAlternative \\ hypothesis be \\ H_1:\\mu>298\\\\\nThe \\ test \\ statistic \\ is \\ z= \\frac{\\bar x-\\mu}{(\\frac{s}{\\sqrt{n}})} \\\\\n\\Rightarrow z=\\frac{(280-298)}{(\\frac{18}{\\sqrt{35}})} \\\\\n=\\frac{(-18)}{(\\frac{18}{\\sqrt{35}})}\\\\\n=-\\sqrt{35}\\\\\n=-5.9161\n\\Rightarrow The \\ test \\ statistic \\ z= -5.9161\\\\\nFor, \\alpha =0.01, \\ the \\ critical \\ value \\ is \\ z_{0.01}=2.43\\\\\nSince, \\ the \\ statistic \\ z=-5.9161\\lt 2.43\\\\\nthere \\ is \\ no \\ reason \\ to \\ reject \\ the \\ null \\ hypothesis \\\\\nat \\alpha=0.01, \\ using \\ right \\ tail \\ test.\\\\\n\\therefore We \\ conclude\\ that \\ consumption \\ for\\ students \\ at \\ John \\ Abbott\\\\\n is \\ less\\ than \\ the \\ national \\ average \\ consumption."