Answer: a) 0.84 b) 0.67 c) 1.28
Step-by-step explanation:
Using the standard normal distribution table for z-value , we have
(a) The value of [tex]z_{\alpha}[/tex] would result in a 80% one-sided confidence interval : [tex]z_{(1-0.80)}=z_{0.20}=0.8416\approx0.84[/tex]
(b) The value of [tex]z_{\alpha}[/tex] would result in a 85% one-sided confidence interval : [tex]z_{(1-0.85)}=z_{0.25}=0.6744897\approx0.67[/tex]
(c) The value of [tex]z_{\alpha}[/tex] would result in a 90% one-sided confidence interval : [tex]z_{(1-0.90)}=z_{0.10}=1.2815515\approx1.28[/tex]
