An airline claims that the no-show rate for passengers is less than 8%. In a sample...

An airline claims that the no-show rate for passengers is less than 10%. In a sample...

An airline claims that the no-show rate for passengers is less than 10%. In a sample of 420 randomly selected reservations, 19 were no-shows. A α = 0.05, test the airline's claim.

Find the P-value for the indicated hypothesis test. An airline claims that the no-show rate for...

Find the P-value for the indicated hypothesis test. An airline claims that the no-show rate for passengers booked on its flights is less than 5%. Of 380 randomly selected reservations, 18 were no-shows. Find the P-value for a test of the airline's claim. Round to 2 decimals

A manufacturer claims that the mean lifetime of its lithium batteries is less than 1120 hours....

A manufacturer claims that the mean lifetime of its lithium batteries is less than 1120 hours. A homeowner selects 25 of these batteries and finds the mean lifetime to be 1100 hours with a standard deviation of 75 hours. Test the manufacturer's claim. Use α = 0.01. A. P-value = 0.110 > 0.01; do not reject H0; There is not enough evidence support the claim, that mean is less than 1120. B. P-value = 0.097 > 0.01; do not reject...

A manufacturer claims that the mean lifetime of its lithium batteries is less than 1500 hours....

A manufacturer claims that the mean lifetime of its lithium batteries is less than 1500 hours. A homeowner selects 25 of these batteries and finds the mean lifetime to be 1480 hours with a standard deviation of 80 hours. Test the manufacturer's claim. Use α = 0.10. A. P-value = 0.112 > 0.10; do not reject H0; There is not enough evidence support the claim, that mean is less than 1500. B. P-value = 0.112 > 0.05; do not reject...

A manufacturer claims that the mean lifetime of its lithium batteries is less than 1520 hours....

A manufacturer claims that the mean lifetime of its lithium batteries is less than 1520 hours. A homeowner selects 27 of these batteries and finds the mean lifetime to be 1498 hours with a standard deviation of 76 hours. Test the manufacturer's claim. Use α = 0.10. A. P-value = 0.112 > 0.02; do not reject H0; There is not enough evidence support the claim, that mean is less than 1500. B. P-value = 0.072 > 0.05; do not reject...

. A bus line claims that the no-show rate for passengers is at most 8%. In...

. A bus line claims that the no-show rate for passengers is at most 8%. In a sample of 360 randomly selected reservations, 38 were no-shows. At α = 0.05, test the bus line’s claim.

The engineering school at a major university claims that 36% of its graduates are women. In...

The engineering school at a major university claims that 36% of its graduates are women. In a graduating class of 210 students, 90 were females. Does this suggest that the school is believable? Use α = 0.10. A. P-value = 0.0558 < 0.05; reject H0; There is enough evidence to reject the claim that is 36%. B. P-value = 0.0384 > 0.01; do not reject H0; There is enough evidence to support the claim that is 36%. C. P-value =...

A humane society center claims that less than 63% of households in a certain country own...

A humane society center claims that less than 63% of households in a certain country own a pet. In a random sample of 400 households in that country, 236 say that they own a pet. At α=0.0​1, is there enough evidence to support the society's center's claim? Complete parts​ (a) through​ (d) below. (a) Identify the claim and state H0 and Ha. Let p be the population proportion of​ successes, where a success is a household in the country that...

The engineering school at a major university claims that 25% of its graduates are women. In...

The engineering school at a major university claims that 25% of its graduates are women. In a graduating class of 210 students, 43 were females. Does this suggest that the school is believable? Use α = 0.10. A. P-value = 0.0028 < 0.02; reject H0; There is enough evidence to reject the claim that is 25%. B. P-value = 0.0650 > 0.05; do not reject H0; There is enough evidence to support the claim that is 25%. C. P-value =...

A humane society claims that less than thirty two percent of U.S. households own a dog....

A humane society claims that less than thirty two percent of U.S. households own a dog. In a random sample of four hundred and nine U.S.​ households, 153 say they own a dog. At alphaαequals=0.04 is there enough evidence to support the​ society's claim?​(a) Write the claim mathematically and identify Upper H 0H0 and Upper H Subscript aHa. ​(b) Find the critical​ value(s) and identify the rejection​ region(s). (c) Find the standardized test statistic.​ (d) Decide whether to reject or...