H0:d+10Ha:d=10 Calculate the value of the test statistic. (Round your answer to three decimal places.) Calculate the p-value. (Round your answer to four decimal places.) p-value= State your conclusion. Reject H0. There is sufficient evidence to condude that a $10 price differential exists. Do not Reject H0, There is sufficlent exvidence to conclude that a $10 price differential exists. Reject H0, There is insufficient evidence to conciude that a 510 pilice differential exists. Do not reject H0. There is ineufnelent evidence to conclude that a $10 price differential exiots. the mean price for the deluxe model - the mean. price for the standard model.).the two models is $10. State the null and alternative hypotheses. (Use d= mean price for the deluxe mndel - mean price for the sanidard model.) Ha:d=10 Ha:d10 H0:d10 Ha:d>10 H0:d>10 Ha:d10 H0:Hd=10 Ha:Hd=10 H0:Hd= 10 Ha:d=10 Calculate the value of the test statistic. (Round your anewer to theee decimal places.) Calculate the p-valuen (Round your answer to four decimal places.) pryalue = State youc concluaion. Reject H0. There is sufficent evidence to, conciude that a 510 price ciferential exists. Do not Relect H0, there is sufficient evidence to conclude that a s1o price duferential anidh. Peject H0. There is insuffident widence to conclude that a 310 price diferemalat e sint.You may need to use the appropriate technology to answer this question. A manufacturer produces both a deluxe and a standard model of an automatic sander designed for home use. Selling prices obtained frem a kample of refad oveles follie. the two models is: sto. state the nult and alternative hypotheses. (Ust j= mean price for the deikene model - mean price for flie standied modpt) ) ..