Answer:
Step-by-step explanation:
This is exponential growth which has the form
![c=ar^n,\text{ where c=cases, a=initial value, r=common ratio, n=days}\\ \\ c=1000(1.2^n)\\ \\ \text{The sequence for days 2 through 6 is}\\ \\ (2, 1440),(3, 1728),(4, 2073.6),(5, 2488.32),(6, 2985.984)\\ \\ \text{Since these are people we should round to nearest whole person.}\\ \\ (2,1440),(3,1728),(4,2074),(5,2488),(6,2986)](https://tex.z-dn.net/?f=c%3Dar%5En%2C%5Ctext%7B%20where%20c%3Dcases%2C%20a%3Dinitial%20value%2C%20r%3Dcommon%20ratio%2C%20n%3Ddays%7D%5C%5C%20%5C%5C%20c%3D1000%281.2%5En%29%5C%5C%20%5C%5C%20%5Ctext%7BThe%20sequence%20for%20days%202%20through%206%20is%7D%5C%5C%20%5C%5C%20%282%2C%201440%29%2C%283%2C%201728%29%2C%284%2C%202073.6%29%2C%285%2C%202488.32%29%2C%286%2C%202985.984%29%5C%5C%20%5C%5C%20%5Ctext%7BSince%20these%20are%20people%20we%20should%20round%20to%20nearest%20whole%20person.%7D%5C%5C%20%5C%5C%20%282%2C1440%29%2C%283%2C1728%29%2C%284%2C2074%29%2C%285%2C2488%29%2C%286%2C2986%29)
The answer is: 250 adult tickets were sold.
To be safe, prove that your answer is correct.
If there are 74 more student tickets than adult tickets, the amount of adult tickets must obviously be less.
Explanation:
74 more than 250, or 250+74 is 324.
250+324=574.
Now, you know the answer is correct. It satisfies all of the given conditions.
Also, note that the difference between the number of student tickets and adult tickets is 74.
So, there are 250 adult tickets and 324 student tickets.
Answer: 34 degrees of freedom should be used to find the p-value of the test .
Step-by-step explanation:
Degrees of Freedom relates to the maximum number of independent values, that have independence to vary in the sample.
Given : When testing the difference between two population means and the population variances are unknown and unequal, the degrees of freedom are calculated as 34.7.
But degree of freedom must be an integer , so we find the greatest integer less than equal to the calculated degree of freedom.
i.e. [df]=[34.7]= 34
Thus , 34 degrees of freedom should be used to find the p-value of the test .
Answer:
The four famous Mountains of Chinese Buddhism -- Mount Wutai in Shanxi, Mount Putuo in Zhejiang, Mount Emei in Sichuan and Mount Jiuhua in Anhui -- are dedicated to Bodhisattva Manjusri, Avalokitesvara, Bodhisattva Puxian and Bodhisattva Dizang. With the introduction of Buddhism, the four famous mountains began to build temples and monasteries in The Han Dynasty and continue to this day.
Step-by-step explanation:
I believe its already in standard form so you would just add it