Qualitative" variables are measured on either ordinal or nominal scales

Cherry is a realtor. She made the graph below to show the amount of taxes paid on the houses she has sold. Which of the followin

BlackZzzverrR [31]

It increased by 3000$ for every 200,000$ increased in appraised value. Hope this helps❤️please rate

5 0

3 years ago

What is the 25th term of the arithmetic sequence where a1 = 8 and a9 = 48?

Yuki888 [10]

Answer: $a_{25} = 128$

Step-by-step explanation:

You need to use this formula:

$a_n = a_1 + (n - 1)d$

Where $a_n$ is the nth] term, $a_1$ is the first term,"n" is the term position and "d" is the common diference.

You must find the value of "d". Substitute $a_1=8$ , $a_9=48$ and $n=9$ into the formula and solve for "d":

$48 = 8 + (9 - 1)d\\48=8+8d\\48-8=8d\\40=8d\\d=5$

Now, you can calculate the 25th term substituting into the formula these values:

$a_1=8$

$d=5$ and $n=25$

Then you get:

$a_{25} = 8 + (25 - 1)5$

$a_{25} = 8 + 120$

$a_{25} = 128$

4 0

3 years ago

Mike paid $18.00 before taxes for 5 photo albums. His sister wants to buy two of the same type of album. What amount should she

Reika [66]

Answer:

$7.2

Step-by-step explanation:

Mike paid $18 for 5 photos

= 18/5

= 3.6

His sister wants to purchase 2 of the same album

= 2 × 3.6

= 7.2

Hence she will pay $7.2 for the two albums

6 0

3 years ago

Read 2 more answers

Usain Bolt is the world's fastest man. How

Gnesinka [82]

Answer:

100/12.4= about 8.06 seconds

Step-by-step explanation:

5 0

3 years ago

Consider an experiment that consists of recording the birthday for each of 20 randomly selected persons. Ignoring leap years, we

8_murik_8 [283]

Answer:

a) $p_{20d}$ = 0.588

b) 23

c) 47

Step-by-step explanation:

To find a solution for this question we must consider the following:

If we’d like to know the probability of two or more people having the same birthday we can start by analyzing the cases with 1, 2 and 3 people

For n=1 we only have 1 person, so the probability $p_{1}$ of sharing a birthday is 0 ( $p_{1}$ =0)

For n=2 the probability $p_{2}$ can be calculated according to Laplace’s rule. That is, 365 different ways that a person’s birthday coincides, one for every day of the year (favorable result) and 365*365 different ways for the result to happen (possible results), therefore,

$p_{2} = \frac{365}{365^{2} } = \frac{1}{365}$

For n=3 we may calculate the probability $p_{3}$ that at least two of them share their birthday by using the opposite probability P(A)=1-P(B). That means calculating the probability that all three were born on different days using the probability of the intersection of two events, we have:

$p_{3} = 1 - \frac{364}{365}*\frac{363}{365} = 1 - \frac{364*363}{365^{2} }$

So, the second person’s birthday might be on any of the 365 days of the year, but it won’t coincide with the first person on 364 days, same for the third person compared with the first and second person (363).

Let’s make it general for every n:

$p_{n} = 1 - \frac{364}{365}*\frac{363}{365}*\frac{362}{365}*...*\frac{(365-n+1)}{365}$

$p_{n} = \frac{364*363*362*...*(365-n+1)}{365^{n-1} }$

$p_{n} = \frac{365*364*363*...*(365-n+1)}{365^{n} }$

$p_{n} = \frac{365!}{365^{n}*(365-n)! }$

Now, let’s answer the questions!

a) Remember we just calculated the probability for n people having the same birthday by calculating 1 <em>minus the opposite</em>, hence <em>we just need the second part of the first calculation for</em> $p_{n}$ , that is:

$p_{20d} = \frac{364}{365}*\frac{363}{365}*\frac{362}{365}*...*\frac{(365-20+1)}{365}$

We replace n=20 and we obtain (you’ll need some excel here, try calculating first the quotients then the products):

$p_{20d}$ = 0.588

So, we have a 58% probability that 20 people chosen randomly have different birthdays.

b) and c) Again, remember all the reasoning above, we actually have the answer in the last calculation for pn:

$p_{n} = \frac{365!}{365^{n}*(365-n)! }$

But here we have to apply some trial and error for 0.50 and 0.95, therefore, use a calculator or Excel to make the calculations replacing n until you find the right n for $p_{n}$ =0.50 and $p_{n}$ =0.95

b) 0.50 = 365!/(365^n)*(365-n)!

n $p_{n}$

1 0

2 0,003

3 0,008

…. …

20 0,411

21 0,444

22 0,476

23 0,507

The minimum number of people such that the probability of two or more of them have the same birthday is at least 50% is 23.

c) 0.95 = 365!/(365^n)*(365-n)!

We keep on going with the calculations made for a)

n $p_{n}$

… …

43 0,924

44 0,933

45 0,941

46 0,948

47 0,955

The minimum number of people such that the probability of two or more of them have the same birthday is at least 95% is 47.

And we’re done :)

6 0

4 years ago