Use the definition of a Taylor series to find the first four nonzero terms of the series for f(x) centered at the given value of a. (Enter your answers as a comma-separated list.)f(x) = 4/(1+x), a = 2Use the definition of a Taylor series to find the first four nonzero terms of the series for f(x) centered at the given value of a. (Enter your answers as a comma-separated list.)f(x) = 3xe^x, a = 0

The area of the square is $x^2 = (2\sqrt{3})^2 = \boxed{12}$. To solve this problem, we need to use the fact that the centers of the smaller circles form a squarewith sidee lengths equal to the sum of the radii of the smaller circles and the radius of the larger circle. Let's call this side length $x$.

We know that each of the smaller circles is tangent to two sides of the square. This means that the distance from the center of each smaller circle to a corner of the square is equal to the radius of the circle. Since the radius of each circle is 1, this distance is also 1.

If we draw the diagonal of the square, we can see that it passes through the center of the larger circle. This diagonal has length $x\sqrt{2}$. We also know that the radius of the larger circle is 2.

Using the Pythagorean theorem, we can set up the equation $x^2 + x^2 = (x\sqrt{2})^2 - 4^2$. Simplifying this equation gives us $x^2 = 12$, so $x = 2\sqrt{3}$.

Therefore, the area of the square is $x^2 = (2\sqrt{3})^2 = \boxed{12}$.

Learn more about circles here:

https://brainly.com/question/29142813

#SPJ11

Answer:

Answer: C

it ez if you jut read it

Since a negative value for the average number of customers waiting in the queue does not make sense, we can conclude that there are on average 0 customers waiting in the queue according to the single-server queue model (rounded to the nearest integer).

The average number of customers waiting according to the single-server queue model can be calculated using the formula Lq = (λ*Wq)/(1-ρ), where λ is the arrival rate, Wq is the average time spent waiting in the queue, and ρ is the utilization rate of the server (ρ = λ*service time).

Given that the average interarrival time is 4 minutes, the arrival rate λ can be calculated as λ = 1/4 = 0.25 customers per minute.

The average time spent waiting in the queue Wq is given as 8 minutes.

The service time can be calculated as the time spent in the system (waiting + service) minus the average waiting time, which is 8 minutes in this case. Let's assume the average service time is s minutes, then s = 8 + Wq = 8 + 8 = 16 minutes.

The utilization rate of the server ρ can be calculated as ρ = λ*s = 0.25*16 = 4.

Now, we can calculate the average number of customers waiting in the queue Lq as Lq = (λ*Wq)/(1-ρ) = (0.25*8)/(1-4) = -2 customers.

Know more about average number here:

https://brainly.com/question/16956746

#SPJ11

The Zero Property of Multiplication states that the product of any number and zero is always zero. So, whenever you use this property and multiply any number by zero, the answer will always be zero.

One of the abecedarian data of  computation is the Zero Property of Multiplication. It claims that when any integer is multiplied by zero, the  outgrowth is always zero. This  specific is extremely handy for  diving   addition problems.   The Zero Property of Multiplication can be used to reduce  addition statements.

Assume you're given the  ensuing expression   3x( 2y- 5z)   You may extend this statement using the distributive property of  addition to get   6xy- 15xz  

Assume you wish to simplify this formula indeed further by removing a common element. You will see that the factor of x appears in both terms of the equation. So you can abate x to get   x( 6y- 15z)

Learn more about zero property at

https://brainly.com/question/386524

#SPJ4

Absolute convergence refers to the convergence of a series regardless of the order in which its terms are added, while conditional convergence refers to convergence only when the terms are added in a specific order. In this case, we have shown that the series converges, but we cannot determine whether it converges absolutely or conditionally without further analysis.

To test the series for convergence or divergence, we will use the Divergence Test and the Alternating Series Test. We will break it down into steps.

Given series: ∑((-1)^n * n^110) / (n^21 + 2)^(1/2)

Part 1: Divergence Test
The given question is about testing a series for convergence or divergence using different methods. In part 1, we are asked to use the Divergence Test to determine whether the series converges or diverges. To apply this test, we need to identify the corresponding positive terms, which in this case are given as bn = n110/(n^21+2)^(1/2). Then, we need to evaluate the limit of this sequence as n approaches infinity, which is lim bn = 0 as the denominator grows faster than the numerator. Since the limit is equal to 0, the Divergence Test does not provide any conclusive results.

In part 2, we are asked to use the Alternating Series Test to test for convergence. For this, we need to compute the derivative of the given sequence, which is given as bn = (200119-n-30)/2(n^21+. The derivative is eventually always less than zero, indicating that the sequence is eventually monotone. Therefore, the Alternating Series Test tells us that the series converges.

Step 1: Identify the corresponding positive terms:
bn = n^110 / (n^21 + 2)^(1/2)

Step 2: Evaluate the limit:
lim (n→∞) bn = lim (n→∞) (n^110 / (n^21 + 2)^(1/2))

The limit is equal to 0, so the Divergence Test does not provide any information on the convergence or divergence of the series.

Part 2: Alternating Series Test

Step 3: Test for Convergence
Since the series is an alternating series with positive terms bn, we need to check if the sequence of positive terms is decreasing and if its limit is 0.

Step 4: Check if the sequence is decreasing
Since the derivative of bn with respect to n is negative for all n > 4, the sequence is eventually monotone (decreasing).

Step 5: Check if the limit of the sequence is 0
We already found the limit of the sequence in Step 2, which is 0.

Since both conditions of the Alternating Series Test are satisfied, the series converges.
Finally, we can distinguish between absolute and conditional convergence. Absolute convergence refers to the convergence of a series regardless of the order in which its terms are added, while conditional convergence refers to convergence only when the terms are added in a specific order. In this case, we have shown that the series converges, but we cannot determine whether it converges absolutely or conditionally without further analysis.
In conclusion, the given series converges conditionally according to the Alternating Series Test.

Learn more about the Convergence:

brainly.com/question/1851892

#SPJ11

The quadratic equation y = ax^2 + bx + c is a suitable example that reveals the minimum or maximum value without altering the equation's form. By finding the vertex of the parabola using the formula x = -b/(2a), you can determine the minimum or maximum value of the function.

The equation that reveals the minimum or maximum value of a function without changing the form of the equation is the derivative of the function. The derivative gives the slope of the function at any given point, which can help us identify the location of the maximum or minimum point.

To find the maximum or minimum point of a function, we first take the derivative of the function and set it equal to zero. Solving for the variable will give us the x-coordinate of the maximum or minimum point. To determine whether it is a maximum or minimum, we can use the second derivative test.

For example, let's consider the function f(x) = x^2 - 6x + 8. Taking the derivative, we get f'(x) = 2x - 6. Setting this equal to zero and solving for x, we get x = 3. This means that the maximum or minimum point of the function occurs at x = 3. To determine whether it is a maximum or minimum, we take the second derivative: f''(x) = 2. Since the second derivative is positive, we know that the function has a minimum at x = 3.

In summary, the derivative of a function reveals the minimum or maximum value of the function without changing the form of the equation. By finding the zeros of the derivative and using the second derivative test, we can identify the location and type of the maximum or minimum point, equation that reveals the minimum or maximum value without changing its form. The quadratic equation, given by the general form y = ax^2 + bx + c, is an ideal example to consider.

A quadratic equation represents a parabola, which has either a minimum or maximum value depending on the coefficient "a". If "a" is positive, the parabola opens upwards and has a minimum value, and if "a" is negative, the parabola opens downwards and has a maximum value. The minimum or maximum value is located at the vertex of the parabola.

To find the x-coordinate of the vertex, you can use the formula x = -b/(2a). By plugging the values of "a" and "b" from the quadratic equation, you can determine the x-coordinate of the vertex. Then, you can substitute this x-coordinate back into the original equation to find the corresponding y-coordinate, revealing the minimum or maximum value of the function without changing its form.

To summarize, the quadratic equation y = ax^2 + bx + c is a suitable example that reveals the minimum or maximum value without altering the equation's form. By finding the vertex of the parabola using the formula x = -b/(2a), you can determine the minimum or maximum value of the function.

To learn more about quadratic equation, click here:

brainly.com/question/30098550

#SPJ11

The experimental probability that the next person at the booth will win a prize is 40%.

In this particular case, out of a total of 35 trials (people), there were 14 individuals who snagged a prize and the other 21 who did not. Consequently, we are able to calculate the experimental probability of the next person at the booth succeeding in winning a prize as such:

Number of Winners / Total Number of Participants

= 14 / 35

= 0.4 or 40%

Learn more about probability on

https://brainly.com/question/24756209

#SPJ1

a) The equation y = 35(0.57)ˣ represents a decay.

b) The rate of decay is 43% per period.

c) The decay factor is 0.57 or 57% per period.

d) The initial amount is $35.

e) The equation is an exponential decay function.

f) If x = 2, y will be $11.37.

An exponential decay function or equation can be represented by y = 35(0.57)^x  or 35(1 - 0.43)^x showing that the initial amount of $35 reduces by a constant rate of 43% per period.

Exponential functions are known by the consistent percentage rate increasing (growth) or decreasing (decay) over a period.

y = 35(0.57)ˣ

x = 2

y = 35(0.57)^2

= $11.37

Learn more about exponential functions at https://brainly.com/question/2456547.

#SPJ1

The kangaroo maximum height is 8.5 feet

From the question, we have the following parameters that can be used in our computation:

Initial height = 4 ft

Initia; velocity = 24 ft/s

We start by writing the height function as

h(t) = -32t^2 + 24t + 4

Where

32 = acceleration of gravity

So, we differentiate and set to 0

-64t + 24 = 0

Solve for t

t = 24/64

So, we have

Max height = -32(24/64)^2 + 24(24/64) + 4

Evaluate

Max height = 8.5

Hence, the max height = 8.5

Read more about height function at

https://brainly.com/question/10837575

#SPJ1

The domain and the range of f(x) are given as follows:

Hence the domain and the range for the graphed function are given as follows:

More can be learned about domain and range of functions at https://brainly.com/question/26098895

#SPJ1

To generate a data set of integer values ranging from 1 to 1000 (inclusive) using a seed and a desired size between 3 and 500, you can utilize a random number generator. First, set the seed to ensure the reproducibility of the random numbers. Then, use the generator to create a data set of the desired size, where each value represents the length.

To generate a data set of integer values ranging from 1 to 1000 (inclusive) with a desired size and a given seed for the random number generator, you can use the following steps:

1. Set the seed for the random number generator using the given seed value.
2. Generate the desired size of the data set, using the random number generator to generate a random integer value between 1 and 1000 (inclusive) for each value in the set. You can do this using a loop or a list comprehension, depending on your preference.
3. Each value in the data set represents the length, so you can use the generated integer value directly as the length for that value.

Here's some sample Python code that shows how to generate a data set of size 10 with a seed of 12345:

```
import random

seed_value = 12345
size = 10

random.seed(seed_value)
data_set = [random.randint(1, 1000) for i in range(size)]
```

This code sets the seed value to 12345, generates a data set of size 10, and stores the resulting list of integers in the `data_set` variable.

Learn more about integer here:

https://brainly.com/question/15276410

#SPJ11

We need to keep in mind that in practice, it would not be appropriate to use the regression line to make a prediction if the correlation coefficient is not statistically significant. This is because the relationship between age and bone density may not be strong enough to make accurate predictions.

Based on the data provided in the table, we can use the equation of the regression line, y = bo + b1x, to predict a woman's bone density based on her age. The correlation coefficient for this data may or may not be statistically significant, which means we need to check if the relationship between age and bone density is strong enough to make predictions.

To calculate the regression line, we need to find the values of bo and b1. Using statistical software or a calculator, we can find that the regression line for this data is:

y = 378.8 - 2.2x

This means that for every one year increase in age, bone density decreases by 2.2 units.

To determine if the correlation coefficient is statistically significant, we need to calculate the p-value. If the p-value is less than 0.05, we can conclude that the relationship between age and bone density is statistically significant.

Using statistical software or a calculator, we can find that the correlation coefficient for this data is -0.93 and the p-value is less than 0.05, which means that the relationship between age and bone density is statistically significant.

Know more about correlation coefficient here:

https://brainly.com/question/15577278

#SPJ11

Answer: The researcher is interested in comparing the effect of different types of music on learning, with four independent groups of students exposed to different types of music. Therefore, she should use a one-way ANOVA (analysis of variance) test to analyze this data.

A one-way ANOVA test is used to compare the means of more than two independent groups, which is exactly what the researcher has in this case. It can determine whether there are statistically significant differences between the means of the groups, and if so, which groups differ from each other.

Therefore, the correct statistical test for this situation is a one-way ANOVA.

The second cross can be explained by the presence of a dominant brown gene and a recessive yellow gene.

The first brown dog was likely homozygous dominant for the brown gene, while the yellow dog was likely homozygous recessive for the yellow gene. The 12 brown offspring from their cross inherited one dominant brown gene from each parent. The second brown individual may have been heterozygous for the brown gene, meaning it carried one dominant brown gene and one recessive yellow gene. When this animal was crossed with the yellow dog, the six brown offspring inherited the dominant brown gene, while the six yellow offspring inherited the recessive yellow gene from both parents. Therefore, the results of the second cross support the idea of Mendelian inheritance and the presence of dominant and recessive genes.
Based on the information provided, the best explanation for the results of the second cross is that the brown dog is heterozygous (Bb) for the coat color gene, and the yellow dog is homozygous recessive (bb). In the second cross, the heterozygous brown dog (Bb) mated with the yellow dog (bb), resulting in a 1:1 ratio of brown (Bb) and yellow (bb) offspring. This is consistent with Mendelian inheritance, where a dominant allele (B) is responsible for the brown coat and a recessive allele (b) is responsible for the yellow coat.

Visit here to learn more about gene brainly.com/question/8832859

#SPJ11

The missing information for q2 is the mean squares for treatment, which can be calculated by dividing the sum of squares for treatment. The missing information for q3 is the sum of squares for error.The missing information for q4 is the mean squares for error, which can be calculated by dividing the sum of squares for error.To find the p-value for the above ANOVA table, we need to use the F-distribution with degrees of freedom for treatment  and degrees of freedom for error.

Using the given mean squares for treatment (25.25) and mean squares for error (2.95), we can calculate the F-statistic as follows:

F = mean squares for treatment / mean squares for error
F = 25.25 / 2.95
F = 8.5593

The p-value can then be calculated using a one-tailed F-test with alpha level of 0.05:

p-value = pf(F, degrees of freedom for treatment, degrees of freedom for error)
p-value = pf(8.5593, 3, 16)
p-value = 0.0006

Therefore, the answer is A.
Q2: Mean squares (treatment) = Sum of squares (treatment) / Degree of freedom (treatment)
Mean squares (treatment) = 75.75 / 3
Mean squares (treatment) = 25.25
So, the answer for q2 is: a. 25.25

Q3: Mean squares (error) = Sum of squares (error) / Degree of freedom (error)
Mean squares (error) = 47.2 / 16
Mean squares (error) = 2.95
So, the answer for q3 is: b. 2.95

Q4: F-value = Mean squares (treatment) / Mean squares (error)
F-value = 25.25 / 2.95
F-value ≈ 8.5593
So, the answer for q4 is: c. 8.5593

Q5:P-value = 1 - pf(F-value, Degree of freedom (treatment), Degree of freedom (error))
P-value = 1 - pf(8.5593, 3, 16)

So, the answer for question 5 is: c. 1- pf(8.5593, 3, 16)

To learn more about F distribution : brainly.com/question/31428881

#SPJ11

There are 48 ways to seat three couples be seated so that each couple sits together. To determine the number of ways three couples can be seated so that each couple sits together.

You can use the following approach:

1. Treat each couple as a single unit. There are three units (couples) to arrange, so there are 3! (3 factorial) ways to arrange them, which is 3 * 2 * 1 = 6 ways.

2. Within each couple, there are 2! (2 factorial) ways to arrange the individuals, which is 2 * 1 = 2 ways.

3. Combine the arrangements of couples and individuals: 6 ways (couples) * 2 ways (individuals within a couple) * 2 ways (individuals within a couple) * 2 ways (individuals within a couple) = 6 * 2^3 = 6 * 8 = 48 ways.

So, there are 48 ways in which three couples can be seated so that each couple sits together.

Learn more about couples here:

https://brainly.com/question/28412526

#SPJ11

If the stock sells for $58 a share the Dragon company's cost of equity will be 8.97%.

The cost of equity is the return that investors require from the stock of the company. We have to use the DDM (Dividend discount model) here,

The formula for the DDM is,

P₀ = D₁/(ke - g), current stock price is P₀, the expected dividend per share in the next period is D₁, required rate of return (cost of equity) is ke, and expected growth rate of dividends  g.

In this case, we have,

D₁ = D₀ x (1 + g)

= $2.85 x (1 + 0.036)

= $2.95 (expected dividend per share in the next period)

P₀ = $58 (current stock price)

g = 0.036 (expected growth rate of dividends)

Substituting these values into the DDM formula, we get,

$58 = $2.95 / (ke - 0.036)

Solving for ke, we get,

ke = ($2.95 / $58) + 0.036

= 0.0897 or 8.97%

Therefore, Dragon Company's cost of equity is 8.97%.

To know more about cost of equity, visit,

https://brainly.com/question/30761849

#SPJ4

The expression using the properties of exponents will be  [tex]3( x^{2/3} y z ^{4/3})[/tex]

Noted that Exponentiation(the process of raising some number to some power) have some basic rules as:

[tex]^n\sqrt{a} = a^{1/n} \\\\(ab)^c = a^c \times b^c\\\\a^b = a^b \implies b= c \[/tex]

We are given that the expression as;

[tex]\sqrt[3]{27 x^2 y^3 z ^4} \\\\[/tex]

Solving the expression by the Exponentiation property;

[tex]\sqrt[3]{27 x^2 y^3 z ^4}[/tex]

[tex]3( x^{2/3} y z ^{4/3})[/tex]

Thus, the answer will be [tex]3( x^{2/3} y z ^{4/3})[/tex]

Learn more about exponentiation here:

https://brainly.com/question/26938318

#SPJ1

In the polygons above, the similar parts and angles are enumerated below.

1) ∠PMN ~ to ∠JKL
∠KJL ~ ∠MPN
∠KLJ ~ ∠MNP

Sides
KJ  ~ MP
PN ~  JL
MN ~  KL

2) YR ~ YX
YZ ~  YS

∠XYZ = ∠RST
∠YRS ≅ ∠YXZ
∠YSR ≅ ∠YZX


3) KL ~  SR
  JM ~  PQ
  KJ ~ QR
∠KJM ~ ∠RQP
∠LMJ ~  ∠SPQ
∠KLM ~ RSP


Part 1:

AD ~  EH and
DC ~  HG
AB ~ EF and
BC ~ FG

Justification:

AD/DC = EH/HG
4/7 = 2/3.5

If we divide the numerator and denomination of 4/7 by 2, we have:

2/3.5 = EH/HG

This means that AD is related to DC in the same ration with which EH is related to HG.

This analysis is also true for :

AB/BC in relation to EF/EF

Learn more  about similar sides and angles:
https://brainly.com/question/30857117
#SPJ1

The projection of the point (4,4) onto the line passing through (3,1) is the point on the line that is closest to (4,4). To find this projection, we need to first find the direction vector of the line, which is (3-1, 1-0) = (2,1).

Next, we need to find the vector from the point (3,1) to the point (4,4), which is (4-3, 4-1) = (1,3).

Then, we can use the formula for projecting a vector onto another vector:

proj_v u = ((u · v) / (v · v)) v

where u is the vector we want to project, v is the vector we want to project onto, and · denotes the dot product.

Applying this formula, we get:

proj_v u = ((1,3) · (2,1)) / ((2,1) · (2,1)) (2,1)

= (5/5) (2,1)

= (2,1)

So the projection of (4,4) onto the line passing through (3,1) is the point (3,1) + (2,1) = (5,2).

To find the projection of vector (4, 4) onto vector (3, 1), you can follow these steps:

Step 1: Calculate the dot product of the two vectors.
Dot product = (4 * 3) + (4 * 1) = 12 + 4 = 16

Step 2: Calculate the magnitude squared of the vector you are projecting onto (3, 1).
Magnitude squared = (3 * 3) + (1 * 1) = 9 + 1 = 10

Step 3: Divide the dot product by the magnitude squared.
Scalar = 16 / 10 = 1.6

Step 4: Multiply the scalar by the vector you are projecting onto (3, 1) to find the projection.
Projection = 1.6 * (3, 1) = (4.8, 1.6)

So, the projection of (4, 4) onto (3, 1) is (4.8, 1.6).

learn nine about projection here:brainly.in/question/2210182

#SPJ11

Answer: 8 hours

Step-by-step explanation:

You can create an algebraic equality equation to solve for the amount of hours required to produce 2320 watts of power.

The equation would look something like this:

[tex]\frac{5}{1450}=\frac{x}{2320}[/tex]

Answer:

It will take 8 hours

Step-by-step explanation:

[tex]\frac{1450}{5}[/tex] = [tex]\frac{2320}{x}[/tex]

1450 x 1.6 = 2320

5 x 1.6 = 8

Helping in the name of Jesus.

To write (10^2)^-3 as a power of 10 with a single exponent, we can use the property of exponents that states that when we raise a power to another power, we multiply the exponents. So:

(10^2)^-3 = 10^(2*-3) = 10^(-6)

Therefore, (10^2)^-3 can be written as 10^-6 with a single exponent of -6.

Answer:

10^-6 as a power of 10 with a single exponent.

Step-by-step explanation:

To write (10^2)^-3 as a power of 10 with a single exponent, we can simplify the expression by using the rule that states that when we raise a power to another power, we multiply the exponents.

Therefore:

(10^2)^-3 = 10^(2*-3) = 10^(-6)

Therefore, (10^2)^-3 is equivalent to 10^-6 as a power of 10 with a single exponent.

Mr. Billings needs to reduce his water usage to 2.7 HCF in order to have a water bill of less than $200.

We have,

To calculate Mr. Billings' water bill, we need to know how much water he used during the month of August.

Let's assume that he used x HCF of water.

We can then use the tiered billing rates to calculate his total water bill.

For the first 8 HCF, the billing rate is $3.64 per HCF,

so the cost for this tier is 3.64x.

For usage between 8 and 24 HCF, the billing rate is $4.08 per HCF,

so the cost for this tier is (24-8) x $4.08 = 61.44.

For usage between 24 and 36 HCF, the billing rate is $5.82 per HCF,

so the cost for this tier is (36-24) x $5.82 = 69.84.

For usage over 36 HCF, the billing rate is $8.19 per HCF,

so the cost for this tier is (x-36) x $8.19.

Now,

Total water bill

= $37.78 + 3.64x + 61.44 + 69.84 + (x-36) x $8.19

= $168.86 + 11.55x

To find the amount of water usage that Mr. Billings needs to reduce in order to have a water bill of less than $200, we can set the total water bill to $200 and solve for x:

$200 = $168.86 + 11.55x

$31.14 = 11.55x

x = 2.7 HCF

So,

Mr. Billings needs to reduce his water usage to 2.7 HCF in order to have a water bill of less than $200.

Similarly,

To find the amount of water usage that Mr. Billings needs to reduce in order to have a water bill of less than $150, we can set the total water bill to $150 and solve for x:

$150 = $168.86 + 11.55x

-$18.86 = 11.55x

x = -1.63 HCF

Since water usage cannot be negative, there is no solution to this problem. Therefore, it is not possible for Mr. Billings to have a water bill of less than $150, given his current water usage and the tiered billing rates.

Thus,

Mr. Billings needs to reduce his water usage to 2.7 HCF in order to have a water bill of less than $200.

Learn more about expressions here:

https://brainly.com/question/3118662

#SPJ1

Answer:

360.

Step-by-step explanation:

Since 18 and 20 make a right angle and touch together, they are the base and height.

For example,

base = B

height = H

A = B x H

A = 18 x 20

A = 360 ft. squared

TIP: Always make sure your area answer is squared or else your teacher will correct it wrong. ^^

The correct interpretation is C. The p-value should be higher than 0.05.

This means that we cannot reject the null hypothesis that there is no difference in strength between the right and left arms. The confidence interval includes 0, which supports this conclusion.


This interpretation is correct because the 95% confidence interval for the true mean difference includes negative values, which suggests that there is a significant difference between the right and left arm strength, with the right arm being stronger for right-handed individuals. If the p-value is smaller than 0.05, it means that the observed results are statistically significant at the 95% confidence level.

In statistics, the null hypothesis is a statement that suggests that there is no significant difference between two measured phenomena or that there is no relationship between them. It is typically denoted as H0 and is used as a basis for statistical inference.

The null hypothesis is usually the opposite of the alternative hypothesis, which is a statement suggesting that there is a significant difference or relationship between the phenomena being measured. The goal of statistical hypothesis testing is to determine whether there is enough evidence to reject the null hypothesis in favor of the alternative hypothesis.

Visit here to learn more about null hypothesis brainly.com/question/28920252

#SPJ11

Step-by-step explanation:

answer is in the photo

..

.