"I am struggling with calculating the p-value. I am using z as
the test statistic and have found that z=-4.22. Please help with
finding the p-value. Thank you.
The output voltage for an electric circuit is specified to be 130. A sample of 40 independent readings on the voltage for this circuit gave a sample mean 128.6 and standard deviation 2.1. (a) Test the hypothesis that the average output voltage is 130 against the alternative that it
is less than 130. Use a test with level.05. Report the p-value as well.

The value of the probability of selecting gray marble is,

⇒ 4 / 9

We have to given that;

A bag contains 3 black, 2 white marbles, and 4 gray marbles.

And,  A marble Is replaced before picking a second marble.

Hence, We get;

Total marbles = 3 + 2 + 4

                      = 9

And, Number of gray marbles = 4

Thus, The value of the probability of selecting gray marble is,

⇒ 4 / 9

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Answer:

19

Step-by-step explanation:

The maximum amount of the sum of digits that can be obtained from a digital clock is 27.

To see why, note that the maximum value for the hour digits is 23 (since the clock uses a 24-hour format). The sum of digits in 23 is 2+3=5.

For the minute digits, the maximum value is 59. The sum of digits in 59 is 5+9=14.

Adding the two sums of digits together, we get:

5 + 14 = 19

Therefore, 19 is the maximum sum of digits that can be obtained from the hour and minute digits on a digital clock

Transportation refers to the different ways that people and/or products are moved from one location to another. The majority of the men surveyed use public transportation to get to work.

Transportation refers to the different ways that people and/or products are moved from one location to another. The ability and necessity to move increasing numbers of people or things across great distances at fast speeds in safety and comfort has grown, and this is a sign of civilization in general and of technical advancement in particular.

The majority of women surveyed use private transportation to get to work. True

The majority of the people surveyed who use private transportation to get to work are men. False

The majority of the people surveyed who use public transportation to get to work are women. True

The majority of the men surveyed use public transportation to get to work. False

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Answer:

The majority of women surveyed use private transportation to get to work.

true

The majority of the people surveyed who use private transportation to get to work are men.

false

The majority of the people surveyed who use public transportation to get to work are women.

true

The majority of the men surveyed use public transportation to get to work.

false

Step-by-step explanation:

Got this on study island

The area of the equilateral triangle that has an apothem of 14cm and a side length of 48.5 cm is 1019.25 square centimeters.

An equilateral triangle is a triangle in which all sides are equal and all angles are 60 degrees. The apothem of an equilateral triangle is the perpendicular distance from the center of the triangle to one of its sides.

To find the area of the equilateral triangle, we can use the formula:

Area = (1/2) x apothem x perimeter

where perimeter is the sum of the lengths of all three sides of the triangle.

In this case, the apothem is given as 14 cm and the side length is given as 48.5 cm. Since the triangle is equilateral, all three sides are equal to 48.5 cm.

Therefore, the perimeter of the triangle is:

Perimeter = 3 x 48.5 cm = 145.5 cm

Now we can substitute the values of the apothem and perimeter into the formula for the area:

Area = (1/2) x 14 cm x 145.5 cm = 1019.25 cm²

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a) The parameter of interest is the percentage of mail items received at the dorm that are considered packages. This can be denoted as p, where p is the proportion of packages out of all mail items received at the dorm. A confidence interval would be most appropriate for this inference procedure.

b) The parameter of interest is the difference in the average number of packages sent from online retailers to a neighborhood in Champaign and the average number of packages sent from online retailers to a neighborhood in Urbana. This can be denoted as μ1 - μ2, where μ1 is the average number of packages sent to Champaign and μ2 is the average number of packages sent to Urbana. A hypothesis test would be most appropriate for this inference procedure.

c) The parameter of interest is the difference in store pick-up rates between all cookies and all cakes sold by the bakery. This can be denoted as p1 - p2, where p1 is the proportion of cookies that are picked up in store and p2 is the proportion of cakes that are picked up in store. A confidence interval would be most appropriate for this inference procedure.

d) The parameter of interest is the association between the weight of the package and the delivery time. This can be denoted as ρ, where ρ is the correlation coefficient between the weight of the package and the delivery time. A hypothesis test would be most appropriate for this inference procedure.

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The transition probability matrix is:

[tex]\left[\begin{array}{cccc}0.5&0.1&0.2&0.2\\0.75&0&0.6 &0.3\\0.1&0.5&0 &0.1\\0.05&0.1&0.25&0\end{array}\right][/tex]

What is matrix?

A matrix is a rectangular array of numbers or other mathematical objects for which operations such as addition, subtraction, multiplication, and scalar multiplication are defined.

The Markov chain for housing movements can be formulated as follows:

State 1: Apartment

State 2: Condominium

State 3: Own House

State 4: Rented House

The transition probability matrix P is given by:

[tex]\left[\begin{array}{cccc}P_{11}&P_{12}&P_{13} &P_{14}\\P_{21}&P_{22}&P_{23} &P_{24}\\P_{31}&P_{32}&P_{33} &P_{34}\\P_{41}&P_{42}&P_{43} &P_{44}\end{array}\right][/tex]

where [tex]$P_{ij}$[/tex] is the probability of moving from state i to state j. To calculate these probabilities, we need to use the data from the survey.

For example, [tex]$P_{12}$[/tex] is the probability of moving from an apartment to a condominium. From the survey data, we can see that out of 200 apartment dwellers, 100 moved to another apartment, 20 moved to a condominium, 40 moved to their own house, and 40 moved to a rented house. Therefore, [tex]$P_{12} = 20/200 = 0.1$[/tex].

Similarly, we can calculate the other transition probabilities:

[tex]P_{13} = 40/200 = 0.2$\\$P_{14} = 40/200 = 0.2$\\$P_{21} = 150/200 = 0.75$\\$P_{23} = 120/200 = 0.6$\\$P_{24} = 60/200 = 0.3$\\$P_{31} = 20/200 = 0.1$\\$P_{32} = 100/200 = 0.5$\\$P_{34} = 20/200 = 0.1$\\$P_{41} = 10/200 = 0.05$\\$P_{42} = 20/200 = 0.1$\\$P_{43} = 50/200 = 0.25$[/tex]

Therefore, the transition probability matrix is:

[tex]\left[\begin{array}{cccc}0.5&0.1&0.2&0.2\\0.75&0&0.6 &0.3\\0.1&0.5&0 &0.1\\0.05&0.1&0.25&0\end{array}\right][/tex]

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The end of the stencil located at (9, 3).

We have,

The beginning of the left edge of the stencil falls at (1, −1).

She wants to align an important detail on the left edge of her stencil at

(3, 0).

Ratio = m:n = 1:3

Using section formula

3 = (x + 3)/4

x+3 = 12

x = 9

and, 0 = (y - 3)/4

y= 3

Thus, the end point are (9, 3).

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The approximate value of yz is 13.85641.

We can simplify the expression for yz by using the fact that the square root of a product is equal to the product of the square roots:

yz = √24 × √80

yz = √(24×80) (using the property of square root of product)

yz = √(1920)

we can simplify √(1920) by factoring out perfect squares.

First, we note that 1920 is divisible by 16,

so we can write:

√(1920) = √(16×120)

Next, we note that 1920 is divisible by 16,

so we can write:

√(16120) = √(164×30)

               = √(16×4)×√30

               = 8√30

Therefore, yz is approximately 8√30.

To get a numerical approximation, we can use a calculator or a tool such as Wolfram Alpha to get:

yz = 13.85641 (rounded to 5 decimal places).

Therefore, the approximate value of yz is 13.85641.

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The argument is valid as it follows the definition of the Fourier transform for both ranges of the function f(t).

(a) To convert the argument into symbolic notation, let's denote the Fourier transform of f(t) as F(w):

f(t) = sin(3t), for k ≤ |t| ≤ 2k

0, for |t| > 2k

F(w) = (1/2) * [(sin(2kw - 3) - sin(kw - 3)) / (kw - 3) + (sin(kw + 3) - sin(2kw + 3)) / (kw + 3)]

(b) To show that the argument is valid, we need to demonstrate that the expression for F(w) derived above satisfies the definition of the Fourier transform:

F(w) = (1/√(2π)) * ∫[from -∞ to +∞] f(t) * e^(-iwt) dt

Let's examine the validity of the argument:

For k ≤ |t| ≤ 2k:

In this range, the function f(t) is sin(3t). We substitute f(t) = sin(3t) into the integral expression and evaluate it to obtain the expression for F(w).

For |t| > 2k:

In this range, the function f(t) is 0. Since the Fourier transform of a zero function is also zero, F(w) = 0 in this case.

Therefore, the argument is valid as it follows the definition of the Fourier transform for both ranges of the function f(t).

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(a) Mode does not exist for this data set.
(b) Mean would be affected by the change.
(c) None of these measures would be changed.
(d) Mean is greater than median for the original data set.

a) All measures of central tendency exist for this data set: Mean, Median, and Mode.
b) If the smallest measurement (26) were replaced by 6, the affected measures of central tendency would be:
  - Mean
c) If the largest measurement were removed from the original data set, the affected measures of central tendency would be:
  - Mean
d) For the original data set, which has a significant skew to the right, the relative values of the mean and median are:
  - Mean is greater

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The solution is, the value of x is, x = 15.

Corresponding sides have the same ratio:

 UV/PR = TV/QR

 (x +6)/14 = (x -3)/8

 4(x +6) = 7(x -3) . . . . . . multiply by 56

 4x +24 = 7x -21 . . . . . . eliminate parentheses

 45 = 3x . . . . . . . . . . . add 21-4x

 15 = x . . . . . . . . . . . .divide by 3

Alternate solution

The long-side : short-side ratios for the two triangles are ...

 14 : 8 = (x +6) : (x -3)

If we look at the differences between the ratio numbers we see ...

 14 -8 = 6

 (x +6) -(x -3) = 9

That is, the numbers in the second ratio must be 9/6 = 3/2 times the numbers in the first ratio. In other words, ...

 x -3 = (3/2)(8) = 12

 x = 15

Check: x +6 = 3/2(14) ; 15 +6 = 21

The solution is, the value of x is, x = 15.

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complete question:

question is given in the picture.

The critical region would be in the tail of the null distribution corresponding to the alpha level (0.05), which is the upper 5%.

We have,

The critical region would be in the upper 5% of the null distribution.

This is because alpha is the probability of making a type I error (rejecting the null hypothesis when it is actually true),

In this case,

We are looking for evidence that the population mean is greater than 1.2.

Therefore,

The critical region would be in the tail of the null distribution corresponding to the alpha level (0.05), which is the upper 5%.

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The two events are rolling a 1 on fair die and rolling even number .

Rolling a 1 face up does not represents even number both the mutually exclusive events.

Rolling a fair die twice represents independent events.

Main difference is both will not occur at the same time.

Mutually exclusive events represents the events are disjoint set.

Suppose from the field of interest like to studying,

The events of rolling a '1' on a fair six-sided die and rolling an 'even number' on the same die.

A scenario in which these events are mutually exclusive is,

When the die shows a '1' face-up after rolling.

The event of rolling an even number did not occur since '1' is an odd number.

Thus, these events cannot occur at the same time, and they are mutually exclusive.

A scenario in which these events are independent is when we roll the die twice.

The first roll may result in an odd or even number.

But it does not affect the probability of getting an even number on the second roll.

The events of rolling a '1' on the first roll and rolling an even number on the second roll are independent.

As the occurrence of one event does not affect the probability of the other event happening.

The main difference between mutually exclusive and independent events is,

That mutually exclusive events cannot occur at the same time.

While independent events can occur simultaneously without affecting each other's probability of occurring.

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Answer:

  -0.1, 1.3

Step-by-step explanation:

You want the solutions to the quadratic equation 5x² -2x -1 = 4x.

The equation can be put in standard form by subtracting 4x:

  5x² -6x -1 = 0

  5(x² -6/5x +(6/10)²) -1 -5(6/10)² = 0 . . . . . complete the square

  5(x -0.6)² = -2.8 . . . . . . . . . . . . . subtract 2.8

  x = 0.6 ± √0.56 = -0.1 or 1.3 . . . . . . . divide by 5 and take square root

Solutions to the equation are x = -0.1 and x = 1.3.

__

Additional comment

The square is completed by making the trinomial in parentheses have the form x² -2ax +a², where 'a' is half the coefficient of the x-term. When we add a² inside parentheses, we need to subtract an equivalent quantity outside parentheses.

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The account that has the greater principal is account B.

Simple interest is a linear function of the amount invested (the principal), the interest rate and the duration of the investment.

The formula that can be used to determine simple interest is:

Interest = principal x time x interest rate

Principal = interest / (time x interest rate)

Principal in account A = $15.75 / (0.03 x (21/12)) = $300

Principal in account B = $28 / (0.04 x (21/12)) = $400

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To express the integral e f(x, y, z) dv as an iterated integral in six different ways, where e is the solid bounded by the given surfaces, we need to determine the limits of integration for each variable. Let's assume that the solid e is bounded by the surfaces g1(x,y,z), g2(x,y,z), h1(x,y,z), and h2(x,y,z).

The first way to express the integral is by integrating with respect to x first, then y, then z:
∫∫∫e f(x, y, z) dv = ∫h1(z)h2(z) ∫g1(y,z)x ∫g2(y,z)x f(x,y,z) dx dy dz

The second way is by integrating with respect to y first, then x, then z:
∫∫∫e f(x, y, z) dv = ∫g1(x)g2(x) ∫h1(z)y ∫h2(z)y f(x,y,z) dy dx dz

The third way is by integrating with respect to z first, then x, then y:
∫∫∫e f(x, y, z) dv = ∫g1(x)g2(x) ∫h1(y)x ∫h2(y)x f(x,y,z) dz dx dy

The fourth way is by integrating with respect to x first, then z, then y:
∫∫∫e f(x, y, z) dv = ∫g1(y)g2(y) ∫h1(z)y ∫h2(z)y f(x,y,z) dx dz dy

The fifth way is by integrating with respect to y first, then z, then x:
∫∫∫e f(x, y, z) dv = ∫h1(x)h2(x) ∫g1(z)x ∫g2(z)x f(x,y,z) dy dz dx

The sixth way is by integrating with respect to z first, then y, then x:
∫∫∫e f(x, y, z) dv = ∫h1(x)h2(x) ∫g1(y)z ∫g2(y)z f(x,y,z) dz dy dx

In all six ways, the limits of integration are determined by the bounding surfaces of the solid e. By integrating iteratively with respect to each variable, we can find the volume of the solid e.
The solid E is bounded by the given surfaces.

Here are the six different ways to express the integral as an iterated integral:

1.

dx dy dz order:
∫∫∫_E f(x, y, z) dx dy dz

2.

dx dz dy order:
∫∫∫_E f(x, y, z) dx dz dy

3.

dy dx dz order:
∫∫∫_E f(x, y, z) dy dx dz

4.

dy dz dx order:
∫∫∫_E f(x, y, z) dy dz dx

5.

dz dx dy order:
∫∫∫_E f(x, y, z) dz dx dy

6.

dz dy dx order:
∫∫∫_E f(x, y, z) dz dy dx

Each of these six ways represents a different order of integrating the function f(x, y, z) over the solid E, which is bounded by the given surfaces. The choice of the order of integration depends on the specific problem and the boundaries of the solid E. When solving a problem, you should carefully analyze the given surfaces and choose the most suitable order of integration to make the calculations easier.

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The gardener used 61.5 gallons of gasoline in his lawn mowers in the one month.

Let's call the amount of gasoline used in the lawn mowers "x".

We know that the total amount of gasoline used is 61.5 gallons, so:

x + (the amount used for other things) = 61.5

We don't know how much was used for other things, but we do know that "of the total amount of gasoline" used, a certain percentage was used in the lawn mowers. Let's call that percentage "p".

"Of" means "times", so we can write:

p * 61.5 = x

Now we have two equations:

x + (the amount used for other things) = 61.5

p * 61.5 = x

We want to solve for x, so let's isolate it in the second equation:

p * 61.5 = x

x = p * 61.5

Now we can substitute that into the first equation:

p * 61.5 + (the amount used for other things) = 61.5

Simplifying:

p * 61.5 = 61.5 - (the amount used for other things)

p = (61.5 - the amount used for other things) / 61.5

We don't know the exact amount used for other things, but we do know that it's less than or equal to 61.5, so:

p = (61.5 - something) / 61.5

p = (61.5 - 0) / 61.5

p = 1

So all of the gasoline was used in the lawn mowers, and:

x = 1 * 61.5

x = 61.5

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Answer: No, it is not.

Step-by-step explanation:

To figure out if a shape is a right triangle, we need to use the pythagorean theorem, which states that a^2 + b^2 = c^2.

In this case, a is equal to 5, b is equal to 9.2, and c is equal to 14.

a^2 is equal to 25 and b^2 is equal to 84.64, we can add these two values together to get 109.64.

Now, we calculate 14^2, which is 196.

We now have something to determine, is 109.64 equal to 196?

Since these two numbers are not equal to each other, the answer is no, and that means this triangle is not a right triangle.

Answer:

Triangle ABC is not a right triangle, as the sum of the squares of the shortest two sides do not equal to the square of the longest side.

Step-by-step explanation:

Pythagoras Theorem explains the relationship between the three sides of a right triangle. The square of the hypotenuse (longest side) is equal to the sum of the squares of the legs of a right triangle:

[tex]\boxed{a^2+b^2=c^2}[/tex]

where:

As we have been given the measures of all three sides of triangle ABC (where AB and AC are the shortest sides, and BC is the longest side), we can use Pythagoras Theorem to determine if the triangle is a right triangle.

If triangle ABC is a right triangle, then AB and AC will be the legs, and BC will be the hypotenuse.

Substitute the values into the formula:

[tex]\implies AB^2+AC^2=BC^2[/tex]

[tex]\implies 5^2+9.2^2=14^2[/tex]

[tex]\implies 25+84.64=196[/tex]

[tex]\implies 109.64=196[/tex]

As 109.64 does not equal 196, triangle ABC is not a right triangle.

Answer:

they jumped

Step-by-step explanation:

They jump because they want to escape Mario and Javier. Paula is very nervous because there are many people, it is not possible to escape quickly

I hope I’m right if not I’m sorry

Answer:4x

Step-by-step explanation:

3+1= 4, so just add the x

4x

Answer: was there a number with the equaision

Step-by-step explanation:

If the population of the city in 2010 was 2 million and is growing at the rate of 0.5% a year. The population of the city n years after 2010 is equal to 1.005^n (2). The correct answer is 2nd option.

The population of the city in 2010 was 2 million and is growing at the rate of 0.5% a year. We need to find the population of the city n years after 2010.

The formula to calculate the population after n years is:

Population = Initial Population * (1 + growth rate)^n

In this case, the initial population is 2 million and the growth rate is 0.5% (or 0.005 in decimal form).

So the formula for the population n years after 2010 is:

Population = 2 * (1 + 0.005)^n

Simplifying the expression:

Population = 2 * (1.005)^n

Population = (1.005)^n(2)

Therefore,  the population of the city n years after 2010 is equal to (1.005)^n(2).

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After purchasing a carpet that is 5 feet long and 6 feet wide, Felicia cut off a section of 8 square feet so the area of the remaining piece of carpet is 22 square feet.

To find the area of the remaining piece of carpet, we need to subtract the area that Felicia cut off from the total area of the carpet.

The total area of the carpet is the product of its length and width, which is:

5 feet x 6 feet = 30 square feet

Felicia cut off 8 square feet from the carpet, so the area of the remaining piece of carpet is:

30 square feet - 8 square feet = 22 square feet

Therefore, the area of the remaining piece of carpet is 22 square feet.

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Answer:

3/14 as a fraction or 0.21428571428 as a decimal

Step-by-step explanation:

The Venn diagram can be used to visualize the different probabilities and relationships between events, and Bayes' theorem can be used to calculate conditional probabilities.

Let's start by drawing a Venn diagram to represent the probabilities given :

               _________________

              /                 \

             /                   \

            /        A∩B          \

           /                       \

          /_________________________\

         /                          \

        /                            \

       /          A\B               \

      /                              \

     /______________     ____________\

                    \   /

                     \ /

                      |

                      B

We know that:

P(A fails) = 0.35, which means P(A works) = 0.65

P(A and B fail) = 0.22

P(B fails alone) = 0.3, which means P(B works) = 0.7

To find (i) P(A fails alone), we need to subtract the probability of A and B failing together from the probability of A failing:

P(A fails alone) = P(A fails) - P(A and B fail) = 0.35 - 0.22 = 0.13

Therefore, the probability of A failing alone is 0.13.

To find (ii) P(A fails given that B has failed), we need to use Bayes' theorem:

P(A fails | B fails) = P(A∩B) / P(B fails)

We already know that P(A∩B) = 0.22 and P(B fails) = 0.3. So, we can substitute these values to get:

P(A fails | B fails) = 0.22 / 0.3 = 0.7333...

Therefore, the probability of A failing given that B has failed is approximately 0.7333.

In summary, the Venn diagram can be used to visualize the different probabilities and relationships between events, and Bayes' theorem can be used to calculate conditional probabilities.

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Result:

Probability that a student studied for 5 hours = C. 0.23

The find out the probability a student studied for 5 hours:

Divide the number of students who studied for 5 hours by the total number of students surveyed:

Probability = Number of students who studied / Total number of students surveyed

Given:

Number of students who studied for 5 hours = 7

Total number of students surveyed = 1 + 3 + 2 + 5 + 9 + 7 + 3 = 30

Therefore, probability for a student studied for 5 hours =

7 / 30 = 0.23 or 23%.

So, option C. 0.23 is correct.

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a. The probability that exactly two adults say they are more likely to make purchases during a sales tax holiday is 0.275.

b.  The probability that more than two adults say they are more likely to make purchases during a sales tax holiday is .305

c. The probability that between two and five adults say they are more likely to make purchases during a sales tax holiday, inclusive, is  0.736.

This is a binomial distribution problem with n = 10 and p = 0.28.

(a) The probability that exactly two adults say they are more likely to make purchases during a sales tax holiday is:

P(2) = (10 choose 2) * 0.28^2 * 0.72^8 = 0.275

Therefore, P(2) ≈ 0.275.

(b) The probability that more than two adults say they are more likely to make purchases during a sales tax holiday is:

P(x > 2) = 1 - P(x ≤ 2) = 1 - [P(0) + P(1) + P(2)]

= 1 - [(10 choose 0) * 0.28^0 * 0.72^10 + (10 choose 1) * 0.28^1 * 0.72^9 + (10 choose 2) * 0.28^2 * 0.72^8]

= 1 - (0.125 + 0.295 + 0.275)

≈ 0.305

Therefore, P(x > 2) ≈ 0.305.

(c) The probability that between two and five adults say they are more likely to make purchases during a sales tax holiday, inclusive, is:

P(2≤x≤5) = P(2) + P(3) + P(4) + P(5)

= (10 choose 2) * 0.28^2 * 0.72^8 + (10 choose 3) * 0.28^3 * 0.72^7 + (10 choose 4) * 0.28^4 * 0.72^6 + (10 choose 5) * 0.28^5 * 0.72^5

≈ 0.736

Therefore, P(2≤x≤5) ≈ 0.736.

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