the probabilities that a batch of computers will contain x defective computers are are given below. find the standard deviation for the probability distribution. round answer to the nearest hundredth. xp(x) ------------------------------- 0|0.533333 1|0.233333 2|0.233333 3|0.000000 what is the standard deviation for this probability distribution?

The solutions of the equation [tex]x^2 - 2x - 8 = 0[/tex] expressed in the form a + bi are 4 + 0i and -2 + 0i

To find the solutions of the equation [tex]x^2 - 2x - 8 = 0,[/tex]  we can use the quadratic formula:

[tex]x = (-b \pm \sqrt{(b^2 - 4ac)) / (2a), }[/tex]

where a, b, and c are the coefficients of the quadratic equation [tex]ax^2 + bx + c = 0.[/tex]

In this case, the coefficients are:

a = 1

b = -2

c = -8

Plugging these values into the quadratic formula, we get:

[tex]x = (-(-2) \pm \sqrt{ ((-2)^2 - 4(1)(-8))) / (2(1)) }[/tex]

= (2 ± √(4 + 32)) / 2

= (2 ± √36) / 2

= (2 ± 6) / 2

We have two possible solutions:

x = (2 + 6) / 2 = 8 / 2 = 4

x = (2 - 6) / 2 = -4 / 2 = -2

Therefore, the solutions to the equation[tex]x^2 - 2x - 8 = 0[/tex] are x = 4 and x = -2.

Expressing them in the form a + bi, where a and b are real numbers and i is the imaginary unit, we have:

x = 4 + 0i

x = -2 + 0i

Since both solutions are real numbers, there is no need to express them in the form a + bi. The solutions are 4 and -2.

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Answer: I think its 9 i could be wrong

Step-by-step explanation:

Answer:

Answer C.   x=10

Step-by-step explanation:

Similar triangles

Given that the base lines are parallel, the base angles will be corresponding angles for the transversal and will be congruent.  If one allows the up-down lines to continue to an intersection, one could form several triangles, all of which would be "Similar" to each other, due to their Angle-Angle congruence.

Similar triangles have all corresponding angles congruent between their triangles, and a consequence, all corresponding side-lengths between two triangles form a common proportion.

In other words, the ratio of the left side-length to the right side length is the same for both triangles.

Proportions

Despite that we don't actually have any full triangles, this concept extends for portions of a side length, so long as the bases are parallel.

So, since the ratio of the left side-length to the right side length is the same for both triangles, we can set up the following equation because both ratios are equal:

[tex]\dfrac{short~left~side}{long~left~side}=\dfrac{short~right~side}{long~right~side}[/tex]

[tex]\dfrac{6}{15}=\dfrac{x}{25}[/tex]

Solving a one-variable equation

From here, we're solving a single variable equation, where the variable only shows up once.  To solve for x, we need to disconnect the "dividing by 25" from it.  To undo that, we apply the opposite operation: multiplication.

Multiply both sides of the equation by 25...

[tex]\dfrac{6}{15}*25=\dfrac{x}{25}*25[/tex]

Notice on the right side of the equation that x is divided by 25, and then immediately multiplied by 25.  This will bring us right back to the value of x.

[tex]\dfrac{6}{15}*25=x[/tex]

Computing without a calculator

On the left side of the equation, to calculate it without a calculator, we could factor each number, and cancel common factors between the numerator and denominator:

[tex]\dfrac{2*3}{3*5}*5*5=x[/tex]

Notice that there is a 3 in the numerator and denominator.  Since there is no multiplication, this is effectively starting with 2, multiplying by 3, and then immediately dividing by 3, which will just bring us back to 2, before dividing by 5.  So, the 3s cancel, as collectively, they won't change the value of 2.

[tex]\dfrac{2}{5}*5*5=x[/tex]

Now, we have the same process with the 5s.  2 is first divided by 5, and then immediately multiplied by 5 (before being multiplied by another 5).  The division by 5 and the first multiplication by 5 will cancel, as they collectively won't change the value of the 2.

[tex]2*5=x[/tex]

Lastly, 2*5 is 10

[tex]10=x[/tex]

If you were allowed to use a calculator to calculate it, then that simplifies the work to getting that answer.

The value of the expression is 1/8. Option C

Index forms are simply defined as mathematical forms used in the representation of numbers that are too large or too small in more convenient ways.

Index forms are also referred to as scientific notation or standard forms.

The rules of index forms are;

From the information given , we have;

2²/2⁵

Subtract the exponents

2²⁻⁵

2⁻³

Represent the value

1/8

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The categories of the expressions are: 187.26 - (394 2/3) = negative, -3/7(1/3 - 11) = positive, (2/7 - 9/13) + (9/13 - 2/7) = zero and -18/13(0 - 13/18) = positive

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

187.26 - (394 2/3)

When evaluated, we have

187.26 - (394 2/3) = -207.41

This means that

187.26 - (394 2/3) = negative

Next, we have

-3/7(1/3 - 11)

When evaluated, we have

-3/7(1/3 - 11) = 4.57

This means that

-3/7(1/3 - 11) = positive

Next, we have

(2/7 - 9/13) + (9/13 - 2/7)

When evaluated, we have

(2/7 - 9/13) + (9/13 - 2/7) = 0

This means that

(2/7 - 9/13) + (9/13 - 2/7) = zero

Lastly, we have

-18/13(0 - 13/18)

When evaluated, we have

-18/13(0 - 13/18) = 1

This means that

-18/13(0 - 13/18) = positive

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Answer:

81

Step-by-step explanation:

We can solve for x by first using the definition of logarithms, which states that log base a of b is equal to c if and only if a raised to the power of c equals b.

Using this definition, we can rewrite the given equation as:

3^4 = x

Simplifying this expression, we get:

81 = x

Therefore, the value of x is 81.

The experimental probability is 29/100 and the number of workers that walk is 1102

The experimental probability of an event is based on the number of times the event has occurred during the experiment and the total number of times the experiment was conducted. Each possible outcome is uncertain and the set of all the possible outcomes is called the sample space.

The formula for this is given as;

P(E) = Number of occurrence of an event / Total number of times experiment is carried out.

a. Experimental probability = 29/100

b. To predict the total number of workers that walk, we can go as;

(29/100) * 3800 = 1102

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By using the power rule of integration, the solution for F(x) is: F(x) = [tex]4x^4 + 7x^2 + 7x - 23[/tex]

To find F, we need to integrate F'(x) with respect to x.
So, F(x) = ∫(16x³ + 14x + 7) dx
Using the power rule of integration, we can integrate each term separately.
∫(16x³) dx = [tex]4x^4[/tex] + C1
∫(14x) dx = 7x² + C2
∫(7) dx = 7x + C3
Adding all of these results, we get:
F(x) = [tex]4x^4[/tex] + 7x² + 7x + C
Now, we need to use the initial condition F(1) = -5 to solve for the constant C.
F(1) = [tex]4(1)^4[/tex] + 7(1)² + 7(1) + C = -5
Simplifying this equation, we get:
4 + 7 + 7 + C = -5
C = -23
Therefore, the solution for F(x) is: F(x) = [tex]4x^4 + 7x^2 + 7x - 23[/tex]

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The value of 4.62 times 3.78 equals 17.4828.

We have to find  4.62 times 3.78 in standard algorithm

To multiply 4.62 by 3.78 using the standard algorithm, follow these steps:

 4.62

x 3.78

------

 27756  (multiply 8 by 2)

+184368  (multiply 7 by 2, then 8 by 6, and add to the previous result)

-------

 17.4828  (the final answer)

Hence, the value of 4.62 times 3.78 equals 17.4828.

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Answer:

the answer will be -3

Step-by-step explanation:

Shape D can be rotated [tex]\underline{270^{o}}[/tex] clockwise about the point (1, 3) to give shape C.

To find the values of blanks, the rotational relationship between Shape C and Shape D should be considered. Shape C is rotated 90° clockwise about the point (1, 3) to give Shape D.

We can conclude that Shape D can be rotated 270° because a full rotation is [tex]360^{o}[/tex]. It means turning around until your point in same direction again.

So, C [tex]\xrightarrow{90^{o}\ clockwise }[/tex] D [tex]\xrightarrow{270^{o}\ clockwise }[/tex] C

The center if rotation should stay the same.

This means that if we rotate Shape D 270° clockwise about the point (1, 3), we will obtain Shape C.

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Answer: 45 in.

Step-by-step explanation:

Step 1:

Length × Width = Area           How to find Area

Step 2:

5 in. × 9 in.       Equation

Answer:

45 in.       Multiply

he inverse Laplace transform of f(s) is [tex]6(t-1)e^{(-6t)[/tex].

The inverse Laplace transform of f(s) = 6 / (s² + 12s + 36) first need to factor the denominator of f(s):

s² + 12s + 36 = (s + 6)²

We can rewrite f(s) as:

f(s) = 6 / [(s + 6)²]

The Laplace transform of the function [tex]6te^{(-6t)[/tex] has the Laplace transform:

[tex]L{6te^{(-6t)}[/tex] = 6 / (s + 6)²

The inverse Laplace transform of f(s), we get:

[tex]L^{-1}{f(s)}[/tex] =[tex]L^{-1}{6 / [(s + 6)^2]}[/tex]

= [tex]L^{-1}{6te^{(-6t)}[/tex]

= [tex]6(t-1)e^{(-6t)[/tex]

The inverse Laplace transform of f(s) is [tex]6(t-1)e^{(-6t)[/tex].

The denominator of f(s) before we can compute the inverse Laplace transform of f(s) = 6 / (s2 + 12s + 36):

s² + 12s + 36 = (s + 6)²

F(s) may be rewritten as f(s) = 6 / [(s + 6)2].

The function 6te(-6t)'s Laplace transform has the following properties:

[tex]L{6te^{(-6t)}[/tex]= 6 / (s + 6)²

The inverse Laplace transform to the function f(s) we obtain:

L-1f(s) = L-16 / [(s + 6)²]

= L-16te(-6t)

= 6(t-1)e(-6t).

6(t-1)e(-6t) is the inverse Laplace transform of the function f(s).

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The Cayley-Hamilton Theorem is verified for this matrix.

In the Cayley-Hamilton Theorem for a given matrix, we need to show that the matrix satisfies its characteristic equation.

Matrix [2 -2; -2 -1]

To begin, we find the characteristic equation for the matrix [2 -2; -2 -1]. The characteristic equation is obtained by finding the determinant of the matrix subtracted by the identity matrix multiplied by the variable α

  [tex]\left[\begin{array}{ccc}(2-\alpha )&-2\\-2&(-1-\alpha )\\\end{array}\right][/tex] = 0

Expanding the determinant, we have

(2 - α)(-1 - α) - (-2)(-2) = 0

(2 - α)(-1 - α) + 4 = 0

α² - α - 6 = 0

Now, we need to calculate the characteristic polynomial

p(α) = α² - α - 6

Using the Cayley-Hamilton Theorem, we substitute the matrix [2 -2; -2 -1] into the characteristic polynomial:

p([2 -2; -2 -1]) = [2 -2; -2 -1]² - [2 -2; -2 -1] - 6 × I

Calculating the matrix multiplication and subtracting the result, we get

[2 -2; -2 -1]² = [0 0; 0 0]

[2 -2; -2 -1] - 6 × I = [2 -2; -2 -1] - [6 0; 0 6] = [-4 -2; -2 -7]

Adding these matrices together, we have

[0 0; 0 0] - [-4 -2; -2 -7] = [4 2; 2 7]

Comparing this result with the zero matrices, we see that they are equal

[4 2; 2 7] = [0 0; 0 0]

Therefore, the matrix [2 -2; -2 -1] satisfies its characteristic equation, and the Cayley-Hamilton Theorem is verified for this matrix.

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To find the value of g(7), we need to integrate g'(x) from 2 to 7 and add g(2) to the result.  ∫g'(x)dx = ∫e^(sin(x^2))dx Unfortunately, there is no closed-form solution for this integral, so we must resort to numerical methods. One way to do this is to use a numerical integration method such as the trapezoidal rule or Simpson's rule.

The problem gives us information about the derivative of g(x), but we need to find the value of g(7). To do this, we use the fundamental theorem of calculus, which tells us that if we integrate the derivative of a function over an interval, we get the value of the function at the endpoints of the interval.

So, we need to integrate g'(x) from 2 to 7 to get the value of g(7). However, the integral of e^(sin(x^2)) does not have a closed-form solution, so we need to use numerical methods to approximate it. Simpson's rule is a numerical integration method that approximates the integral of a function by using quadratic approximations to the function over subintervals of the interval of integration. Using Simpson's rule with 10 subintervals, we can approximate the value of the integral of g'(x) from 2 to 7.  Finally, we add g(2) to the result to get the value of g(7).
Hi! To find the value of g(7), we need to integrate g'(x) from 2 to 7 and then add the value of g(2) to the result.

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Answer:A triangle can be defined as a two-dimensional shape that comprises three (3) sides, three (3) vertices and three (3) angles.

This ultimately implies that, any polygon with three (3) lengths of sides is a triangle.

In Geometry, there are three (3) main types of triangle based on the length of their sides and these are;

Equilateral triangle.

Scalene triangle.

Isosceles triangle.

An isosceles triangle has two (2) congruent sides that are equal in length and two (2) equal angles while the third side has a different length.

Step-by-step explanation:

Answer:

-1 ± 2√10

Step-by-step explanation:

first of all, do -2 on top divided by 2 on bottom to get 1st part of answer -1.

now (2√40) / 2 = 1√40 which just equals √40.

√40 = √(4 X 10) = √4 X √10 = 2 X √10 = 2√10.

so our final answer becomes -1 ± 2√10

The probability of an event occurring 4 standard deviations from the mean in a normal distribution is extremely low. Specifically, the probability of an event occurring 4 standard deviations from the mean in a normal distribution is approximately 0.006%.

In a normal distribution, 68% of the values are within one standard deviation of the mean, 95% are within two standard deviations of the mean, and 99.7% are within three standard deviations of the mean. So, an event that is 4 standard deviations from the mean is extremely unlikely to occur.

This is because the empirical rule states that in a normal distribution, approximately 68% of observations will fall within 1 standard deviation of the mean, 95% of observations will fall within 2 standard deviations of the mean, and 99.7% of observations will fall within 3 standard deviations of the mean. Thus, the probability of an observation falling more than 3 standard deviations from the mean is very small, and the probability of it falling 4 or more standard deviations from the mean is even smaller. This demonstrates the importance of considering outliers and extreme values when analyzing data in a normal distribution.

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The recursive sequence to represent how many papers Josiah has remaining to grade after working for n hours is aₙ = aₙ₋₁ - 8

Let aₙ be the number of papers Josiah has remaining to grade after working for n hours.

In the first hour, Josiah grades 8 papers, so the number of papers remaining is:

a₁ = 44 - 8 = 36

In the second hour, Josiah grades another 8 papers, but this time he is grading papers from the remaining pile:

a₂ = a₁ - 8

= 36 - 8 = 28

In general, after n hours, Josiah will have graded 8n papers, and the number of papers remaining to be graded will be:

aₙ = aₙ₋₁ - 8

This is because he starts with a₀ = 44 papers, and each hour he grades 8 papers, reducing the number of papers remaining by 8.

Therefore, the recursive sequence to represent how many papers Josiah has remaining to grade after working for n hours is aₙ = aₙ₋₁ - 8

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When the probability of winning a lion, then another lion if the probability of winning is 4/9 will be 16/81

If the probability of winning a lion is 4/9, then the probability of losing a lion is 1 - 4/9 = 5/9.

The probability of winning the first lion is 4/9. Assuming that the first lion is won, the probability of winning the second lion is also 4/9, since the events are independent.

Therefore, the probability of winning both lions is:

P(win first lion) x P(win second lion | win first lion)

= (4/9) x (4/9)

= 16/81

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What is the probability of winning a lion, then another lion if the probability of winning is 4/9

His record should not be changed. The correct option is A

An individual who works for an employer pursuant to an employment contract, whether it be written or verbal, is referred to as an employee.

David is an hourly worker, and since his compensation is remaining the same, his employee earnings record shouldn't be altered. Even if he transfers to a different department, his hourly rate and rate of pay need to stay the same. The employee's record's department or job code may be the only thing to change in this scenario, but the earnings record itself is unaffected.

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Answer:

15πcm

Step-by-step explanation:

2πr = circumference

radius = 0.075m = 7.5cm

Circumference = 7.5X2π

15π cm

To find the value of 'a' such that P(0 < Z < a) = 0.2324, follow these steps:

Step 1: Identify the given probability
The given probability is P(0 < Z < a) = 0.2324.

Step 2: Understand the context of the problem
This is a problem involving the standard normal distribution (Z-distribution), where Z represents the standard normal variable.

Step 3: Use a Z-table or calculator
To find the value of 'a', you can use a standard normal (Z) table or a calculator with a Z-table function. Since P(0 < Z < a) = 0.2324, we can rewrite it as P(0 < Z) + P(Z < a) = 0.5 + P(Z < a) = 0.2324.

Step 4: Calculate the cumulative probability
Solve for P(Z < a) by subtracting 0.5 from both sides: P(Z < a) = 0.2324 - 0.5 = -0.2676.

Step 5: Find the Z-value
Look for -0.2676 in the Z-table or use the calculator's inverse Z-function. You will find that the corresponding Z-value (to two decimal places) is approximately -0.64.

Step 6: Provide the answer
The value of 'a' that satisfies P(0 < Z < a) = 0.2324 is approximately -0.64.

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The hexadecimal expression of decimal integer -100 in the 8-bit signed binary integer system is "9C". The decimal integer expression of the signed binary number 11010111 is -41. The 8-bit fixed point binary number expression of decimal real number -3.47 is 10111011.

To obtain the hexadecimal expression of decimal integer -100 in the 8-bit signed binary integer system, we first need to represent -100 in binary form. Since the 8-bit signed binary integer system uses two's complement representation, we can find the binary representation of -100 by taking the two's complement of the binary representation of 100. The binary representation of 100 is 01100100, so the two's complement of this number is 10011100. Therefore, the binary representation of -100 is 10011100, and its hexadecimal expression is 9C.

To find the decimal integer expression of the signed binary number 11010111, we first need to determine its sign bit. Since the leftmost bit is a 1, the number is negative. To obtain its binary value, we can take the two's complement of the binary representation of 00101001, which is the binary representation of the absolute value of 11010111. The two's complement of 00101001 is 11010111, so the binary representation of -41 is 11010111 in the 8-bit signed binary integer system.

To obtain the 8-bit fixed point binary number expression of decimal real number -3.47, we first need to represent -3.47 in binary form. To do this, we can convert the integer part and the fractional part separately. The integer part of -3.47 is -3, which has a binary representation of 11111101 in the 8-bit signed binary integer system. The fractional part of -3.47 can be converted using the binary fraction representation method. Multiplying 0.47 by 2 yields 0.94, which has an integer part of 0. Multiplying 0.94 by 2 yields 1.88, which has an integer part of 1. Continuing in this way, we can obtain the binary fraction 01101101. Therefore, the binary representation of -3.47 is 11111101.01101101. To obtain the 8-bit fixed point binary number expression, we need to shift the binary point to the left by 4 bits, yielding 11010111.

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The minimum and maximum values of f(x,y) subject to the constraint 8 - 2x - 5y^2 = 0 are both equal to 1.


We can use the method of Lagrange multipliers to solve this problem. Let's define the Lagrangian as L(x,y,λ) = x^2 y^2 + λ(8 - 2x - 5y^2). We need to find the values of x, y, and λ that minimize or maximize L subject to the constraint 8 - 2x - 5y^2 = 0.

Taking partial derivatives of L with respect to x, y, and λ, we get:

∂L/∂x = 2xy^2 - 2λ

∂L/∂y = 2x^2y - 10λy

∂L/∂λ = 8 - 2x - 5y^2

Setting these equal to zero and solving for x, y, and λ, we get:

x = ±√(2λ/y^2)

y = ±√(2λ/5)

λ = xy^2/2

Substituting these back into the constraint equation, we get:

8 - 2x - 5y^2 = 0

8 - 2(±√(2λ/y^2)) - 5(±√(2λ/5))^2 = 0

Simplifying this equation, we get:

√(5λ) = √2

λ = 2/5

Substituting this back into the equations for x and y, we get:

x = ±1

y = ±1

Now we can evaluate the function f(x,y) = x^2 y^2 at the four possible points (1,1), (-1,1), (1,-1), and (-1,-1):

f(1,1) = 1

f(-1,1) = 1

f(1,-1) = 1

f(-1,-1) = 1

Therefore, the minimum and maximum values of f(x,y) subject to the constraint 8 - 2x - 5y^2 = 0 are both equal to 1.

the minimum and maximum values of f(x,y) subject to the constraint 8 - 2x - 5y^2 = 0 are both equal to 1.

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The minimum and maximum values of f(x,y) subject to the constraint 8 - 2x - 5y^2 = 0 are both equal to 1.

We can use the method of Lagrange multipliers to solve this problem. Let's define the Lagrangian as L(x,y,λ) = x^2 y^2 + λ(8 - 2x - 5y^2). We need to find the values of x, y, and λ that minimize or maximize L subject to the constraint 8 - 2x - 5y^2 = 0.

Taking partial derivatives of L with respect to x, y, and λ, we get:

∂L/∂x = 2xy^2 - 2λ

∂L/∂y = 2x^2y - 10λy

∂L/∂λ = 8 - 2x - 5y^2

Setting these equal to zero and solving for x, y, and λ, we get:

x = ±√(2λ/y^2)

y = ±√(2λ/5)

λ = xy^2/2

Substituting these back into the constraint equation, we get:

8 - 2x - 5y^2 = 0

8 - 2(±√(2λ/y^2)) - 5(±√(2λ/5))^2 = 0

Simplifying this equation, we get:

√(5λ) = √2

λ = 2/5

Substituting this back into the equations for x and y, we get:

x = ±1

y = ±1

Now we can evaluate the function f(x,y) = x^2 y^2 at the four possible points (1,1), (-1,1), (1,-1), and (-1,-1):

f(1,1) = 1

f(-1,1) = 1

f(1,-1) = 1

f(-1,-1) = 1

Therefore, the minimum and maximum values of f(x,y) subject to the constraint 8 - 2x - 5y^2 = 0 are both equal to 1.

the minimum and maximum values of f(x,y) subject to the constraint 8 - 2x - 5y^2 = 0 are both equal to 1.

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Answer:

Top right

Step-by-step explanation:

It goes through most of the plotted data

The equation that best represents the phone company's monthly charges would be c = 1 / 4 m + 15 , 0 ≤ m ≤ 44, 640.

The equation would take the form of :

Total monthly charges = Slope x Number of minutes + y - intercept

The y - intercept is the point on the graph for 0 minutes which is shown to be $ 15 on the graph.

The slope would be with points ( 0, 15 ) and ( 40, 25 ):

= ( 25 - 15 ) / ( 40 - 0 )

= 10 / 40

= 1 / 4

The equation is then :

= c = 1 / 4 m + 15 , 0 ≤ m ≤ 44, 640

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The question is:

If there are a maximum of 44740 minutes in a month, which equation best represents the phone company’s charges?

The jar of paint is not enough to cover the area of the parking lot.

In this problem we find that Laura wants to paint a parking lot, whose area is represented by a rectangle:

A = w · h

Where:

If w = 2.5 m and h = 3.5 m, then the area of the parking lot is:

A = (2.5 m) · (3.5 m)

A = 8.75 m²

The area of the parking lot cannot be covered by a jar of paint.

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The amount of the principal investment is the sum of $10,000. The Option D is correct.

The equation "A = P(1+0.0430t)" represents the amount of money earned on a savings account with 4.3% annual simple interest, where a is the amount after t years, p is the principal investment, and 0.043 is the interest rate.

Given that the amount after 12 years is equal to $15,160, we can use the equation to solve for the principal investment:

[tex]\sf A = P(1+0.0430t)[/tex]

[tex]\sf \$15160 = P(1+0.043\times12)[/tex]

[tex]\sf\$15160 = P(1 + 0.516)[/tex]

[tex]\sf \$15160= P \times 1.516[/tex]

[tex]\sf P = \dfrac{\$15160}{1.516}[/tex]

[tex]\sf P = \$10000[/tex].

Therefore, the amount of the principal investment is the sum of $10,000.

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