X Find the interest earned a. Annually Semiannually b. c. Quarterly d. Monthly e. Continuously on $20,000 invested for 6 years at 5% interest compounded as follows. (twice a year)

Answers

Answer 1

To calculate the interest earned on $20,000 invested for 6 years at a 5% interest rate compounded semiannually, quarterly, monthly, and continuously, we can use the formula for compound interest: A = P(1 + r/n)^(nt) - P, where A is the final amount, P is the principal (initial investment), r is the interest rate, n is the number of compounding periods per year, and t is the number of years.

For part (a), when the interest is compounded annually, the interest earned can be calculated as A - P, where A is the final amount and P is the principal. The final amount is given by A = 20000(1 + 0.05)^6, and thus the interest earned annually is A - P.

For parts (b), (c), and (d), we divide the interest rate by the number of compounding periods per year and multiply the number of compounding periods by the number of years. For semiannual compounding, n = 2, for quarterly compounding, n = 4, and for monthly compounding, n = 12. The formula for interest earned is A - P, where A is given by A = P(1 + r/n)^(nt) and P is the principal.

Lastly, for part (e), when the interest is compounded continuously, we use the formula A = Pe^(rt), where e is the base of the natural logarithm. The interest earned is then A - P.

In summary, for each scenario (a) to (e), we calculate the final amount using the respective compounding formulas and then subtract the principal to obtain the interest earned.

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Related Questions

Test the validity of the following argument by using a Venn diagram. First draw a Venn diagram with the proper number of sets (circles) and label all the regions. ~ avb b (bΛο) α 1 ~ С a. Which region or regions represent the intersection of the premises? b. Which region or regions represent the conclusion? c. Is the above argument valid or invalid?

Answers

The given argument is invalid. It can be tested for validity using a Venn diagram.

A Venn diagram is a diagrammatic representation of all the possible logical relations between a finite collection of sets. We draw a Venn diagram with the appropriate number of sets and label all the regions for a given argument. Here, a Venn diagram with three sets A, B, and C will be drawn. a.

The given premises are[tex]avb[/tex], b(bΛc), and [tex]~c[/tex]. Thus, the regions that represent the intersection of the premises are the regions that are present in all three sets A, B, and C.

b. The given conclusion is [tex]~a(bc)[/tex]. Thus, the region or regions that represent the conclusion is the region or regions that are only present in sets A but not in sets B and C.

c. The argument is invalid. The reason for this is that there is a non-empty region that is shaded in the Venn diagram that is included in the premise region(s) but is not included in the conclusion region.

Thus, the given argument is invalid. Hence, the conclusion is that the above argument is invalid.

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Suppose W, X and Y are matrices with the following properties.

W is a 3 x 3-matrix.
X has characteristic polynomial λ² − 4 · λ + 17.
Y has characteristic polynomial λ² – 6 · λ – 4.
(A.) Which one of the three matrices has no real eigenvalues?
(B.) Calculate the quantity trace(X) - det(X).
(C.) Calculate the rank of Y.
[3 marks] (No answer given) [3 marks] [3marks]

Answers

(A) The matrix Y has no real eigenvalues (B) The quantity trace(X) - det(X) can be calculated by substituting the coefficients of the characteristic polynomial of X into the formula.

A) The characteristic polynomial of Y is λ² - 6λ - 4. To determine if Y has real eigenvalues, we can check the discriminant of the characteristic polynomial. The discriminant is given by Δ = b² - 4ac, where a, b, and c are the coefficients of the polynomial. In this case, a = 1, b = -6, and c = -4. Calculating the discriminant, Δ = (-6)² - 4(1)(-4) = 36 + 16 = 52. Since the discriminant is positive, Y has two distinct real eigenvalues.

B) The quantity trace(X) - det(X) can be calculated by substituting the coefficients of the characteristic polynomial of X into the formula. From the characteristic polynomial λ² - 4λ + 17, we can see that the trace of X is the coefficient of λ with the opposite sign, which is -(-4) = 4. The determinant of X is the constant term of the polynomial, which is 17. Therefore, trace(X) - det(X) = 4 - 17 = -13.

C) To calculate the rank of matrix Y, we can perform row operations to obtain its row-echelon form and count the number of nonzero rows. The rank of a matrix is equal to the number of nonzero rows in its row-echelon form.

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Solve the differential equation. ((t− 6)^6) s′ + 7((t−6)^5)s = t +6,t> 6

Answers

By using an integrating factor, we can solve this differential equation .  The general solution is s(t) = C * (t - 6) + (t²/2 + 6t + K) / (t - 6)⁷, where C and K are constants.

The given differential equation is ((t - 6)⁶)s' + 7((t - 6)⁵)s = t + 6, where t > 6. This is a linear first-order ordinary differential equation. To solve it, we can use an integrating factor.

First, we rewrite the equation in standard form: s' + 7((t - 6)/(t - 6)⁶)s = (t + 6)/((t - 6)⁶). The integrating factor is then given by the exponential of the integral of the coefficient of s, which is 7∫((t - 6)/(t - 6)⁶) dt = -1/((t - 6)⁵).

Multiplying both sides of the equation by the integrating factor (-1/((t - 6)⁵)), we obtain:

-1/((t - 6)⁵) * s' - 7/((t - 6)⁴) * s = -1/((t - 6)⁵) * (t + 6)/((t - 6)⁶).

Simplifying, we have:

d/dt((-1/((t - 6)⁵)) * s) = d/dt((-1/((t - 6)⁵)) * (t + 6)/((t - 6)⁶)).

Integrating both sides with respect to t, we get:

(-1/((t - 6)⁵)) * s = ∫((-1/((t - 6)⁵)) * (t + 6)/((t - 6)⁶)) dt.

Solving the integral on the right-hand side, we find:

(-1/((t - 6)⁵)) * s = (t²/2 + 6t + K)/((t - 6)⁷), where K is an integration constant.

Multiplying through by -((t - 6)⁵) and rearranging, we obtain the general solution:

s(t) = C * (t - 6) + (t²/2 + 6t + K) / (t - 6)⁷, where C and K are constants.

In summary, the solution to the given differential equation is s(t) = C * (t - 6) + (t²/2 + 6t + K) / (t - 6)⁷, where C and K are constants. This solution is obtained by using an integrating factor and integrating both sides of the equation.

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The speed of a runner increased steadily during the first three seconds of a race. Her speed at half-second intervals is given in the table.

Time(s) 0 0.5 1 1.5 2 2.5 3
Velocity (ft/sec) 0 6.2 10.8 14.9 18.1 19.4 20.2
a) Find a lower estimate for the distance that she traveled during these 3 seconds.

b) Find an upper estimate for the distance that she traveled during these 3 seconds.

Answers

According to the information, the lower estimate for the distance traveled during these 3 seconds is 14.9 feet, and the upper estimate for the distance traveled during these 3 seconds is 20.2 feet.

How to calculate the distance traveled?

To estimate the distance traveled, we can use the concept of lower and upper Riemann sums, where the velocity is multiplied by the time interval to approximate the displacement.

How to find a lower estimate?

To find a lower estimate, we use the left Riemann sum. We calculate the sum of the products of the lowest velocity at each time interval and the corresponding time interval. In this case, the lowest velocity is 14.9 ft/sec at time 1.5 seconds. So, the lower estimate for the distance traveled is (0.5 * 6.2) + (0.5 * 10.8) + (0.5 * 14.9) = 14.9 feet.

How to find an upper estimate?

To find an upper estimate, we use the right Riemann sum. We calculate the sum of the products of the highest velocity at each time interval and the corresponding time interval.

According to the above, the highest velocity is 20.2 ft/sec at time 3 seconds. So, the upper estimate for the distance traveled is:

(0.5 * 6.2) + (0.5 * 10.8) + (0.5 * 14.9) + (0.5 * 18.1) + (0.5 * 19.4) + (0.5 * 20.2) = 20.2 feet.

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Use linear approximation, i.e. the tangent line, to approximate √16.2 as follows: Let f(x) = √. Find the equation of the tangent line to f(x) at x = 16 L(x) = Using this, we find our approximation for √16.2 is NOTE: For this part, give your answer to at least 9 significant figures or use an expression to give the exact

Answers

The approximation for √16.2 using linear approximation (tangent line) is approximately 4.01249375.

To find the equation of the tangent line to f(x) = √x at x = 16, we need to determine the slope of the tangent line and the y-intercept. Taking the derivative of f(x) with respect to x, we get f'(x) = 1 / (2√x). Evaluating this at x = 16, we find f'(16) = 1 / (2√16) = 1/8.

The equation of a line can be written as y = mx + b, where m is the slope and b is the y-intercept. Plugging in the values, we have y = (1/8)x + b. To find b, we substitute the coordinates of the point (16, f(16)) = (16, 4) into the equation and solve for b. This gives us 4 = (1/8)(16) + b, which simplifies to b = 2.

Therefore, the equation of the tangent line to f(x) at x = 16 is y = (1/8)x + 2. Plugging in x = 16.2 into this equation, we can approximate √16.2 as follows: L(16.2) ≈ (1/8)(16.2) + 2 ≈ 4.01249375.

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In the diagram below, ΔMPO is a right triangle and PN = 24 ft. How much longer is MO than MN? (round to nearest foot)

Answers

In the triangle, the length MO is 63 feet longer than the length MN.

How do you determine a right triangle's side?

A triangle with a right angle is one in which one of the angles is 90 degrees.

A triangle's total number of angles is 180.

Let's use trigonometric ratios to determine MN and MP.

adjacent / hypotenuse = cos 63

cos 63 = 24 / MN

MN = 24 / cos 63

MN = 52.8646005419

MN = 52.86 ft

tan 63 = adjacent or opposite

tan 63 = MP / 24

MP = 47.1026521321

MP = 47.10 ft

So let's determine MO as follows:

Hypotenuse or opposite of sin 24

sin 24 equals MP / MO

Sin 24 = 47.10 / MO

MO = 47.10 / sin 24

MO = 115.810179493

MO = 115.81 ft

Hence the difference between MO and MN = 115.8 - 52.86 = 63 ft

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X and Y are independent, standard normal random vari- ables. Determine the conditional distribution of X given that X - Y = V

Answers

The conditional distribution of X given that X - Y = V is a normal distribution with mean V/2 and variance 1/2.

Since X and Y are independent standard normal random variables, their difference X - Y is also a normal random variable with mean 0 and variance 2. Let Z = X - Y. Then the joint density function of X and Z is given by f(x,z) = f(x)f(z-x) = (1/sqrt(2*pi))exp(-x2/2)*(1/sqrt(4*pi))*exp(-(z-x)2/4). The conditional density function of X given Z = V is given by f(x|z=v) = f(x,v)/f(v) = (1/sqrt(2pi))exp(-x2/2)*(1/sqrt(4*pi))*exp(-(v-x)2/4)/(1/sqrt(4pi))*exp(-v^2/4). Simplifying this expression, we get f(x|z=v) = (1/sqrt(pi))*exp(-(x-v/2)^2/2). This is the density function of a normal distribution with mean V/2 and variance 1/2.

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You have decided to invest in a bond fund. You must choose between a taxable fund and a municipal bond fund that is at least partially tax-free. Which is better? The retums for randomly selected funds for the last three-year period are given below. Compl parts a through d. Full data se Taxable bond funds 11.48, 5.91, 8.72.9.37, 4.45, 8.93, 7.24, 1.38, 1.04, 0.09, 7.61, 5.67, 4.27, 12.7 Municipal bond funds 8.13, 7.45, 7.36, 6.08, 4.81, 4.55, 4.16, 5.84, 4.03, 5.45, 5.35, 4.22, 5.22, 3.22, 4.68, 3.87 a) Write the null and alternative hypotheses, Let group T correspond to taxable bond funds and group correspond to municipal bond funds. Complete the hypotheses below. Hy HT= 0 HAPPT HM0 b) Check the conditions The Randomization Condition is satisfied because the samples are random. The Nearly Normal Condition is satisfied because the taxable bond funds sample is nearly normal and the municipal bond funds sample is nearly normal. The Independent Group Assumption is satisfied. c) Test the hypothesis and find the P-value. The test statistic is 0.98 (Round to two decimal places needed.) The P-value is 0.340 (Round to three decimal places as needed.) d) Is there a significant difference in 3-year returns between these two kinds of funds? Use ce=0.1. It appears that there is no difference between the two kinds of funds because there is insufficient evidence to reject the null hypothesis.

Answers

a) Null hypothesis (H₀): There is no significant difference in 3-year returns between taxable bond funds and municipal bond funds.

Alternative hypothesis (H₁): There is a significant difference in 3-year returns between taxable bond funds and municipal bond funds.

b) There is no sufficient evidence to conclude.

a) Null hypothesis (H₀): There is no significant difference in 3-year returns between taxable bond funds and municipal bond funds.

Alternative hypothesis (H₁): There is a significant difference in 3-year returns between taxable bond funds and municipal bond funds.

d) Based on the provided information, it is stated that the test statistic is 0.98 and the p-value is 0.340.

With a significance level (α) of 0.1, since the p-value (0.340) is greater than the significance level, we fail to reject the null hypothesis. Therefore, we do not have sufficient evidence to conclude that there is a significant difference in 3-year returns between taxable bond funds and municipal bond funds.

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xam $ 1 R F A M V 25 % 23 201 Acellus Learning System Which of the following represents a parabola? Enter a, b, c, d, or e. a. 4x² + 2y² = 25
b. 3x²-5y² = 15
c. 5x + 2y = 7 d. y=-3x²+2x+1 e. x² + y2=5

Answers

An equation that represents a parabola is of the form y = ax² + bx + c, where a, b and c are real numbers with a ≠ 0. In this form, the variable x has a squared term, while y does not, and the coefficient a determines whether the parabola opens up or down. If a > 0, the parabola opens upward, and if a < 0, the parabola opens downward.

The equation that represents a parabola from the given options

4x² + 2y²

= 25, 3x² - 5y² = 15,

5x + 2y = 7,

y = -3x² + 2x + 1 and x² + y² = 5 is: y

= -3x² + 2x + 1 rom the given options is y = -3x² + 2x + 1.

And the equation given in the options that is in the form of y = ax² + bx + c can be recognized as the equation of parabola, where x is squared and y is not.

Therefore, the equation that represents a parabola from the given options is y = -3x² + 2x + 1.

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Answer T/F, if true, give justification, if false, give a non-trivial example as to why it's false.
1. AB = BA for all square nxn matrices.F
2. If E is an elementary matrix, then E is invertible and E-1 is also elementary T
3. If A is an mxn matrix with a row of zeros, and if B is an nxk matrix, then AB has a row of zeros. T
4. The columns of any 7x10 matrix are linearly dependent. T
5. (A+B)-1 = B-1 + A-1 for all square nxn matrices. F
6. If A is a square matrix with A4 = 0, then A is not invertible. T
7. In a space V, if vectors v1, ....., vk are linearly independent, then dim V = k. F
8. If A is an 10x15 matrix, then dim nullA >= 5. T
9. If A is an nxn matrix and c is a real number, then det(cA) = cdetA. F
10. In a matrix A, the number of independent columns is the same as the number of independent rows. F
11. If A and B are invertible nxn matrices, then det(A+B) = det(A) + det(B). F
12. Every linearly independent set in\mathbb{R}n is an orthogonal set.
13. For any two vectors u and v,\left \| u+v \right \|^2 =\left \| u \right \|^2+\left \| v \right \|^2.
14. If A is a square upper triangular, then the eigenvalues of A are the entries along the main diagonal of A. T
15. Every square matrix can be diagonalized. F
16. If A is inverstible, then\lambda=0 is an eigenvalue of A. F
17. Every basis of\mathbb{R}n is an orthogonal set. F
18. If u and v are orthonormal vectors in\mathbb{R}n, then\left \| u-v \right \|^2 = 2. T
I have answers for most of these as they will be listed, but I want to know justifications and/or examples for each one. Thank you

Answers

1. AB = BA for all square nxn matrices. (False)

Justification: Matrix multiplication is not commutative in general. It is possible for AB to be different from BA for square matrices. For example, consider:

[tex]A = [[1, 2], [0, 1]][/tex]

  [tex]B = [[1, 0], [1, 1]][/tex]

  [tex]AB = [[3, 2], [1, 1]][/tex]

  [tex]BA = [[1, 2], [1, 1]][/tex]

  Therefore, AB ≠ BA.

2. If E is an elementary matrix, then E is invertible and [tex]E^{-1}[/tex]is also elementary. (True)

  Justification: An elementary matrix is defined as a matrix that represents a single elementary row operation. Each elementary row operation is invertible, meaning it has an inverse operation that undoes its effect. Therefore, an elementary matrix is invertible, and its inverse is also an elementary matrix representing the inverse row operation.

3. If A is an mxn matrix with a row of zeros, and if B is an nxk matrix, then AB has a row of zeros. (True)

  Justification: When multiplying matrices, each element in the resulting matrix is obtained by taking the dot product of a row from the first matrix and a column from the second matrix. If a row in matrix A is all zeros, the dot product will always be zero for any column in matrix B. Therefore, the resulting matrix AB will have a row of zeros.

4. The columns of any 7x10 matrix are linearly dependent. (True)

  Justification: If the number of columns in a matrix exceeds the number of rows, then the columns must be linearly dependent. In this case, a 7x10 matrix has more columns than rows, so the columns are guaranteed to be linearly dependent.

5. [tex](A+B)^{-1} = B^{-1}+ A^{-1}[/tex] for all square nxn matrices. (False)

  Justification: Matrix addition is commutative, but matrix inversion is not. In general,[tex](A+B)^{-1} = B^{-1}+ A^{-1}[/tex]. For example, consider the matrices:

  A = [[1, 0], [0, 1]]

  B = [[1, 0], [0, -1]]

[tex](A + B)^{-1} = [[1, 0], [0, -1]]^{-1}[/tex]= [[1, 0], [0, -1]]

[tex]B^{-1} + A^{-1}[/tex] = [[1, 0], [0, -1]] + [[1, 0], [0, 1]] = [[2, 0], [0, 0]]

  Therefore, [tex](A + B)^{-1} \neq B^{-1} + A^{-1}[/tex].

6. If A is a square matrix with A^4 = 0, then A is not invertible. (True)

  Justification: If A^4 = 0, it means that when you multiply A by itself four times, you get the zero matrix. In this case, A cannot have an inverse because there is no matrix that, when multiplied by itself four times, would give you the identity matrix required for invertibility.

7. In a space V, if vectors v1, ..., vk are linearly independent, then dim V = k. (False)

  Justification: The dimension of a vector space V is defined as the maximum number of linearly independent

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pls clear hand writing
a) The sum of the first n terms of the progression 36,34,32, ...is 0. Find n and the tenth (4 marks) term.

Answers

n = 37, and tenth term = 18

Given progression,

36, 34, 32, ...

The sum of the first n terms is 0

First term(a1) = 36

The common difference (d)= 34-36 = -2,

The formula of the sum of the first n term is,

[tex]Sn = \frac{n}{2} [2a_{1} + (n - 1)d][/tex]

substitue the values Sn= 0, a1= 36, d= -2 in the above equation to find n

[tex]0[/tex]= [tex]\frac{n}{2} [2(36) + (n-1) (-2)][/tex]

[tex]0 = \frac{n}{2}[72- 2n+ 2][/tex]

[tex]0 = \frac{n}{2}[74 - 2n][/tex]

[tex]74 - 2n = 0[/tex]

[tex]2n = 74[/tex]

[tex]n = \frac{74}{2}[/tex]

[tex]n = 37[/tex]

n = 37

The formula for finding the nth term(10th term):

[tex]a_{n} = a1 + (n - 1)d[/tex]

n = 10, a1 = 36, d = -2

[tex]a_{10} = 36 + (10-1)(-2)[/tex]

[tex]a_{10} = 36 + 9(-2)[/tex]

[tex]a_{10} = 36 - 18[/tex]

[tex]a_{10} = 18[/tex]

[tex]a_{10}[/tex] = 18

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1- How can definite integration be helpful in economics?

2- Analyze the mathematical shape and features of The Museum of the Future in Dubai.

Answers

The use of integrals in economics is not limited to the analysis of a range of economic models and their utility in quantitative predictions.

Integrals are also used to compute the areas of consumer surplus and producer surplus.

Consumer surplus is the difference between what a consumer is willing to pay for a product and what they actually pay.

Producer surplus is the difference between the price at which a producer sells a product and the minimum price at which they are willing to sell it.

The mathematical calculation of consumer and producer surplus is determined by integrating the demand and supply curves, respectively.

The definite integral of the demand function yields the area representing consumer surplus,

while the definite integral of the supply function yields the area representing producer surplus.

2. Analyze the mathematical shape and features of The Museum of the Future in Dubai.

The Museum of the Future is a cylindrical, steel-clad building that stands 77 meters tall in Dubai. It's a unique, cutting-edge facility with a distinctively designed façade that is distinct from other structures.

The building's cylindrical form is reminiscent of a donut or a torus, with a hole in the middle that allows visitors to see the exhibits from a variety of angles.

The façade's design was created using parametric modeling software that enabled the project's architects to analyze and adjust the façade's different structural components based on an array of factors such as orientation, weather patterns, and solar radiation.

The building's façade comprises of 890 stainless steel and fiberglass panels that are arranged in a rhombus pattern to create a repeating geometric design.

The use of parametric modeling software allowed the architects to create an innovative, eye-catching façade while remaining cost-effective and feasible to construct.

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sequences and series
Arithmetic Series 12) An arithmetic series is the indicated sum of the terms of an arithmetic sequence. O True O False Save 13) Find the sum of the following series. 1+ 2+ 3+ 4+...+97 +98 +99 + 100 OA

Answers

Therefore, the sum of the series is 5050.

To find the sum of the series 1 + 2 + 3 + 4 + ... + 97 + 98 + 99 + 100, we can use the formula for the sum of an arithmetic series:

[tex]S_n = (n/2)(a_1 + a_n)[/tex]

where [tex]S_n[/tex] is the sum of the series, n is the number of terms, [tex]a_1[/tex] is the first term, and [tex]a_n[/tex] is the last term.

In this case, the first term [tex]a_1[/tex] is 1 and the last term [tex]a_n[/tex] is 100, and there are 100 terms in total.

Substituting these values into the formula, we have:

[tex]S_n[/tex] = (100/2)(1 + 100)

= 50(101)

= 5050

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Tabetha bought a patio set $2500 on a finance for 2 years. She was offered 3% interest rate. Store charged her $100 for delivery and 6% local tax. We want to find her monthly installments. (1) Calculate the tax amount. Tax amount = $ (2) Compute the total loan amount, Loan amount P = (3) Identify the remaining letters in the formula I=Prt. TH and tw (4) Find the interest amount. I= $ (5) Find the total amount to be paid in 2 years. A = $ (6) Find the monthly installment. d = $

Answers

Tabetha's monthly installment for the patio set is approximately $121.46.

To calculate the different components involved in Tabetha's patio set purchase:

(1) Calculate the tax amount:

Tax rate = 6%

Tax amount = Tax rate * Purchase price = 0.06 * $2500 = $150.

(2) Compute the total loan amount:

Loan amount = Purchase price + Delivery fee + Tax amount = $2500 + $100 + $150 = $2750.

(3) Identify the remaining letters in the formula I=Prt:

I = Interest amount

P = Loan amount

r = Interest rate

t = Time period (in years)

(4) Find the interest amount:

I = Prt = $2750 * 0.03 * 2 = $165.

(5) Find the total amount to be paid in 2 years:

Total amount = Loan amount + Interest amount = $2750 + $165 = $2915.

(6) Find the monthly installment:

The loan term is 2 years, which means there are 24 months.

Monthly installment = Total amount / Loan term = $2915 / 24 = $121.46 (rounded to two decimal places).

This represents the amount she needs to pay each month over the course of 2 years to fully repay the loan, including the principal, interest, taxes, and delivery fee.

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(b) Solve the following demand and supply model for the equilibrium price
Q^D=a+bP, b>0
Q^S=c+dP, d<0
dP/dt =k(QS - QP), k>0
Where QP, QS and P are continuous functions of time, t.

Answers

To solve the demand and supply model for the equilibrium price, we can start by setting the quantity demanded (Q^D) equal to the quantity supplied (Q^S) and solving for the equilibrium price (P).

Q^D = a + bP

Q^S = c + dP

Setting Q^D equal to Q^S:

a + bP = c + dP

Now, we can solve for P:

bP - dP = c - a

(P(b - d)) = (c - a)

P = (c - a) / (b - d)

The equilibrium price (P) is given by the ratio of the difference between the supply and demand constant (c - a) divided by the difference between the supply and demand coefficients (b - d).

Note that the equation dP/dt = k(QS - QP) represents the rate of change of price over time (dP/dt) based on the difference between the quantity supplied (QS) and the quantity demanded (QP). The constant k represents the speed at which the price adjusts to the imbalance between supply and demand.

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At the 5% level of significance, translate the critical value of t with 18 degrees of freedom (df) is 2.101 (2 tailed test) and 1.734 (1 tailed test).

Answers

It means that if the calculated t-statistic falls below -1.734 or above +1.734, we would reject the null hypothesis, depending on the direction of the alternative hypothesis.

How did we arrive at this assertion?

The critical value of t depends on the level of significance (α), the degrees of freedom (df), and the type of test (two-tailed or one-tailed).

For a two-tailed test at the 5% level of significance (α = 0.05) with 18 degrees of freedom, the critical value of t is 2.101. This means that if the calculated t-statistic falls outside the range of -2.101 to +2.101, we would reject the null hypothesis.

For a one-tailed test at the 5% level of significance (α = 0.05) with 18 degrees of freedom, the critical value of t is 1.734. This means that if the calculated t-statistic falls below -1.734 or above +1.734, we would reject the null hypothesis, depending on the direction of the alternative hypothesis.

Remember that in a one-tailed test, we are only interested in deviations in one direction (either positive or negative), while in a two-tailed test, we are interested in deviations in both directions.

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The integral 3√1-162²dz is to be evaluated directly and using a series approximation. (Give all your answers rounded to 3 significant figures.) a) Evaluate the integral exactly, using a substitutio

Answers

Evaluating the integral, the solution is

∫ f(x) dx ≈ 11654264.079

Given the integral 3√1-162² dz, we have to evaluate the integral exactly, using a substitution and series approximation.

Using substitution method,Let u = 1 - 162²

Since du/dz = 0 - 2 * 162 * dz = -324 * dz ⇒ dz = -du/324

The integral becomes

∫ 3√1 - 162² dz= ∫3√u * (-du/324)= -1/108 * ∫3√u du

Using integration by parts,

Let w = u^(1/2) and dv = u^(1/2) du ⇒ v = (2/3) u^(3/2)

Thus,

∫3√u du = uv - ∫v dw= (2/3) u^(3/2) - (2/3) ∫u^(3/2) du= (2/3) u^(3/2) - (2/15) u^(5/2)

Since u = 1 - 162², we get= (-2/45) * [(1 - 162²)^(5/2) - (1 - 162²)^(3/2)]----------------------

Using series approximation:

Let f(x) = 3√(1 - x²)

The integral becomes

∫ 3√1 - 162² dz= ∫ f(x) dx

where x = 162² sin t and dx = 162² cos t dt

The integral then becomes,

∫ f(x) dx = 162² ∫ f(162² sin t) cos t dt

Using Maclaurin series expansion,

We have f(x) = ∑(n=0 to ∞) (2n-1)!! / [2^n n! x^n]

Using first 3 terms of series, we get f(x) ≈ 1 - (9/2)x² + (405/16)x^4

Substituting x = 162² sin t in the above expression and using it in the integral, we have,

∫ f(x) dx ≈ 162² ∫ (1 - (9/2)(162² sin t)^2 + (405/16)(162² sin t)^4) cos t dt

Evaluating the integral,

∫ f(x) dx ≈ 11654264.079

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can I make 7-5, -5+7?? if yes, how and why?? i thought it can only be done from left to right according to order of operations. ​

Answers

Following the order of operations, you can simplify the expressions 7-5 and -5+7 to obtain the result of 2 for both. The order of operations ensures consistent and accurate evaluation of mathematical expressions, maintaining consistency and preventing ambiguity.

Yes, you can simplify the expressions 7-5 and -5+7 using the order of operations.

The order of operations, also known as PEMDAS (Parentheses, Exponents, Multiplication and Division, Addition and Subtraction), provides a set of rules to evaluate mathematical expressions.

Let's break down the expressions step by step:

7-5: According to the order of operations, you start by performing the subtraction. Subtracting 5 from 7 gives you 2. Therefore, 7-5 simplifies to 2.

-5+7: Again, following the order of operations, you perform the addition. Adding -5 and 7 gives you 2. Therefore, -5+7 simplifies to 2 as well.

Both expressions simplify to the same result, which is 2. The order of operations allows you to evaluate expressions consistently and accurately by providing a standardized sequence of steps to follow.

It is important to note that the order of operations ensures that mathematical expressions are evaluated in a predictable manner, regardless of the order in which the operations are written. This helps maintain consistency and prevents ambiguity in mathematical calculations.

In summary, by following the order of operations, you can simplify the expressions 7-5 and -5+7 to obtain the result of 2 for both.

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Do anyone know the answer, need help asap

Answers

Answer:

a or c

Step-by-step explanation:

Use the Simpson's rule to approximate ∫ 2.4 2f(x)dx for the following data
x f(x) f'(x)
2 0.6931 0.5
2.20.7885 0.4545
2.40.8755 0.4167

Answers

To approximate the integral ∫2.4 to 2 f(x) dx using Simpson's rule, we divide the interval [2, 2.4] into subintervals and approximate the integral within each subinterval using quadratic polynomials.

Given the data points (x, f(x)) = (2, 0.6931), (2.2, 0.7885), and (2.4, 0.8755), we can use Simpson's rule to approximate the integral.

Step 1: Determine the step size, h.

Since we have three data points, we can divide the interval [2, 2.4] into two subintervals, giving us a step size of h = (2.4 - 2) / 2 = 0.2.

Step 2: Calculate the approximations within each subinterval.

Using Simpson's rule, the integral within each subinterval is given by:

∫f(x)dx ≈ (h/3) * [f(x₀) + 4f(x₁) + f(x₂)]

where x₀, x₁, and x₂ are the data points within each subinterval.

For the first subinterval [2, 2.2]:

∫f(x)dx ≈ (0.2/3) * [f(2) + 4f(2.1) + f(2.2)]

≈ (0.2/3) * [0.6931 + 4(0.7885) + 0.8755]

For the second subinterval [2.2, 2.4]:

∫f(x)dx ≈ (0.2/3) * [f(2.2) + 4f(2.3) + f(2.4)]

≈ (0.2/3) * [0.7885 + 4(0.4545) + 0.8755]

Step 3: Sum up the approximations.

To obtain the approximation of the total integral, we sum up the approximations within each subinterval.

Approximation ≈ (∫f(x)dx in subinterval 1) + (∫f(x)dx in subinterval 2)

Calculating the values, we get the final approximation of the integral ∫2.4 to 2 f(x) dx using Simpson's rule.

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"






-80 + 64 lim 1+8 22 – 150 + 56

Answers

The given expression is to be evaluated as follows:$$\lim_{x\to 1}\frac{-80+64}{x-1}+\frac{22-150+56}{x-1}$$We observe that both the numerators contain like terms. Therefore, we can combine the like terms as follows:

$$\lim_{x\to 1}\frac{-16}{x-1}+\frac{-72}{x-1}$$$$\lim_{x\to 1}\frac{-16-72}{x-1}$$$$\lim_{x\to 1}\frac{-88}{x-1}$$Now, as $x$ approaches $1$, the denominator $x-1$ approaches $0$. We can not divide by zero. Thus, the limit does not exist. So, the answer is D. In more than 100 words, we can say that the given expression is the limit expression. In this expression, we have to find the value of x by substituting the given value in the expression. After that, we can solve this expression by using the given formula of a limit.

We observe that both the numerators contain like terms. Therefore, we can combine the like terms as given in the answer section. So, the given expression becomes $(-16/x-1) - (72/x-1)$. Then, we take the limit as x approaches 1. The denominator x - 1 approaches 0, and we can not divide by zero. Hence, the limit does not exist.

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What does the graph of the parametric equations x(t)=3−t and
y(t)= (t+1)^2 , where t is on the interval [−3,1], look like? Drag
and drop the answers to the boxes to correctly complete the
statemen
The parametric equations graph as a portion of a parabola. The initial point is and the terminal point is The vertex of the parabola is Arrows are drawn along the parabola to indicate motion right to

Answers

The parametric equations graph as a portion of a parabola. The initial point is (3, 4) and the terminal point is (2, 4). The vertex of the parabola is at (2, 4). Arrows are drawn along the parabola to indicate motion from right to left.

The graph of the parametric equations [tex]x(t) = 3 - t[/tex] and y(t) =[tex](t + 1)^2[/tex], where t is on the interval [-3, 1], represents a portion of a parabola. The initial point of the graph is [tex](3, 4)[/tex] when [tex]t = -3[/tex], and the terminal point is (2, 4) when t = 1. The vertex of the parabola occurs at [tex](2, 4)[/tex], which is the lowest point on the curve. As t increases from [tex]-3 \ to \ 1[/tex], the x-coordinate of the points decreases, indicating a right-to-left motion along the parabola. The parabola opens upwards, creating a concave shape. The graph displays the relationship between x and y values as t varies within the given interval.

In conclusion, the parametric equations graph as a portion of a parabola. The initial point is (3, 4) and the terminal point is (2, 4). The vertex of the parabola is at (2, 4). Arrows are drawn along the parabola to indicate motion from right to left.

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2. Consider a finitely repeated bargaining game with T = 3, 6 = .5 and three players. Find the unique SPNE.

Answers

To find the unique Subgame Perfect Nash Equilibrium (SPNE) in the repeated bargaining game with T = 3, δ = 0.5, and three players, we need to analyze the game step by step.

In this game, players engage in bargaining for T periods, and the discount factor is δ = 0.5, indicating future payoffs are discounted by 50%.

Let's denote the three players as Player 1, Player 2, and Player 3.

At each period, players simultaneously propose a division of the pie, which is represented by a number between 0 and 1. If all players agree on the proposed division, the game ends, and each player receives their respective share. However, if players fail to agree, the game continues to the next period.

To find the SPNE, we need to identify a strategy profile that is a Nash equilibrium at every subgame of the repeated game.

In this case, since T = 3, we have three periods to consider.

Period 3:

In the last period, players have no future gains from cooperation. Therefore, they will propose a division that gives them the entire pie. This implies that each player will propose 1, and since they all agree, the game ends with each player receiving a share of 1.

Period 2:

In the second period, players consider the possibility of reaching the last period. Knowing that proposing 1 leads to a division of (1, 0, 0) in the last period, each player will prefer to propose a division that ensures they receive the largest share in the second period. Since there are no future periods, the Nash equilibrium division will be (1, 0, 0).

Period 1:

In the first period, players consider the possibility of reaching the second and third periods. Knowing that proposing 1 in the second period leads to a division of (1, 0, 0) in the third period, each player will prefer to propose a division that ensures they receive the largest share in the first and second periods. Again, there are no future periods to consider, so the Nash equilibrium division will be (1, 0, 0).

Therefore, the unique SPNE in this repeated bargaining game is for each player to propose a division of 1 in each period.

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Question 9 Find the limit of the sequence: an = 7n² +9n+ 5 / 6n² + 4n+ 1
.........

Answers

The limit of the sequence, as n approaches infinity, is 7/6.To find the limit of the sequence, we divide the highest power of n in the numerator and denominator, which is

By applying the rule of limits, we can ignore the lower-order terms as n approaches infinity.

The limit can be simplified by dividing all terms by n², resulting in (7 + 9/n + 5/n²) / (6 + 4/n + 1/n²). As n approaches infinity, the terms with 9/n and 5/n² become negligible, and similarly for the terms in the denominator. Thus, the limit simplifies to 7/6.

In this limit, the main focus is on the leading coefficients of n² in the numerator and denominator, resulting in a limit of 7/6.

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(2) Find the exact length of a circular are determined by an angle of 195° if the radius of the circle is 24 cm. For full credit, your final answer must be in terms of the correct units.

Answers

The length of arc determined by an angle of 195° with a radius of 24 cm is 13π cm.

The length of the arc of a circle with radius r subtended by an angle θ (measured in radians) is given by the formula, L = θr. However, the angle θ must be expressed in radians before we use the formula.θ = 195°

We know that 360° = 2π radians or 1° = π/180 radians. Therefore, 195° = 195π/180 radians.Let r be the radius of circle and θ be the angle in radians.

Then the length L of the arc is given by L = θr.

Thus, we have L = (195π/180)×24 = 130π/3 cm.

To find the length of the arc, we need to use the formula L = θr.

Here, θ is the angle in radians and r is the radius of the circle. We are given that the angle is 195° and the radius is 24 cm.

We need to first convert the angle to radians.

We know that 360° = 2π radians. Hence, 195° = (195/360)×2π = (13/24)π radians.

Substituting the given values, we have L = (13/24)π × 24.

Simplifying, we get L = 13π cm or approximately 40.8 cm.

Therefore, the length of the arc determined by an angle of 195° with a radius of 24 cm is 13π cm.

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a Find integers s, t, u, v such that 1485s +952t = 690u + 539v. b 211, 307, 401, 503 are four primes. Find integers a, b, c, d such that 211a + 307b+ 401c + 503d = 0 c Find integers a, b, c such that 211a + 307b+ 401c = 0

Answers

In part (a), we can solve it by equating the coefficients of s, t, u, and v on both sides. In part (b),This problem involves finding a linear combination of the given primes that sums to zero. In part (c), involves finding a linear combination of three integers that sums to zero.

(a) For finding integers s, t, u, and v that satisfy the equation 1485s + 952t = 690u + 539v, we can rewrite the equation as 1485s - 690u = 539v - 952t. This equation represents a linear combination of two vectors, where the coefficients of s, t, u, and v are fixed. To find the integers that satisfy the equation, we can use techniques such as the Euclidean algorithm or Gaussian elimination to solve the system of linear equations formed by equating the coefficients on both sides.

(b) For part (b), we need to  integers a, b, c, and d such that 211a + 307b + 401c + 503d = 0. This problem involves finding a linear combination of the given primes (211, 307, 401, 503) that sums to zero. We can consider this as a system of linear equations, where the coefficients of a, b, c, and d are fixed. By solving this system of equations, we can find the values of a, b, c, and d that satisfy the equation.

(c) In part (c), we are asked solve the integers a, b, and c such that 211a + 307b + 401c = 0. This problem is similar to part (b), but involves finding a linear combination of three integers that sums to zero. We solve this problem by solving the system of linear equations formed by equating the coefficients on both sides.

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6. (a) (5pt) Let u = ln(x) and v=In(y), for x>0 and y>0.. Write In (x' √y) in terms of u and v. (b) (5pt) Find the domain, the x-intercept and asymptotes. Then sketch the graph for f(x)=In(x-7). 7.

Answers

(a) Let u = ln(x)

and v = ln(y), for x > 0 and y > 0. Write In (x' √y) in terms of u and v. We have to write In (x' √y) in terms of u and v. Here, we know that,

In(x) = u (Given)

In(y) = v (Given)

In(x' √y) = ln(x) + ln(√y)

= u + 1/2 ln(y)

= u + 1/2 v

Hence, we have written In (x' √y) in terms of u and v.

(b) Find the domain, the x-intercept and asymptotes. Then sketch the graph for f(x) = In(x - 7).

Domain: In any logarithmic function, the argument must be greater than 0. So, (x - 7) > 0

=> x > 7. Therefore, the domain of the given function is {x ∈ R : x > 7}.x-intercept:

To find the x-intercept of f(x), we need to substitute f(x) = 0.0

= In(x - 7)ln(e^0)

= ln(1)

= 0

=> x - 7

= 1x

= 8

Therefore, the x-intercept of f(x) is (8, 0). Asymptotes: The natural logarithmic function does not have a horizontal asymptote. To find the vertical asymptote, we need to find the values of x for which the function does not exist. The function f(x) = In(x - 7) does not exist for

x - 7 ≤ 0

=> x ≤ 7.

Therefore, the vertical asymptote of f(x) is x = 7.

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HW9: Problem 5
Previous Problem Problem List
Next Problem
(1 point)
Let x(t) =
xit) x(t)
be a solution to the system of differential equations:
(t)
6x1(t) +
2(t)
x(t)
If x(0)
find x(t)
Put the eigenvalues in ascending order when you enter ri(t), 2(t) below.
x1(t) r2(t)=
exp
exp
Note: You can earn partial credit on this problem.
exp(
t)
exp(
t)

Answers

To solve the system of differential equations, let's start by writing it in matrix form. Given: x'(t) = 6x₁(t) + 2x₂(t)

x'(t) = x₁(t) + 2x₂(t)

We can write this as:x'(t) = A * x(t),  where A is the coefficient matrix:

A = [[6, 2], [1, 2]]. To find the eigenvalues and eigenvectors of matrix A, we solve the characteristic equation: det(A - λI) = 0, where I is the identity matrix and λ is the eigenvalue.

So, solve for the eigenvalues: |6-λ  2  |   |x|   |0|

|1    2-λ| * |y| = |0|

Expanding the determinant, we get: (6-λ)(2-λ) - (2)(1) = 0

(12 - 6λ - 2λ + λ²) - 2 = 0

λ² - 8λ + 10 = 0

Solving this quadratic equation, we get: λ₁ = (8 + √(8² - 4(1)(10))) / 2 = 4 + √6

λ₂ = (8 - √(8² - 4(1)(10))) / 2 = 4 - √6

Now, let's find the corresponding eigenvectors. For λ₁ = 4 + √6:

(A - λ₁I) * v₁ = 0

|6 - (4 + √6)   2 |   |x|   |0|

|1              2 - (4 + √6)| * |y| = |0|

Simplifying, we get: (2 - √6)x + 2y = 0

x + (√6 - 2)y = 0

Solving these equations, we find that an eigenvector v₁ corresponding to λ₁ is: v₁ = [2√6, 6 - √6]

Similarly, for λ₂ = 4 - √6, we can find the corresponding eigenvector v₂:

v₂ = [2√6, √6 - 2]

Now, we can express the general solution as:

x(t) = c₁ * exp(λ₁ * t) * v₁ + c₂ * exp(λ₂ * t) * v₂, where c₁ and c₂ are constants.

Given the initial condition x(0) = [x₁(0), x₂(0)], we can substitute t = 0 into the general solution and solve for the constants.

x(0) = c₁ * exp(λ₁ * 0) * v₁ + c₂ * exp(λ₂ * 0) * v₂

x(0) = c₁ * v₁ + c₂ * v₂

Let's denote x(0) as [x₁(0), x₂(0)]:

[x₁(0), x₂(0)] = c₁ * v₁ + c₂ * v₂

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3) Let f(x, y) = x²+y²¹//x^2+y^2 (x, y) ≠ (0.0) ; 1, (x, y) = (0,0) Discuss the continuity of the function f on R². Explain all the steps in your answer.

Answers

The function f(x, y) = x² + y² / (x² + y²) is continuous on R², except at the point (0,0), where it is undefined. This can be demonstrated by examining the function's behavior in different regions of R² and checking for continuity using limit properties.

To analyze the continuity of f(x, y) on R², we consider two cases: when (x, y) ≠ (0,0) and when (x, y) = (0,0).

In the first case, when (x, y) ≠ (0,0), the function is well-defined and can be simplified to f(x, y) = 1. Since the constant function 1 is continuous everywhere, f(x, y) is continuous for all (x, y) ≠ (0,0).

In the second case, when (x, y) = (0,0), the function is undefined because it involves division by zero. This creates a potential discontinuity at this point.

To determine the continuity at (0,0), we examine the behavior of the function as (x, y) approaches (0,0) along different paths. By considering limits, we find that the function approaches 1 regardless of the path taken. Therefore, the limit of f(x, y) as (x, y) approaches (0,0) exists and is equal to 1.

Since the function approaches the same value, 1, as (x, y) approaches (0,0) from any direction, we can conclude that f(x, y) is continuous at (0,0) as well.

In summary, f(x, y) = x² + y² / (x² + y²) is continuous on R², except at the point (0,0) where it is undefined but has a limit of 1, ensuring continuity at that point.

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Missing Amount from an Account On August 1, the supplies account balance was $1,240. During August, supplies of $3,760 were purchased, and $1,600 of supplies were on hand as of August 31. Determine su

Answers

The missing amount from the supplies account on August 31 is $3,400.

The missing amount from the supplies account on August 31 is $3,400.

Supplies on hand + Supplies purchased − Beginning supplies = Ending supplies

1,600 + 3,760 - Beginning supplies = Ending supplies

Ending supplies - 3,760 - 1,600 = Beginning supplies

Ending supplies - 5,360 = Beginning supplies

The beginning balance of the supplies account can be determined as follows:

           Beginning supplies + Purchases − Ending supplies = Supplies used during the month

         Beginning supplies + 3,760 - 1,600 = Supplies used during the month

Beginning supplies = Supplies used during the month - 3,160

Therefore: Beginning supplies = 3,760 - 1,600 - 3,160

Beginning supplies = - $3,400

The negative balance shows that the supplies account is overdrawn by $3,400.

The missing amount from the supplies account on August 31 is $3,400.

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In regard to obtaining property, the S.A.F.E. Act states that loan originators:May do so in any way they see fitMay not do so in the course of their professional dutiesMust not do so by fraud or misrepresentationMust not do so without using the services of a real estate licensee How to manage a hotel in Hungary?write done your marketing plan with budget Find the value of k such that h(x)=x^5-2krx^4 +kr^2+1 has the factor x+2. Solve the given differential equation by using an appropriate substitution. The DE is a Bernoulli equation.t dy/dt + y = ty A monopolist produces the good or with costs of c for each unit of x. The inverse demand function is given by p(x) = a - bx (with a, b > 0). a) The monopolist has to pay a tax t (with 0 < t < 1) on his profits. What is the monopolist's optimization problem? Calculate the profit maximizing price and quantity from the first-order conditions. Which of the following statements are TRUE?I. An investor who pays no tax would be more likely to accept the view that high dividends increase stock values rather than the view that low dividends increase stock values.II. corporation announces a large increase in its annual dividend, but its stock price declines. This could result from bird-in-the-hand theory.III. Assume that the tax on dividends and the tax on capital gains is the same. All else equal, a prudent investor would prefer dividends because a dollar today is always worth more than a dollar to be received in the future.IV. If John owns 5% of XYZ corporation before its 2 for 1 stock split, John will own 5% of XYZ corporation after the stock split as well The income statements for ArrowCorporation for years ending December 31, 2021 and 2020 follow:($ millions)20212020Sales revenue$150,000$100,000Cost of sales100,000 list all the ordered pairs in the relation r = {(a, b) | a divides b} on the set {1, 2, 3, 4, 5, 6}. 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If it is rainy or cloudy one day, then there is one chance in two that it will be the same the next day, and if it changes then it is equally likely to be either of the other two possibilities. In the long run, what proportion of days are sunny? What proportion are cloudy? the function f has a taylor series about x=2 that converges to f(x) for all x in the interval of convergence. the nth derivative of f at x=2 is given by f^n(2)=(n 1)!/3^n for n>1, and f(2)=1. The numbers of online applications from simple random samples of college applications for 2003 and for the 2009 were taken. In 2003, out of 563 applications, 180 of them were completed online. In 2009, out of 629 applications, 252 of them were completed online. Test the claim that the proportion of online applications in 2003 was equal to the proportion of online applications in 2009 at the .025 significance level. Claim: Select an answer which corresponds to Select an answer Opposite: Select an answer y which corresponds to Select an answer The test is: Select an answer The test statistic is: z = (to 2 decimals) The critical value is: z = (to 2 decimals) Based on this we: Select an answer Conclusion There Select an answer v appear to be enough evidence to support the claim that the proportion of online applications in 2003 was equal to the proportion of online applications in 2009. 6. Consider the 3-period binomial model for the stock price process {Sn}0(a) Determine the support (range) of each random variable M, M2 and M3. (b) Determine the probability distribution (p.m.f.) of M3. (c) Determine the conditional expectations: (i) E[M | 0(S)]; (ii) E[M3 | (S)]. Discuss the relationship between Risk and Return. 1 mark b) List the two (2) main sources of capital that big corporations use to finance their investments. 2 marks c) Discuss which source of capital is used MORE and WHY? 2 marks Question 3 4 marks Net Present Value (NPV). RAK Itd made an investment in Project A and expects the following estimated Net Cash inflows below for five (5) years. Use this information to answer the questions that follow: Project A Time 0 (10,000) 1 2,500 2 5,000 3 4,500 4 8,000 5 3,500 2 marks a) Calculate Net Present Value (NPV) of Project A, assuming the cost of capital is 10% per annum. b) Should RAK Ltd accept this Project? If YES, Why? If NO, why not? Assume an annual interest rate of 10% for all five (5) years. 2 marks Which of the following statements about the cash method ofaccounting is false?Under the cash method, annual taxable income equals annual netcash inflow.The revenue from a s what sort of companies might employ a private company marketplace The labor market on Starkiller Base is described using the following supply and demand curves for labor: W = -1/15 L + 400/15W = 1/10 L + 10Suppose there are 600 non-institutionalized adults in this economy. Question 9: If there is no minimum wage, how many people are unemployed in the neoclassical labor model?Question 10 If the minimum wage is $22, how many people are hired on Starkiller Base?Question 11 If the minimum wage is $22, what is the labor force participation rate? The answer is in percentage form, do not include % symbol.Question 12 If the minimum wage is $22, what is the unemployment rate? The answer is in percentage form, do not include % symbol. Route to the nearest full percent. ie: 12.70 = 13