start fraction, 2, divided by, 7, end fraction of a meter of ribbon to make bows for her cousins. Now, she has \dfrac{10}{21}
21
10
​
start fraction, 10, divided by, 21, end fraction of a meter of ribbon left.
How much ribbon did Jennifer start with?

a-1: The standardized z-score for the age of the airline passenger is approximately 3.556.

a-2. The statement provided does not indicate whether the given age value (81) is considered an outlier or unusual observation.

To convert the age of an airline passenger (x=81) to a standardized z-score,  use the formula:

z = (x - μ) / σ

where x is the given value, μ is the mean, and σ is the standard deviation.

Plugging in the values,

z = (81 - 49) / 9 =3.556

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To minimize the total monthly cost of production, we need to minimize the joint cost function C(x,y) subject to the constraint that x + y = 1000 (since the objective is to produce 1000 units per month).

We can use the method of Lagrange multipliers to solve this problem. Let L(x,y,λ) be the Lagrangian function defined as:

L(x,y,λ) = x^2 + xy + 2y^2 + 1500 + λ(1000 - x - y)

Taking partial derivatives and setting them equal to zero, we get:

∂L/∂x = 2x + y - λ = 0

∂L/∂y = x + 4y - λ = 0

∂L/∂λ = 1000 - x - y = 0

Solving these equations simultaneously, we obtain:

x = 200 units at Factory X

y = 800 units at Factory Y

Therefore, to minimize costs, the company should produce 200 units at Factory X and 800 units at Factory Y.

Substituting these values into the joint cost function, we get:

C(200,800) = 200^2 + 200800 + 2(800^2) + 1500 = $1,622,500

So, for this combination of units, their minimal costs will be $1,622,500.

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A. The derivative of f(x) is 4x.

B. The derivative of g(x) is -3/(ct^4).

C. The derivative of f(x) is 6(2x + 1)^2.

NAB. 1

(a) The derivative of f(x) = 2x² + b is:

f'(x) = d/dx (2x² + b)

= 4x

So the derivative of f(x) is 4x.

(b) The derivative of g(x) = 1/ct³ is:

g'(x) = d/dx (1/ct³)

= (-3/ct^4) * (dc/dx)

We can use the chain rule to find dc/dx, where c = t. Since c = t, we have:

dc/dx = d/dx (t)

= 1

Substituting this value into the expression for g'(x), we get:

g'(x) = (-3/ct^4) * (dc/dx)

= (-3/ct^4) * (1)

= -3/(ct^4)

So the derivative of g(x) is -3/(ct^4).

(c) The derivative of h(x) = b/(1 - at²) is:

h'(x) = d/dx [b/(1 - at²)]

= -b * d/dx (1 - at²)^(-1)

= -b * (-1) * (d/dx (1 - at²))^(-2) * d/dx (1 - at²)

= -b * (1 - at²)^(-2) * (-2at)

= 2abt / (a²t^4 - 2t^2 + 1)

So the derivative of h(x) is 2abt / (a²t^4 - 2t^2 + 1).

NAB. 2

Let f(x) = g(h(x)), where g(u) = u^3 and h(x) = 2x + 1. We can use the chain rule to find f'(x):

f'(x) = d/dx [g(h(x))]

= g'(h(x)) * h'(x)

= 3(h(x))^2 * 2

= 6(2x + 1)^2

Therefore, the derivative of f(x) is 6(2x + 1)^2.

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The slope of the tangent line refers to the rate at which a curve or function is changing at a specific point. In calculus, it is commonly used to determine the instantaneous rate of change or the steepness of a curve at a particular point.

We need to find the slope of the tangent line to the curve defined by 2xy^9 + 7xy = 9 at the point (1, 1).

Therefore, we are required to use implicit differentiation.

Step 1: Differentiate both sides of the equation with respect to x.

d/dx[2xy^9 + 7xy] = d/dx[9]2y * dy/dx (y^9) + 7y + xy * d/dx[7y]

= 0(dy/dx) * (2xy^9) + y^10 + 7y + x(dy/dx)(7y)

= 0(dy/dx)[2xy^9 + 7xy]

= -y^10 - 7ydy/dx (x)dy/dx

= (-y^10 - 7y)/(2xy^9 + 7xy)

Step 2: Plug in the values to solve for the slope at (1,1).

Therefore, the slope of the tangent line to the curve defined by 2xy^9 + 7xy = 9 at the point (1, 1) is -8/9.

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The only equation that can be written as a second-order, linear, homogeneous differential equation is [tex]3y'' + e^ty = 0.[/tex]

A second-order differential equation is an equation that involves the second derivative of the dependent variable (in this case, y), and it can be written in the form ay'' + by' + c*y = 0, where a, b, and c are coefficients. Now, let's examine each option:

y' + 2y = 0:

This is a first-order differential equation because it involves only the first derivative of y.

[tex]y'' + y' + 5y^2 = 0:[/tex]

This equation is not linear because it contains the term [tex]y^2[/tex], which makes it nonlinear. Additionally, it is not homogeneous as it contains the term [tex]y^2.[/tex]

2y'' + y' + 5t = 0:

This equation is linear and second-order, but it is not homogeneous because it involves the variable t.

[tex]3y'' + e^ty = 0:[/tex]

This equation satisfies all the criteria. It is second-order, linear, and homogeneous because it contains only y and its derivatives, with no other variables or functions involved.

[tex]y'' + y' + e^y = 0:[/tex]

This equation is second-order and homogeneous, but it is not linear because it contains the term [tex]e^y.[/tex]

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The type of sampling the student used is known as convenience sampling.

Convenience sampling involves selecting individuals who are easily accessible or readily available for the study. In this case, the student surveyed members of his own class, which was likely a convenient and easily accessible group for him to gather data from.

However, convenience sampling may introduce bias and may not provide a representative sample of the entire student population.

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Based on the given area of the room and the minimum space required per person, we have determined that a maximum of 37 people could fit in this room.

To find the maximum number of people who can fit in the room, we need to divide the total area of the room by the minimum space required per person.

Given that the area of the room is approximately 9×10^4 square inches, and each person needs a minimum of 2.4×10^3 square inches of space, we can calculate the maximum number of people using the formula:

Maximum number of people = (Area of the room) / (Minimum space required per person)

First, let's convert the given values to standard form:

Area of the room = 9×10^4 square inches = 9,0000 square inches

Minimum space required per person = 2.4×10^3 square inches = 2,400 square inches

Now, we can perform the calculation:

Maximum number of people = 9,0000 square inches / 2,400 square inches ≈ 37.5

Since we need to round down to the nearest whole person, the maximum number of people who could fit in the room is 37.

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A cylindrical object is 3.13 cm in diameter and 8.94 cm long and weighs 60.0 g. The density of the cylindrical object is 0.849 g/cm^3.

To calculate the density, we first need to find the volume of the cylindrical object. The volume of a cylinder can be calculated using the formula V = πr^2h, where r is the radius (half of the diameter) and h is the height (length) of the cylinder.

Given that the diameter is 3.13 cm, the radius is half of that, which is 3.13/2 = 1.565 cm. The length of the cylinder is 8.94 cm.

Using the values obtained, we can calculate the volume: V = π * (1.565 cm)^2 * 8.94 cm = 70.672 cm^3.

The density is calculated by dividing the weight (mass) of the object by its volume. In this case, the weight is given as 60.0 g. Therefore, the density is: Density = 60.0 g / 70.672 cm^3 = 0.849 g/cm^3.

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The complete factorization of the function P(x) is [tex]P(x) = (x + 1)(x - [-1 + i*\sqrt{ (7)/ 2} (x - [-1 - i*\sqrt{(7)] / 2}.[/tex]

The function given to us is: P(x) = x³ + 2x² + x + 2

To find all the rational and other zeros of the given function, we can use the rational root theorem. According to the rational root theorem, if a polynomial function has a rational zero, then it must be of the form: p/q where p is a factor of the constant term of the function and q is a factor of the leading coefficient of the function.

Here, the constant term is 2 and the leading coefficient is 1, so the possible rational roots of the function P(x) are: ±1, ±2.

Next, we can test these possible rational roots using synthetic division:

Let's start with the root x = -1, we have the following synthetic division:

x  |  1  2  1  2-1  |___|_______|_______|______|1   1   2  |  0

Since we get a zero remainder, x = -1 is a root of the function P(x).Using the factor theorem, we can write:

P(x) = (x + 1)(x² + x + 2)

Now, we need to find the roots of the quadratic factor x² + x + 2. Since there are no real roots of this quadratic, we can use the quadratic formula to find the complex roots:

x = [-b ± sqrt(b² - 4ac)] / 2a

Here, a = 1, b = 1, c = 2, so we have:

[tex]x = [-1 ± sqrt(1 - 4(1)(2))] / 2[/tex]

[tex]= [-1 ± sqrt(-7)] / 2[/tex]

[tex]= [-1 ± i*sqrt(7)] / 2[/tex]

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The center-radius form of the equation of the circle with center (0, 0) and radius 2 is[tex]`(x - 0)^2 + (y - 0)^2 = 2^2` or `x^2 + y^2 = 4`.[/tex]

The center-radius form of the equation of the circle is given by [tex]`(x - h)^2 + (y - k)^2 = r^2`[/tex], where (h, k) is the center and r is the radius of the circle.

Given the center of the circle as (0, 0) and the radius as 2, we can substitute these values in the center-radius form to obtain the equation of the circle:[tex]`(x - 0)^2 + (y - 0)^2 = 2^2`or `x^2 + y^2 = 4`.[/tex]

This is the center-radius form of the equation of the circle with center (0, 0) and radius 2.

The equation describes a circle with radius 2 units and the center at the origin (0,0).

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Kenzie can visit the movie theater approximately 5 times, given the prices of a ticket and a small popcorn.

To find how many times Kenzie can visit the movie theater given the prices of a ticket and a small popcorn, we can set up an equation.

Let's denote the number of times Kenzie visits the movie theater as "x".

The cost of one ticket is $6.50, and the cost of a small popcorn is $3.25. So, each time she goes to the movie theater, she spends $6.50 + $3.25 = $9.75.

The equation that represents this situation is:

6.50 + 3.25x = 25.00

This equation states that the total amount spent, which is the sum of $6.50 and $3.25 multiplied by the number of visits (x), is equal to $25.00.

To find the value of x, we can solve this equation:

3.25x = 25.00 - 6.50

3.25x = 18.50

x = 18.50 / 3.25

x ≈ 5.692

Since we cannot have a fraction of a visit, we need to round down to the nearest whole number.

Therefore, Kenzie can visit the movie theater approximately 5 times, given the prices of a ticket and a small popcorn.

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The percentage of students who chose something other than red, blue, or yellow is 43%.

To find the percentage of students who chose something other than red, blue, or yellow, we need to subtract the percentages of students who chose red, blue, and yellow from 100%.

Given:

- 24% chose blue

- 17% chose red

- 16% chose yellow

Let's calculate the percentage of students who chose something other than red, blue, or yellow:

Percentage of students who chose something other than red, blue, or yellow = 100% - (percentage of students who chose red + percentage of students who chose blue + percentage of students who chose yellow)

= 100% - (17% + 24% + 16%)

= 100% - 57%

= 43%

43% of the students chose something other than red, blue, or yellow as their favorite color.

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Hence, the equation of the line that is parallel to the line y = -7 and passes through the point (-1, 9) is y = 9.

Given that a line that is parallel to the line y = -7 and passes through the point (-1, 9) is to be determined.

To find the equation of the line that is parallel to the line y = -7 and passes through the point (-1, 9), we need to make use of the slope-intercept form of the equation of the line, which is given by y = mx + c, where m is the slope of the line and c is the y-intercept of the line.

In order to determine the slope of the line that is parallel to the line y = -7, we need to note that the slope of the line y = -7 is zero, since the line is a horizontal line.

Therefore, any line that is parallel to y = -7 would also have a slope of zero.

Therefore, the equation of the line that is parallel to the line y = -7 and passes through the point (-1, 9) would be given by y = 9, since the line would be a horizontal line passing through the y-coordinate of the given point (-1, 9).

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The equation of the line with a slope of 3/2, passing through the point (0, -4), in slope-intercept form is y = (3/2)x - 4.

To write the equation of a line in slope-intercept form, we need two key pieces of information: the slope of the line and a point it passes through. Given that the slope is 3/2 and the line passes through the point (0, -4), we can proceed to write the equation.

The slope-intercept form of a line is given by the equation y = mx + b, where m represents the slope and b represents the y-intercept.

Substituting the given slope, m = 3/2, into the equation, we have y = (3/2)x + b.

To find the value of b, we substitute the coordinates of the given point (0, -4) into the equation. This gives us -4 = (3/2)(0) + b.

Simplifying the equation, we have -4 = 0 + b, which further reduces to -4 = b.

Therefore, the value of the y-intercept, b, is -4.

Substituting the values of m and b into the slope-intercept form equation, we have the final equation:

y = (3/2)x - 4.

This equation represents a line with a slope of 3/2, meaning that for every 2 units of horizontal change (x), the line rises by 3 units (y). The y-intercept of -4 indicates that the line intersects the y-axis at the point (0, -4).

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a) The coefficient of variation the coefficient of variation can be determined using the following formulaic = (Standard deviation / Mean) × 100Where CV = Coefficient of variation The Mean (μ) = 30.3 years old.

Therefore, the range of ages that will include 68% of the students is from: μ ± σ= 30.3 ± 2.8= (27.5, 32.1)d) Using Chebyshev's Theorem, determine the range of ages that will include at least 94% of the students around the mean Chebyshev's theorem is given as follows;1.

Using Chebyshev's Theorem, determine the range of ages that will include at least 78% of the students around the mean Since we want to find the range of ages that will include at least 78% of the students, then;

1 – 1/k²

= 0.78

Thus,

k²

= 1/0.22

= 4.5455k

= 2.13

Hence, the range of ages that will include at least 78% of the students is from:

μ ± 2.13σ

= 30.3 ± (2.13 x 2.8)

= (23.6, 37)

Therefore, the range of ages that will include at least 78% of the students is from 23.6 years old to 37 years old.

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Answer:

1071

Step-by-step explanation:

1989÷13=153

so x=153

153×7=1071

so 7x=1071

Answer:

1,071

Explanation:

If 13x = 1,989, then I can find x by dividing 1,989 by 13:

[tex]\sf{13x=1,989}[/tex]

[tex]\sf{x=153}[/tex]

Multiply 153 by 7:

[tex]\sf{7\times153=1,071}[/tex]

Hence, the value of 7x is 1,071.

1. The product of (3/4) multiplied by (16/21) is 4/7.

2. The product of 5(7/9) and (27/56) is 189/100.

3. 4(2/5) times 7(1/3) is 484/15.

4. Twice the product of (8/11) and (9/10) is 72/55.

To solve the given problems, we will translate the mathematical sentences and perform the necessary calculations.

1. (3/4) multiplied by (16/21):

Mathematical sentence: (3/4) * (16/21)

Solution: (3/4) * (16/21) = (3 * 16) / (4 * 21) = 48/84 = 4/7

Therefore, the product of (3/4) multiplied by (16/21) is 4/7.

2. The product of 5(7/9) and (27/56):

Mathematical sentence: 5(7/9) * (27/56)

Solution: 5(7/9) * (27/56) = (35/9) * (27/56) = (35 * 27) / (9 * 56) = 945/504 = 189/100

Therefore, the product of 5(7/9) and (27/56) is 189/100.

3. 4(2/5) times 7(1/3):

Mathematical sentence: 4(2/5) * 7(1/3)

Solution: 4(2/5) * 7(1/3) = (22/5) * (22/3) = (22 * 22) / (5 * 3) = 484/15

Therefore, 4(2/5) times 7(1/3) is 484/15.

4. Twice the product of (8/11) and (9/10):

Mathematical sentence: 2 * (8/11) * (9/10)

Solution: 2 * (8/11) * (9/10) = (2 * 8 * 9) / (11 * 10) = 144/110 = 72/55

Therefore, twice the product of (8/11) and (9/10) is 72/55.

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The equation of the plane is -16x - 12y - 4z + 64 = 0.

Given three points P = (4, 0, 0), Q = (3, 4, -4), R = (5, -1, -4) and a plane equation through the three points. We need to find the equation of the plane.

Let's start with the vector PQ and PR will lie on the plane

PQ vector = Q - P = (3, 4, -4) - (4, 0, 0)

                 = (-1, 4, -4)

PR vector = R - P = (5, -1, -4) - (4, 0, 0)

                = (1, -1, -4)

The normal vector of the plane will be perpendicular to both the above vectors.

N = PQ × PRN = (-1, 4, -4) x (1, -1, -4)

N = (-16, -12, -4)

The equation of the plane is of the form ax + by + cz = d. Now we will substitute any one of the three points to find the value of d. We use point P as P.

N + d = 0(-16)(4) + (-12)(0) + (-4)(0) + d = 0 +d = 64

The equation of the plane is -16x - 12y - 4z + 64 = 0. The plane is represented by the equation -16x - 12y - 4z + 64 = 0.

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The range of the given data is 4.4 miles, the variance of the given data is 2.99054 and the standard deviation of the given data is 1.728 (approx).

To compute the range, standard deviation and variance of the given data we have to use the following formulae:

Range = Maximum value - Minimum value

Variance = (Σ(X - μ)²) / n

Standard deviation = √Variance

Here, the data given is:

1.1 5.2 3.6 5.0 4.8 1.8 2.2 5.2 1.5 0.8

First we will find out the range:

Range = Maximum value - Minimum value= 5.2 - 0.8= 4.4

Now, we will find the mean of the data.

μ = (ΣX) / n= (1.1 + 5.2 + 3.6 + 5.0 + 4.8 + 1.8 + 2.2 + 5.2 + 1.5 + 0.8) / 10= 30.2 / 10= 3.02

Now, we will find out the variance:

Variance = (Σ(X - μ)²) / n= [(1.1 - 3.02)² + (5.2 - 3.02)² + (3.6 - 3.02)² + (5.0 - 3.02)² + (4.8 - 3.02)² + (1.8 - 3.02)² + (2.2 - 3.02)² + (5.2 - 3.02)² + (1.5 - 3.02)² + (0.8 - 3.02)²] / 10= [(-1.92)² + (2.18)² + (0.58)² + (1.98)² + (1.78)² + (-1.22)² + (-0.82)² + (2.18)² + (-1.52)² + (-2.22)²] / 10= (3.6864 + 4.7524 + 0.3364 + 3.9204 + 3.1684 + 1.4884 + 0.6724 + 4.7524 + 2.3104 + 4.9284) / 10= 29.9054 / 10= 2.99054

Now, we will find out the standard deviation:

Standard deviation = √Variance= √2.99054= 1.728 (approx)

Hence, the range of the given data is 4.4 miles, the variance of the given data is 2.99054 and the standard deviation of the given data is 1.728 (approx).

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The unit ratio of substance X to substance Y is 34:1. This means that for every 34 units of substance X, 1 unit of substance Y is required.

The unit ratio of substance X to substance Y in the science experiment is 493:14.5. This means that for every 493 milliliters of substance X used, 14.5 milliliters of substance Y is required.

A ratio is a comparison of two or more quantities of the same kind. Ratios can be expressed in different forms, but the most common is the unit ratio, which is the ratio of two numbers that have the same units. In this case, we are finding the unit ratio of substance X to substance Y, which is the amount of substance X required for a fixed amount of substance Y or vice versa.

We are given that 493 milliliters of substance X and 14.5 milliliters of substance Y are required for the science experiment. To find the unit ratio of substance X to substance Y, we divide the amount of substance X by the amount of substance Y:

Unit ratio of substance X to substance Y = Amount of substance X/Amount of substance Y

                                                                    = 493/14.5

                                                                    = 34:1

Therefore, the unit ratio of substance X to substance Y is 34:1. This means that for every 34 units of substance X, 1 unit of substance Y is required.

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If an architect built a scale model of Cowboys Stadium using a scale in which 2 inches represents 40 feet and the height of Cowboys Stadium is 320 feet, then the height of the scale model in inches is 16 inches.

To find the height in inches, follow these steps:

Therefore, the height of the scale model in inches is 16 inches.

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The total number of TV sets sold is 20 + 25 = 45.

Let the number of 42′′ TV sold be x and the number of 55′′ TV sold be x + 5.

The cost of 42′′ TV is $400.The cost of 55′′ TV is $730.

So, the total amount collected = $26,250.

Therefore, by using the above-mentioned information we can write the equation:400x + 730(x + 5) = 26,250

Simplifying this equation, we get:

1130x + 3650 = 26,2501130x = 22,600x = 20

Thus, the number of 42′′ TV sold is 20 and the number of 55′′ TV sold is 25 (since x + 5 = 20 + 5 = 25).

Hence, the total number of TV sets sold is 20 + 25 = 45.

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ABC needs money to buy a new car.

a) ABC can borrow approximately $20500.99 from his friend initially

b) Assuming a payment growth rate of 0.75, ABC can borrow approximately $50139.09

a) To calculate how much ABC can borrow from his friend initially, we can use the present value formula for an annuity:

PV = PMT * [(1 - (1 + r)^(-n)) / r]

Where PV is the present value, PMT is the annual payment, r is the interest rate, and n is the number of years.

In this case, ABC will make annual payments of $5000 in the first year and $8000 for the next four years, with a 7% compounded interest rate.

Calculating the present value:

PV = 5000 * [(1 - (1 + 0.07)^(-5)) / 0.07]

PV ≈ $20500.99

Therefore, ABC can borrow approximately $20500.99 from his friend initially.

b) If ABC's salary is estimated to increase at a rate of 0.75, we need to adjust the annual payments accordingly. The new payment schedule will be $5000 in the first year, $5000 * 1.75 in the second year, $5000 * (1.75)^2 in the third year, and so on.

Using the adjusted payment schedule, we can calculate the present value:

PV = 5000 * [(1 - (1 + 0.07)^(-5)) / 0.07] + (5000 * 1.75) * [(1 - (1 + 0.07)^(-4)) / 0.07]

PV ≈ $50139.09

Therefore, ABC can borrow approximately $50139.09 from his friend initially, considering the estimated salary increase.

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Given Data: Price of a single ticket = $7Number of tickets sold = 700Amount of Grand Prize = $2,000Amount of Second Prize (4) = $200 x 4 = $800Amount of Third Prize (16) = $10 x 16 = $160

Expected Value can be defined as the average value of each ticket bought by each person.

Therefore, the expected value of the profit is the sum of the probabilities of each winning ticket multiplied by the amount won.

Calculation: Expected value for your profit = probability of winning × amount wonProbability of winning Grand Prize = 1/700

Therefore, the expected value of Grand Prize = (1/700) × 2,000 = $2.86

Probability of winning Second Prize = 4/700Therefore, the expected value of Second Prize = (4/700) × 200 = $1.14

Probability of winning Third Prize = 16/700Therefore, the expected value of Third Prize = (16/700) × 10 = $0.23

Expected value of profit = (2.86 + 1.14 + 0.23) - 7

Expected value of profit = $3.23 - $7

Expected value of profit = - $3.77

As the expected value of profit is negative, it means that on average you would lose $3.77 on each ticket you buy. Therefore, it is not a good investment.

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Given sequence is 1, 2, 4, 8, 6, 1, 2, 4, 8, 6,. The content loaded is that the sequence is repeated. We need to find out the number of sixes in the first 296 numbers of the sequence. Solution: Let us analyze the given sequence first.

Number sequence is 1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....On close observation, we can see that the sequence is a combination of 5 distinct digits 1, 2, 4, 8, 6, and is loaded. Let's repeat the sequence several times to see the pattern.1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....1, 2, 4, 8, 6, 1, 2, 4, 8, 6, ....We see that the sequence is formed by repeating the numbers {1, 2, 4, 8, 6}. The first number is 1 and the 5th number is 6, and the sequence repeats. We have to count the number of 6's in the first 296 terms of the sequence.So, to obtain the number of 6's in the first 296 terms of the sequence, we need to count the number of times 6 appears in the first 296 terms.296 can be written as 5 × 59 + 1.Therefore, the first 296 terms can be written as 59 complete cycles of the original sequence and 1 extra number, which is 1.The number of 6's in one complete cycle of the sequence is 1. To obtain the number of 6's in 59 cycles of the sequence, we have to multiply the number of 6's in one cycle of the sequence by 59, which is59 × 1 = 59.There is no 6 in the extra number 1.Therefore, there are 59 sixes in the first 296 numbers of the sequence.

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The g(h(-1)) = g(-10) = -1 ------------ (1)h(g(x)) = x, which means h(g(-1)) = -1, h(2) = -1 ------------ (2)(a) (g + h)(-1) = g(-1) + h(-1)= 2 + (-10)=-8(b) (g - h)(-1) = g(-1) - h(-1) = 2 - (-10) = 12. The required value are:

(a) -8 and (b) 12  

Given: g(x) and h(x) are inverse functions of each other (i.e.,

g(x) = h-¹(x) and h(x) = g(x)).g(-1) = 2 and h(-1) = -10

We are to find:

(a) (g + h)(-1) (b) (g - h)(-1)

We know that g(x) = h⁻¹(x),

which means g(h(x)) = x.

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The size of each repayment should be $1,746.38 if the loan is to be amortized at the end of the term.

Given: Loan amount = $320,000

Annual interest rate = 3%

Tenure = 25 years = 25 × 12 = 300 months

Annuity pay = Monthly payment amount to repay the loan each month

Formula used: The formula to calculate the monthly payment amount (Annuity pay) to repay a loan amount with interest over a period of time is given below.

P = (Pr) / [1 – (1 + r)-n]

where P is the monthly payment,

r is the monthly interest rate (annual interest rate / 12),

n is the total number of payments (number of years × 12), and

P is the principal or the loan amount.

The interest rate of 3% per year is charged on the unpaid balance. So, the monthly interest rate, r is given by;

r = (3 / 100) / 12 = 0.0025 And the total number of payments, n is given by n = 25 × 12 = 300

Substituting the given values of P, r, and n in the formula to calculate the monthly payment amount to repay the loan each month.

320000 = (P * (0.0025 * (1 + 0.0025)^300)) / ((1 + 0.0025)^300 - 1)

320000 = (P * 0.0025 * 1.0025^300) / (1.0025^300 - 1)

(320000 * (1.0025^300 - 1)) / (0.0025 * 1.0025^300) = P

Monthly payment amount to repay the loan each month = $1,746.38

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The Moore family received 12 letters in their mail on July 28.

Let the number of magazines received be x.

According to the question, the number of ads is 5 more than the number of magazines i.e., ads = x + 5.

Also, the number of bills is three times the number of magazines i.e., bills = 3x.

Therefore, the total number of pieces of mail can be represented as:

Total pieces of mail = letters + magazines + bills + ads

23 = letters + x + 3x + (x+5)

Simplifying the above equation:

23 = 5x + 5

18 = 5x

x = 3.6

Since x represents the number of magazines, it cannot be a decimal value. So, we take the closest integer value, which is 4.

Hence, the number of magazines received by the Moore family is 4.

Now, substituting the values of magazines, ads, and bills in the equation:

letters = 23 - magazines - ads - bills

letters = 23 - 4 - 9 - 12

letters = 12

Therefore, the number of letters received by the Moore family on July 28 is 12.

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The characters in increasing order of asymptotic growth (big-O notation) are: 5, x⁴, 60n² + 5n + 1.

To sort the characters below in increasing order of asymptotic growth (big-O notation):

x⁴, 5, 60n² + 5n + 1

The correct order is:

1. 5 (constant time complexity, O(1))

2. x⁴ (polynomial time complexity, O(x⁴))

3. 60n² + 5n + 1 (quadratic time complexity, O(n²))

Therefore, the characters are sorted in increasing order of asymptotic growth as follows: 5, x⁴, 60n² + 5n + 1.

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(a) The derivative of x^3+y^3=4 is given by 3x^2+3y^2(dy/dx)=0. Thus, dy/dx=-x^2/y^2.

(b) The derivative of y=sin(3x+4y) is given by dy/dx=3cos(3x+4y)/(1-4cos^2(3x+4y)).

(c) The derivative of y=sin^(-1)x is given by dy/dx=1/√(1-x^2).

(d) The derivative of y=tan^(-1)x is given by dy/dx=1/(1+x^2).

(a) To find dy/dx for the equation x^3 + y^3 = 4, we can differentiate both sides of the equation with respect to x using implicit differentiation:

d/dx (x^3 + y^3) = d/dx (4)

Differentiating x^3 with respect to x gives us 3x^2. To differentiate y^3 with respect to x, we use the chain rule. Let's express y as a function of x, y(x):

d/dx (y^3) = d/dx (y^3) * dy/dx

Applying the chain rule, we get:

3y^2 * dy/dx = 0

Now, let's solve for dy/dx:

dy/dx = 0 / (3y^2)

dy/dx = 0

Therefore, the derivative dy/dx for the equation x^3 + y^3 = 4 is 0.

(b) For the equation y = sin(3x + 4y), let's differentiate both sides of the equation with respect to x using implicit differentiation:

d/dx (sin(3x + 4y)) = d/dx (y)

Using the chain rule, we have:

cos(3x + 4y) * (3 + 4(dy/dx)) = dy/dx

Rearranging the equation, we can solve for dy/dx:

4(dy/dx) - dy/dx = -cos(3x + 4y)

Combining like terms:

3(dy/dx) = -cos(3x + 4y)

Finally, we can express dy/dx in terms of x only:

dy/dx = (-cos(3x + 4y)) / 3

(c) For the equation y = sin^(-1)(x), we can rewrite it as x = sin(y). Let's differentiate both sides with respect to x using implicit differentiation:

d/dx (x) = d/dx (sin(y))

The left side is simply 1. To differentiate sin(y) with respect to x, we use the chain rule:

cos(y) * dy/dx = 1

Now, we can solve for dy/dx:

dy/dx = 1 / cos(y)

Using the Pythagorean identity sin^2(y) + cos^2(y) = 1, we can express cos(y) in terms of x:

cos(y) = sqrt(1 - sin^2(y))= sqrt(1 - x^2)    (substituting x = sin(y))

Therefore, the derivative dy/dx for the equation y = sin^(-1)(x) is:

dy/dx = 1 / sqrt(1 - x^2)

(d) For the equation y = tan^(-1)(x), we can rewrite it as x = tan(y). Let's differentiate both sides with respect to x using implicit differentiation:

d/dx (x) = d/dx (tan(y))

The left side is simply 1. To differentiate tan(y) with respect to x, we use the chain rule:

sec^2(y) * dy/dx = 1

Now, we can solve for dy/dx:

dy/dx = 1 / sec^2(y)

Using the identity tan^2(y) + 1 = sec^2(y), we can express sec^2(y) in terms of x:

sec^2(y) = tan^2(y) + 1= x^2 + 1    (substituting x = tan(y))

Therefore, the derivative dy/dx for the equation y = tan^(-1)(x) is:

dy/dx = 1 / (x^2 + 1)

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