The exchange rate is 1.3 Canadian dollars per US dollar. How many U.S. dollars are needed to purchase 10,000 Canadian dollars? $7,692 $13,000

The linear equation graph of the given function shows that the slope is -1 and y-intercept is -1

The general form of a Linear Equation in slope intercept form is expressed as:

y = mx + c

where:

m is slope

c is y-intercept

The linear equation is given as:

f(x) = -x - 1

At x = 0, f(0) = -0 - 1 = -1

At x = 1, f(1) = -1 - 1 = -2

At x = 2, f(2) = -2 - 2 = -4

These and other points are used to plot the linear equation graph attached.

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To find the area of the finite region bounded by the straight-line with equation y = -x and the parabola y = N-x-x², the steps to follow are as follows:Explanation in your own words of the method/approach you would use to find the wanted areaThe task requires calculating the finite area between a straight line and a parabolic curve.

We need to find the points of intersection of the two curves and then integrate the difference of the two functions.Appropriate graphs (using GeoGebra or similar software) and appropriate expressions and formulae using a correct mathematical notationThe curve y = N-x-x² and y = -x are intersecting at some point. (ii)Equating (i) and (ii), we get:N-x-x² = -x ... (On substituting y = -x in equation (i))⇒ x² - (N-1)x = 0 ... (iii)The above equation (iii) gives us the value of x which is: x = 0 and x = N-1.Solving the above equation, we get  divide he two points of intersection as (0, 0) and (N-1, N-1). Hence the two curves intersect at these two points and they  the region into two.All the calculations made clearly stated using the equation editor in Word (or similar software).

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Step-by-step explanation:

According to angles of intersecting chords theorem    ( angle S is also 117):

117 = 1/2 (208 + 2x-4)  

so  x = 15

then 2x-4 = 26 degrees

Answer:

Step-by-step explanation:

You want the speeds of Lisa and Kim if Lisa's speed is 15 mph faster than Kim's and they can travel 228 miles and 168 miles, respectively, in the same time.

Let L represent Lisa's speed. Their travel time is the distance divided by the speed, so you have ...

  228/L = 168/(L -15)

  228(L -15) = 168L

  60L = 228(15) . . . . . . . . add 228·15 -168L

  L = 228(15/60) = 57

  L -15 = 42

Lisa's speed is 57 miles per hour; Kim's is 42 mph.

__

Additional comment

The distance traveled is proportional to speed when the travel time is constant. This means we can write the ratio of speeds as ...

  228/168

We note that these differ by 60 "ratio units". The actual speeds differ by 15 mph, so each mile per hour is represented by (60/15) = 4 "ratio units". Dividing the ratio numbers by 4 gives the speed numbers:

  228 : 168 = (228)(1/4) : (168)(1/4) = 57 : 42

The latter two numbers differ by 15, as do Lisa's and Kim's speeds.

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Therefore, the probability that either component A or B, but not both, fails is 0.5.

To find the probability that either component A or B, but not both, fails, we can use the concept of exclusive OR (XOR).

The XOR operation evaluates to true (1) if and only if exactly one of the conditions is true. In this case, we want to calculate the probability of either A or B failing, but not both.

Let's denote the event "A fails" as A and the event "B fails" as B. The probability that both A and B fail simultaneously is given as 0.1.

Now, let's break down the possible scenarios:

A fails, B does not fail: The probability of this event is P(A) * (1 - P(B)) = 0.4 * (1 - 0.5) = 0.4 * 0.5 = 0.2.

A does not fail, B fails: The probability of this event is (1 - P(A)) * P(B) = (1 - 0.4) * 0.5 = 0.6 * 0.5 = 0.3.

Since we are interested in the XOR scenario, where either A or B fails, but not both, we need to sum up the probabilities from scenarios 1 and 2:

P(A XOR B) = P(A fails, B does not fail) + P(A does not fail, B fails)

= 0.2 + 0.3

= 0.5.

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In the given context, the function h(x) = 39 - 6.5x represents the distance (in meters) that a Tortoise is ahead of a Hare in terms of the number of seconds, x, since the start of a 100-meter race.

We need to solve the equation h(x) = 0 for x and determine its meaning in the problem context. We also need to find the root of h and identify the point representing the horizontal intercept of the graph of h. a. To solve the equation h(x) = 0, we substitute 0 for h(x) in the equation and solve for x. In this context, the solution represents the time at which the Tortoise and the Hare are at the same distance from the starting point, i.e., the moment when the Tortoise and the Hare are tied in the race. This solution can be labeled on the graph as the point where the h(x) curve intersects the x-axis. b. The root of h represents the x-value for which h(x) = 0, indicating the time when the Tortoise and the Hare are tied. This root is the same as the solution found in part (a). The point representing the horizontal intercept of the graph of h is the point (x, 0) on the graph where the curve intersects the x-axis.

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Since P(pass/male) ≈ 0.627 and P(pass) ≈ 0.636, the two results are close, so the events are somewhat independent.

We have,

To determine whether gender and passing the test are independent, we need to compare the conditional probability of passing the test given the gender with the overall probability of passing the test.

Let's calculate the probabilities:

P(pass/male) = Number of males who passed / Total number of males

= 69 / (69 + 41)

= 69 / 110

≈ 0.627

P (pass) = (Number of males who passed + Number of females who passed) / Total number of students

= (69 + 66) / (69 + 41 + 66 + 36)

= 135 / 212

≈ 0.636

Since P(pass/male) is approximately equal to P(pass) (0.627 ≈ 0.636), the two results are close, indicating that passing the test does not seem to depend strongly on gender.

Thus,

Filling in the blanks in the sentence:

Since P(pass/male) ≈ 0.627 and P(pass) ≈ 0.636, the two results are close, so the events are somewhat independent.

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The Effective Annual Rate (EAR) is a measure of the annual interest rate that takes into account the compounding period. For the "Maximum Return" account with an interest rate of 2.9% compounded daily, and the "Super" account with an interest rate of 2.85% compounded continuously, the Effective Annual Rates can be calculated.

The Effective Annual Rate (EAR) for the "Maximum Return" account can be found using the formula:

EAR = (1 + (nominal interest rate / number of compounding periods))^number of compounding periods - 1

In this case, the nominal interest rate is 2.9% and it is compounded daily. Since compounding occurs daily, the number of compounding periods in a year is 365.

Plugging in the values, the calculation would be:

EAR = (1 + (0.029 / 365))^365 - 1

Calculating this expression will give us the Effective Annual Rate for the "Maximum Return" account.

For the "Super" account, where the interest is compounded continuously, the formula for the Effective Annual Rate is simply the nominal interest rate itself. Therefore, the Effective Annual Rate for the "Super" account is 2.85%.

In summary, the Effective Annual Rate for the "Maximum Return" account with a 2.9% interest rate compounded daily can be found using the compounding formula. For the "Super" account with a 2.85% interest rate compounded continuously, the Effective Annual Rate is equal to the nominal interest rate itself.

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The statement is false. If the sample space S is an uncountable set, it is still possible for a random variable Y: S → R to be a discrete random variable.

A random variable is considered discrete if its range, which is the set of possible values it can take on, is countable. The countability of the range depends on the nature of the mapping from the sample space to the real numbers.

Even though the sample space S is uncountable, it is still possible for the random variable Y to have a countable range. For example, consider a uniform distribution on the interval [0, 1]. The sample space S is uncountable (i.e., an infinite continuum), but the random variable Y that maps each point in S to its corresponding value in [0, 1] is a discrete random variable because the range is the countable interval [0, 1].

Therefore, the countability of the range is what determines whether a random variable is discrete, not the countability of the sample space.

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The statement "If det(A) = det(B), then det(A - B) = 0" is not always true. The determinant of a matrix is not additive under subtraction.

Therefore, the determinant of the difference of two matrices does not necessarily equal zero even if the determinants of the individual matrices are equal. Counterexamples can be easily constructed.

The statement "If A and B are symmetric, then the matrix AB is also symmetric" is not always true. The product of two symmetric matrices is not necessarily symmetric. Counterexamples can be easily constructed.

The statement "If A and B are skew-symmetric, then the matrix AT + B is also skew-symmetric" is always true. A skew-symmetric matrix has the property that its transpose is equal to the negative of the original matrix. Therefore, taking the transpose of AT + B results in -(AT + B), which is the negative of the original matrix. Hence, the matrix AT + B is also skew-symmetric.

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Therefore, the profit function P(x) is 17x - 450, and the slope m of the profit function is 17.

The profit function P(x) represents the profit obtained from selling x units. It can be calculated by subtracting the cost function C(x) from the revenue function R(x).

The revenue function R(x) is given as 26x, which represents the revenue obtained from selling x units.

The cost function C(x) is given as 9x + 450, which represents the cost of producing x units.

To find the profit function P(x), we subtract the cost function from the revenue function: P(x) = R(x) - C(x) = 26x - (9x + 450) = 26x - 9x - 450 = 17x - 450.

The slope of the profit function represents the rate of change of profit with respect to the number of units produced. It is equal to the coefficient of x in the profit function. In this case, the coefficient of x is 17, so the slope m of the profit function is 17.

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Simplifying the expression above:angle in degrees = (2 × 180)/(3) = 120

The given angle in radians is 2π/3, and we are asked to find the measure of the angle in degrees.

To convert radians to degrees, we use the conversion factor π/180:Radians to degrees conversion: angle in degrees = angle in radians × 180/π

So the  angle in degrees = 2π/3 × 180/π

Simplifying the expression above:angle in degrees = (2 × 180)/(3) = 120°

Therefore, the measure of the angle in degrees is 120°.

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The equation 2x - y = 0 has exactly one solution. This means that there is one unique value for both x and y that satisfies the equation and lies on the line represented by the equation.

In the given equation, we have two variables, x and y, and only one equation. This equation represents a linear relationship between x and y. To determine the number of solutions, we can examine the equation's coefficients.

The equation 2x - y = 0 can be rearranged as y = 2x. This equation is in slope-intercept form, y = mx + b, where m is the slope and b is the y-intercept. In this case, the slope (m) is 2, which means that for every increase of 1 in x, y increases by 2.

Since the slope is not zero, the equation represents a non-horizontal line. Therefore, the line represented by the equation 2x - y = 0 will intersect the x-axis at a single point. This intersection point is the solution to the equation.

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The change-of-coordinates matrix from basis B to basis C is given by:

| -5 0 | | | | -90 80₂ |

The change-of-coordinates matrix from basis B to basis C can be found by expressing the basis vectors of B in terms of the basis vectors of C.

In this case, we have B = (b, b₂) and C = (₁, ₁.₂). Given that b = -5e and b₂ = -90 + 80₂, we can find the change-of-coordinates matrix.

To express b in terms of the basis vectors of C, we need to find the coordinates of b with respect to C. Since b = -5e, we have -5e = x₁ + x₂₁. Solving this equation, we find x₁ = -5 and x₂₁ = 0.

Similarly, for b₂ = -90 + 80₂, we have -90 + 80₂ = x₁ + x₂₁. By solving this equation, we get x₁ = -90 and x₂₁ = 80.

Therefore, the change-of-coordinates matrix from B to C is:

| x₁ | | -5 0 |

| | = | |

| x₂₁ | | -90 80₂ |

In summary, the change-of-coordinates matrix from basis B to basis C is given by:

| -5 0 |

| |

| -90 80₂ |

This matrix allows us to convert coordinates from the B basis to the C basis.

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The limits of integration for the surface S are:x^2 + y^2 ≤ 64. Finally, we can evaluate the line integral using the given information and the limits of integration.

To use Stokes's Theorem to evaluate the line integral ∫c F · dr, we need to find the curl of F and the surface S that is bounded by the given curve C.

First, let's find the curl of F:

curl F = (∂Fz/∂y - ∂Fy/∂z)i + (∂Fx/∂z - ∂Fz/∂x)j + (∂Fy/∂x - ∂Fx/∂y)k.

∂Fz/∂y = 0

∂Fy/∂z = 0

∂Fx/∂z = 3x

∂Fz/∂x = 0

∂Fy/∂x = 3y

∂Fx/∂y = 1

Therefore, the curl of F is:

curl F = (3x)j + (3y)k.

Now, let's find the surface S. The equation of S is given by:

z = 64 - x^2 - y^2, z > 0.

This represents a paraboloid opening downward with vertex at (0, 0, 64).

To apply Stokes's Theorem, we need to find a vector normal to the surface S. Taking the partial derivatives, we have:

∂z/∂x = -2x

∂z/∂y = -2y

A normal vector to the surface S is then:

n = ∂z/∂x i + ∂z/∂y j + k = -2x i - 2y j + k.

Now, we can evaluate the line integral using Stokes's Theorem:

∫c F · dr = ∬S (curl F) · n dS.

Substituting the values we obtained:

∫c F · dr = ∬S ((3x)j + (3y)k) · (-2x i - 2y j + k) dS.

Now, we need to determine the limits of integration for the surface S. Since z > 0, we consider the region above the xy-plane.

The surface S is a portion of the paraboloid with z = 64 - x^2 - y^2. We can integrate over the region R in the xy-plane where the paraboloid intersects the plane z = 0.

Setting z = 0, we have:

0 = 64 - x^2 - y^2.

Simplifying, we get:

x^2 + y^2 = 64.

This represents a circle with radius 8 centered at the origin in the xy-plane.

Therefore, the limits of integration for the surface S are:

x^2 + y^2 ≤ 64.

Finally, we can evaluate the line integral using the given information and the limits of integration.

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Therefore, According to the given information F(x) = ∫ (x - 6)² dx= ∫ x² - 12x + 36 dx= (1/3)x³ - 6x² + 36x + C .

Explanation:We are given the following functions;f(x) = x² - 7x + 2, and F(x) = (x - 6)².1. To find the most general antiderivative of f(x), we need to apply the power rule of integration which states that the antiderivative of xⁿ = (x^(n+1))/(n+1) + C, where C is the constant of integration.Applying this rule, we have:F(x) = (1/3)x³ - (7/2)x² + 2x + C .2. To find the most general antiderivative of F(x), we need to apply the binomial expansion of (x - 6)².

Therefore, According to the given information F(x) = ∫ (x - 6)² dx= ∫ x² - 12x + 36 dx= (1/3)x³ - 6x² + 36x + C .

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The volume of prime required to fill 1 foot of 3/8" tubing in mL/ft is 1.655.

Given a 3/8" tubing and we are required to find out the volume of prime required to fill 1 foot of the tubing.

Calculation of the volume of prime required to fill 1 foot of 3/8" tubing:

First of all, we will calculate the radius of the 3/8" tubing:We know that the diameter of the tubing is 3/8".Diameter = 3/8"Radius = Diameter/2Radius = (3/8) / 2Radius = 3/16"

Now, we will calculate the volume of prime required to fill 1 foot of the tubing using the formula of the volume of a cylinder."V = πr²L"

Where V is the volume, r is the radius, L is the length.We will plug in the given values in the formula."V = π(3/16)² × 12""V = π(9/256) × 12""V = (27/256)π"

Converting it into mL/ft:We know that 1 cubic inch = 16.39 milliliters (mL)

So, the volume of prime required to fill 1 foot of 3/8" tubing in mL/ft is:(27/256)π × 16.39 mL/ft= (27/256)π × 16.39= 1.655 mL/ft (approx)

Therefore, the volume of prime required to fill 1 foot of 3/8" tubing in mL/ft is 1.655.

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When using the replacement chain approach, the NPV of the most profitable project is $6,652.

The replacement chain approach is used to determine the most profitable project by considering the possibility of repeating a project at the end of its initial life. In this case, Project X has a life of 2 years and can be repeated at the end of Year 2, while Project Y has a life of 4 years.

To calculate the NPV of each project, we need to discount the cash inflows at the project's weighted average cost of capital (WACC). The WACC for both projects is 8%.

For Project X, the cash inflows at the end of Years 1 and 2 are $6,400 and $7,900, respectively. The cash inflows at the end of Year 2 can be repeated, so we calculate the present value (PV) of the cash inflows for two cycles. Using the formula for the present value of cash flows, the PV of Project X is $12,321.

For Project Y, the cash inflows at the end of each of the next 4 years are $4,000. Using the PV formula, the PV of Project Y is $13,202.

Next, we compare the NPV of each project. The NPV of Project X is calculated by subtracting the initial investment of $11,000 from the PV of $12,321, resulting in an NPV of $1,321. The NPV of Project Y is calculated by subtracting the initial investment of $11,000 from the PV of $13,202, resulting in an NPV of $2,202.

Since Project Y has a higher NPV than Project X, it is initially considered more profitable. However, we need to consider the possibility of repeating Project X at the end of Year 2. By repeating Project X, the total NPV for two cycles would be $2,642. Comparing this to the NPV of Project Y, we can conclude that Project X is the most profitable option.

Therefore, the NPV of the most profitable project using the replacement chain approach is $6,652, rounded to the nearest whole number.

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To simplify the expression √18/16, we can simplify the numerator and denominator separately.

For the numerator √18, we can find the largest perfect square that divides evenly into 18, which is 9. So, we can rewrite √18 as √9 * √2. The square root of 9 is 3, so √18 can be simplified to 3√2. For the denominator 16, there are no perfect squares that divide evenly into 16 other than 1 and 16 itself. Putting it all together, the simplified expression is: (3√2) / 16

If you need a decimal approximation, you can calculate the value of √2 and divide it by 16.

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(a) Margin of error = E

= z α/2 * (σ/√n)Given, Sample size n

= 54Mean price charged = $31.44

Population standard deviation = σ = $17The level of significance (α) = 0.05Therefore, the level of confidence is 95% and

α/2 = 0.05/2

= 0.025.

The corresponding value of z-score can be obtained from the standard normal distribution table with the

cumulative probability of 0.975 (1 - α/2).z α/2 = 1.96Plugging all the given values into the formula,Margin of error = E = z α/2 * (σ/√n)E = 1.96 * (17/√54)≈ 4.08Therefore, the margin of error in dollars associated with a 95% confidence interval

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The correct answer is:

2 dependent variables and 2 independent variables

A two-factor ANOVA involves analyzing the effects of two independent variables (also known as factors) on two dependent variables. The independent variables are typically categorical or grouping variables, while the dependent variables are the variables being measured or observed.

In a two-factor ANOVA, the goal is to determine whether the independent variables have a significant effect on the dependent variables and whether there are any interactions between the independent variables.

Therefore, the correct option is "2 dependent variables and 2 independent variables."

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The appropriate value for M1 in the linking constraint for product A is $17.

In the given scenario, the decision variable Yi is defined as 1 if the amount of product i produced (Xi) is greater than 0, and 0 if Xi equals 0. This implies that Yi represents whether or not product i is produced. In this case, we are dealing with product A.

The linking constraint is used to ensure that if product A is produced (Yi = 1), then the amount produced (Xi) must be greater than 0. This can be expressed as Xi ≥ Yi * M1, where M1 is a sufficiently large value that ensures the constraint holds.

Since the profit per unit of A is $17, setting M1 equal to this value guarantees that if Yi is 1 (product A is produced), then Xi must be greater than 0 (at least one unit of A is produced). This ensures that the linking constraint is satisfied and reflects the condition that the company can sell all the units it produces.

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Based on research data from 28 students with a standard deviation of 8 years for their ages, we can calculate a 90% confidence interval for the variance.

To calculate the 90% confidence interval for the variance, we use the chi-square distribution. The chi-square distribution is commonly used for inference about the variance of a normally distributed variable.

First, we need to determine the degrees of freedom, which is the sample size minus one. In this case, the degrees of freedom would be 28 - 1 = 27.

Next, we look up the critical chi-square values corresponding to the desired confidence level of 90% and the degrees of freedom. These critical values represent the boundaries of the confidence interval.

Using the critical chi-square values and the sample size, we can calculate the lower and upper limits of the confidence interval for the variance. This interval provides a range within which we can estimate the true population variance with 90% confidence.

It's important to note that the confidence interval for the variance is typically expressed in terms of squared units (e.g., years squared in this case), as it represents the variability of the variable of interest.

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The equation of the plane containing the lines L₁ and L₂ is -2x - y + z + 3 = 0.

To find the equation for the plane containing the lines L₁ and L₂, we can use the cross product of the direction vectors of the two lines.

The direction vector of L₁ is (1, 1, 1), and the direction vector of L₂ is (1, -1, 0). Taking the cross product of these two vectors will give us a vector that is orthogonal (perpendicular) to both lines and therefore normal to the plane.

Let's calculate the cross product:

N = (1, 1, 1) × (1, -1, 0)

To calculate the cross product, we can use the determinant method:

N = (1 * (-1) - 1 * 1, 1 * 0 - 1 * 1, 1 * 1 - 1 * 0)

= (-2, -1, 1)

Now, we have the normal vector N = (-2, -1, 1) which is orthogonal to the plane containing L₁ and L₂.

Next, we need to find a point on the plane. We can choose any point on either of the lines L₁ or L₂. Let's choose a point on L₁. When t = 0, the parametric equation for L₁ gives us the point (1, 0, -1).

Now, we have a point (1, 0, -1) on the plane and the normal vector N = (-2, -1, 1) orthogonal to the plane. We can use the point-normal form of the equation for a plane to find the equation of the plane.

The point-normal form of the equation of a plane is:

N · (P - P₀) = 0

where N is the normal vector, P is a point on the plane, and P₀ is a known point on the plane.

Substituting the values we have:

(-2, -1, 1) · ((x, y, z) - (1, 0, -1)) = 0

Simplifying:

-2(x - 1) - (y - 0) + (z + 1) = 0

-2x + 2 - y + z + 1 = 0

-2x - y + z + 3 = 0

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The real solutions to the equation are x = -2 + √13 and x = -2 - √13. Rounding these values to two decimal places, we get x ≈ -0.36 and x ≈ -3.64, respectively.

(a) The real solutions to the equation 9 - 4x - x² = 0, obtained using the quadratic formula, are x = -1 and x = 9.

(b) To solve the equation using the quadratic formula, we first identify the coefficients in the standard quadratic form ax² + bx + c = 0. In this case, a = -1, b = -4, and c = 9. Substituting these values into the quadratic formula x = (-b ± √(b² - 4ac)) / (2a), we can calculate the solutions.

x = [-( -4) ± √((-4)² - 4(-1)(9))] / (2(-1))

= (4 ± √(16 + 36)) / (-2)

= (4 ± √52) / (-2)

= (4 ± 2√13) / (-2)

= -2 ± √13

Thus, the real solutions to the equation are x = -2 + √13 and x = -2 - √13. Rounding these values to two decimal places, we get x ≈ -0.36 and x ≈ -3.64, respectively.

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The probability density function (pdf) of a random variable X is given by;f(x) = 2(1 - x) ; 0 < x < 1; = 0, elsewhere.The cumulative distribution function (cdf) of a random variable X is given by;F(x) = 0, for x < 0; = 2x - 2x2, for 0 ≤ x ≤ 1; = 1, for x > 1.

The probability density function (pdf) of a random variable X is given by;f(x) = 2(1 - x) ; 0 < x < 1; = 0, elsewhere.The cumulative distribution function (cdf) of a random variable X is given by;F(x) = 0, for x < 0; = 2x - 2x2, for 0 ≤ x ≤ 1; = 1, for x > 1. The weekly demand for propane gas (in 1000s of gallons) from a particular facility is a random variable X with the probability density function as described above.

Given the pdf f(x) = 2(1 - x), the cumulative distribution function (cdf) is obtained as follows;For 0 ≤ x ≤ 1;F(x) = ∫f(x)dx= ∫[2(1 - x)]dx= 2x - 2x2 + c.To determine the value of c, let us integrate the probability density function over the entire domain;For -∞ < x < ∞;∫f(x)dx = ∫[2(1 - x)]dx= 2x - x2 + c = F(∞) - F(-∞) = 1 - 0 = 1.Then c = 0.Substituting in the cdf, we get;F(x) = 2x - 2x2.The cumulative distribution function (cdf) of the weekly demand for propane gas (in 1000s of gallons) from a particular facility is given by;F(x) = 2x - 2x2, for 0 ≤ x ≤ 1.

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The answer in the form a + b i  is :

18⁽⁴π/³⁾ * (6⁽²π/³⁾* ²) * (cos(7π/9) + i sin(7π/9))

To simplify the expression using De Moivre's theorem, we need to evaluate the expression 18√6(cos(4π/3) + i sin(4π/3)).

De Moivre's theorem states that for any complex number

z = r(cosθ + i sinθ), its nth power can be expressed as

zⁿ = rⁿ (cos(nθ) + i sin(nθ)).

In this case, we have z = 18√6 and

n = 4π/3.

Let's calculate the simplified form:

r = 18√6

θ = 4π/3

Using De Moivre's theorem, we can rewrite the expression as:

18√6(cos(4π/3) + i sin(4π/3)) = (18√6)⁽⁴π/³⁾ (cos(4π/3 * 4π/3) + i sin(4π/3 * 4π/3))

Now, let's simplify the expression further:

(18√6)⁽⁴π/³⁾ = 18⁽⁴π/³⁾  * (6^⁽¹/²⁾)⁽⁴π/³⁾ = 18⁽⁴π/³⁾ * (6⁽⁴π/⁶⁾) = 18⁽⁴π/³⁾ * (6⁽⁽²π/³⁾ * ²⁾)

cos(4π/3 * 4π/3) = cos(16π/9) = cos(2π + 7π/9)

= cos(7π/9)

sin(4π/3 * 4π/3) = sin(16π/9) = sin(2π + 7π/9)

= sin(7π/9)

Putting it all together, the simplified expression is:

18⁽⁴π/³⁾* (6⁽⁽²π/³⁾ * ²⁾) * (cos(7π/9) + i sin(7π/9))

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the position of the object at t = 2 is 35/3 or approximately 11.667.

To find the position of the object at t = 2, we need to integrate the velocity function, v(t), with respect to time and then apply the initial condition.

Given v(t) = t² + 2, to find the position function x(t), we integrate v(t) with respect to t:

∫ v(t) dt = ∫ (t² + 2) dt

Integrating term by term, we get:

x(t) = (1/3)t³ + 2t + C

Where C is the constant of integration.

To determine the value of C, we can use the initial condition x(0) = 5:

5 = (1/3)(0)³ + 2(0) + C

5 = C

Therefore, C = 5.

Now we have the position function:

x(t) = (1/3)t³ + 2t + 5

To find the position of the object at t = 2, we substitute t = 2 into the position function:

x(2) = (1/3)(2)³ + 2(2) + 5

x(2) = (1/3)(8) + 4 + 5

x(2) = 8/3 + 4 + 5

x(2) = 8/3 + 12/3 + 15/3

x(2) = 35/3

Therefore, the position of the object at t = 2 is 35/3 or approximately 11.667.

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Given question is incomplete, the complete question is below

Suppose an object moves in a straight line so that its speed at time is given by v(t) = t²+2, and that at t=0 the object is at position 5. Find the position of the object at t = 2

The sample space corresponding to the random experiment "observe the result of a visit to the portal" is S = {B, S}. The probability that a visit results in a big sale is  0.01. The probability that a visit results in a small sale is 0.1. The probability that a visit results in a sale is 0.11.

a)

Sample Space: Sample space is the collection of all possible outcomes of a random experiment. Here, the random experiment is "observe the result of a visit to the portal".

As every 1000 visits result in 10 big sales and 100 small sales, the sample space for observing the result of a visit to the portal can be given as: S = {B, S} where B represents the event of big sale and S represents the event of small sale.

b)

The probability that a visit results in a big sale can be obtained as:

Probability of a big sale = Number of big sales / Total number of visits= 10/1000= 0.01

c)

The probability that a visit results in a small sale can be obtained as:

Probability of a small sale = Number of small sales / Total number of visits= 100/1000= 0.1

d)

The probability that a visit results in a sale can be obtained as the sum of the probability of big sales and the probability of small sales:

Probability of a sale = Probability of a big sale + Probability of a small sale= 0.01 + 0.1= 0.11

Therefore, the probability that a visit results in a sale is 0.11.

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To determine the range of prices corresponding to elastic, inelastic, and unitary demand, we need to analyze the elasticity of demand based on the given demand function:

F(p) = (p+2)¹¹ * e^p

a) Unitary Elasticity:

Demand is unitary elastic when the price elasticity of demand is equal to 1. To find the price at which demand is unitary elastic, we need to find the price for which the absolute value of the price elasticity of demand is 1.

In this case, we calculate the price at which the absolute value of the derivative of the demand function with respect to p is equal to 1:

|F'(p)| = 1

We differentiate the demand function to find F'(p):

F'(p) = 11(p+2)¹⁰ * e^p + (p+2)¹¹ * e^p

Now, we solve the equation |F'(p)| = 1:

11(p+2)¹⁰ * e^p + (p+2)¹¹ * e^p = 1

Unfortunately, it is not possible to solve this equation analytically to find the exact price at which demand is unitary elastic. We would need to use numerical methods or approximation techniques to find an approximate value.

b) Elastic Demand:

Demand is elastic when the price elasticity of demand is greater than 1. To determine the interval of prices for which demand is elastic, we need to find the range of prices where the absolute value of the price elasticity of demand is greater than 1.

We calculate the price elasticity of demand (E) using the following formula:

E = (p/F(p)) * F'(p)

We need to find the interval of prices (p) where |E| > 1.

c) Inelastic Demand:

Demand is inelastic when the price elasticity of demand is less than 1. To determine the interval of prices for which demand is inelastic, we need to find the range of prices where the absolute value of the price elasticity of demand is less than 1.

We calculate the price elasticity of demand (E) using the formula mentioned earlier:

E = (p/F(p)) * F'(p)

We need to find the interval of prices (p) where |E| < 1.

Since we do not have specific values or constraints for the price (p), it is not possible to provide the exact intervals of prices for elastic and inelastic demand without further information or calculations.

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