A particle is moving with the given data. Find the position of the particle. a(t) = 13 sin(t) + 3 cos(t), s(0) = 0, s(2π) = 14 s(t) 1 Submit Answer

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Answer 1

To find the position of the particle, we can integrate the given acceleration function twice with respect to time.

Given:

a(t) = 13 sin(t) + 3 cos(t)

Integrating once will give us the velocity function v(t):

v(t) = ∫(a(t)) dt = ∫(13 sin(t) + 3 cos(t)) dt

Using the integral properties and trigonometric identities, we have:

v(t) = -13 cos(t) + 3 sin(t) + C₁

Next, integrating the velocity function v(t) will give us the position function s(t):

s(t) = ∫(v(t)) dt = ∫(-13 cos(t) + 3 sin(t) + C₁) dt

Using the integral properties and trigonometric identities again, we have:

s(t) = -13 sin(t) - 3 cos(t) + C₁t + C₂

To find the specific values of the constants C₁ and C₂, we'll use the given initial conditions.

Given:

s(0) = 0

Plugging t = 0 into the position function:

0 = -13 sin(0) - 3 cos(0) + C₁(0) + C₂

0 = 0 - 3 + C₂

C₂ = 3

Now, we'll use the second initial condition:

Given:

s(2π) = 14

Plugging t = 2π into the position function:

14 = -13 sin(2π) - 3 cos(2π) + C₁(2π) + 3

14 = 0 - 3 + 2πC₁ + 3

2πC₁ = 14 - 0

2πC₁ = 14

C₁ = 7/π

Now we have the specific values for the constants C₁ and C₂, and we can write the position function s(t) as:

s(t) = -13 sin(t) - 3 cos(t) + (7/π)t + 3

Thus, the position of the particle at any given time t is given by the equation:

s(t) = -13 sin(t) - 3 cos(t) + (7/π)t + 3

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Decide whether the following statements are true or false. Provide counter examples for those that are false, and supply proofs for those that are true. a. An open set that contains every rational number must necessarily be all of R. b. The Nested Interval Property remains true if the term "closed interval" is replaced by "closed set." c. Every nonempty open set contains a rational number. d. Every bounded infinite closed set contains a rational number. e. The Cantor set is closed.

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a. False: An open set containing every rational number doesn't have to be all of R.

b. True: The Nested Interval Property holds true even if "closed interval" is replaced by "closed set."

c. False: Not every nonempty open set contains a rational number.

d. False: Not every bounded infinite closed set contains a rational number.

e. True: The Cantor set is closed.

How is this so?

a. False An open set that contains every rational number does not necessarily have to be all of R.

b. True The Nested Interval Property remains true if the term "closed interval" is replaced by "closed set."

c. False Every nonempty open set does not necessarily contain a rational number. Consider the open set (0, 1) in R. It contains infinitely many real numbers, but none of them are rational.

d. False Every bounded infinite closed set does not necessarily contain a rational number.

e. True: The Cantor set is closed. It is constructed by removing open intervals from the closed interval [0, 1], and the resulting set is closed as it contains all its limit points.

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Sketch the level curves of the function corresponding to each value of z. f(x,y) = /16 - x2 - y2, z = 0,1,2,3,4 Sketch the graph and find the area of the region completely enclosed by the graphs of

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Answer:

The area completely enclosed by the graphs of the level curves is 4π.

Step-by-step explanation:

To sketch the level curves of the function f(x, y) = 16 - x^2 - y^2 for different values of z, we can plug in the given values of z (0, 1, 2, 3, 4) into the equation and solve for x and y. The level curves represent the points (x, y) where the function f(x, y) takes on a specific value (z).

For z = 0:

0 = 16 - x^2 - y^2

This equation represents a circle centered at the origin with a radius of 4. The level curve for z = 0 is a circle of radius 4.

For z = 1:

1 = 16 - x^2 - y^2

This equation represents a circle centered at the origin with a radius of √15. The level curve for z = 1 is a circle of radius √15.

Similarly, for z = 2, 3, 4, we can solve the corresponding equations to find the level curves. However, it is worth noting that for z = 4, the equation does not have any real solutions, indicating that there are no level curves for z = 4 in the real plane.

Now, to find the area completely enclosed by the graphs of the level curves, we need to find the region bounded by the curves.

The area enclosed by a circle of radius r is given by the formula A = πr^2. Therefore, the area enclosed by each circle is:

For z = 0: A = π(4^2) = 16π

For z = 1: A = π((√15)^2) = 15π

For z = 2: A = π((√14)^2) = 14π

For z = 3: A = π((√13)^2) = 13π

To find the area completely enclosed by the graphs of all the level curves, we need to subtract the areas enclosed by the inner level curves from the area enclosed by the outermost level curve.

Area = (16π - 15π) + (15π - 14π) + (14π - 13π) = 4π

Therefore, the area completely enclosed by the graphs of the level curves is 4π.

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2 In estimating cos(5x)dx using Trapezoidal and Simpson's rule with n = 4, we can estimate the error involved in the approximation using the Error Bound formulas. For Trapezoidal rule, the error will

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The estimated error using the Trapezoidal rule with n = 4 is given by:

[tex]\[E_T \leq \frac{{25x^3}}{{192}}\][/tex]

To estimate the error involved in the approximation of cos(5x), dx using the Trapezoidal rule with n = 4, we can utilize the error bound formula. The error bound for the Trapezoidal rule is given by:

[tex]\[E_T \leq \frac{{(b-a)^3}}{{12n^2}} \cdot \max_{a \leq x \leq b} |f''(x)|\][/tex]

where [tex]E_T[/tex] represents the estimated error, a and b are the lower and upper limits of integration, respectively, n is the number of subintervals, and [tex]f''(x)[/tex]is the second derivative of the integrand.

In this case, we have a = 0 and b = x. To calculate the second derivative of cos(5x), we differentiate twice:

[tex]\[f(x) = \cos(5x) \implies f'(x) = -5\sin(5x) \implies f''(x) = -25\cos(5x)\][/tex]

To estimate the error, we need to find the maximum value of [tex]|f''(x)|[/tex]within the interval [0, x]. Since cos(5x) oscillates between -1 and 1, we can determine that [tex]$|-25\cos(5x)|$[/tex] attains its maximum value of 25 at [tex]x = \frac{\pi}{10}.[/tex]

Plugging the values into the error bound formula, we have:

[tex]\[E_T \leq \frac{{(x-0)^3}}{{12 \cdot 4^2}} \cdot \max_{0 \leq x \leq \frac{\pi}{10}} |f''(x)| = \frac{{x^3}}{{192}} \cdot 25\][/tex]

Hence, the estimated error using the Trapezoidal rule with $n = 4$ is given by:  [tex]\[E_T \leq \frac{{25x^3}}{{192}}\][/tex]

Note: This error bound is an approximation and provides an upper bound on the true error.

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URGENT!!!
(Q2)
What is the product of the matrices Matrix with 1 row and 3 columns, row 1 negative 3 comma 3 comma 0, multiplied by another matrix with 3 rows and 1 column. Row 1 is negative 3, row 2 is 5, and row 3 is negative 2.?

A) Matrix with 2 rows and 1 column. Row 1 is 9, and row 2 is 15.
B) Matrix with 1 row and 3 columns. Row 1 is 9 and 15 and 0.
C) Matrix with 3 rows and 3 columns. Row 1 is 9 comma negative 9 comma 0, row 2 is negative 15 comma 15 comma 0, and row 3 is 6 comma negative 6 comma 0.
D) [24]

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Answer:

The product of the two matrices is a 1x1 matrix with the value 24. So the correct answer is D) [24].

Here’s how to calculate it:

Matrix A = [-3, 3, 0] and Matrix B = [-3, 5, -2]T (where T denotes the transpose of the matrix).

The product of the two matrices is calculated by multiplying each element in the first row of Matrix A by the corresponding element in the first column of Matrix B and then summing up the products:

(-3) * (-3) + 3 * 5 + 0 * (-2) = 9 + 15 + 0 = 24

(2 points) Let ƒ : R² → R, ƒ(x, y) = sinh(4x³y) + (3x² + x − 1) log(y). (a) Find the following partial derivatives: fx = 12x^2y*cosh(4x^3y)+(6x+1)*log(y) fy = 4x^3*cosh(4x^3y)+((3x^2+x-1)/y)

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The partial derivatives of ƒ(x, y) are:

[tex]Fx=12x^{2} y*cosh(4x^{3}y) + (6x+1)*log(y) \\Fy=4x^{3} *cosh(4x^{3}y) + \frac{3x^{2} +x-1}{y}[/tex]

The partial derivatives of the function   [tex]f(x,y)=sinh(4x^{3}y) + (3x^{2} +x-1)log(y)[/tex]  are as follows:

Partial derivative with respect to x (fx):

To find fx, we differentiate ƒ(x, y) with respect to x while treating y as a constant.

[tex]fx=\frac{d}{dx}[sinh(4x^{3}y) + (3x^{2} +x-1)log(y)][/tex]

Using the chain rule, we have:

[tex]fx=12x^{2} y*cosh(4x^{3}y) + (6x+1)*log(y)[/tex]

Partial derivative with respect to y (fy):

To find fy, we differentiate ƒ(x, y) with respect to y while treating x as a constant.

[tex]fy=\frac{d}{dy}[sinh(4x^{3}y) + (3x^{2} +x-1)log(y)][/tex]

Using the chain rule, we have:

[tex]fy=4x^{3}*cosh(4x^{3}y) + \frac{3x^{2} +x-1 }{y}[/tex]

Therefore, the partial derivatives of ƒ(x, y) are:

[tex]Fx=12x^{2} y*cosh(4x^{3}y) + (6x+1)*log(y) \\Fy=4x^{3} *cosh(4x^{3}y) + \frac{3x^{2} +x-1}{y}[/tex]

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8) Find the limit (exact value) a) lim (Vy2-3y - - y) b) lim tan ax x-0 sin bx (a #0,5+0)

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a) The limit of the expression lim (Vy^2-3y - - y) as y approaches infinity is 0.

b) The limit of the expression lim (tan(ax) / (x - 0)) as x approaches 0, where a ≠ 0, is a.

a) To determine the limit of the expression lim (Vy^2-3y - - y) as y approaches infinity, we simplify the expression:

lim (Vy^2-3y - - y)

= lim (Vy^2-3y + y) (since -(-y) = y)

= lim (Vy^2-2y)

As y approaches infinity, the term -2y becomes dominant, and the other terms become insignificant compared to it. Therefore, we can rewrite the limit as:

lim (Vy^2-2y)

= lim (Vy^2 / 2y) (dividing both numerator and denominator by y)

= lim (V(y^2 / 2y)) (taking the square root of y^2 to get y)

= lim (Vy / √(2y))

As y approaches infinity, the denominator (√(2y)) also approaches infinity. Thus, the limit becomes:

lim (Vy / √(2y)) = 0 (since the numerator is finite and the denominator is infinite)

b) To determine the limit of the expression lim (tan(ax) / (x - 0)) as x approaches 0, we use the condition that a ≠ 0 and evaluate the expression:

lim (tan(ax) / (x - 0))

= lim (tan(ax) / x)

As x approaches 0, the numerator tan(ax) approaches 0, and the denominator x also approaches 0. Applying the limit:

lim (tan(ax) / x) = a (since the limit of tan(ax) / x is a, using the property of the tangent function)

Therefore, the limit of the expression lim (tan(ax) / (x - 0)) as x approaches 0 is a, where a ≠ 0.

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A rock climber is about to haul up 100 N (about 22.5 pounds) of equipment that has been hanging beneath her on 40 meters of rope that weighs 0.8 newtons per meter. How much work will it take?

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It will take approximately 5280 Joules of work to haul up the equipment.

To calculate the work required to haul up the equipment, we need to consider two components: the work done against gravity and the work done against the weight of the rope.

Work done against gravity:

The weight of the equipment is 100 N, and it is being lifted vertically for a distance of 40 meters. The work done against gravity is given by the formula:

Work_gravity = Force_gravity × Distance

In this case, the force of gravity is equal to the weight of the equipment, which is 100 N. So, the work done against gravity is:

Work_gravity = 100 N × 40 m = 4000 Joules

Work done against the weight of the rope:

The weight of the rope is given as 0.8 N per meter, and it needs to be lifted vertically for a distance of 40 meters. The total weight of the rope is:

Weight_rope = Weight_per_meter × Distance

Weight_rope = 0.8 N/m × 40 m = 32 N

Therefore, the work done against the weight of the rope is:

Work_rope = 32 N × 40 m = 1280 Joules

The total work required to haul up the equipment is the sum of the work done against gravity and the work done against the weight of the rope:

Total work = Work_gravity + Work_rope

= 4000 Joules + 1280 Joules

= 5280 Joules

Therefore, it will take approximately 5280 Joules of work to haul up the equipment.

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7. At what point(s) on the curve y = 2x³-12x is the tangent line horizontal? [4]

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The points on the curve where the tangent line is horizontal are (√2, 4√2 - 12√2) and (-√2, -2√8 + 12√2).

To find the point(s) on the curve where the tangent line is horizontal, we need to determine the values of x that make the derivative of the curve equal to zero.

Let's find the derivative of the curve y = 2x³ - 12x with respect to x:

dy/dx = 6x² - 12

Now, set the derivative equal to zero and solve for x:

6x² - 12 = 0

Divide both sides of the equation by 6:

x² - 2 = 0

Add 2 to both sides:

x² = 2

Take the square root of both sides:

x = ±√2

Therefore, there are two points on the curve y = 2x³ - 12x where the tangent line is horizontal: (√2, f(√2)) and (-√2, f(-√2)), where f(x) represents the function 2x³ - 12x.

To find the corresponding y-values, substitute the values of x into the equation y = 2x³ - 12x:

For x = √2:

y = 2(√2)³ - 12(√2)

y = 2√8 - 12√2

For x = -√2:

y = 2(-√2)³ - 12(-√2)

y = -2√8 + 12√2

Therefore, the points on the curve where the tangent line is horizontal are (√2, 4√2 - 12√2) and (-√2, -2√8 + 12√2).

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Differentiate implicitly to find the first partial derivatives of w. x2 + y2 + 22 . 7yw 1 8w2 ow dy

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The first partial derivatives of w are:

∂w/∂x = 14xy/(x^2 + y^2 + 22)

∂w/∂y = 7x^2/(x^2 + y^2 + 22) - 7yw/(x^2 + y^2 + 22) + 44y/(x^2 + y^2 + 22)

∂w/∂z = 0

We are given the function w = x^2 + y^2 + 22 / (7yw - 8w^2). To find the first partial derivatives of w, we need to differentiate the function implicitly with respect to x, y, and z (where z is a constant).

Let's start with ∂w/∂x. Taking the derivative of the function with respect to x, we get:

dw/dx = 2x + (d/dx)(y^2) + (d/dx)(22/(7yw - 8w^2))

The derivative of y^2 with respect to x is simply 0 (since y is treated as a constant here), and the derivative of 22/(7yw - 8w^2) with respect to x is:

[d/dx(7yw - 8w^2) * (-22)] / (7yw - 8w^2)^2 * (dw/dx)

Using the chain rule, we can find d/dx(7yw - 8w^2) as:

7y(dw/dx) - 16w(dw/dx)

So the expression above simplifies to:

[-154yx(7yw - 16w)] / (x^2 + y^2 + 22)^2

To find ∂w/∂x, we need to multiply this by 1/(dw/dx), which is:

1 / [2x - 154yx(7yw - 16w) / (x^2 + y^2 + 22)^2]

Simplifying this gives:

∂w/∂x = 14xy / (x^2 + y^2 + 22)

Next, let's find ∂w/∂y. Again, we start with taking the derivative of the function with respect to y:

dw/dy = (d/dy)(x^2) + 2y + (d/dy)(22/(7yw - 8w^2))

The derivative of x^2 with respect to y is 0 (since x is treated as a constant here), and the derivative of 22/(7yw - 8w^2) with respect to y is:

[d/dy(7yw - 8w^2) * (-22)] / (7yw - 8w^2)^2 * (dw/dy)

Using the chain rule, we can find d/dy(7yw - 8w^2) as:

7x(dw/dy) - 8w/(y^2)

So the expression above simplifies to:

[154x^2/(x^2 + y^2 + 22)^2] - [154xyw/(x^2 + y^2 + 22)^2] + [352y/(x^2 + y^2 + 22)^2]

To find ∂w/∂y, we need to multiply this by 1/(dw/dy), which is:

1 / [2y - 154xyw/(x^2 + y^2 + 22)^2 + 352/(x^2 + y^2 + 22)^2]

Simplifying this gives:

∂w/∂y = 7x^2/(x^2 + y^2 + 22) - 7yw/(x^2 + y^2 + 22) + 44y/(x^2 + y^2 + 22)

Finally, to find ∂w/∂z, we differentiate the function with respect to z, which is just:

∂w/∂z = 0

Therefore, the first partial derivatives of w are:

∂w/∂x = 14xy/(x^2 + y^2 + 22)

∂w/∂y = 7x^2/(x^2 + y^2 + 22) - 7yw/(x^2 + y^2 + 22) + 44y/(x^2 + y^2 + 22)

∂w/∂z = 0

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Problem #11: If f(x) – **(x)* = x - 15 and f(1) = 2, find f'(1). Problem #21: Enter your answer symbolically in these examples Just Save Submit Problem #11 for Grading Attempt 21 Problem #11 Your An

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Given that f(x) - g(x^2) = x - 15 and f(1) = 2, we need to find f'(1), the derivative of f(x) at x = 1.

To find f'(1), we need to differentiate both sides of the given equation with respect to x. Let's break down the equation and find the derivative step by step.

f(x) - g(x^2) = x - 15

Differentiating both sides with respect to x:

f'(x) - g'(x^2) * 2x = 1

Now, we substitute x = 1 into the equation:

f'(1) - g'(1^2) * 2 = 1

Since f(1) = 2, we know that f'(1) represents the derivative of f(x) at x = 1.

Therefore, f'(1) - g'(1) * 2 = 1.

Unfortunately, the information given does not provide us with the values or expressions for g(x) or g'(x). Without additional information, we cannot determine the exact value of f'(1).

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The graph of the function y 83+ (x +94)- can be obtained from the graph of y = x2 (a) shift the graph of f(x) to the right 94 units; (b) shift the graph of f(x) to the left 94 units; (c) vertically strech the graph by 94 units

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The graph of the function y = 83 + (x + 94)² can be obtained from the graph of y = x² by shifting the graph of f(x) to the left 94 units.

1. The original function is y = x², which represents a parabola centered at the origin.

2. To obtain the graph of y = 83 + (x + 94)², we need to apply a transformation to the original function.

3. The term (x + 94)² represents a shift of the graph to the left by 94 units. This is because for any given x value, we add 94 to it, effectively shifting all points on the graph 94 units to the left.

4. The term 83 is a vertical shift, which moves the entire graph vertically upward by 83 units.

5. Therefore, the graph of y = 83 + (x + 94)² can be obtained from the graph of y = x² by shifting the graph of f(x) to the left 94 units. The term 83 also results in a vertical shift, but it does not affect the horizontal position of the graph.

In summary, the main answer is to shift the graph of f(x) to the left 94 units. The explanation provides a step-by-step understanding of how the transformation is applied to the original function y = x².

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Find the profit function if cost and revenue are given by C(x) = 140 + 1.4x and R(x) = 4x -0.06x². . The profit function is P(x)=

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The profit function is P(x) = - 0.06x² + 2.6x - 140. Let us first recall the definition of the profit function: Profit Function is defined as the difference between the Revenue Function and the Cost Function.

P(x) = R(x) - C(x)

Where,

P(x) is the profit function

R(x) is the revenue function

C(x) is the cost function

Given,

C(x) = 140 + 1.4x ...(1)

R(x) = 4x - 0.06x² ...(2)

We need to find the profit function P(x)

We know,

P(x) = R(x) - C(x)

By substituting the given values in the above equation, we get,

P(x) = (4x - 0.06x²) - (140 + 1.4x)

On simplification,

P(x) = 4x - 0.06x² - 140 - 1.4x

P(x) = - 0.06x² + 2.6x - 140

The profit function is given by P(x) = - 0.06x² + 2.6x - 140.

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Problem 14(30 points). Using the Laplace transform, solve the following initial value problem: y" + 4y+3y=e', y(0) = 1, y(0) = 0.

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The solution to the initial value problem y" + 4y + 3y' = e', y(0) = 1, y'(0) = 0 is y(t) = -1/7 + (1/7)cos(√7t).

To solve the given initial value problem using the Laplace transform, we need to take the Laplace transform of both sides of the differential equation and apply the initial conditions.

Taking the Laplace transform of the differential equation:

L[y"] + 4L[y] + 3L[y'] = L[e']

Using the properties of the Laplace transform and the differentiation property L[y'] = sY(s) - y(0), where Y(s) is the Laplace transform of y(t) and y(0) is the initial condition:

s²Y(s) - sy(0) - y'(0) + 4Y(s) + 3Y(s) = 1/s

Since the initial conditions are y(0) = 1 and y'(0) = 0, we can substitute these values:

s²Y(s) - s(1) - 0 + 4Y(s) + 3Y(s) = 1/s

Simplifying the equation:

s²Y(s) + 4Y(s) + 3Y(s) - s = 1/s + s

Combining like terms:

(s² + 7)Y(s) = (1 + s²)/s

Dividing both sides by (s² + 7):

Y(s) = (1 + s²)/(s(s² + 7))

Now, we can use partial fraction decomposition to simplify the right side of the equation:

Y(s) = A/s + (Bs + C)/(s² + 7)

Multiplying through by the common denominator (s(s² + 7)):

(1 + s²) = A(s² + 7) + (Bs + C)s

Expanding and equating coefficients:

1 + s² = As² + 7A + Bs³ + Cs

Matching coefficients of like powers of s:

A + B = 0 (coefficient of s²)

7A + C = 1 (constant term)

0 = 0 (coefficient of s)

From the first equation, we have B = -A. Substituting into the second equation:

7A + C = 1

Solving this system of equations, we find A = -1/7, B = 1/7, and C = 1.

Therefore, the Laplace transform of y(t) is:

Y(s) = (-1/7)/s + (1/7)(s)/(s² + 7)

Taking the inverse Laplace transform of Y(s) using the table of Laplace transforms, we can find y(t):

y(t) = -1/7 + (1/7)cos(√7t)

So, the solution to the initial value problem y" + 4y + 3y' = e', y(0) = 1, y'(0) = 0 is y(t) = -1/7 + (1/7)cos(√7t).

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determine whether the sequence is increasing, decreasing, or not monotonic. an = 1 4n 2

Answers

The sequence is increasing

The sequence an = [tex]1 + 4n^2[/tex] is increasing.

In the given sequence, each term (an) is obtained by substituting the value of 'n' into the expression 1 + 4n^2. To determine whether the sequence is increasing, decreasing, or not monotonic, we need to examine the pattern of the terms as 'n' increases.

Let's consider the difference between consecutive terms:

[tex]a(n+1) - an = [1 + 4(n+1)^2] - [1 + 4n^2][/tex]

[tex]= 1 + 4n^2 + 8n + 4 - 1 - 4n^2[/tex]

= 8n + 4

The difference, 8n + 4, is always positive for positive values of 'n'. Since the difference between consecutive terms is positive, it implies that each term is greater than the previous term. Hence, the sequence is increasing.

To illustrate this, let's consider a few terms of the sequence:

[tex]a1 = 1 + 4(1)^2 = 1 + 4 = 5[/tex]

[tex]a2 = 1 + 4(2)^2 = 1 + 16 = 17[/tex]

[tex]a3 = 1 + 4(3)^2 = 1 + 36 = 37[/tex]

From these examples, we can observe that as 'n' increases, the terms of the sequence also increase. Therefore, we can conclude that the sequence an =[tex]1 + 4n^2[/tex]is increasing.

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a complex number is plotted on the complex plane (horizontal real axis, vertical imaginary axis). write the number in trigonometric form, using where is in degrees.

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When a complex number is plotted on the complex plane, it is represented by a point in the two-dimensional plane with the horizontal axis representing the real part and the vertical axis representing the imaginary part.

To write the number in trigonometric form, we first need to find the modulus, which is the distance between the origin and the point representing the complex number. We can use the Pythagorean theorem to find the modulus. Once we have the modulus, we can find the argument, which is the angle that the line connecting the origin to the point representing the complex number makes with the positive real axis. We can use the inverse tangent function to find the argument in radians and then convert it to degrees. Finally, we can write the complex number in trigonometric form as r(cos(theta) + i sin(theta)), where r is the modulus and theta is the argument. By using this method, we can represent complex numbers in a way that makes it easy to perform arithmetic operations and understand their geometric properties.

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please do all of this fast and I'll upvote you. please do it
all
Part A: Knowledge 1 A(2,-3) and B(8,5) are two points in R2. Determine the following: a) AB b) AB [3] c) a unit vector that is in the same direction as AB. [2] 1 of 4 2. For the vectors å = (-1,2)

Answers

a) To find the distance between points A(2, -3) and B(8, 5), we can use the distance formula:

[tex]AB = \sqrt{(x_2 - x_1)^2 + (y_2 - y_1)^2}[/tex]

Substituting the coordinates of A and B:

[tex]AB = \sqrt{(8 - 2)^2 + (5 - (-3))^2}\\= \sqrt{(6^2 + 8^2)}\\= \sqrt{(36 + 64)}\\= \sqrt{100}\\= 10[/tex]

Therefore, the distance AB is 10.

b) To find the vector AB[3], we subtract the coordinates of A from B:

AB[3] = B - A

= (8, 5) - (2, -3)

= (8 - 2, 5 - (-3))

= (6, 8)

Therefore, the vector AB[3] is (6, 8).

c) To find a unit vector in the same direction as AB, we divide the vector AB[3] by its magnitude:

Magnitude of AB[3]

[tex]= \sqrt{6^2 + 8^2}\\= \sqrt{36 + 64}\\= \sqrt{100}\\= 10[/tex]

Unit vector in the same direction as AB = AB[3] / ||AB[3]||

Unit vector in the same direction as AB = (6/10, 8/10)

= (0.6, 0.8)

Therefore, a unit vector in the same direction as AB is (0.6, 0.8).

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. (a) Explain why the function f(x) = e™² is not injective (one-to-one) on its natural domain. (b) Find the largest possible domain A, where all elements of A are non-negative and f: A → R, f(x)

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The function f(x) = e^x^2 is not injective (one-to-one) on its natural domain because it fails the horizontal line test. This means that there exist different values of x within its domain that map to the same y-value. In other words, there are multiple x-values that produce the same output value.

To find the largest possible domain A, where all elements of A are non-negative and f(x) is defined, we need to consider the domain restrictions of the exponential function. The exponential function e^x is defined for all real numbers, but its output is always positive. Therefore, in order for f(x) = e^x^2 to be non-negative, the values of x^2 must also be non-negative. This means that the largest possible domain A is the set of all real numbers where x is greater than or equal to 0. In interval notation, this can be written as A = [0, +∞). Within this domain, all elements are non-negative, and the function f(x) is well-defined.

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In the figure given alongside,∠a = ∠x and ∠b = ∠y show that ∠x+∠y+∠z = 180​

Answers

It is proved that ∠x + ∠y + ∠z = 180.

Here, we have,

given that,

∠a = ∠x and ∠b = ∠y

now, from the given figure, it is clear that,

∠a , ∠z ,  ∠b is  making a straight line.

we know that,

a straight angle is an angle equal to 180 degrees. It is called straight because it appears as a straight line.

so, we get,

∠a + ∠b + ∠z = 180

now, ∠a = ∠x and ∠b = ∠y

so, ∠x + ∠y + ∠z = 180

Hence, It is proved that ∠x + ∠y + ∠z = 180.

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Please help with each section of the problem (A-C) with a
detailed explanation. Thank you!
X A company manufactures and sells x television sets per month. The monthly cost and price-demand equations are C(x) = 74,000 + 60x and p(x) = 300 - 0

Answers

The revenue R can be expressed as a function of x: R(x) = 300x - 0.2[tex]x^2.[/tex] The profit P can be expressed as a function of x: P(x) = -0.2[tex]x^2[/tex] + 240x - 74,000.

What is function?

In mathematics, a function is a relation between a set of inputs (called the domain) and a set of possible outputs (called the codomain or range), where each input is uniquely associated with one output. It specifies a rule or mapping that assigns each input value to a corresponding output value.

This equation represents the profit the company will earn based on the quantity of television sets produced and sold. The profit function takes into account the revenue generated and subtracts the total cost incurred.

A) "The monthly cost and price-demand equations are C(x) = 74,000 + 60x and p(x) = 300 - 0.2x, respectively."

In this section, we are given two equations related to the company's operations. The first equation, C(x) = 74,000 + 60x, represents the monthly cost function. The cost function C(x) calculates the total cost incurred by the company per month based on the number of television sets produced and sold, denoted by x.

The cost function is composed of two components:

A fixed cost of 74,000, which represents the cost that remains constant regardless of the number of units produced or sold. It includes expenses such as rent, utilities, salaries, etc.

A variable cost of 60x, where x represents the number of television sets produced and sold. The variable cost increases linearly with the number of units produced and sold.

The second equation, p(x) = 300 - 0.2x, represents the price-demand function. The price-demand function p(x) calculates the price at which the company can sell each television set based on the number of units produced and sold (x).

The price-demand function is also composed of two components:

A constant term of 300, which represents the base price at which the company can sell each television set, regardless of the quantity.

A variable term of 0.2x, where x represents the number of television sets produced and sold. The variable term indicates that as the quantity of units produced and sold increases, the price per unit decreases. This reflects the concept of demand elasticity, where higher quantities generally lead to lower prices to maintain market competitiveness.

B) "Express the revenue R as a function of x."

To express the revenue R as a function of x, we need to calculate the total revenue obtained by the company based on the number of television sets produced and sold.

Revenue (R) can be calculated by multiplying the quantity sold (x) by the price per unit (p(x)). Given that p(x) = 300 - 0.2x, we substitute this value into the revenue equation:

R(x) = x * p(x)

= x * (300 - 0.2x)

= 300x - 0.2[tex]x^2[/tex]

Hence, the revenue R can be expressed as a function of x: R(x) = 300x - 0.2[tex]x^2.[/tex]

C) "Express the profit P as a function of x."

To express the profit P as a function of x, we need to calculate the total profit obtained by the company based on the number of television sets produced and sold. Profit (P) is the difference between the total revenue (R) and the total cost (C).

The profit function can be expressed as:

P(x) = R(x) - C(x),

where R(x) represents the revenue function and C(x) represents the cost function.

Substituting the expressions for R(x) and C(x) from the previous sections, we have:

P(x) = (300x - 0.2[tex]x^2[/tex]) - (74,000 + 60x)

= 300x - 0.2[tex]x^2[/tex] - 74,000 - 60x

= -0.2[tex]x^2[/tex] + 240x - 74,000

Hence, the profit P can be expressed as a function of x: P(x) = -0.2[tex]x^2[/tex] + 240x - 74,000.

This equation represents the profit the company will earn based on the quantity of television sets produced and sold. The profit function takes into account the revenue generated and subtracts the total cost incurred.

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Simplifying Radicals Then Adding and Subtracting using the rules of exponents and examine and describe the steps you are taking.
sqrt 12 + sqrt 24

Answers

The simplified expression is [tex]2 * (\sqrt{3}) + \sqrt{6}[/tex] for the given radicals.

To simplify a given expression, start by looking at the numbers inside the square root to find the full square factor. This allows us to simplify radicals using exponent rules for the radicals.

First, let's decompose the number using the square root.

[tex]\sqrt{12} = \sqrt{4} * \sqrt{3} = 2 * \sqrt{3} \\sqrt(24) = \sqrt{4} * \sqrt{6} = 2 * \sqrt{6}[/tex]

Now you can replace these simplified expressions with the original expressions.

[tex]\sqrt{12} + \sqrt{24} = 2 * \sqrt{3} + 2* \sqrt{6}[/tex]

The terms under the square root are not similar terms, so they cannot be directly combined. However, we can extract the common term 2 from both terms:

[tex]2 * \sqrt{3} + 2 * \sqrt{6} = 2 * (\sqrt{3} + \sqrt{6})[/tex]

This is a simplified form of the expression [tex]\sqrt{12} + \sqrt{24}[/tex] and the square root term cannot be further simplified or combined.

So the simplified formula is [tex]2 * (\sqrt{3} + \sqrt{6} )[/tex]. 

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Find the elasticity of demand (E) for the given demand function at the indicated values of p. Is the demand elastic, inelastic, or meither at the indicated values? 9 = 403 - 0.2p2 a. $25 b. $35

Answers

The elasticity of demand (E) for the given demand function at the indicated values of p. Is the demand elastic, inelastic, or meither at the indicated values is $25 and $35.

To find the elasticity of demand (E) for a given demand function, we use the formula:

E = (p/Q) * (dQ/dp)

where p is price, Q is quantity demanded, and dQ/dp is the derivative of the demand function with respect to p.

In this case, the demand function is:

Q = 403 - 0.2p^2

Taking the derivative with respect to p, we get:

dQ/dp = -0.4p

Now we can find the elasticity of demand at the indicated prices:

a. $25:

Q = 403 - 0.2(25)^2 = 253

dQ/dp = -0.4(25) = -10

E = (p/Q) * (dQ/dp) = (25/253) * (-10) = -0.99

Since E is negative, the demand is elastic at $25.

b. $35:

Q = 403 - 0.2(35)^2 = 188

dQ/dp = -0.4(35) = -14

E = (p/Q) * (dQ/dp) = (35/188) * (-14) = -2.59

Since E is greater than 1 in absolute value, the demand is elastic at $35.

Therefore, the demand is elastic at both $25 and $35.

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precalc help !! i need help pls

Answers

The value of tan 2θ would be,

⇒ tan 2θ = 2√221/9

We have to given that,

The value is,

⇒ cos θ = - 2 / √17

Now, The value of sin θ is,

⇒ sin θ = √ 1 - cos² θ

⇒ sin θ = √1 - 4/17

⇒ sin θ = √13/2

Hence, We get;

tan 2θ = 2 sin θ cos  θ / (2cos² θ - 1)

tan 2θ = (2 × √13/2 × - 2/√17) / (2×4/17 - 1)

tan 2θ = (- 2√13/√17) / (- 9/17)

tan 2θ = (- 2√13/√17) x (-17/ 9)

tan 2θ = 2√221/9

Thus, The value of tan 2θ would be,

⇒ tan 2θ = 2√221/9

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use the laplace transform to solve the given initial-value problem. y'' 4y' 3y = 0, y(0) = 1, y'(0) = 0 y(t) = $$

Answers

To solve the initial-value problem y'' + 4y' + 3y = 0 with initial conditions y(0) = 1 and y'(0) = 0 using Laplace transform, we will first take the Laplace transform of the given differential equation and convert it into an algebraic equation in the Laplace domain.

Taking the Laplace transform of the given differential equation, we have s^2Y(s) - sy(0) - y'(0) + 4(sY(s) - y(0)) + 3Y(s) = 0, where Y(s) is the Laplace transform of y(t).

Substituting the initial conditions y(0) = 1 and y'(0) = 0 into the equation, we get the following algebraic equation: (s^2 + 4s + 3)Y(s) - s - 4 = 0.

Solving this equation for Y(s), we find Y(s) = (s + 4)/(s^2 + 4s + 3).

To find y(t), we need to take the inverse Laplace transform of Y(s). By using partial fraction decomposition or completing the square, we can rewrite Y(s) as Y(s) = 1/(s + 1) - 1/(s + 3).

Applying the inverse Laplace transform to each term, we obtain y(t) = e^(-t) - e^(-3t).

Therefore, the solution to the initial-value problem is y(t) = e^(-t) - e^(-3t)

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AS The instantaneous value of current i Camps) att seconds in a circuit is given by 2 5 sin(2007+ - 0.5) Find the value of a)

Answers

The given equation describes the instantaneous value of current in a circuit as a sinusoidal function of time, with an amplitude of 2.5 and an angular frequency of 2007. The phase shift is represented by the constant term -0.5.

The given equation i(t) = 2.5 sin(2007t - 0.5) can be broken down to understand its components. The coefficient 2.5 determines the amplitude of the current. It represents the maximum value the current can reach, in this case, 2.5 Amperes. The sinusoidal function sin(2007t - 0.5) represents the variation of the current with time.

The angular frequency of the current is determined by the coefficient of t, which is 2007 in this case. Angular frequency measures the rate of change of the sinusoidal function. In this equation, the current completes 2007 cycles per unit of time, which is usually given in radians per second.

The term -0.5 represents the phase shift. It indicates a horizontal shift or delay in the waveform. A negative phase shift means the waveform is shifted to the right by 0.5 units of time.

By substituting different values of t into the equation, we can calculate the corresponding current values at those instances. The resulting waveform will oscillate between positive and negative values, with a period determined by the angular frequency.

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Use part I of the Fundamental Theorem of Calculus to find the derivative of 15 x f(x) = là [² ( ²7 ² - 1) " d dt 4 ƒf'(x) = [NOTE: Enter a function as your answer. Make sure that your syntax is c

Answers

The derivative of the function f(x) = ∫[a to x] [(t² - 7t + 2)² - 1] dt is given by f'(x) = [(x² - 7x + 2)² - 1].

To find the derivative of the function f(x) = ∫[a to x] [(t² - 7t + 2)² - 1] dt using Part I of the Fundamental Theorem of Calculus, we can differentiate f(x) with respect to x.

According to Part I of the Fundamental Theorem of Calculus, if we have a function f(x) defined as the integral of another function F(t) with respect to t, then the derivative of f(x) with respect to x is equal to F(x).

In this case, the function f(x) is defined as the integral of [(t² - 7t + 2)² - 1] with respect to t. Let's differentiate f(x) to find its derivative f'(x):

f'(x) = d/dx ∫[a to x] [(t² - 7t + 2)² - 1] dt.

Since the upper limit of the integral is x, we can apply the chain rule of differentiation. The chain rule states that if we have an integral with a variable limit, we need to differentiate the integrand and then multiply by the derivative of the upper limit.

First, let's find the derivative of the integrand, [(t² - 7t + 2)² - 1], with respect to t. The derivative of [(t² - 7t + 2)² - 1] with respect to t is:

d/dt [(t² - 7t + 2)² - 1] = 2(t² - 7t + 2)(2t - 7).

Now, we multiply this derivative by the derivative of the upper limit, which is dx/dx = 1:

f'(x) = d/dx ∫[a to x] [(t² - 7t + 2)² - 1] dt

= [(x² - 7x + 2)² - 1] * (d/dx x)

= [(x² - 7x + 2)² - 1].

It's important to note that in this solution, the lower limit 'a' was not specified. Since the lower limit is not involved in the differentiation process, it does not affect the derivative of the function f(x).

In conclusion, we have found the derivative f'(x) of the given function f(x) using Part I of the Fundamental Theorem of Calculus. The derivative is given by f'(x) = [(x² - 7x + 2)² - 1].

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Solve the equation. dx dt xe 3 t+9x An implicit solution in the form F(t.x)C, where C is an arbitrary constant.

Answers

Answer:

[tex]x(t) =e^{\frac{1}{3}e^{3x}+9t+C}[/tex]

Step-by-step explanation:

Solve the given differential equation.

[tex]\frac{dx}{dt} = xe^{ 3 t}+9x[/tex]

(1) - Use separation of variables to solve

[tex]\boxed{\left\begin{array}{ccc}\text{\underline{Separable Differential Equation:}}\\\frac{dy}{dx} =f(x)g(y)\\\\\rightarrow\int\frac{dy}{g(y)}=\int f(x)dx \end{array}\right }[/tex]

[tex]\frac{dx}{dt} = xe^{ 3 t}+9x\\\\\Longrightarrow \frac{dx}{dt} = x(e^{ 3 t}+9)\\\\\Longrightarrow \frac{1}{x}dx = (e^{ 3 t}+9)dt\\\\\Longrightarrow \int\frac{1}{x}dx = \int(e^{ 3 t}+9)dt\\\\\Longrightarrow \boxed{\ln(x) =\frac{1}{3}e^{3x}+9t+C}[/tex]

(2) - Simplify to get x(t)

[tex]\ln(x) =\frac{1}{3}e^{3x}+9t+C\\\\\Longrightarrow e^{\ln(x)} =e^{\frac{1}{3}e^{3x}+9t+C}\\\\\therefore \boxed{\boxed{ x(t) =e^{\frac{1}{3}e^{3x}+9t+C}}}[/tex]

Thus, the given DE is solved.

We can remove the absolute value and write the implicit solution in the form F(t,x)C: e^[(1/3)e^(3t+9x)] = F(t,x)C
The above solution is an implicit solution to the given differential equation.

To solve the equation dx/dt = xe^(3t+9x), we can separate the variables by writing it as:
1/x dx = e^(3t+9x) dt
Integrating both sides, we get:
ln|x| = (1/3)e^(3t+9x) + C
where C is an arbitrary constant of integration. To solve for x, we can exponentiate both sides and solve for the absolute value of x:
|x| = e^[(1/3)e^(3t+9x) + C]
|x| = Ce^[(1/3)e^(3t+9x)
where C is the new arbitrary constant. Finally, we can remove the absolute value and write the implicit solution in the form F(t,x)C:
e^[(1/3)e^(3t+9x)] = F(t,x)C
The above solution is an implicit solution to the given differential equation. The solution involves finding an expression that relates the dependent variable (x) and the independent variable (t) such that when we substitute this expression into the differential equation, the equation is satisfied. The solution includes an arbitrary constant (C) that allows us to obtain infinitely many solutions that satisfy the differential equation. The arbitrary constant arises due to the integration process, where we have to integrate both sides of the equation. The constant can be determined by specifying an initial or boundary condition that allows us to uniquely identify one solution from the infinitely many solutions. The implicit solution can be helpful in finding a more explicit solution by solving for x, but it can also be useful in identifying the behavior of the solution over time and space.

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In the diagram below of right triangle ABC, altitude CD is drawn to hypotenuse AB. If AD = 3 and DB = 12, what is the length of altitude CD?

Answers

The length of the altitude DB of the triangle is 6 units.

How to find the altitude of the right triangle?

A right angle triangle is a triangle that has one of its angles as 90 degrees.

The sum of angles in a triangle is 180 degrees. The triangles are similar. Therefore, the similar ratio can be used to find the altitude DB of the triangle.

Therefore, using the ratio,

let

x = altitude

Hence,

3 / x = x / 12

cross multiply

x²= 12  × 3

x = √36

x = 6 units

Therefore,

altitude of the triangle  = 6 units

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35 POINTS

Simplify the following expression

Answers

Step-by-step explanation:

c (3c^5 + c + b - 4 )       <======use distributive property of multiplication

                                                         to expand to :

3 c^6 + c^2 + bc -4c            Done .

Answer:

[tex]3c^{6}+c^{2}+bc-4c[/tex]

Step-by-step explanation:

We are given:
[tex]c(3c^{5}+c+b-4)[/tex]

and are asked to simplify.

To simplify this, we have to use the distributive property to distribute the c (outside of parenthesis) to the terms and values inside the parenthesis.

[tex](3c^{5})(c)+(c)(c)+(b)(c)+(-4)(c)\\=3c^{6} +c^{2} +bc-4c[/tex]

So our final equation is:

[tex]3c^{6}+c^{2}+bc-4c[/tex]

Hope this helps! :)

HELP!! Prove that cos²A + cos²B + cos²C = 2 + sinAsinBsinC​

Answers

Answer:

Here is the proof:

Given: A + B + C = π/2

We know that

cos²A + sin²A = 1cos²B + sin²B = 1cos²C + sin²C = 1

Adding all three equations, we get

cos²A + cos²B + cos²C + sin²A + sin²B + sin²C = 3

Since sin²A + sin²B + sin²C = 1 - cos²A - cos²B - cos²C,

we have

or, 1 - cos²A - cos²B - cos²C + sin²A + sin²B + sin²C = 3

or, 2 - cos²A - cos²B - cos²C = 3

or, cos²A + cos²B + cos²C = 2 + sinAsinBsinC

Hence proved.

Find the direction angle in degrees of v = 5 i-5j."

Answers

The direction angle of the vector v = 5i - 5j is 225 degrees.

To find the direction angle of a vector, we need to determine the angle between the vector and the positive x-axis. In this case, the vector v = 5i - 5j can be written as (5, -5) in component form.

The direction angle can be calculated using the inverse tangent function. We can use the formula:

θ = atan2(y, x)

where atan2(y, x) is the arctangent function that takes into account the signs of both x and y. In our case, y = -5 and x = 5.

θ = atan2(-5, 5) Evaluating this expression using a calculator, we find that the direction angle is approximately 225 degrees. The positive x-axis is at an angle of 0 degrees, and the direction angle of 225 degrees indicates that the vector v is pointing in the third quadrant, towards the negative y-axis.

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when describing the role of the pancreas to a client with a pancreatic dysfunction, the nurse would identify which substance as being acted on by pancreatic lipase? biomedical researchers are testing a cancer treatment to see if it is safe for human use. this can be thought of as a hypothesis test with the following hypotheses. h0: the medicine is safe ha: the medicine is not safe the following is an example of what type of error? the sample suggests that the medicine is safe, but it actually is not safe.a. type 1b. type 2c. not answer What does teaching involve vaccinations are intended to prevent illness. suppose a flu vaccine is determined to be effective for 53% of patients administered the shot. a random sample of 85 people will be selected from the population. (a) what is the population proportion of success in the above scenario? (b) calculate the mean of the sampling distribution of the sample proportion of people for whom the shot was effective. (c) calculate the standard deviation of the sampling distribution of the sample proportion of people for whom the shot was effective. (round your answer to three decimal places.) garner places great emphasis on operating his business to the highest standards of honesty and ethics. garner likely believes: group of answer choices a.how you achieve is as important as what you achieve. b.the end justifies the means. c.the customer is always right. d.good guys finish last. Tell the truth value for each of the following proposition. - February has 30 days 5 is a prime number. - If February has 30 days, then 7 is an even number.- February has 30 days iff 7 is an even number. - 4.2 +2 = 4 or 7 is an even number. - 5.2 + 2 = 4 7 is an even number.- 6.2 + 2 = 4 and 7 is an even number.- If February has 30 days then 5 is a prime number. - February has 30 days or 7 is an even number if a person is dehydrated, he will____ group of answer choices a.be at risk of heat stroke b.all the given answers are correct c.not be able to sweat d.have low blood pressure Let and be two linear maps V V, dim V = n, such that . = ., and assume that has n = distinct real eigenvalues. Prove that there exists a basis of V such that both and have diagonal matrices in this basis. Crowing out is a phenomenon focused upon most by the macroeconomists of ____. a) monetarism b) Keynesianism c) real business cycle theory d) rational expectations Sketch AABC in which A = 43, B = 101 and a = 7.5 cm.Find b and c, in cm correct to two decimal places. Properties of integrals Use only the fact that 04 3x(4x)dx=32, and the definitions and properties of integrals, to evaluate the following integrals, if possible. a. 40 3x(4x)dx b. 04 x(x4)dx c. 40 6x(4x)dx d. 08 3x(4x)dx You purchased a stock for $46.70 a share and resold it one year later. Your total return for the year was 11.2 percent and the dividend yield was 2.8 percent. At what price did you resell the stock? Find the maximum and minimum values of the function f(x) = r - 27 on the interval (0,8). The minimum value = The maximum value = 0 Which points on the graph of $y=4-x^2$ are closest to the point $(0,2)$ ?$(2,0)$ and $(-2,0)$$(\sqrt{2}, 2)$ and $(-\sqrt{2}, 2)$$\left(\frac{3}{2}, \frac{7}{4}\right)$ and $\left(\frac{-3}{2}, \frac{7}{4}\right)$.$\left(\frac{\sqrt{6}}{2}, \frac{5}{2}\right)$ and $\left(\frac{-\sqrt{6}}{2}, \frac{5}{2}\right)$ True/false: social media posts are routinely included in discovery in litigation can you help me with thisquestion please??Exercise: Find the absolute maximum and minimum values of the function - f(x, y) = (x2 + y2 1)2 + xy on the unit disk D= {(x, y) : x2 + y2 MUSIC SUBJECT!!!! Post a Hip-Hop Song with a Pro-Woman Message,1) write who the artist of the song is, and some historical significance (either about the lyrics, when/why it was created, the social impact at the time, what the pro-woman message is, etc, etc) in paragraph form.2) Include a link to the song you choose. the front section of a two-piece drive shaft is supported at its rear end by a center bearing called a: DETAILS SULLIVANCALC2HS 8.5.008. Use the Alternating Series Test to determine whether the alternating series converges or diverges. - (-1)* + 1. 7 5vk k=1 Identify an Evaluate the following limit. liman 00 Since lima 20 and a 2a, for all ni Select--- (1 point) Find the sum of each of the geometric series given below. For the value of the sum, enter an expression that gives the exact value, rather than entering an approximation A. -123- -48/5 19 4/3