A graphing calculator is recommended. For the limit lim x → 2 (x3 − 3x + 3) = 5 illustrate the definition by finding the largest possible values of δ that correspond to ε = 0.2 and ε = 0.1. (Round your answers to four decimal places.)

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Answer 1

To illustrate the limit definition for lim x → 2 (x^3 - 3x + 3) = 5, we need to find the largest possible values of δ for ε = 0.2 and ε = 0.1.

The limit definition states that for a given ε (epsilon), we need to find a corresponding δ (delta) such that if the distance between x and 2 (|x - 2|) is less than δ, then the distance between f(x) and 5 (|f(x) - 5|) is less than ε.

Let's first consider ε = 0.2. We want to find the largest possible δ such that |f(x) - 5| < 0.2 whenever |x - 2| < δ. To find this, we can graph the function f(x) = x^3 - 3x + 3 and observe the behavior near x = 2. By using a graphing calculator or plotting points, we can see that as x approaches 2, f(x) approaches 5. We can choose a small interval around x = 2, and by experimenting with different values of δ, we can determine the largest δ that satisfies the condition for ε = 0.2.

Similarly, we can repeat the process for ε = 0.1. By graphing f(x) and observing its behavior near x = 2, we can find the largest δ that corresponds to ε = 0.1.

It's important to note that finding the exact values of δ may require numerical methods or advanced techniques, but for the purpose of illustration, a graphing calculator can be used to estimate the values of δ that satisfy the given conditions.

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Related Questions

Find the sum of the vectors 4.79Z25.8° and 6.96252°. Round your final answers to 1 decimal place and express your angle in degrees – 180°"

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The sum of the vectors 4.79Z25.8° and 6.96Z252° is approximately 5.4Z99.6°.

To find the sum of vectors, we need to combine their magnitudes and add their angles. The vector 4.79Z25.8° can be represented as a complex number in polar form as 4.79 * cos(25.8°) + 4.79i * sin(25.8°). Similarly, the vector 6.96Z252° can be represented as 6.96 * cos(252°) + 6.96i * sin(252°). Adding these two complex numbers gives us the resultant vector.

To simplify the calculation, we can convert the angles to radians by multiplying them by π/180. Adding the magnitudes and angles, we get (4.79 * cos(25.8°) + 6.96 * cos(252°)) + (4.79 * sin(25.8°) + 6.96 * sin(252°))i. Evaluating this expression gives us the complex number approximately equal to -3.79 + 3.9i.

Converting this back to polar form, we can find the magnitude using the Pythagorean theorem: √((-3.79)^2 + (3.9)^2) ≈ 5.4. The angle can be found using the arctan function: arctan(3.9/(-3.79)) ≈ 99.6°. Since the question asks for the angle in degrees within the range of -180° to 180°, we subtract 180° to obtain -80.4°. Rounding these values to one decimal place, the sum of the vectors is approximately 5.4Z99.6°.

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Evaluate 5. F. di where = (dz, 3y, – 4x), and C is given by F(t) = (t, sin(t), cos(t)), 0

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Evaluating the vector field 5F·di, where F = (dz, 3y, –4x) and C is given by F(t) = (t, sin(t), cos(t)), yields a result that depends on the specific path of integration. The value of the line integral is 5.

The line integral can be evaluated using the following steps:

Calculate the vector field F(t).

Calculate the differential dr.

Evaluate the line integral using the formula ∫ F(t) · dr.

The vector field F = (dz, 3y, –4x) describes a three-dimensional vector that varies with position. When calculating the line integral 5F·di, we are evaluating the dot product of 5F and the differential displacement vector di along a given path C. The path C is defined by the function F(t) = (t, sin(t), cos(t)), where t ranges from 0 to some value. The line integral is then evaluated as follows:

∫ F(t) · dr = ∫ (dz, 3y, – 4x) · (dt i + sin(t) j + cos(t) k)

= ∫ dz + 3∫ sin(t) dt – 4∫ cos(t) dt

= z + 3(–cos(t)) – 4(sin(t))

= z – 3cos(t) + 4sin(t)

The value of the line integral is then evaluated at the endpoints of the curve C. The endpoints are (0, 0, 1) and (1, π/2, 0). The value of the line integral is then:

(1 – 3(–1) + 4(0)) – (0 – 3(0) + 4(π/2)) = 1 + 2π/2 = 5

Therefore, the value of the line integral is 5.

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. Find the volume of solid generated by revolving the area bounded by: y=x²+1, x=0, y=0 and x=2 about: a) y=0 b) x=2 c) y=5 (10 pts. each.)

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The volume of the solid generated by revolving the area bounded by the curve y = x² + 1, the x-axis, and the lines x = 0 and x = 2 about different axes can be calculated. The axes of revolution are y = 0, x = 2, and y = 5.

To find the volume of the solid generated by revolving the given area about the y-axis (y = 0), we can use the method of cylindrical shells. Integrating the formula for the volume of a cylindrical shell, V = 2π∫[a,b] x(f(x) - g(x)) dx, where f(x) is the upper boundary curve and g(x) is the lower boundary curve, we obtain the volume.

Similarly, for revolving the area about the line x = 2, we can use the same method of cylindrical shells. The difference lies in the limits of integration, which will now be [c,d], where c is the distance between the line of revolution (x = 2) and the x-axis, and d is the distance between the line of revolution and the upper boundary curve.

Lastly, for revolving the area about the line y = 5, we can use the method of disks or washers. We need to find the range of x-values that lies within the bounded area. By integrating the formula for the volume of a disk or washer, V = π∫[a,b] (r(x)² - R(x)²) dx, where r(x) is the distance between the line of revolution and the lower boundary curve, and R(x) is the distance between the line of revolution and the upper boundary curve, we can calculate the volume.

By following these approaches, the volumes of the solids generated by revolving the given area about each respective axis can be determined.

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water runs into a conical tank at the rate of 23 cubic centimeters per minute. the tank stands point down and has a height of 10 centimeters and a base radius of 4 centimeters. how fast is the water level rising when the water is 2 centimeters deep?

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When the water is 2 centimeters deep, the water level is rising at a rate of approximately 0.271 centimeters per minute.

The rate at which the water level is rising in the conical tank can be determined using the formula for the volume of a cone and the chain rule of differentiation. Given that the water is flowing into the tank at a rate of 23 cubic centimeters per minute, the tank has a height of 10 centimeters and a base radius of 4 centimeters, we need to find the rate at which the water level is rising when the water is 2 centimeters deep.

We can use the formula for the volume of a cone to relate the variables:

[tex]V = \frac{1}{3} \pi r^2 h[/tex]

Differentiating both sides of the equation with respect to time (t), we have:

[tex]\frac{{dV}}{{dt}} = \frac{1}{3} \pi (2r) \frac{{dh}}{{dt}}[/tex]

Now, we can substitute the given values into the equation:

23 = (1/3) * π * (2 * 4) * (dh/dt)

Simplifying the equation further:

23 = (8/3) * π * (dh/dt)

To solve for dh/dt, we can rearrange the equation:

dh/dt = (23 * 3) / (8 * π)

Calculating the value:

dh/dt ≈ 0.271 cm/min

Therefore, when the water is 2 centimeters deep, the water level is rising at a rate of approximately 0.271 centimeters per minute.

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Find the maximum profit P if C(x) = 10 + 40x and p = 80-2x. A. $210.00 B. $200.00 O C. $190.00 O D. $180.00 Un recently, hamburgers at the city sports arena cost $4.70 each. The food concessionaire sold an average of 23,000 hamburgers on game night the price was raised to $5.00, hamburger sales dropped off to an average of 20.000 per (a) Assuming a inear demand curve, find the price of a hamburger that will maximize the nighty hamburger revenue b) if the concessionare had fixed costs of $2.500 per night and the variable cost is 50 60 per hamburger, find the price of a hamburger that will maximize the nighty hamburger pro (a) Assuming a linear demand curve, find the price of a hamburger that will maximize the nighty hamburger revenue The hamburger price that will maximize the nightly hamburger revenue is (Round to the nearest cent as needed) (b) If the concessionaire had fad costs of $2.500 per night and the variable cost is $0 60 per hamburger find the price of a hamburger that will maximize the nightly hamburger prof The hamburger price that will maximize the nightly hamburger profit is S

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a) The hamburger price that will maximize the nightly hamburger revenue is $122,500.

b) The hamburger price that will maximize the nightly hamburger profit is $108,000.

In this problem, we are given cost and price functions for hamburgers sold at a sports arena. We are asked to find the maximum profit and the price of the hamburger that will maximize revenue and profit under different conditions. To solve these problems, we will use mathematical equations and optimization techniques.

Question (a):

To find the price of a hamburger that will maximize the nightly hamburger revenue, we need to determine the point at which the revenue is maximized. The revenue is calculated by multiplying the price per hamburger by the number of hamburgers sold.

Given:

Initial price (P₁) = $4.70

Initial quantity sold (Q₁) = 23,000

New price (P₂) = $5.00

New quantity sold (Q₂) = 20,000

Since we are assuming a linear demand curve, we can determine the equation for demand using the initial and new quantity and price values. We can use the point-slope form of a linear equation:

Q - Q₁ = m(P - P₁)

Where Q is the quantity, P is the price, Q₁ is the initial quantity, P₁ is the initial price, and m is the slope of the demand curve.

Substituting the given values:

Q - 23,000 = m(P - 4.70)

To find the slope (m), we can use the formula:

m = (Q₂ - Q₁) / (P₂ - P₁)

Substituting the given values:

m = (20,000 - 23,000) / (5.00 - 4.70)

m = -3,000 / 0.30

m = -10,000

Now we have the equation:

Q - 23,000 = -10,000(P - 4.70)

Simplifying:

Q = -10,000P + 23,000 + 47,000

Q = -10,000P + 70,000

The revenue (R) is calculated by multiplying the price (P) by the quantity (Q):

R = P * Q

R = P * (-10,000P + 70,000)

R = -10,000P² + 70,000P

To find the maximum revenue, we need to find the vertex of the parabolic function. The x-coordinate of the vertex can be found using the formula:

x = -b / (2a)

In this case, a = -10,000 and b = 70,000, so:

x = -70,000 / (2 * (-10,000))

x = -70,000 / (-20,000)

x = 3.5

Now we can substitute the value of x back into the revenue equation to find the maximum revenue:

R = -10,000(3.5)² + 70,000(3.5)

R = -10,000(12.25) + 245,000

R = -122,500 + 245,000

R = 122,500

Therefore, the maximum nightly hamburger ² is $122,500.

Question (b):

To find the price of a hamburger that will maximize the nightly hamburger profit, we need to consider both fixed costs and variable costs in addition to the revenue equation.

Given:

Fixed cost per night (Cf) = $2,500

Variable cost per hamburger (Cv) = $0.60

The profit (P) can be calculated by subtracting the total cost from the revenue:

P = R - C

P = (P * Q) - (Cf + Cv * Q)

Substituting the revenue equation from part (a):

P = (-10,000P² + 70,000P) - (Cf + Cv * Q)

Substituting the given values for Cf and Cv:

P = (-10,000P² + 70,000P) - (2,500 + 0.60 * Q)

Now we have a quadratic equation in terms of P. To find the maximum profit, we need to find the vertex of the parabolic function. We can use the same formula as in part (a):

x = -b / (2a)

In this case, a = -10,000 and b = 70,000, so:

x = -70,000 / (2 * (-10,000))

x = -70,000 / (-20,000)

x = 3.5

Now we can substitute the value of x back into the profit equation to find the maximum profit:

P = (-10,000(3.5)² + 70,000(3.5)) - (2,500 + 0.60 * Q)

P = (-10,000(12.25) + 245,000) - (2,500 + 0.60 * Q)

P = -122,500 + 245,000 - 2,500 - 0.60 * Q

P = 120,000 - 0.60 * Q

To maximize the profit, we need to determine the quantity (Q) that corresponds to the maximum revenue found in part (a), which is 20,000. Substituting this value:

P = 120,000 - 0.60 * 20,000

P = 120,000 - 12,000

P = 108,000

Therefore, the price of a hamburger that will maximize the nightly hamburger profit is $108,000.

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Parameterize the plane in R^3 which contains the point (1,2,3)
and is parallel to the lines given by (x,y,z)=(3,2,1)+s(1,2,3) and
(x,y,z)=(9,1,2)+t(1,-1,1).

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To parameterize the plane in R^3 containing the point (1,2,3) and parallel to the given lines, we first need to find the normal vector to the plane. Since the plane is parallel to both lines, its normal vector must be perpendicular to both of their direction vectors.


The direction vector of the first line is (1,2,3), and the direction vector of the second line is (1,-1,1). To find a vector perpendicular to both of these, we can take their cross product:
(1,2,3) x (1,-1,1) = (5,2,-3)
This vector (5,2,-3) is perpendicular to both lines and therefore is the normal vector to the plane.
Now we can use the point-normal form of the equation for a plane:
ax + by + cz = d
where (a,b,c) is the normal vector and (x,y,z) is any point on the plane. We know that (1,2,3) is a point on the plane, so we can plug in these values
5x + 2y - 3z = d
To find the value of d, we can plug in the coordinates of the given point:
5(1) + 2(2) - 3(3) = -4
So the equation of the plane is:
5x + 2y - 3z = -4
To parameterize the plane, we can choose two variables (say, s and t) and solve for the remaining variable (say, z) in terms of them. Then we can plug in any values of s and t to get points on the plane.
Solving for z in terms of s and t:
5x + 2y - 3z = -4
5x + 2y + 4 = 3z
z = (5/3)x + (2/3)y + (4/3)
We can choose any values of s and t to get points on the plane, so a possible parameterization is:
x = s
y = t
z = (5/3)s + (2/3)t + (4/3)
Alternatively, we can write this in vector form:
(r,s,t) = (s,t,5s/3 + 2t/3 + 4/3)
where (r,s,t) represents a point on the plane.

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a textbook distributor has 10 employees in each of four midwestern states: ohio, indiana, illinois, and wisconsin. the variable is the number of unexcused absences in the last year. for each state, the mean number of unexcused absences is 3. four histograms in which state is the standard deviation of unexcused absences zero?

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The standard deviation of unexcused absences is zero in all four states: Ohio, Indiana, Illinois, and Wisconsin.

A standard deviation of zero indicates that there is no variation or dispersion in the data. In this case, it means that all employees in each state had the exact same number of unexcused absences, which is 3.

Since the mean number of unexcused absences is the same (3) for each state, and the standard deviation is zero, it implies that every employee in each state had exactly 3 unexcused absences. There is no variability in the data, and all employees exhibit the same behavior in terms of unexcused absences.

Therefore, for all four histograms representing the states (Ohio, Indiana, Illinois, and Wisconsin), the bars will be identical and centered at 3, indicating that there is no variation in the number of unexcused absences among the employees in each state.

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Need solution of these questions But Fast Please
Find the power series representation 4.) f(x) = (1 + x)²/3 of # 4-6. State the radius of convergence. 5.) f(x) = sin x cos x (hint: identity) 6.) f(x) = x²4x

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The power series representation of f(x) = (1 + x)²/3 is f(x) = 1/3 + 2/3x + 1/3x² + 0x³ + 0x⁴ + ...The radius of convergence is infinite.

The power series representation of f(x) = sin x cos x is f(x) = (1/2)sin(2x) = x - (1/6)x³ + (1/120)x⁵ - ...The radius of convergence is infinite.The power series representation of f(x) = x²4x is f(x) = x^2 + 4x^3 + 0x^4 + 0x^5 + ...The radius of convergence is infinite.4.) To find the power series representation of f(x) = (1 + x)²/3, we expand (1 + x)² to get 1 + 2x + x². Dividing by 3, we have f(x) = (1/3) + (2/3)x + (1/3)x². This representation can be extended with additional terms of x raised to higher powers, but since the numerator is a constant, those terms will be zero. The radius of convergence for this power series is infinite, meaning it converges for all values of x.

5.) To find the power series representation of f(x) = sin x cos x, we can use the double-angle identity: sin 2x = 2sin x cos x. Rearranging, we have f(x) = (1/2)sin 2x. Using the power series representation of sin x, we substitute 2x for x, yielding f(x) = (1/2)(2x - (1/6)(2x)³ + (1/120)(2x)⁵ - ...). Simplifying, we have f(x) = x - (1/6)x³ + (1/120)x⁵ - ... The radius of convergence for this power series is also infinite.6.) The power series representation of f(x) = x²4x is straightforward. It is simply x² + 4x³ + 0x⁴ + 0x⁵ + ... As there are no coefficients involving x to negative powers, the radius of convergence is also infinite.

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A tank is in the shape of an inverted cone, with height 10 ft and base radius 6 ft. The tank is filled to a depth of 8 ft to start with, and water is pumped over the upper edge of the tank until 3 ft of water remain in the tank. How much work is required to pump out that amount of water?

Answers

The work required to pump out the water from the tank can be calculated by integrating the weight of the water over the depth range from 8 ft to 3 ft.

The volume of water in the tank can be determined by subtracting the volume of the remaining cone-shaped space from the initial volume of the tank.

The initial volume of the tank is given by the formula for the volume of a cone: V_initial = (1/3)πr²h, where r is the base radius and h is the height of the tank. Plugging in the values, we have V_initial = (1/3)π(6²)(10) = 120π ft³.

The remaining cone-shaped space has a height of 3 ft, which is equal to the depth of the water in the tank after pumping. To find the radius of this remaining cone, we can use similar triangles. The ratio of the remaining height (3 ft) to the initial height (10 ft) is equal to the ratio of the remaining radius to the initial radius (6 ft). Solving for the remaining radius, we get r_remaining = (3/10)6 = 1.8 ft.

The volume of the remaining cone-shaped space can be calculated using the same formula as before: V_remaining = (1/3)π(1.8²)(3) ≈ 10.795π ft³.

The volume of water that needs to be pumped out is the difference between the initial volume and the remaining volume: V_water = V_initial - V_remaining ≈ 120π - 10.795π ≈ 109.205π ft³.

To find the work required to pump out the water, we need to multiply the weight of the water by the distance it is lifted. The weight of water can be found using the formula weight = density × volume × gravity, where the density of water is approximately 62.4 lb/ft³ and the acceleration due to gravity is 32.2 ft/s².

The work required to pump out the water is then given by W = weight × distance, where the distance is the depth of the water that needs to be lifted, which is 5 ft.

Plugging in the values, we have W = (62.4)(109.205π)(5) ≈ 107,289.68π ft-lb.

Therefore, the work required to pump out that amount of water is approximately 107,289.68π ft-lb.

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Given points A(2; -3), B(4;0), C(5; 1). Find the general equation of a straight line passing... 1. ...through the point A perpendicularly to vector AB 2. ...through the point B parallel to vector AC 3

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The general equation of the straight line passing through point A perpendicularly to vector AB is y - (-3) = -2/3(x - 2), and the general equation of the straight line passing through point B parallel to vector AC is y - 0 = 1(x - 4).

To find the equation of a line passing through point A perpendicularly to vector AB, we first calculate the slope of AB. The slope of a line passing through points (x1, y1) and (x2, y2) is given by m = (y2 - y1) / (x2 - x1). For AB, the slope is (0 - (-3)) / (4 - 2) = 3/2. To find the slope of the perpendicular line, we take the negative reciprocal, which is -2/3. Using point A (2, -3), we can substitute the values into the point-slope form equation: y - y1 = m(x - x1). Therefore, the equation is y - (-3) = -2/3(x - 2), which simplifies to y = -2/3x + 8/3.

To find the equation of a line passing through point B parallel to vector AC, we calculate the slope of AC. The slope of AC is (1 - 0) / (5 - 4) = 1/1 = 1. Using point B (4, 0), we substitute the values into the point-slope form equation: y - y1 = m(x - x1). Therefore, the equation is y - 0 = 1(x - 4), which simplifies to y = x - 4. By obtaining the slopes and using the point-slope form, we can determine the equations of the lines passing through the given points with specific conditions.

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Find the equations of the straight line passing through the point (1,2,3) to intersect the straight line x+1=2(y−2)=z+4 and parallel to the plane x+5y+4z=0

Solve the initial value problem for I as a vector function of t d't Differential equation -18k dr initial conditions r(0)-70k and =81 +81 = 0+1+0 dr du to

Answers

The solution to the initial value problem, given the differential equation -[tex]18k d'r/dr = 81 + 81 = 0 + 1 + 0[/tex] and the initial condition [tex]r(0) = -70k[/tex], is [tex]I(t) = -4k e^{-9t}[/tex].

To solve the given differential equation, we can separate the variables and integrate both sides. Rearranging the equation, we have:

[tex]-18k d'r/dr = 81 + 81 = 162[/tex]

Dividing both sides by 162 and integrating, we get:

[tex]\int\limits(1/162) d'r = \int\limits dt[/tex]

Integrating both sides, we obtain:

[tex](1/162) r = t + C[/tex]

Simplifying further, we have:

[tex]r = 162t + C[/tex]

Applying the initial condition r(0) = -70k, we can solve for the constant C:

[tex]-70k = 162(0) + C\\C = -70k[/tex]

Substituting this value of C back into the equation, we have:

[tex]r = 162t - 70k[/tex]

Finally, we can express the solution in vector form as [tex]I(t) = (162t - 70)k[/tex], which simplifies to [tex]I(t) = -4k e^{-9t}[/tex]after factoring out a common factor of 2 from the numerator and denominator and applying the exponential function.

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Let C(T) be a function that models the dependence of the cost (C) in thousands of dollars on the amount of ore to extract from a copper mine measured in tons (T):
1) If you computed the average rate of change of cost with respect to tons for production levels between T = 20000 and T = 40000, give the units of your answer (no calculations - describe the units of the rate of change).
2) If you had a function for C(T) and were able to calculate the answer to part 1, explain why you would not expect your answer to be negative (explanation should be in terms of cost, tons of ore to extract, and rates of change).

Answers

The units of the average rate of change of cost with respect to tons would be "thousands of dollars per ton."

This represents how much the cost (in thousands of dollars) changes on average for each additional ton of ore extracted. If the function C(T) represents the cost in thousands of dollars and we are calculating the average rate of change of cost with respect to tons, we would not expect the answer to be negative.

This is because the rate of change represents the direction and magnitude of the change in cost per ton. A negative value would indicate a decrease in cost as the number of tons increases, which does not align with the concept of cost. In the context of the problem, we would expect the cost to either increase or remain constant as more tons of ore are extracted, hence a non-negative rate of change.

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Express the vector in the form v=vqi + V2] + V3k. AB if A is the point (-3,-4,5) and B is the point (4,4,5) Choose the correct answer below. O A. -21 + 13k OB. 71 +8j O C. 2j-13k OD. 1 + 10k O E. -¡-

Answers

To express the vector AB in the form v = v1i + v2j + v3k, where A is the point (-3, -4, 5) and B is the point (4, 4, 5), we subtract the coordinates of A from the coordinates of B to obtain the components v1, v2, and v3.

The vector AB can be obtained by subtracting the coordinates of point A from the coordinates of point B. Let's denote the components of vector AB as v1, v2, and v3.

v1 = x-coordinate of B - x-coordinate of A = 4 - (-3) = 7

v2 = y-coordinate of B - y-coordinate of A = 4 - (-4) = 8

v3 = z-coordinate of B - z-coordinate of A = 5 - 5 = 0

Therefore, the vector AB can be expressed as v = 7i + 8j + 0k.

Looking at the provided answer choices, we see that only option B. 71 + 8j matches the expression obtained for the vector AB. The answer B. 71 + 8j represents the vector with a magnitude of 71 in the i-direction and 8 in the j-direction, with no component in the k-direction. Hence, the correct answer is B. 71 + 8j.

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Determine the area of the shaded region bounded by y= -x^2+9x and y=x^2-5x

Answers

The area of the shaded region can be found by calculating the definite integral of the difference between the two curves over their common interval so it will be 343/3 square units.

The shaded region is the area between the curves y =[tex]-x^2 + 9x[/tex]and y = [tex]x^2 - 5x.[/tex] To find the points of intersection, we set the two equations equal to each other:

[tex]-x^2 + 9x = x^2 - 5x[/tex]

Simplifying the equation, we have:

[tex]2x^2 - 14x = 0[/tex]

Factoring out 2x, we get:

2x(x - 7) = 0

This gives us two solutions: x = 0 and x = 7.

To calculate the area, we integrate the difference of the two curves over the interval [0, 7]:

A = ∫[tex][0,7] ((x^2 - 5x) - (-x^2 + 9x))[/tex] dx

Simplifying the expression inside the integral, we have:

A = ∫[tex][0,7] (2x^2 - 14x)[/tex] dx

Evaluating the integral, we get:

A = [tex][(2/3)x^3 - 7x^2][/tex] evaluated from 0 to 7

A = [tex](2/3)(7^3) - 7(7^2) - (2/3)(0^3) + 7(0^2)[/tex]

A = (2/3)(343) - 7(49)

A = 686/3 - 343

A = 343/3

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The series diverges. O 1 O O 1 n = If the infinite series Σa has nth partial sum Sn= 2n- k=1 -N for n ≥ 1, what is the sum of the series Σak? k=1

Answers

Answer:

The limit of 2 as n approaches infinity is still 2, we can conclude that the sum of the series Σak is 2. Therefore, the sum of the series Σak is 2.

Step-by-step explanation:

To find the sum of the series Σak, we can analyze the relationship between the nth partial sums of Σa and Σak.

The nth partial sum of Σak can be denoted as Sk, where Sk represents the sum of the first k terms of the series Σak.

Given that the nth partial sum of Σa is Sn = 2n - N for n ≥ 1, we can express the relationship between Sn and Sk as:

Sk = Sn - Sn-1

This equation represents the difference between consecutive nth partial sums. By subtracting the (n-1)th partial sum from the nth partial sum, we obtain the sum of the kth term (ak) in the series Σak.

Now, let's calculate the sum of the series Σak:

Σak = lim (n → ∞) Sk

Since we are dealing with infinite series, we need to take the limit as n approaches infinity. The limit represents the sum of all the terms in the series Σak.

Using the equation Sk = Sn - Sn-1, we can rewrite the sum of the series as:

Σak = lim (n → ∞) (Sn - Sn-1)

By applying the limit, we can simplify the expression further:

Σak = lim (n → ∞) (2n - N - 2(n-1) + N)

Simplifying the expression inside the limit:

Σak = lim (n → ∞) (2n - 2n + 2 + N - N)

The terms 2n and -2n cancel out, and we are left with:

Σak = lim (n → ∞) 2

Since the limit of 2 as n approaches infinity is still 2, we can conclude that the sum of the series Σak is 2.

Therefore, the sum of the series Σak is 2.

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Triple integrals Which of the following triple integrals is definite (that is, well-defined and whose result is a real number) ? Note that there may be more than one correct answer 1 zyc dac dydz 0zy | carloveldstyle sin(Zyx) dx dydz 0 0 11 SI [zyz dydz dz SITE 0 0 1 ey 1 SI zyndzdy dz 0 Oy e O Sl cos(zy) dydz dz SI 0 0 0 11 SS sin(zy a) dzda dy 0 0 1 er 1 11. I cos cos(z y) dz dy dx desde 0 0 y

Answers

The definite triple integrals that are well-defined and whose results are real numbers are 1 and 3.

The triple integral [tex]∫∫∫ zyc dxdydz[/tex]over the region R defined by 0 ≤ z ≤ y and 0 ≤ y ≤ 1 is definite. In this case, the integration is carried out over a bounded region, and the integrand is a continuous function, ensuring a well-defined result. The limits of integration are finite, and the integral evaluates to a real number.

The triple integral[tex]∫∫∫ sin(zy^2) dydzdz[/tex] over the region R defined by 0 ≤ z ≤ 1 and 0 ≤ y ≤ e is also definite. Similar to the first case, the integration is performed over a bounded region, and the integrand is continuous. The limits of integration are finite, leading to a well-defined result that is a real number.

Both of these integrals satisfy the conditions for definiteness, as they are over bounded regions with continuous integrands. They can be evaluated numerically to obtain their specific values.

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In triangle ABC, if 35⁰
55°
40°
45°

Answers

The value of measure of angle C is,

⇒ ∠C = 70 degree

We have to given that;

In triangle ABC,

⇒ AC = BC

And, angle A = 55°

Since, We know that;

If two sides are equal in length in a triangle then their corresponding angles are also equal.

Hence, We get;

⇒ ∠A = ∠B = 55°

So, We get;

⇒ ∠A + ∠B + ∠C = 180

⇒ 55 + 55 + ∠C = 180

⇒ 110 + ∠C = 180

⇒ ∠C = 180 - 110

⇒ ∠C = 70 degree

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Is this statement true or false?
"The linear line of best fit can always be used to make reliable
predictions."

Answers

False. The statement "The linear line of best fit can always be used to make reliable predictions" is false. While linear regression is a widely used and valuable tool for making predictions, its reliability depends on several factors and assumptions.

The linear line of best fit assumes that the relationship between the variables being modeled is linear. If the relationship is not truly linear, using a linear model may lead to inaccurate predictions. In such cases, alternative models, such as polynomial regression or non-linear regression, may be more appropriate.

Additionally, the reliability of predictions based on a linear line of best fit depends on the quality and representativeness of the data. If the data used for the regression analysis is not sufficiently diverse, or if it contains outliers or influential observations, the predictions may be less reliable.

Furthermore, it's important to note that correlation does not imply causation. Even if a strong linear relationship is observed between variables, it does not necessarily mean that one variable is causing changes in the other. Using a linear model to make predictions based on a presumed causal relationship may lead to unreliable results.

In summary, while linear regression can be a useful tool for making predictions, its reliability depends on the linearity of the relationship, the quality of the data, and the presence of confounding factors. It is essential to carefully consider these factors and assess the assumptions of the linear model before relying on it for predictions.

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cale tables on page drawing. A pencil which has been sharpened at each end just fits along the diagonal of the base of 2 box. See Figure 17.15. If the box measures 14 cm by 8 cm, find the length of the pencil.​

Answers

The length of this pencil is 16.12 cm.

How to determine the length of the pencil?

In order to determine the length of this pencil (diagonal of rectangular figure), we would have to apply Pythagorean's theorem.

In Mathematics and Geometry, Pythagorean's theorem is represented by the following mathematical equation (formula):

x² + y² = z²

Where:

x, y, and z represents the length of sides or side lengths of any right-angled triangle.

By substituting the side lengths of this rectangular figure, we have the following:

z² = x² + y²

z² = 14² + 8²

z² = 196 + 64

z² = 260

z = √260

y = 16.12 cm.

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Missing information:

The question is incomplete and the complete question is shown in the attached picture.

help asap please
Use a table to evaluate the limit: lim -x² *4-7+ x+7'

Answers

The value of the limit of the expression [tex]\(\lim_{x\to\infty} (-x^2 \cdot 4 - 7 + x + 7)\)[/tex] is

[tex]\[\lim_{x\to\infty} (-x^2 \cdot 4 - 7 + x + 7) = -\infty\][/tex].

To evaluate the limit of the expression [tex]\(\lim_{x\to\infty} (-x^2 \cdot 4 - 7 + x + 7)\),[/tex] we can create a table of values approaching positive infinity [tex](\(x \to \infty\))[/tex].

Let's substitute increasing values of x into the expression and observe the corresponding values:

x = 10: -393

x = 100: -39,907

x = 1000: -39,999,007

x = 10000: -39,999,990,007

As we can see from the table, as x increases, the expression (-x² * 4 - 7 + x + 7) approaches negative infinity ([tex]\(-\infty\)[/tex]). Therefore, we can conclude that the limit of the expression as x approaches infinity is ([tex]-\infty[/tex]).

In mathematical notation, we can write :

[tex]\[\lim_{x\to\infty} (-x^2 \cdot 4 - 7 + x + 7) = -\infty\][/tex]

This means that as x becomes arbitrarily large, the expression (-x² * 4 - 7 + x + 7) becomes infinitely negative.

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(6) (5 marks) Use the definition of the Taylor series to find the first four nonzero terms of the series for f(x) = x2/3 centered at x = 1. Next use this result to find the first three nonzero terms i

Answers

The Taylor series for f(x) = x^(2/3) centered at x = 1 has the first four nonzero terms: 1 + (2/3)(x - 1) + (2/9)(x - 1)^2 + (4/81)(x - 1)^3.

To find the Taylor series for f(x) = x^(2/3) centered at x = 1, we need to calculate its derivatives at x = 1. Taking the first four nonzero derivatives, we have f'(x) = (2/3)x^(-1/3), f''(x) = (-2/9)x^(-4/3), and f'''(x) = (8/81)x^(-7/3).

Evaluating these derivatives at x = 1, we obtain f'(1) = 2/3, f''(1) = -2/9, and f'''(1) = 8/81. Using these values and the general formula for the Taylor series, we can write the first four nonzero terms as 1 + (2/3)(x - 1) + (2/9)(x - 1)^2 + (4/81)(x - 1)^3. To find the first three nonzero terms, we simply omit the last term from the series.

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A cantaloupe costs $0.45 per pound. If Jacinta pays $1.80, how many pounds did the cantaloupe weigh? *

Answers

The total weight the cantaloupe weigh is 4 pounds

How to calculate how many pounds the cantaloupe weigh?

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

A cantaloupe costs $0.45 per pound. Jacinta pays $1.80

using the above as a guide, we have the following:

Weight of cantaloupe = Amount paid/Cost of a cantaloupe

substitute the known values in the above equation, so, we have the following representation

Weight of cantaloupe = 1.8/0.45

Evaluate

Weight of cantaloupe = 4

Hence, the pounds the cantaloupe weigh is 4 pounds

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Which of the following is a process by which the level of attainment by an exemplary program is used as a point of comparison to the current level of achievement? a) Benchmarking b) Standardizing c) Prototyping d) Modeling

Answers

The correct option is (a) The process by which the level of attainment by an exemplary program is used as a point of comparison to the current level of achievement is called benchmarking.

Benchmarking involves identifying the best practices and achievements of other organizations or programs and comparing them to your own performance. This process helps organizations to improve their performance by learning from others who have achieved exemplary results. By comparing your organization's performance to that of others, you can identify areas where you need to improve and develop strategies to achieve better results.

Benchmarking is a powerful tool for organizations seeking to improve their performance. It involves a systematic process of identifying, analyzing, and comparing the practices, processes, and performance of other organizations or programs that have achieved exceptional results in a particular area. Benchmarking can be applied to any aspect of an organization's performance, including product quality, customer service, operational efficiency, and financial performance. Benchmarking typically involves four key steps: planning, analysis, integration, and action. In the planning phase, organizations identify the areas where they want to improve and select the benchmarks they will use for comparison. The analysis phase involves collecting and analyzing data on the performance of the benchmark organizations and comparing it to the organization's own performance. In the integration phase, organizations integrate the best practices they have learned from the benchmarking process into their own processes and systems.

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) Write the parametric equations x = 3t -1 , y= 4– 2t as a function of x in the given Cartesian form. y=

Answers

To write the given parametric equations as a function of x, we need to eliminate the parameter t.
From the first equation, we have:
[tex]x = 3t - 1[/tex]
Solving for t, we get:
[tex]t = (x + 1) / 3[/tex]
Substituting this value of t into the second equation, we get:
[tex]y = 4 - 2ty = 4 - 2[(x + 1) / 3]y = (2/3)x + (10/3)[/tex]
Therefore, the function of y in terms of x is:
[tex]y = (2/3)x + (10/3)[/tex]

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If y = Acoskt + Bsinkt, where A, B, and k are constants, determine the value of y' + ky. + > 7

Answers

The value of the expression y' + ky is 0.

Given the function y = Acos(kt) + Bsin(kt), where A, B, and k are constants, we need to find the value of y' + ky.

First, let's find the derivative of y with respect to t.

Taking the derivative of each term separately, we have:

y' = -Aksin(kt) + Bkcos(kt)

Next, we substitute y' into the expression y' + ky:

y' + ky = (-Aksin(kt) + Bkcos(kt)) + k(Acos(kt) + Bsin(kt))

Expanding the terms and rearranging, we have:

y' + ky = -Aksin(kt) + Bkcos(kt) + Akcos(kt) + Bksin(kt)

Combining like terms, we get:

y' + ky = (Bk - Ak)cos(kt) + (Bk + Ak)sin(kt)

To determine the value of y' + ky, we need to consider the coefficient of each trigonometric function.

Since the coefficients Bk - Ak and Bk + Ak are constants, their values will depend on the specific values of A, B, and k.

However, the trigonometric functions cos(kt) and sin(kt) are periodic functions that repeat their values, so their sum will be periodic as well.

Therefore, the value of y' + ky is 0, regardless of the specific values of A, B, and k.

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Designing a Silo
As an employee of the architectural firm of Brown and Farmer, you have been asked to design a silo to stand adjacent to an existing barn on the campus of the local community college. You are charged with finding the dimensions of the least expensive silo that meets the following specifications.

The silo will be made in the form of a right circular cylinder surmounted by a hemi-spherical dome.
It will stand on a circular concrete base that has a radius 1 foot larger than that of the cylinder.
The dome is to be made of galvanized sheet metal, the cylinder of pest-resistant lumber.
The cylindrical portion of the silo must hold 1000π cubic feet of grain.
Estimates for material and construction costs are as indicated in the diagram below.



The ultimate proportions of the silo will be determined by your computations. In order to provide the needed capacity, a relatively short silo would need to be fairly wide. A taller silo, on the other hand, could be rather narrow and still hold the necessary amount of grain. Thus there is an inverse relationship between r, the radius, and h, the height of the cylinder.

Part A
Suppose the cylinder has a radius of r. What would be the surface area of the hemi-spherical dome? The construction cost for the metal dome is estimated at $30 per square foot. Write an expression for the estimated cost of the dome.

Surface area of dome = ____________________

Cost of dome = ____________________

Answers

The surface area of the dome is 2πr² and the cost of the dome is $60πr².

How to calculate the area

The surface area of a hemisphere is half of the surface area of a sphere. The surface area of a sphere is 4πr², so the surface area of a hemisphere is:

= 4πr² / 2

= 2πr²

The cost of the dome is the surface area of the dome multiplied by the cost per square foot. The cost of the dome is:

= 2πr² * $30

= $60πr²

Therefore, the surface area of the dome is 2πr² and the cost of the dome is $60πr²

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Question 1. (6 marks) Scientific studies suggest that some animals regulate their intake of different types of food available in the environment to achieve a balance between the pro- portion, and ulti

Answers

Scientific studies indicate that animals have the ability to regulate their intake of different types of food in order to maintain a balance between nutritional requirements and overall fitness.

This regulatory behavior is known as "dietary balance" and is crucial for the animal's survival and reproductive success. Animals have evolved mechanisms, such as taste preferences, nutrient sensing, and hormonal signaling, to detect and respond to variations in nutrient availability. By adjusting their food intake and selecting a diverse diet, animals can meet their nutritional needs, obtain essential nutrients, and avoid excessive intake of harmful substances.

Animals have complex physiological and behavioral adaptations that enable them to achieve dietary balance. They possess taste preferences for different flavors and can differentiate between foods based on their nutritional content. For example, animals may have a preference for foods rich in essential nutrients or select foods that help maintain a certain nutrient ratio in their diet.

Nutrient sensing mechanisms also play a crucial role in dietary balance. Animals can detect the presence of specific nutrients through sensory receptors in the gut and other tissues. This information is then communicated to the brain, which regulates food intake accordingly. Hormonal signaling, such as the release of leptin, ghrelin, and insulin, further modulates the animal's appetite and energy balance, ensuring that nutrient requirements are met.

In conclusion, scientific studies support the idea that animals regulate their food intake to achieve dietary balance. Through taste preferences, nutrient sensing, and hormonal signaling, animals can adjust their diet to meet their nutritional needs and avoid potential harm. This ability to balance food intake is crucial for their overall fitness and reproductive success.

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Tomas factored the polynomial completely. What is true about his final product?

3x4−18x3+9x2−54x

Ax(x2+B)(x+C)

A and B are both 6.
A and B are both 3.
B and C are both positive.
B and C are both negative.

Answers

The factored form of the Polynomial is: 3x(x - 6)(x^2 + 3)

The given polynomial is 3x^4 - 18x^3 + 9x^2 - 54x.

To factorize it completely, we can first take out the common factor of 3x:

3x(x^3 - 6x^2 + 3x - 18)

Now, let's focus on the expression within the parentheses, which is a cubic polynomial. To factorize it further, we can look for common factors among its terms.

The common factor here is 3, so we can rewrite the expression as:

3x[(x^3 - 6x^2) + (3x - 18)]

Now, let's factor out x^2 from the first two terms and 3 from the last two terms:

3x[x^2(x - 6) + 3(x - 6)]

Notice that we have a common factor of (x - 6) in both terms, so we can factor it out:

3x(x - 6)(x^2 + 3)

Therefore, the factored form of the polynomial is:

3x(x - 6)(x^2 + 3)

In this factored form, we can observe the following:

- A = 3, which corresponds to the coefficient of x in the linear factor (x - 6).

- B = 0, which corresponds to the coefficient of x^2 in the quadratic factor (x^2 + 3).

- C = 6, which corresponds to the constant term in the linear factor (x - 6).

To answer the given options:

- A and B are not both 6.

- A and B are not both 3.

- B and C are not both positive.

- B and C are not both negative.

Therefore, none of the options accurately describe the factored form of the polynomial. The correct factored form is 3x(x - 6)(x^2 + 3).

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Answer:

B: A and B are both 3

Step-by-step explanation:

Edge 23

Find the gradient of the following function 22 - 3y2 + 2 f(2, y, z) 2x + y - 43

Answers

The partial derivatives of f(x, y, z) are as follows:

∂f/∂x = 2x

∂f/∂y = -6y

∂f/∂z = 2

Arranging these partial derivatives as a vector gives us the gradient of the function:

∇f = [∂f/∂x, ∂f/∂y, ∂f/∂z] = [2x, -6y, 2]

So, the gradient of the function f(2, y, z) is:

∇f(2, y, z) = [2(2), -6y, 2] = [4, -6y, 2]

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please answer asap
4. (10 points) Evaluate the integral 1. (+ V1 – a2)ds. - (Hint:it can be interpreted in terms of areas. )

Answers

The integral represents the area between the curve C and the x-axis, but to evaluate it precisely, we need additional information about the curve and its parameterization.

To evaluate the integral ∫(+ V1 – a^2) ds, where V1 and a are constants, we need to determine the appropriate limits of integration and express ds in terms of a differential variable.

The expression (+ V1 – a^2) represents a function that varies along the path of integration, which we can denote as C. Let's assume C is a curve in a two-dimensional space.

To interpret this integral in terms of areas, we can consider the integrand as the height of a rectangle at each point on the curve C. The width of the rectangle is ds, which represents an infinitesimally small segment of the curve.

The integral sums up the areas of all these small rectangles along the curve C, resulting in the total area between the curve C and the x-axis.

To evaluate the integral, we need to parameterize the curve C and express ds in terms of a differential variable, such as dt or dθ, depending on the coordinate system used.

Once we have the parameterization and the differential expression, we can substitute them into the integral and determine the appropriate limits of integration.

Without specific information about the curve C or its parameterization, it is not possible to provide a specific solution or simplify the integral further.

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(a) Show that 2 sin cos ko sink + 0 - sink (x-1) 0. Consider the sequence {an} = {cos no} and the partial sums sn = n - Rear k=1 (b) Hence, find all solutions of the equation 8(b) s(a 1) = you+borrow+$15763+to+buy+a+car.+you+will+have+to+repay+this+loan+by+making+equal+monthly+payments+for+9+years.+the+bank+quoted+an+apr+of+9%.+how+much+is+your+monthly+payment+(in+$+dollars)?+$________. Find where y is defined as a function of x implicitly by the equation below. 1 da -6x - y = 11 3. Explain why the nth derivative, y(n) for y=e* is y(n) = e*. Funds that are for identified risks that have a low probability of occurring and that decrease as the project progresses are called ______ reserves.A) ManagementB) BudgetC) ContingencyD) PaddedE) Just in case Encino Ltd. received an invoice dated February 16 for $520.00less 25%, 8.75%, terms 3/15, n/30 E.O.M. A cheque for $159.20 wasmailed by Encino on March 15 as part payment of the invoice. Whatis the T/F when you are trying to sell a new product or service, you usually only have to convince one key person to make the sale. a random sample of size 24 from a normal distribution has standard deviation s=62 . test h0:o=36 versus h1:o/=36 . use the a=0.10 level of significance. Factor completely. Remember you will first need to expand the brackets, gather like termsand then factor.a) (x + 4)^2 - 25b)(a-5)^2-36 Evaluate the indefinite integral. (Remember to use absolute values where appropriate. Use C for the constant of integration.) 9 sec(0) de tan(0) Compound interest I = Prt A = P(1 + r) What is the total balance of a savings account after 10 years opened with $1,200 earning 5% compounded interest annually?A. $600 B. $679.98C. $75 SG&A in a medium to large sized company would typically include the costs of all of the following departments except:a. Accounting Departmentb. Legal Departmentc. Overheadd. Marketing Department which bond guarantees the contractor will proceed with the contract if stock a has a market price of $124 and stock b has a market price of $80, what investment makes sense? Suppose z=x^2siny, x=2s^25t^2, y=10st.A. Use the chain rule to find z/s and z/t as functions of x, y, s and t.z/s=_________________________z/t= _________________________B. Find the numerical values of z/s and z/t when (s,t)=(2,1).z/s(2,1)= ______________________z/t(2,1)= ______________________ a transition metal complex has a a maximum absorbance of 593.7 nm. what is the crystal field splitting energy, in units of kj/mol, for this complex? For this question choose three answered which question should be asked before writing the name for H2SO4 (aq) HURRY the pen/trace statute regulates the collection of communication content. T/F according to the evolutionary psychology notion of kin selection, bob is most likely to help group of answer choices his half brother randall. his step-sister sally. his brother-in-law herbert. his best friend ralf.