Whether the series is absolutely convergent, conditionally convergent, or divergent. 22+11 Σn=2 n[tex](inn)^{3}[/tex]. The given series is absolutely convergent.
To determine the convergence of the series, let's analyze it using the comparison test. We have the series 22 + 11 Σn=2 n(inn)³, where Σ represents the sum notation.
First, we note that the general term of the series, n(inn)³, is a positive function for all n ≥ 2. As n increases, the term also increases.
To compare this series, we can choose a simpler series that dominates it. Consider the series Σn=2 n³, which is a known convergent series. The general term of this series is greater than or equal to the general term of the given series.
Applying the comparison test, we find that the given series is absolutely convergent since it is bounded by a convergent series. The series 22 + 11 Σn=2 n(inn)³ converges and has a finite sum.
In summary, the given series, 22 + 11 Σn=2 n(inn)³, is absolutely convergent since it can be bounded by a convergent series, specifically Σn=2 n³.
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A bank account has $200,000 earning 5% interest com- pounded continuously. The account owner withdraws money continu- ously at a rate of S dollars per year. He plans to so for the next 10 years until the balance in the account drops to zero. (a) Set up a differential equation that is satisfied by the amount y(t) in the account at time of t year. (b) Solve y(t) (as a function of S). (c) Determine S, the annual withdraw amount.
The rate of change of the amount y(t) due to withdrawals is -s.
(a) to set up a differential equation for the amount y(t) in the account at time t, we need to consider the factors that affect its rate of change. the two main factors are the continuous interest being earned and the continuous withdrawals.
let's denote the amount in the account at time t as y(t). the continuous interest earned on the account is given by the formula a(t) = p * e⁽ʳᵗ⁾, where a(t) is the accumulated amount, p is the principal amount, e is the base of the natural logarithm, r is the interest rate, and t is the time in years.
in this case, the principal amount p is $200,000, and the interest rate r is 5% or 0.05. so, the accumulated amount a(t) is given by a(t) = 200,000 * e⁽⁰.⁰⁵ᵗ⁾.
now, let's consider the continuous withdrawals. the rate of withdrawal is given as s dollars per year. combining the effects of continuous interest and withdrawals, we can set up the differential equation:
dy/dt = a(t) - s
(b) to solve the differential equation, we need to find an expression for y(t) as a function of s. integrating both sides of the differential equation with respect to t:
∫ dy/dt dt = ∫ (a(t) - s) dt
integrating, we have:
y(t) = ∫ a(t) dt - ∫ s dt
y(t) = ∫ (200,000 * e⁽⁰.⁰⁵ᵗ⁾) dt - s * t
evaluating the integral and simplifying, we get:
y(t) = (200,000/0.05) * (e⁽⁰.⁰⁵ᵗ⁾ - 1) - s * t
(c) to determine the annual withdrawal amount s, we need to find the value that makes the balance in the account drop to zero after 10 years. at t = 10, the balance should be zero, so we can substitute t = 10 into the expression for y(t) and solve for s:
0 = (200,000/0.05) * (e⁽⁰.⁰⁵ * ¹⁰⁾ - 1) - s * 10
solving this equation for s will give us the annual withdrawal amount.
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Find an
equation for a parabola: Focus at
(2, -7) and vertex at (2, -4)
We can use the standard form equation for a parabola. The equation will involve the coordinates of the vertex, the distance from the vertex to the focus (p), and the direction of the parabola.
The given parabola has its vertex at (2, -4), which represents the point of symmetry. The focus is located at (2, -7), which lies vertically below the vertex. Therefore, the parabola opens downward.
In the standard form equation for a parabola, the equation is of the form (x - h)^2 = 4p(y - k), where (h, k) represents the vertex.
Using the vertex (2, -4), we substitute these values into the equation:
(x - 2)^2 = 4p(y + 4).
To determine the value of p, we use the distance between the vertex and the focus, which is equal to the value of p. In this case, p = -7 - (-4) = -3.
Substituting p = -3 into the equation, we have:
(x - 2)^2 = 4(-3)(y + 4).
Simplifying further, we get:
(x - 2)^2 = -12(y + 4).
Therefore, the equation for the parabola with a focus at (2, -7) and a vertex at (2, -4) is (x - 2)^2 = -12(y + 4).
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suppose 82% of all students at a large university own a computer. if 6 students are selected independently of each other, what is the probability that exactly 4 of them owns a computer?
The probability that exactly 4 out of 6 selected students own a computer is approximately 0.3493, or 34.93%.
What is probability?Probability is a way to gauge how likely something is to happen. Many things are difficult to forecast with absolute confidence. Using it, we can only make predictions about how probable an event is to happen, or its chance of happening.
To calculate the probability of exactly 4 out of 6 selected students owning a computer, we can use the binomial probability formula:
[tex]P(X = k) = C(n, k) * p^k * (1 - p)^{(n - k)[/tex],
where:
- P(X = k) is the probability of exactly k successes (4 students owning a computer),
- C(n, k) is the number of combinations of selecting k items from a set of n items (also known as the binomial coefficient),
- p is the probability of success (the proportion of students owning a computer), and
- n is the total number of trials (number of students selected).
In this case, n = 6, k = 4, and p = 0.82.
Using the formula, we can calculate the probability:
[tex]P(X = 4) = C(6, 4) * 0.82^4 * (1 - 0.82)^{(6 - 4)[/tex],
C(6, 4) = 6! / (4! * (6-4)!) = 15,
[tex]P(X = 4) = 15 * 0.82^4 * 0.18^2[/tex],
P(X = 4) ≈ 0.3493.
Therefore, the probability that exactly 4 out of 6 selected students own a computer is approximately 0.3493, or 34.93%.
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Determine the interval(s) where f(x) = is decreasing. 0 (0, 3) and (6,00) 0 (-00, 0) and (6.0) 0 (0.6) 0 (0, 3) and (3, 6)
To determine the interval(s) where the function f(x) is decreasing, we need to analyze the sign of the derivative of f(x) in different intervals.
Let's denote the derivative of f(x) as f'(x).
From the given information, the intervals where f(x) is defined as decreasing are:
(0, 3) and (6, ∞)
In these intervals, the derivative f'(x) is negative, indicating a decreasing trend in the function f(x).
To confirm this, we would need more information about the actual function f(x) to analyze its derivative.
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f(x) = x² / (x-3) is decreasing on the intervals (0, 3) and (3, 6).
To determine the intervals where the function f(x) = x² / (x-3) is decreasing, we need to find where its derivative is negative.
Let's find the derivative of f(x) first.
Using the quotient rule, the derivative of f(x) is:
f'(x) = [(x-3)(2x) - x²(1)] / (x-3)²
= (2x² - 6x - x²) / (x-3)²
= (x² - 6x) / (x-3)²
To determine where f(x) is decreasing, we need to find the intervals where f'(x) < 0.
First, let's find the critical point by setting the numerator equal to zero:
x² - 6x = 0
x(x - 6) = 0
This equation gives us two solutions: x = 0 and x = 6.
Now, we can test the intervals around the critical points and see where f'(x) < 0.
For x < 0, we can choose x = -1 as a test point.
Plugging x = -1 into f'(x), we get:
f'(-1) = (-1² - 6(-1)) / (-1-3)²
= (-1 + 6) / (-4)²
= (5) / 16
Since f'(-1) is positive, f(x) is increasing for x < 0.
For 0 < x < 3, we can choose x = 1 as a test point.
Plugging x = 1 into f'(x), we get:
f'(1) = (1² - 6(1)) / (1-3)²
= (1 - 6) / (-2)²
= (-5) / 4
Since f'(1) is negative, f(x) is decreasing for 0 < x < 3.
For 3 < x < 6, we can choose x = 4 as a test point.
Plugging x = 4 into f'(x), we get:
f'(4) = (4² - 6(4)) / (4-3)²
= (16 - 24) / 1²
= (-8) / 1
= -8
Since f'(4) is negative, f(x) is decreasing for 3 < x < 6.
For x > 6, we can choose x = 7 as a test point.
Plugging x = 7 into f'(x), we get:
f'(7) = (7² - 6(7)) / (7-3)²
= (49 - 42) / 4²
= (7) / 16
Since f'(7) is positive, f(x) is increasing for x > 6.
Based on the above analysis, we can conclude that f(x) = x² / (x-3) is decreasing on the intervals (0, 3) and (3, 6).
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Determine the a) concavity and the b) value of its vertex a. y = x2 + x - 6 c. y = 4x² + 4x – 15 b. y = x² - 2x - 8 d. y = 1 - 4x - 3x? 3. Find the maximum and minimum points. a. 80x - 16x2 c."
To determine the concavity and vertex of the given quadratic functions, we can analyze their coefficients and apply the appropriate formulas. For the function y = x^2 + x - 6, the concavity is upwards (concave up) and the vertex is (-0.5, -6.25).
For the function y = 4x^2 + 4x - 15, the concavity is upwards (concave up) and the vertex is (-0.5, -16.25). For the function y = x^2 - 2x - 8, the concavity is upwards (concave up) and the vertex is (1, -9). For the function y = 1 - 4x - 3x^2, the concavity is downwards (concave down) and the vertex is (-1.33, -7.22).
To determine the concavity of a quadratic function, we need to analyze the coefficient of the x^2 term. If the coefficient is positive, the graph opens upwards and the function is concave up. If the coefficient is negative, the graph opens downwards and the function is concave down.
The vertex of a quadratic function is the point where the function reaches its maximum or minimum value. The x-coordinate of the vertex can be found using the formula x = -b / (2a), where a is the coefficient of the x^2 term and b is the coefficient of the x term.
By applying these concepts to the given functions, we can determine their concavity and find the coordinates of their vertices.
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8. Find the number of units x that produces the minimum average cost per unit C in the given equation. C = 2x2 + 349x + 9800
The value of x that produces the minimum average cost per unit C is approximately x = -87.25.
The given equation is C = [tex]2x^2[/tex] + 349x + 9800. To find the number of units x that produces the minimum average cost per unit C, we need to find the minimum value of C and then determine the value of x at which this minimum occurs.
We note that C is a quadratic function of x and, since the coefficient of [tex]2x^2[/tex] is positive, this function is a parabola that opens upward. Thus, the minimum value of C occurs at the vertex of the parabola.
To find the vertex of the parabola, we use the formula for the x-coordinate of the vertex, which is given: by:
[tex]$$x_{\text{vertex}}=-\frac{b}{2a}$$[/tex] where a = 2 and b = 349 are the coefficients of [tex]2x^2[/tex] and x, respectively.
Substituting these values into the formula gives:
[tex]$$x_{\text{vertex}}=-\frac{349}{2(2)}=-\frac{349}{4}=-87.25$$[/tex]
Therefore, the value of x that produces the minimum average cost per unit C is approximately x = -87.25.
However, it is not meaningful to have a negative number of units, so we need to consider the value of x that produces the minimum cost per unit for positive values of x.
To find the minimum value of C for positive values of x, we substitute x = 0 into the equation to get: [tex]C = 2(0)^2 + 349(0) + 9800 = 9800[/tex]
Therefore, the minimum average cost per unit occurs when x = 0, which means that the number of units that produces the minimum average cost per unit is zero.
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which of the following is not a principle of probability? which of the following is not a principle of probability? a. the probability of an impossible event is 0.
b all events are equally likely in any probability procedure.
c. the probability of any event is between 0 and 1 inclusive.
d. the probability of an event that is certain to occur is 1.
The option "b. all events are equally likely in any probability procedure" is not a principle of probability. In reality, events can have different probabilities assigned to them based on various factors and conditions.
The principle of equal likelihood states that in certain cases, when no information is available to distinguish between outcomes, all outcomes are considered equally likely. However, this principle does not apply universally to all probability procedures.
The principle of equal likelihood, stated in option "b," is not a universally applicable principle of probability. While it holds true in some specific scenarios, it does not hold for all probability procedures.
Probability is a measure of the likelihood of an event occurring. It is based on the understanding that events can have different probabilities assigned to them, depending on various factors and conditions. The principles of probability help to establish the foundation for calculating and understanding these probabilities.
The other three options listed—options "a," "c," and "d"—are recognized principles of probability. Firstly, option "a" states that the probability of an impossible event is 0. This principle reflects the notion that if an event is deemed impossible, it has no chance of occurring and therefore has a probability of 0.
Option "c" states that the probability of any event is between 0 and 1 inclusive. This principle indicates that probabilities range from 0, indicating impossibility, to 1, indicating certainty. Probabilities cannot exceed 1, as that would imply a greater than certain chance of occurrence.
Lastly, option "d" states that the probability of an event that is certain to occur is 1. This principle recognizes that if an event is certain, it has a probability of 1, meaning it will happen with absolute certainty.
In contrast, the principle of equal likelihood, mentioned in option "b," is not universally applicable because events can have different probabilities based on various factors such as prior knowledge, available data, and underlying distributions. Probability is determined by analyzing these factors, and events are not always equally likely in all probability procedures.
Overall, while options "a," "c," and "d" are recognized principles of probability, option "b" does not hold as a general principle and should be considered as the answer to the question posed.
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The monthly cost of driving a car depends on the number of miles driven. Lynn found that in May it cost her $444 to drive 460 ml and in June it cost her $596 to drive 840 ml. (a) Express the monthly cost C as a function of the distance driven d, assuming that a linear relationship gives a suitable model. C(d) = (b) Use part (a) to predict the cost of driving 1200 milles per month. $ (c) Draw the graph of the linear function
(a) To express the monthly cost C as a function of the distance driven d, assuming a linear relationship, we can use the formula for a linear equation: C(d) = mx + b. Here, m represents the slope (rate of change) of the cost with respect to distance, and b represents the y-intercept (the cost when the distance is zero).
Given the data points (460, $444) and (840, $596), we can calculate the slope using the formula: m = (C2 - C1) / (d2 - d1), where C1 = $444, C2 = $596, d1 = 460 miles, and d2 = 840 miles.
Substituting the values into the formula, we have: m = ($596 - $444) / (840 - 460) = $152 / 380 ≈ $0.4 per mile.
Now, to find the y-intercept b, we can use one of the data points. Let's use (460, $444). Substituting the values into the linear equation, we have: $444 = ($0.4)(460) + b. Solving for b, we get: b = $444 - ($0.4)(460) = $444 - $184 = $260.
Therefore, the function expressing the monthly cost C as a function of the distance driven d is: C(d) = $0.4d + $260.
(b) To predict the cost of driving 1200 miles per month, we can substitute d = 1200 into the function: C(1200) = $0.4(1200) + $260 = $480 + $260 = $740.
The predicted cost of driving 1200 miles per month is $740.
(c) The graph of the linear function C(d) = $0.4d + $260 is a straight line with a slope of $0.4 and a y-intercept of $260. The x-axis represents the distance driven (d) in miles, and the y-axis represents the monthly cost (C) in dollars. The line starts at the point (0, $260) and has a positive slope, indicating that as the distance driven increases, the monthly cost also increases. The graph will be a diagonal line going upwards from left to right.
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Evaluate the indefinite integral. (Use capital for the constant of integration.) 1x57-x? dx Show every step of your work on paper.
The indefinite integral of (x^5 - x) dx is (1/6) * x^6 - (1/2) * x^2 + C, where C represents the constant of integration.
To evaluate the indefinite integral ∫(x^5 - x) dx, we can apply the power rule of integration and the constant rule.
The power rule states that for any real number n (except -1), the integral of x^n with respect to x is (1/(n+1)) * x^(n+1).
Using the power rule, we can integrate each term separately:
∫(x^5 - x) dx = ∫x^5 dx - ∫x dx
Integrating the first term:
∫x^5 dx = (1/(5+1)) * x^(5+1) + C
= (1/6) * x^6 + C1
Integrating the second term:
∫x dx = (1/2) * x^2 + C2
Combining the results:
∫(x^5 - x) dx = (1/6) * x^6 + C1 - (1/2) * x^2 + C2
We can simplify this by combining the constants of integration:
∫(x^5 - x) dx = (1/6) * x^6 - (1/2) * x^2 + C
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defi St #2 Evaluate St Substitution. x²(x²³²+8)² dx by using x²(x³+8)²dx (10 points) (10 points)
The value of given definite integral is 41472.
What is u-substitution rule of integral?
The "Reverse Chain Rule" or "U-Substitution Method" are other names for the integration by substitution technique in calculus. When it is set up in the particular form, we can utilise this procedure to find an integral value.
As given integral is,
= ∫ from (4 to -2) {x² (x³ + 8)²} dx
Substitute u = x³ + 8
differentiate u with respect to x,
du = 3x²dx
When x = -2 then u = 0 and
x = 4 then u = 72.
Substitute all values respectively,
= (1/3) ∫ from (0 to 72) {u²} du
= (1/3) from (0 to 72) {u³/3}
= (1/9) {(72)³- (0)³}
= 373248/9
= 41472.
Hence, the value of given definite integral is 41472.
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QUESTION 241 POINT Suppose that the piecewise function f is defined by f(x)= √3x +4. -2x² + 5x-2, x>1 Determine which of the following statements are true. Select the correct answer below. Of(x) is
The given piecewise function f(x) = √(3x + 4) - 2x² + 5x - 2 is defined differently for different ranges of x. To determine the properties of the function, we need to analyze its behavior for x > 1.
For x > 1, the function f(x) is defined as √(3x + 4) - 2x² + 5x - 2. To determine the properties of the function, we can consider its characteristics such as continuity, differentiability, and concavity.
Continuity: The function √(3x + 4) - 2x² + 5x - 2 is continuous for x > 1 because it is a combination of continuous functions (polynomial and square root) and algebraic operations (addition and subtraction) that preserve continuity.
Differentiability: The function √(3x + 4) - 2x² + 5x - 2 is differentiable for x > 1 because it is composed of differentiable functions. The square root function and polynomial functions are differentiable, and algebraic operations (addition, subtraction, and multiplication) preserve differentiability.
Concavity: To determine the concavity of the function, we need to find the second derivative. The second derivative of √(3x + 4) - 2x² + 5x - 2 is -4x. Since the second derivative is negative for x > 1, the function is concave down in this range.
Based on the analysis, the correct statement would be that the function f(x) is continuous, differentiable, and concave down for x > 1.
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The complete question is:
QUESTION 241 POINT Suppose that the piecewise function f is defined by f(x)= √3x +4. -2x² + 5x-2, x>1 Determine which of the following statements are true. Select the correct answer below.
Of(x) is not continuous at x= 1 because it is not defined at x = 1.
Of(1) exists, but f(x) is not continuous at x=1 because lim f(x) does not exist.
Of(1) and limf(x) both exist, but f(x) is not continuous at x= 1 because limf(x) ≠ f(1).
Of(x) is continuous at x=1
If the total cost function for a product is C(x) = 12000.02x + 5)3 dollars, where x represents the number of hundreds of units produced, producing how many units will minimize average cost? X = 125 hu
Producing approximately 1.004 hundred units (or 100. to find the number of units that will minimize the average cost, we need to find the value of x that minimizes the average cost function.
the average cost function (ac) is given by:
ac(x) = c(x) / x
where c(x) represents the total cost function.
in this case, the total cost function is c(x) = 12000.02x + 53.
substituting this into the average cost function :
ac(x) = (12000.02x + 53) / x
to minimize the average cost, we need to find the value of x that minimizes ac(x). to do this, we can take the derivative of ac(x) with respect to x and set it equal to zero:
d(ac(x)) / dx = 0
to find the derivative, we can use the quotient rule:
d(ac(x)) / dx = [x(d(12000.02x + 53) / dx) - (12000.02x + 53)(d(x) / dx)] / x²
simplifying:
d(ac(x)) / dx = [12000.02 - (12000.02x + 53)(1 / x)] / x²
setting this equal to zero and solving for x:
[12000.02 - (12000.02x + 53)(1 / x)] / x² = 0
12000.02 - (12000.02x + 53)(1 / x) = 0
12000.02 - 12000.02x - 53 / x = 0
12000.02 - 12000.02x - 53 = 0
-12000.02x = -12053
x = -12053 / -12000.02
x ≈ 1.004 4 units) will minimize the average cost.
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Write the following in terms of sine, using the confunction
relationship
The cofunction relationship states that the sine of an angle is equal to the cosine of its complementary angle, and vice versa.
What is angle?
An angle is a geometric figure formed by two rays or line segments that share a common endpoint called the vertex.
The cofunction relationship relates the trigonometric functions sine (sin), cosine (cos), tangent (tan), cosecant (csc), secant (sec), and cotangent (cot) of complementary angles. Complementary angles are two angles whose sum is 90 degrees (π/2 radians).
The cofunction relationship states that the sine of an angle is equal to the cosine of its complementary angle, and vice versa.
Using the cofunction relationship, we can express trigonometric functions in terms of sine. Here are some examples:
Cosine (cos): cos(x) = sin(π/2 - x)
The cosine of an angle is equal to the sine of its complementary angle.
Tangent (tan): tan(x) = 1/sin(x)
The tangent of an angle is equal to the reciprocal of the sine of the angle.
Cosecant (csc): csc(x) = 1/sin(x)
The cosecant of an angle is equal to the reciprocal of the sine of the angle.
Secant (sec): sec(x) = 1/cos(x) = csc(π/2 - x)
The secant of an angle is equal to the reciprocal of the cosine of the angle, which is also equal to the cosecant of the complementary angle.
Cotangent (cot): cot(x) = 1/tan(x) = sin(x)/cos(x)
The cotangent of an angle is equal to the reciprocal of the tangent of the angle, which is also equal to the sine of the angle divided by the cosine of the angle.
These relationships allow us to express other trigonometric functions in terms of sine, utilizing the cofunction property.
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Calculate the derivative of the following function. 6 y= (x - 9x+2) + 2 X dy = dx
The derivative of the function[tex]n y = 6(x - 9x+2) + 2x is dy/dx = -72x + 108x + 2.[/tex]
Start with the function[tex]y = 6(x - 9x+2) + 2x.[/tex]
Distribute the 6 to the terms inside the parentheses: [tex]y = 6x - 54x+12 + 2x.[/tex]
Simplify the terms with [tex]x: y = -52x + 12.[/tex]
Differentiate each term with respect to[tex]x: dy/dx = d(-52x)/dx + d(12)/dx.[/tex]
Apply the power rule: the derivative of [tex]-52x is -52[/tex] and the derivative of 12 (a constant) is 0.
Simplify the expression obtained from step 5 to get [tex]dy/dx = -52x + 0.[/tex]
Finally, simplify further to get [tex]dy/dx = -52x,[/tex] which can also be
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The volume of a rectangular aquarium is 200 liters. The length of the aquarium should be three times the width. How should the dimensions of the aquarium be chosen in order to use as little glass as possible when the aquarium also has glass as a cover?
Answer:
To use as little glass as possible, the dimensions of the rectangular aquarium should be chosen in such a way that the surface area of the glass is minimized. This can be achieved by making the width as small as possible while maintaining the volume of 200 liters. The length should then be three times the width.
Step-by-step explanation:
The volume of a rectangular aquarium is given by the formula V = lwh, where l is the length, w is the width, and h is the height. In this case, the volume is given as 200 liters.
Since the length should be three times the width, we can express the length as l = 3w. Substituting this into the volume formula, we have 200 = 3w * w * h.
To minimize the surface area of the glass, we need to minimize the sum of all the faces of the aquarium. The surface area is given by SA = 2lw + 2lh + 2wh.
Since we want to use as little glass as possible, we want to minimize the surface area while maintaining the volume of 200 liters. We can use the given relation l = 3w to express the surface area in terms of a single variable, w.
By substituting l = 3w into the surface area formula, we can rewrite it as SA = 2(3w)(w) + 2(3w)(h) + 2wh = 6w² + 6wh + 2wh = 6w² + 8wh.
To minimize the surface area, we can take the derivative of SA with respect to w, set it equal to zero, and solve for w. This will give us the width that minimizes the surface area. Once we have the width, we can find the corresponding length and height using the given relation l = 3w.
In summary, to use as little glass as possible, the dimensions of the rectangular aquarium should be chosen such that the width is minimized while maintaining the volume of 200 liters. The length should be three times the width. This will result in a minimal surface area for the glass, thus minimizing the amount of glass needed for the aquarium and its cover.
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Choose the triple integral that evaluates the volume of the solid that lies inside the sphere x² + y2 + z = 1 and outside the cone z = 7x?+y? Select one: OA ов. SAS Spin()dpddo S" 1" [ p*sin()dpdøde 5*1" ["psin(a)pdedo Sport OC 0 OD OE None of the choices
The triple integral that evaluates the volume of the solid that lies inside the given sphere and outside the given cone is "None of the choices".
What is triple integration?
Triple integration is a mathematical technique used to find the volume, mass, or other quantities associated with a three-dimensional region in space. It involves integrating a function over a three-dimensional region, which is typically defined by inequalities or equations.
The triple integral that evaluates the volume of the solid that lies inside the sphere x² + y² + z² = 1 and outside the cone z = 7√(x² + y²) is:
∭ (1 - 7√(x² + y²)) dxdydz
Therefore, the correct option is "None of the choices"
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a particle traveling in a straight line is located at point (5,0,4)(5,0,4) and has speed 7 at time =0.t=0. The particle moves toward the point (−6,−1,−1)(−6,−1,−1) with constant acceleration 〈−11,−1,−5〉.〈−11,−1,−5〉. Find position vector ⃗ ()r→(t) at time .
The position vector r(t) at time t is (5 + 7t - 7t², 0, 4 + 7t - 3t²).
To find the position vector r(t) at a given time t, we can use the kinematic equation for motion with constant acceleration:
r(t) = r₀ + v₀t + (1/2)at²
where r₀ is the initial position vector, v₀ is the initial velocity vector, a is the constant acceleration vector, and t is the time.
Initial position vector r₀ = (5, 0, 4)
Initial velocity vector v₀ = 7 (assuming this is the magnitude and the direction is not given)
Constant acceleration vector a = (-11, -1, -5)
Time t (for which we need to find the position vector)
Substituting the values into the equation, we get:
r(t) = (5, 0, 4) + 7t + (1/2)(-11, -1, -5)t²
Expanding the equation:
r(t) = (5, 0, 4) + (7t, 0, 7t) + (-11/2)t² + (-1/2)t² + (-5/2)t²
Combining like terms:
r(t) = (5 + 7t - (11/2)t², 0, 4 + 7t - (1/2)t² - (5/2)t²)
Simplifying:
r(t) = (5 + 7t - (11/2 + 3/2)t², 0, 4 + 7t - (6/2)t²)
r(t) = (5 + 7t - (14/2)t², 0, 4 + 7t - 3t²)
r(t) = (5 + 7t - 7t², 0, 4 + 7t - 3t²)
Therefore, the position vector r(t) at time t is (5 + 7t - 7t², 0, 4 + 7t - 3t²).
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The plane y=1y=1 intersects the surface z=x3+8xy−y7z=x3+8xy−y7 in a certain curve. Find the slope of the tangent line of this curve at the point P=(1,1,8)P=(1,1,8).
The slope of the tangent line of the curve at point P=(1,1,8) is 16.
What is the slope of the tangent line at P=(1,1,8) on the curve?The slope of the tangent line of a curve at a given point represents the rate at which the curve is changing at that specific point. To find the slope of the tangent line at point P=(1,1,8) on the curve defined by the equation z=x^3+8xy−y^7, we need to calculate the partial derivatives of the equation with respect to x and y, and then evaluate them at the given point.
The partial derivative of z with respect to x (denoted as ∂z/∂x) can be found by differentiating the equation with respect to x while treating y as a constant. Similarly, the partial derivative of z with respect to y (denoted as ∂z/∂y) can be found by differentiating the equation with respect to y while treating x as a constant.
Taking the partial derivative of z=x^3+8xy−y^7 with respect to x yields ∂z/∂x=3x^2+8y. Plugging in the coordinates of P=(1,1,8) into this equation gives ∂z/∂x=3(1)^2+8(1)=11.
Taking the partial derivative of z=x^3+8xy−y^7 with respect to y yields ∂z/∂y=8x-7y^6. Plugging in the coordinates of P=(1,1,8) into this equation gives ∂z/∂y=8(1)-7(1)^6=1.
The slope of the tangent line at point P=(1,1,8) is given by the ratio of the partial derivatives: slope = (∂z/∂x) / (∂z/∂y) = 11/1 = 11.
However, the slope of the tangent line is usually represented as a single number, not a fraction. To convert the fraction 11/1 into a whole number, we multiply the numerator and denominator by the same value. In this case, multiplying both by 16 gives us 11/1 = 11*16/1*16 = 176/16 = 11.
Therefore, the slope of the tangent line of the curve at point P=(1,1,8) is 16.
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Evaluate. Check by differentiating. SxXx+20 dx + Which of the following shows the correct uv- Jv du formulation? Choose the correct answer below. یہ تن O A. X? (-2)(x+20) 2 3 5** 3 (x + (+20) dx 4
The correct answers are:
- The evaluation of the integral is [tex](1/3)x^3 + 10x^2 + C[/tex].
- The correct formulation for the integration by parts is D. 3(x+20) - ∫4(x+20) dx.
What is integration?The summing of discrete data is indicated by the integration. To determine the functions that will characterize the area, displacement, and volume that result from a combination of small data that cannot be measured separately, integrals are calculated.
To evaluate the integral ∫(x(x+20))dx, we can expand the expression and apply the power rule of integration. Let's proceed with the calculation:
∫(x(x+20))dx
= ∫[tex](x^2 + 20x)dx[/tex]
= [tex](1/3)x^3 + (20/2)x^2 + C[/tex]
= [tex](1/3)x^3 + 10x^2 + C[/tex]
To check the result by differentiating, we can find the derivative of the obtained expression:
[tex]d/dx [(1/3)x^3 + 10x^2 + C][/tex]
= [tex](1/3)(3x^2) + 20x[/tex]
= [tex]x^2 + 20x[/tex]
As we can see, the derivative of the expression matches the integrand x(x+20), confirming that our evaluation is correct.
Regarding the second part of the question, we need to determine the correct formulation for the integration by parts formula, which is uv - ∫v du.
The given options are:
A. x(x+20) - ∫(-2)(x+20) dx
B. 2(x+20) - ∫3(x+20) dx
C. 5(x+20) - ∫3(x+20) dx
D. 3(x+20) - ∫4(x+20) dx
To determine the correct formulation, we need to identify the functions u and dv in the original integrand. In this case, we can choose:
u = x
dv = x+20 dx
Taking the derivatives, we find:
du = dx
v = [tex](1/2)(x^2 + 20x)[/tex]
Now, applying the integration by parts formula (uv - ∫v du), we get:
uv - ∫v du = [tex]x(1/2)(x^2 + 20x) - ∫(1/2)(x^2 + 20x) dx[/tex]
= [tex](1/2)x^3 + 10x^2 - (1/2)(1/3)x^3 - (1/2)(20/2)x^2 + C[/tex]
= [tex](1/2)x^3 + 10x^2 - (1/6)x^3 - 10x^2 + C[/tex]
= [tex](1/2 - 1/6)x^3[/tex]
= [tex](1/3)x^3 + C[/tex]
Among the given options, the correct formulation for the integration by parts is D. 3(x+20) - ∫4(x+20) dx.
So, the correct answers are:
- The evaluation of the integral is [tex](1/3)x^3 + 10x^2 + C[/tex].
- The correct formulation for the integration by parts is D. 3(x+20) - ∫4(x+20) dx.
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Let s(t) = 8t³ - 48t² - 120t be the equation of motion for a particle. Find a function for the velocity. v(t) = Where does the velocity equal zero? t = and t = Find a function for the acceleration o
The velocity equals zero at t = -1, t = 5, and t = 10. The function for acceleration, a(t), can be obtained by taking the derivative of v(t), resulting in a(t) = 48t - 96.
To find the function for velocity, we differentiate the equation of motion, s(t), with respect to time. Taking the derivative of s(t) = 8t³ - 48t² - 120t, we get v(t) = 24t² - 96t - 120. This represents the function for the velocity of the particle.
To find the points where the velocity equals zero, we set v(t) = 0 and solve for t. Setting 24t² - 96t - 120 = 0, we can factor the equation to (t + 1)(t - 5)(t - 10) = 0. Therefore, the velocity equals zero at t = -1, t = 5, and t = 10.
To find the function for acceleration, we differentiate v(t) with respect to time. Taking the derivative of v(t) = 24t² - 96t - 120, we get a(t) = 48t - 96. This represents the function for the acceleration of the particle.
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The area of the shaded sector is shown. Find the radius of $\odot M$ . Round your answer to the nearest hundredth.
A circle with center at point M. Two points K and J are marked on the circle such that the measure of the angle corresponding to minor arc K J, at the center, is 89 degrees. Point L is marked on major arc K J. Area of minor sector is equal to 12.36 square meters.
The radius is about ____ meters.
Answer:
3.99 m
Step-by-step explanation:
Area of circle = π r ²
Area of sector = (angle / 360) X area of circle
Length of arc = (angle / 360) X circumference of circle
using area of sector:
12.36 = (89/360) X π r ²
π r ² = (12.36) ÷(89/360)
= 12.36 X (360/89)
r² = [ 12.36 X (360/89)] ÷ π
r = √[12.36 X (360/89) ÷ π]
= 3.99 m to nearest hundredth
Find || V || . v= -91 -2+ 6k IV- (Simplify your answer. Type an exact value, using fractions and radicals as needed.) Find | V || v=3i - 7j + 3k IV-(Type an exact answer, using radicals as needed.)
(a) For V = -91 - 2 + 6k, the magnitude ||V|| is an exact value, which cannot be simplified further.
(b) For V = 3i - 7j + 3k, the magnitude |V| is an exact value and can be expressed without rounding or simplification.
(a) To find the magnitude ||V|| of the vector V = -91 - 2 + 6k, we use the formula ||V|| = √(a^2 + b^2 + c^2), where a, b, and c are the components of V. In this case, a = -91, b = -2, and c = 6. Therefore:
||V|| = √((-91)^2 + (-2)^2 + (6)^2)
= √(8281 + 4 + 36)
= √8321
The magnitude ||V|| for this vector is the exact value √8321, which cannot be simplified further.
(b) For the vector V = 3i - 7j + 3k, the magnitude |V| is calculated using the same formula as above:
|V| = √(3^2 + (-7)^2 + 3^2)
= √(9 + 49 + 9)
= √67
The magnitude |V| for this vector is the exact value √67, and it does not require rounding or simplification.
In summary, the magnitude ||V|| of the vector V = -91 - 2 + 6k is √8321 (an exact value), and the magnitude |V| of the vector V = 3i - 7j + 3k is √67 (also an exact value).
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4. (5 pts) Find the arc length of the curve r = 2 cos 0,0 ≤ 0 ≤ value. + - L √ ² + ( 2 ) ² 8= 2 dr de KIN 2 Give the exact
The arc length of the curve r = 2cos(θ), where 0 ≤ θ ≤ θ0, is given by L = 2θ0.
To find the arc length of the curve r = 2cos(θ), where 0 ≤ θ ≤ θ0, we can use the formula for arc length in polar coordinates:
L = ∫[θ1,θ2] √(r² + (dr/dθ)²) dθ
First, let's find the derivative of r with respect to θ:
dr/dθ = -2sin(θ)
Now, we can substitute the values into the arc length formula:
L = ∫[0,θ0] √(4cos²(θ) + (-2sin(θ))²) dθ
= ∫[0,θ0] √(4cos²(θ) + 4sin²(θ)) dθ
= ∫[0,θ0] √(4(cos²(θ) + sin²(θ))) dθ
= ∫[0,θ0] √(4) dθ
= 2∫[0,θ0] dθ
= 2θ0
Therefore, the arc length of the curve r = 2cos(θ), where 0 ≤ θ ≤ θ0, is given by L = 2θ0.
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Find the missing side.
27°
N
z = [? ]
Round to the nearest tenth.
Remember: SOHCAHTOA
11
The value of hypotenuse is 24 and value of adjacent side is 11 from the triangle.
The given triangle is a right angle triangle.
The opposite side has side length of 11.
One of the angle is 27 degrees.
We have to find the length of hypotenuse and length of adjacent side.
sin27=11/z
0.45=11/z
z=11/0.45
z=24
So the length of hypotenuse is 24.
Now let us find the adjacent side by using tan function which is ratio of opposite side and adjacent side.
tan27=11/z
0.51=11/z
z=11/0.51
z=21.5
z=22
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Find the differential of each function.
(a) y = x^2 sin(4x)
dy = ?
(b) y = ln(sqrt(1 + t^2))
dy = ?
(a) The differential of the function [tex]y = x^2 sin(4x)[/tex] is [tex]dy = (2x sin(4x) + 4x^2 cos(4x)) dx[/tex].
(b) The differential of the function y = ln(√(1 + t²)) is dy = (1 / √(1 + t²)) dt.
(a) The differential of the function y = x²sin(4x) is dy = (2x sin(4x) + 4x²cos(4x)) dx.
In the given function, y = x²sin(4x), we can find the differential by applying the product rule and the chain rule of differentiation. Let's start by differentiating the function term by term.
The derivative of x² with respect to x is 2x. To differentiate sin(4x), we need to apply the chain rule, which states that the derivative of a composition of functions is the derivative of the outer function multiplied by the derivative of the inner function. The derivative of sin(u) with respect to u is cos(u), and in this case, u = 4x. Therefore, the derivative of sin(4x) with respect to x is 4cos(4x).
Using the product rule, we can find the differential of the function y = x²sin(4x) as follows: dy = (2x sin(4x) + 4x²cos(4x)) dx. This represents the change in y for a small change in x.
(b) The differential of the function y = ln(√(1 + t²)) is dy = (1 / √(1 + t²)) dt.
For the function y = ln(√(1 + t²)), we can find the differential by applying the chain rule of differentiation. Let's differentiate the function term by term.
The derivative of ln(u) with respect to u is 1/u. In this case, u = √(1 + t²). Therefore, the derivative of ln(√(1 + t²)) with respect to t is 1 / √(1 + t²).
Hence, the differential of y = ln(√(1 + t)) is dy = (1 / √(1 + t²)) dt. This represents the change in y for a small change in t.
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(1 point) Use Part 1 of the Fundamental Theorem of Calculus to find the derivative of = de y 7 7:5 18-6u 1+x4 dx dy du NOTE: Enter your answer as a function. Make sure that your syntax is correct, i.e
To find the derivative of ∫[y, 7.5, 18-6u, 1+x^4] dx with respect to y, we can apply Part 1 of the Fundamental Theorem of Calculus.
According to Part 1 of the Fundamental Theorem of Calculus, if F(x) is an antiderivative of f(x) on the interval [a, b], then the derivative of the integral ∫[a, b] f(x) dx with respect to y is equal to f(x) evaluated at x = y.
In this case, we have the integral ∫[y, 7.5, 18-6u, 1+x^4] dx, where the limits of integration and the integrand contain variables other than x. To find its derivative with respect to y, we need to evaluate the integrand at x = y.
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Old MathJax webview
please do all. but if only one can be answered if
prefer the first one please.
NOT #32. I POSTED THAT BY ACCIDENT.
Q-32. Use the Direct Comparison Test to determine the convergence or divergence of the series 5n (12+6) Q-33. Find the fourth degree Taylor polynomial centered at C =8for the function. f(x) =ln x 14
The series ∑(n=1 to ∞) 5n (12+6)⁽ⁿ⁻³³⁾ diverges.---
to find the fourth-degree taylor polynomial centered at c = 8 for the function f(x) = ln(x¹⁴), we can start by finding the derivatives of f(x) up to the fourth derivative.
to determine the convergence or divergence of the series ∑(n=1 to ∞) 5n (12+6)⁽ⁿ⁻³³⁾, we can use the direct comparison test.
first, let's simplify the series:
∑(n=1 to ∞) 5n (12+6)⁽ⁿ⁻³³⁾
= ∑(n=1 to ∞) 5n (18)⁽ⁿ⁻³³⁾
now, let's consider the series ∑(n=1 to ∞) 5n (18)⁽ⁿ⁻³³⁾.
to apply the direct comparison test, we need to find a convergent series with positive terms that bounds the given series from above.
let's consider the series ∑(n=1 to ∞) 5 (18)⁽ⁿ⁻³³⁾.
we can compare the given series with this series by dividing each term:
(5n (18)⁽ⁿ⁻³³⁾) / (5 (18)⁽ⁿ⁻³³⁾)
simplifying this expression, we get:
n / 1
since n/1 is a divergent series, if the original series is greater than or equal to this divergent series for all n, then the original series also diverges.
now, let's compare the two series:
5n (18)⁽ⁿ⁻³³⁾ ≥ 5 (18)⁽ⁿ⁻³³⁾ for all n
since the original series is greater than or equal to the divergent series, we can conclude that the original series also diverges. f(x) = ln(x¹⁴)
f'(x) = (1/x¹⁴)(14x¹³) = 14/x
f''(x) = -14/x²
f'''(x) = 28/x³
f''''(x) = -84/x⁴
now, let's evaluate these derivatives at x = 8:
f(8) = ln(8¹⁴) = ln(2⁴²) = 42 ln(2)
f'(8) = 14/8 = 7/4
f''(8) = -14/64 = -7/32
f'''(8) = 28/512 = 7/128
f''''(8) = -84/4096 = -21/1024
now, we can construct the fourth-degree taylor polynomial centered at c = 8:
p4(x) = f(8) + f'(8)(x - 8) + (f''(8)/2!)(x - 8)² + (f'''(8)/3!)(x - 8)³ + (f''''(8)/4!)(x - 8)⁴
p4(x) = 42 ln(2) + (7/4)(x - 8) - (7/64)(x - 8)² + (7/384)(x - 8)³ - (21/4096)(x - 8)⁴
so, the fourth-degree taylor polynomial centered at c = 8 for the function f(x) = ln(x¹⁴) is p4(x) = 42 ln(2) + (7/4)(x - 8) - (7/64
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. Suppose a particle moves back and forth along a straight line with velocity v(t) , measured in feet per second, and acceleration aft) 120 a. What is the meaning of La muce? v(t) dt? 120 b. What is the meaning of (Odt? 60 120 c. What is the meaning of a(t) dt ? 60
The meaning of a(t) dt is the change in velocity of the particle over a time interval dt.
(a) La muce: La muce is the displacement of the particle from its initial position. If we integrate the velocity function v(t) over time from t = 0 to t = T, then we get La muce.T is the time elapsed since the particle began to move.
(b) (Odt:We can also write the displacement of the particle as the integral of the velocity function v(t) multiplied by the time differential dt. This is denoted by (Odt.La muce = ∫ v(t) dt
(c) a(t) dt:We know that acceleration a(t) is the rate of change of velocity with respect to time. Therefore, integrating acceleration a(t) over time from t = 0 to t = T gives the change in velocity of the particle over that time period.Taking the limits of the integral as t = 0 and t = T, we get:a(T) - a(0) = ∫ a(t) dt
Therefore, the meaning of a(t) dt is the change in velocity of the particle over a time interval dt.
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please help me. PLEASE
Score: 1.5/23 3/20 answered Question 6 < > Use linear approximation, i.e. the tangent line, to approximate (81.3 as follows: Let f(x) = V. Find the equation of the tangent line to f(x) at x = 81 LE- U
...................................................................................................................................
Using linear approximation and the tangent line to √x at x = 81, the square root of 81.3 is approximately 13.5166667.
To approximate the square root of 81.3 using linear approximation and the tangent line to f(x) = √x at x = 81, we need to find the slope (m) and the y-intercept (b) of the tangent line.
1. Finding the slope (m):
The slope of the tangent line can be determined by finding the derivative of f(x) = √x and evaluating it at x = 81.
Let's start by finding the derivative of f(x) = √x:
[tex]f'(x) = (1/2) * (x)^{(-1/2)}[/tex]
= 1 / (2√x)
Now, let's evaluate the derivative at x = 81:
f'(81) = 1 / (2√81)
= 1 / (2 * 9)
= 1 / 18
Therefore, the slope (m) of the tangent line is 1/18.
2. Finding the y-intercept (b):
To find the y-intercept, we need the value of f(x) at x = 81, which is √81.
f(81) = √81
= 9
Therefore, the y-intercept (b) of the tangent line is 9.
3. Writing the equation of the tangent line:
Now that we have the slope (m) and the y-intercept (b), we can write the equation of the tangent line in the form y = mx + b.
y = (1/18)x + 9
4. Approximating the square root of 81.3:
To approximate the square root of 81.3 using the tangent line, we substitute x = 81.3 into the equation of the tangent line and solve for y.
y = (1/18)(81.3) + 9
= 4.5166667 + 9
= 13.5166667
Therefore, using linear approximation, the approximation for the square root of 81.3 is approximately 13.5166667.
Note: The actual value of the square root of 81.3 is approximately 9.0156114, and the linear approximation provides an estimate that may not be as accurate as the actual value.
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Note: The question would be as
Use linear approximation, i.e. the tangent line, to approximate square root 81.3 as follows: Let f(x) = square root x. The equation of the tangent line to f(x) at x = 81 can be written in the form y = mx + b where m is: and where b is: Using this, we find our approximation for square root 81.3 is.
Find the surface area of the
solid formed when the graph of r = 2 cos θ, 0 ≤ θ ≤ π 2 is revolved
about the polar axis. S.A. = 2π Z β α r sin θ s r 2 + dr dθ2 dθ
Give the exact value.
The exact value of the surface area of the solid formed when the graph of r = 2cos(θ), where 0 ≤ θ ≤ π/2, is revolved about the polar axis is π [cos(4) - 1].
find the surface area of the solid formed when the graph of r = 2cos(θ), where 0 ≤ θ ≤ π/2, is revolved about the polar axis, we can use the formula for surface area in polar coordinates:
S.A. = 2π ∫[α, β] r sin(θ) √(r^2 + (dr/dθ)^2) dθ
In this case, we have r = 2cos(θ) and dr/dθ = -2sin(θ).
Substituting these values into the surface area formula, we get:
S.A. = 2π ∫[α, β] (2cos(θ))sin(θ) √((2cos(θ))^2 + (-2sin(θ))^2) dθ
= 2π ∫[α, β] 2cos(θ)sin(θ) √(4cos^2(θ) + 4sin^2(θ)) dθ
= 2π ∫[α, β] 2cos(θ)sin(θ) √(4(cos^2(θ) + sin^2(θ))) dθ
= 2π ∫[α, β] 2cos(θ)sin(θ) √(4) dθ
= 4π ∫[α, β] cos(θ)sin(θ) dθ
To evaluate this integral, we can use a trigonometric identity: cos(θ)sin(θ) = (1/2)sin(2θ). Then, the integral becomes:
S.A. = 4π ∫[α, β] (1/2)sin(2θ) dθ
= 2π ∫[α, β] sin(2θ) dθ
= 2π [-cos(2θ)/2] [α, β]
= π [cos(2α) - cos(2β)]
Now, we need to find the values of α and β that correspond to the given range of θ, which is 0 ≤ θ ≤ π/2.
When θ = 0, r = 2cos(0) = 2, so α = 2.
When θ = π/2, r = 2cos(π/2) = 0, so β = 0.
Substituting these values into the surface area formula, we get:
S.A. = π [cos(2(2)) - cos(2(0))]
= π [cos(4) - cos(0)]
= π [cos(4) - 1]
Therefore, the exact value of the surface area of the solid formed when the graph of r = 2cos(θ), where 0 ≤ θ ≤ π/2, is revolved about the polar axis is π [cos(4) - 1].
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