Show that the Fourier series of f(x)=∣sinx∣,−2π​≤x≤2π​f(x)=f(x+π)​ Is given by f(x)=π2​−π4​∑n=1[infinity]​42−11​cos2nx.

(a) The volume of the water tower tank ≈ 17318.88 cubic meters

(b) The depth of the concrete foundation needs to be ≈ 4.10 feet.

(c) The future value of the investment after 30 years with weekly compounding ≈ $57,537.14.

(a) Volume of the Water Tower Tank:

The volume of a right circular cylinder is obtained by the formula V = πr^2h, where r is the radius and h is the height.

We have:

Height (h) = 38 meters

Diameter (d) = 24 meters

To calculate the radius (r), we divide the diameter by 2:

r = d/2 = 24/2 = 12 meters

Now we can calculate the volume using the formula:

V = πr^2h = 3.14 * 12^2 * 38

V ≈ 17318.88 cubic meters

Rounded to the nearest hundredth, the volume of the water tower tank is approximately 17318.88 cubic meters.

(b) Depth of the Concrete Foundation:

We have:

Volume of concrete (V) = 16100 cubic feet

Length (L) = 70 feet

Width (W) = 46 feet

To determine the depth (D) of the foundation, we rearrange the volume formula to solve for D:

V = L * W * D

D = V / (L * W) = 16100 / (70 * 46)

D ≈ 4.10 feet

Rounded to the nearest hundredth, the depth of the concrete foundation needs to be approximately 4.10 feet.

(c) Future Value of the Investment:

We have:

Principal (P) = $25,000

Interest rate (r) = 3% = 0.03 (decimal)

Time (t) = 30 years

Compound frequency (n) = 52 (weekly compounding, as there are 52 weeks in a year)

The future value (FV) of an investment with compound interest can be calculated using the formula:

FV = P * (1 + r/n)^(n*t)

FV = $25,000 * (1 + 0.03/52)^(52*30)

≈ $57,537.14.

Rounded to the nearest cent, the future value of the investment after 30 years with weekly compounding is approximately $57,537.14.

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The p-value for this test is approximately 0.868.

To find the p-value, we can use the one population proportion test. First, we calculate the sample proportion of defective chips:

p = 34/95

p = 0.3579

The standard error is :

SE = sqrt((p * (1 - p)) / n)

= sqrt((0.3579 * (1 - 0.3579)) / 95)

≈ 0.0519

To conduct the hypothesis test, we assume

Using a Z-test, we calculate the test statistic:

Z = (p - p₀) / SE

Z = (0.3579 - 0.30) / 0.0519

Z = 1.108

The p-value associated with a Z-statistic of 1.108 is 0.868.

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The p-value for this test is approximately 0.868.

We can use the one population proportion test. First, we calculate the sample proportion of defective chips:

p = 34/95

p = 0.3579

The standard error is :

SE = sqrt((p * (1 - p)) / n)

= sqrt((0.3579 * (1 - 0.3579)) / 95)

≈ 0.0519

For the hypothesis test, we assume

The null hypothesis (H₀) that the true proportion of defective chips is equal to or less than 0.30.

The alternative hypothesis (H₁) is that the true proportion is greater than 0.30.

Using a Z-test,

Z = (p - p₀) / SE

Z = (0.3579 - 0.30) / 0.0519

Z = 1.108

The p-value of 1.108 is 0.868.

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The point is S(-8, -1, 8) and the line is given by x = 3t, y = 6t, z = t. The distance from point S to the line is found by the given formula for the distance between a point and a line in space is 10.392 units.

Given, the point is S(-8, -1, 8) and the line is given by x = 3t, y = 6t, z = t. To find the distance from the point to the line, use the formula for the distance between a point and a line in space.
This formula is given by: [tex]$$d = \frac{\mid (\vec{P_0}-\vec{L_0}) \times \vec{n} \mid}{\mid \vec{n} \mid}$$[/tex] where [tex]P_0[/tex] is the point S(-8, -1, 8) and [tex]L_0[/tex]  is a point on the line and is given by (0, 0, 0) and the direction vector is given by [tex]$\vec{n} = \langle 3, 6, 1 \rangle$[/tex].
Therefore, we have [tex]\vec{P_0} - \vec{L_0} = \langle -8, -1, 8 \rangle - \langle 0, 0, 0 \rangle = \langle -8, -1, 8 \rangle$$$$\Rightarrow \vec{P_0} - \vec{L_0} = \langle -8, -1, 8 \rangle$$$$\Rightarrow \mid (\vec{P_0}-\vec{L_0}) \times \vec{n} \mid = \mid \begin{vmatrix} \vec{i} & \vec{j} & \vec{k} \\ -8 & -1 & 8 \\ 3 & 6 & 1 \end{vmatrix} \mid = \mid \langle -50, 25, 54 \rangle \mid = \sqrt{50^2 + 25^2 + 54^2} \approx 58.038$$[/tex].

Now, calculate the value of [tex]|\vec{n}|$ as $|\vec{n}| = \sqrt{3^2 + 6^2 + 1^2} = \sqrt{46}$$[/tex].Therefore, the distance d between the point S and the line is [tex]$d = \frac{\mid (\vec{P_0}-\vec{L_0}) \times \vec{n} \mid}{\mid \vec{n} \mid} = \frac{58.038}{\sqrt{46}} \approx 10.392$$[/tex]. Therefore, the distance between the point S(-8, -1, 8) and the line x = 3t, y = 6t, z = t is approximately 10.392 units (rounded to the nearest thousandth).

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The factored form of the polynomial x^2+3x-10 is (x - 2)(x + 5).

To factor the polynomial \( x^{2}+3 x-10 \), we should obtain two binomials.

We know that to factor a quadratic polynomial of the form ax^2+bx+c,

we need to find two numbers whose product is equal to a*c and whose sum is equal to b.

Here, we have the quadratic polynomial x^2+3x-10.

Multiplying the coefficient of the x^2 term (1) by the constant term (-10), we get -10.

We need to find two numbers whose product is -10 and whose sum is 3.

Let's consider all the factor pairs of 10:(1, 10), (-1, -10), (2, 5), (-2, -5)

The pair whose sum is 3 is (2, 5).

So, we can rewrite the polynomial as follows : x^2 + 3x - 10 = x^2 + 5x - 2x - 10

Grouping the first two terms and the last two terms, we get :

x^2 + 5x - 2x - 10 = (x^2 + 5x) + (-2x - 10)

                            = x(x + 5) - 2(x + 5)

                            = (x - 2)(x + 5)

Therefore, the factored form of the polynomial x^2+3x-10 is (x - 2)(x + 5).

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Using the integrating factor method, the solution of the given 1st order linear initial value problem is:y = (t+1)(2ln|t+1| - 2)And, the domain of the solution is (-∞, -1) U (-1, ∞).

Using the integrating factor method, the 1st order linear initial value problem can be solved. The integrating factor method involves multiplying the entire equation by an integrating factor, which is a function of x or y that makes the equation integrable and easy to solve. The given differential equation is: dy/dx = (y/t+1)+2For this equation, we first write it in the standard form of a first-order linear differential equation: dy/dx +P(x)y=Q(x)Here, P(x) = -1/(t+1), Q(x) = 2.So, the equation can be rewritten as: dy/dx +(-1/(t+1))y=2 Now, we will find the integrating factor for this equation. It can be found using the formula: I.F = e^(∫P(x)dx)So, I.F = e^(∫(-1/(t+1))dt) = e^(-ln|t+1|) = 1/(t+1)Therefore, we multiply both sides of the equation by the integrating factor, I.F = 1/(t+1):1/(t+1)dy/dx -y/(t+1)^2= 2/(t+1)

Simplifying the equation, we get:(y/(t+1))' = 2/(t+1) Integrating both sides of the equation, we get: y/(t+1) = 2ln|t+1| + C ... (1) Here, C is the constant of integration. To find the value of C, we use the initial condition y(0) = -2. Substituting these values in equation (1), we get:-2 = 2ln|0+1| + C => C = -2Substituting this value of C in equation (1), we get: y/(t+1) = 2ln|t+1| - 2 Multiplying both sides by (t+1), we get: y = (t+1)(2ln|t+1| - 2) The domain of the solution of the given initial value problem can be found by checking the denominator of the solution. Here, the denominator is t+1, which can take any value except t = -1. So, the domain of the solution is (-∞, -1) U (-1, ∞).

Using the integrating factor method, the solution of the given 1st order linear initial value problem is:y = (t+1)(2ln|t+1| - 2)And, the domain of the solution is (-∞, -1) U (-1, ∞).

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To calculate the equivalent effective annual interest rate, we need to consider the compounding period and convert the stated interest rate to an annual rate. In this case, the interest is compounded semi-annually.

To find the equivalent effective annual interest rate, we can use the formula: Effective Annual Interest Rate = (1 + (Nominal Interest Rate / Number of Compounding Periods)) ^ Number of Compounding Periods - 1

Using the given information, the nominal interest rate is 12.33%, and the compounding period is semi-annually (twice a year). Substituting these values into the formula, we have:

Effective Annual Interest Rate = (1 + (0.1233 / 2)) ^ 2 - 1 = (1 + 0.06165) ^ 2 - 1 = 1.1269025 - 1 = 0.1269025

Converting this to a percentage and rounding to two decimal places, the equivalent effective annual interest rate is approximately 12.69%. Therefore, the answer is 12.69.

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The probability that a 7 is chosen from a standard deck of playing cards is approximately 0.077, rounded to three decimal places.

The probability of choosing a 7 from a standard deck of playing cards can be found by dividing the number of favorable outcomes (number of 7s) by the total number of possible outcomes (total number of cards).

In a standard deck, there are four suits, and each suit has one 7. Therefore, the number of favorable outcomes is 4.

The total number of cards in the deck is 52.

Hence, the probability of choosing a 7 is given by:

Probability = Number of favorable outcomes / Total number of possible outcomes

= 4 / 52

= 1 / 13

≈ 0.077

Therefore, the probability that a 7 is chosen from a standard deck of playing cards is approximately 0.077, rounded to three decimal places.

Note that the probability is expressed as a decimal, not an integer, since it represents a ratio of the number of favorable outcomes to the total number of possible outcomes.

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The confidence interval of 16.5% ± 8.2% in the form of a trilinear inequality can be expressed as 8.3% ≤ x ≤ 24.7%, where x represents the true value within the interval.

A confidence interval is a range of values within which we estimate the true value of a parameter to lie with a certain level of confidence. In this case, the confidence interval is given as 16.5% ± 8.2%.

To express this confidence interval in the form of a trilinear inequality, we consider the lower and upper bounds of the interval. The lower bound is calculated by subtracting the margin of error (8.2%) from the central value (16.5%), resulting in 8.3%. The upper bound is calculated by adding the margin of error to the central value, resulting in 24.7%.

Therefore, the trilinear inequality representing the confidence interval is 8.3% ≤ x ≤ 24.7%, where x represents the true value within the interval. This inequality states that the true value lies between 8.3% and 24.7% with the given level of confidence.

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Probability of P(A∩B) = 0.85 - 0.6 and P(A∩B) = 0.25

To find the probability of the intersection of events A and B, denoted by P(A∩B), we can use the formula:

P(A∩B) = P(A) + P(B) - P(A∪B)

Given that P(A∪B) = 0.6, P(A) = 0.3, and P(B) = 0.55, we can substitute these values into the formula:

P(A∩B) = 0.3 + 0.55 - 0.6

Simplifying the expression:

P(A∩B) = 0.85 - 0.6

P(A∩B) = 0.25

Therefore, the probability of the intersection of events A and B, P(A∩B), is equal to 0.25.

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The determinant of the matrix is 11.

In order to find the determinant of a matrix,

we use the cofactor expansion method.

The given matrix is

A=⎡​000−2​2410​3501​00−33​⎦⎤​

The cofactor expansion for the first row is given by :

∣A∣=0×(−1)0+−2×(−1)1+0×(−1)2=2

The cofactor expansion for the second row is given by :

∣A∣=2×(−1)1+4×(−1)2+10×(−1)3=14

The cofactor expansion for the third row is given by :

∣A∣=14×(−1)4+3×(−1)5=11

Therefore, the determinant of the matrix is 11.

Note :

We can find the determinant of matrix by multiplying the diagonal elements and subtracting the product of other two elements.

The cofactor expansion method can be used in case of larger matrices where multiplying the diagonal elements becomes tedious.

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Given X is a discrete random variable with the following distribution: $X$  $-23$  $-8$  $23$ $P(X)$ $0.4$ $0.2$ $0.4$.

We have to find the standard deviation of XTo calculate the standard deviation we need to calculate the mean of X first.The formula for mean is:$$\mu = \sum_{i=1}^{n}x_iP(X=x_i)$$Substituting the values of X and P(X) we get$$\mu = (-23)(0.4) + (-8)(0.2) + (23)(0.4)$$$$\mu = -9.4$$The mean of X is -9.4.To calculate the variance of X we use the formula:$$\sigma^2=\sum_{i=1}^{n}(x_i-\mu)^2P(X=x_i)$$Substituting the values of X, P(X) and $\mu$ we get$$\sigma^2=(-23-(-9.4))^2(0.4)+(-8-(-9.4))^2(0.2)+(23-(-9.4))^2(0.4)$$$$\sigma^2=485.24$$The variance of X is 485.24.The standard deviation of X is:$$\sigma=\sqrt{\sigma^2}=\sqrt{485.24}=22.021$$Hence, the standard deviation of X is 22.021 (rounded to 3 decimal places).

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The r is \begin{bmatrix}207 & -30 & 130 \\ 690 & -104 & 206 \\ 1502 & -290 & 490 \end{bmatrix}.

Given matrices are:

A = \begin{bmatrix}1 & -2 & 1 \\ 11 & 4 & 1 \\ 3 & 1 & 3 \end{bmatrix}, B = \begin{bmatrix}0 & -1 & 2 \\ 2 & 2 & 2 \\ 3 & 1 & 1 \end{bmatrix}, C = \begin{bmatrix}1 & 1 & 2 \\ 2 & 1 & 1 \\ 2 & 3 & 1 \end{bmatrix}, D = \begin{bmatrix}0 & 1 & 3 \\ 2 & 2 & 2 \\ 3 & 1 & 0 \end{bmatrix}We are asked to find 3(BTD) + 4CA^2$ .

Here, we need to first find the individual matrices and then find the final matrix by using the given formula. Now, let us calculate each term one by one. First of all, let's find BTD.We have B = \begin{bmatrix}0 & -1 & 2 \\ 2 & 2 & 2 \\ 3 & 1 & 1 \end{bmatrix}, D = \begin{bmatrix}0 & 1 & 3 \\ 2 & 2 & 2 \\ 3 & 1 & 0 \end{bmatrix}Multiplying the above matrices, we get \begin{aligned} BTD &= \begin{bmatrix}0 & -1 & 2 \\ 2 & 2 & 2 \\ 3 & 1 & 1 \end{bmatrix}\begin{bmatrix}0 & 1 & 3 \\ 2 & 2 & 2 \\ 3 & 1 & 0 \end{bmatrix}\\ &= \begin{bmatrix}(0)(0) + (-1)(2) + (2)(3) & (0)(1) + (-1)(2) + (2)(1) & (0)(3) + (-1)(2) + (2)(0) \\ (2)(0) + (2)(2) + (2)(3) & (2)(1) + (2)(2) + (2)(1) & (2)(3) + (2)(1) + (2)(0) \\ (3)(0) + (1)(2) + (1)(3) & (3)(1) + (1)(2) + (1)(1) & (3)(3) + (1)(1) + (1)(0) \end{bmatrix} \\ &= \begin{bmatrix}4 & -2 & -2 \\ 12 & 8 & 6 \\ 5 & 6 & 10 \end{bmatrix} \end{aligned}

Next, let's calculate A^2. We have A = \begin{bmatrix}1 & -2 & 1 \\ 11 & 4 & 1 \\ 3 & 1 & 3 \end{bmatrix}$$Multiplying the above matrix by itself, we get \begin{aligned} A^2 &= AA\\ &= \begin{bmatrix}1 & -2 & 1 \\ 11 & 4 & 1 \\ 3 & 1 & 3 \end{bmatrix}\begin{bmatrix}1 & -2 & 1 \\ 11 & 4 & 1 \\ 3 & 1 & 3 \end{bmatrix}\\ &= \begin{bmatrix}(1)(1) + (-2)(11) + (1)(3) & (1)(-2) + (-2)(4) + (1)(1) & (1)(1) + (-2)(1) + (1)(3) \\ (11)(1) + (4)(11) + (1)(3) & (11)(-2) + (4)(4) + (1)(1) & (11)(1) + (4)(1) + (1)(3) \\ (3)(1) + (1)(11) + (3)(3) & (3)(-2) + (1)(4) + (3)(1) & (3)(1) + (1)(1) + (3)(3) \end{bmatrix} \\ &= \begin{bmatrix}1 & -4 & 2 \\ 147 & -27 & 14 \\ 17 & -5 & 13 \end{bmatrix} \end{aligned} Now, we need to find CA^2.

We have C = \begin{bmatrix}1 & 1 & 2 \\ 2 & 1 & 1 \\ 2 & 3 & 1 \end{bmatrix}, A^2 = \begin{bmatrix}1 & -4 & 2 \\ 147 & -27 & 14 \\ 17 & -5 & 13 \end{bmatrix}Multiplying the above matrices, we get \begin{aligned} CA^2 &= \begin{bmatrix}1 & 1 & 2 \\ 2 & 1 & 1 \\ 2 & 3 & 1 \end{bmatrix}\begin{bmatrix}1 & -4 & 2 \\ 147 & -27 & 14 \\ 17 & -5 & 13 \end{bmatrix}\\ &= \begin{bmatrix}(1)(1) + (1)(147) + (2)(17) & (1)(-4) + (1)(-27) + (2)(-5) & (1)(2) + (1)(14) + (2)(13) \\ (2)(1) + (1)(147) + (1)(17) & (2)(-4) + (1)(-27) + (1)(-5) & (2)(2) + (1)(14) + (1)(13) \\ (2)(1) + (3)(147) + (1)(17) & (2)(-4) + (3)(-27) + (1)(-5) & (2)(2) + (3)(14) + (1)(13) \end{bmatrix} \\ &= \begin{bmatrix}167 & -12 & 42 \\ 166 & -36 & 29 \\ 446 & -79 & 45 \end{bmatrix} \end{aligned}

Finally, we can find the value of 3(BTD) + 4CA^2. We have $$3(BTD) + 4CA^2 = 3\begin{bmatrix}4 & -2 & -2 \\ 12 & 8 & 6 \\ 5 & 6 & 10 \end{bmatrix} + 4\begin{bmatrix}167 & -12 & 42 \\ 166 & -36 & 29 \\ 446 & -79 & 45 \end{bmatrix} = \begin{bmatrix}207 & -30 & 130 \\ 690 & -104 & 206 \\ 1502 & -290 & 490 \end{bmatrix}

Therefore, $3(BTD) + 4CA^2 = \begin{bmatrix}207 & -30 & 130 \\ 690 & -104 & 206 \\ 1502 & -290 & 490 \end{bmatrix}.

The required answer is \begin{bmatrix}207 & -30 & 130 \\ 690 & -104 & 206 \\ 1502 & -290 & 490 \end{bmatrix}.

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The value of tangent of 210 degrees can be calculated using the unit circle.

The unit circle is a circle whose radius is one and whose center is at the origin of a coordinate plane, the x-axis is a line that passes through (1, 0), and the y-axis is a line that passes through (0, 1).

A point on the unit circle represents an angle that is measured in radians.

To calculate the tangent of 210 degrees, follow these steps:

Step 1: Convert the angle from degrees to radians.

1 degree = π/180 radians

Therefore,

210 degrees = 210 * π/180 radians

                     = 7π/6 radians

Step 2: Locate the point on the unit circle that corresponds to the angle 7π/6 radians.

The point (-√3/2, -1/2) corresponds to 7π/6 radians.

This can be seen from the labelled sketch below.

Step 3: Calculate the tangent of 7π/6 radians.

tan(7π/6) = y/x

                = (-1/2)/(-√3/2)

                = (1/2)√3

Therefore, the exact value of tan 210 degrees is (1/2)√3.

The labelled sketch is attached below.

https://www.cuemath.com/trigonometry/tan-210-degrees/

(Note: The angle is marked in radians on the sketch, but the process remains the same for degrees as well.)

Labelled sketch:

Explanation:

Total words used = 166 words.

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The tangent of 210º is given as follows:

tan(210º) = [tex]\frac{\sqrt{3}}{3}[/tex]

The angle for this problem is given as follows:

210º.

Which is on the third quadrant, as 180º < 210º < 270º.

The equivalent angle to 210º on the first quadrant is given as follows:

210 - 180 = 30º.

The tangent of 30º is given as follows:

tan(30º) = [tex]\frac{\sqrt{3}}{3}[/tex]

On the third quadrant, the tangent is positive, just as in the first quadrant, hence the tangent of 210º is given as follows:

tan(210º) = [tex]\frac{\sqrt{3}}{3}[/tex]

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the particular solution of the given differential equation:[tex]y_p(t)=u_1(t)+u_2(t)=c_1 e^{−t}+c_2 e^{−4t}+5t e^{2t}[/tex]

Assume that the particular solution has the form:

[tex]y_p(t)=u_1(t)+u_2(t)[/tex] where [tex]u_1(t)[/tex] is the solution to the associated homogeneous equation:

[tex]y″+5y′+4y=0u_2(t)[/tex] is the solution of

[tex]y″+5y′+4y=10t[/tex]

Then the characteristic equation of the associated homogeneous equation:

y″+5y′+4y=0 is obtained by substituting [tex]y=e^{mx}[/tex] into the differential equation:

[tex]\begin{aligned}y″+5y′+4y=0\\ \Rightarrow m^2 e^{mx} + 5me^{mx}+4e^{mx}=0\\ \Rightarrow (m+1)(m+4)e^{mx}=0\\ \end{aligned}[/tex]

The roots of the characteristic equation are m = −1, −4.Then the solution to the associated homogeneous equation:

[tex]y_h(t)=c_1 e^{−t}+c_2 e^{−4t}[/tex]

Now solve for [tex]u_2(t)[/tex] using the method of undetermined coefficients. Assume that:

[tex]u_2(t)=A_1 t e^{2t}[/tex] where A_1 is a constant. Substituting [tex]u_2(t)[/tex] into the differential equation:

[tex]\begin{aligned}y″+5y′+4y&=10te\\ \Rightarrow 2A_1t e^{2t} + 5A_1 e^{2t} + 4A_1t e^{2t}&= 10te\\ \end{aligned}[/tex]

Equating the coefficients of the terms with t to 10, :

[tex]\begin{aligned}2A_1 &= 10\\ A_1 &= 5\\ \end{aligned}[/tex]

Therefore, the particular solution of the given differential equation:

[tex]y_p(t)=u_1(t)+u_2(t)=c_1 e^{−t}+c_2 e^{−4t}+5t e^{2t}[/tex]

where[tex]c_1[/tex] and [tex]c_2[/tex] are arbitrary constants.

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The completed sequence is: 4, 16, 64, 256, 1024.

The given sequence is 4, 16, 64, ...

To identify the pattern in this sequence, we can observe that each number is obtained by multiplying the previous number by 4.

4 * 4 = 16

16 * 4 = 64

Therefore, to find the next number in the sequence, we can continue this pattern and multiply the last number (64) by 4:

64 * 4 = 256

So, the very next missing number in Blank #1 is 256.

To find the second missing number, we follow the same pattern:

256 * 4 = 1024

Therefore, the second missing number in Blank #2 is 1024.

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The test statistic is calculated to be [tex]t_0 = 0.59[/tex]. The p-value is found to be 0.278. The sample mean of 531 is not statistically significantly higher than the population mean of 524.

a) For the test statistic,

[tex]t_0 = \frac {(sample mean - population mean)}{\frac {(sample standard deviation)}{ \sqrt {n}}}[/tex].
Plugging in the values, we get [tex]t_0 = \frac {(531 - 524)}{\frac {(119)}{ \sqrt {2200}}} \approx 0.59[/tex].

b) The p-value represents the probability of observing a test statistic as extreme as the one obtained, assuming the null hypothesis is true. To find the p-value, we compare the calculated test statistic with the appropriate t-distribution table or use statistical software. In this case, the P-value is found to be 0.278.
c) Since the P-value (0.278) is greater than the common significance level of 0.05, we fail to reject the null hypothesis. This means that the sample mean of 531 is not statistically significantly higher than the population mean of 524. Therefore, based on the available evidence, there is no convincing statistical support to claim that the review course developed by the math teacher has a significant impact on increasing the math scores of students.
d) While the increase in score from 524 to 531 may not have statistical significance, it is important to consider practical significance as well. Practical significance refers to the real-world impact or meaningfulness of the observed difference. In this case, a difference of 7 points may not have practical significance for a school admissions administrator since it falls within the natural variability of the test scores and may not significantly impact the admissions decision-making process. Other factors such as overall academic performance, extracurricular activities, and letters of recommendation may have a greater influence on the decision.

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The given information represents a linear regression model where Y represents the likelihood of sending children to college and X represents family income in thousands of dollars.

According to the given model Y = 0.11 + 0.009X, the likelihood of sending children to college increases as family income (X) increases. To determine the likelihood for specific income levels:

1. For a family with an income of $100,000 (X = 100), we substitute X into the equation: Y = 0.11 + 0.009 * 100 = 0.11 + 0.9 = 1.01. Therefore, the model predicts a likelihood of approximately 1.01, or 101%, for this income level.

2. For a family with an income of $50,000 (X = 50), we substitute X into the equation: Y = 0.11 + 0.009 * 50 = 0.11 + 0.45 = 0.56. The linear regression  model predicts a likelihood of approximately 0.56, or 56%, for this income level.

3. For a family with an income of $17,500 (X = 17.5), we substitute X into the equation: Y = 0.11 + 0.009 * 17.5 = 0.11 + 0.1575 = 0.2675. The model predicts a likelihood of approximately 0.2675, or 26.75%, for this income level.

The logic behind these estimates is that the model assumes a positive relationship between family income and the likelihood of sending children to college. As income increases, the model predicts a higher likelihood of sending children to college.

The slope coefficient of 0.009 indicates that for each additional thousand dollars of income, the likelihood of sending children to college increases by 0.9%. The intercept term of 0.11 represents the estimated likelihood when family income is zero, which may not have a practical interpretation in this context.

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Yes, we can conclude that X is a subspace of V and that collection F need not be finite or countable.

As per data,

Let V be a vector space, F a collection of subspaces of V with the following property:

If X, Y E F, then there exists a Z E F such that X UY ≤ Z.

Let X =UWEFW.

To Prove: X is a subspace of V.

Proof:

Let X = UW∈F W, since F is a collection of subspaces of V, thus X is a collection of subspaces of V.

Since V is a vector space, thus by definition, V must satisfy the following conditions:

Closed under vector addition Closed under scalar multiplication.

Let x, y ∈ X.

We need to show that x + y ∈ X and cx ∈ X for any c ∈ F.

Using the given property, since X, y ∈ F, there exists a Z ∈ F such that X U y ≤ Z and thus x, y ∈ Z. Since Z is a subspace of V, thus x + y ∈ Z and hence x + y ∈ X.

Now, let c ∈ F and x ∈ X.

Using the given property, since X, c ∈ F, there exists a Z ∈ F such that X U c ≤ Z and thus x, c ∈ Z.

Since Z is a subspace of V, thus cx ∈ Z and hence cx ∈ X.

Therefore, we can conclude that X is a subspace of V.

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The correct option that gives the polar form of the equation \(y = 5x + 7\) is \[r = \frac{7}{\cos \theta - 3 \operatorname{cis} \theta}\].

To convert the equation \(y = 5x + 7\) to polar form, we need to express \(x\) and \(y\) in terms of polar coordinates \(r\) and \(\theta\).

1. Express \(x\) and \(y\) in terms of \(r\) and \(\theta\) using the relationships \(x = r \cos \theta\) and \(y = r \sin \theta\).

  Substituting these values into the equation \(y = 5x + 7\), we get:

  \(r \sin \theta = 5(r \cos \theta) + 7\).

2. Simplify the equation:

  \(r \sin \theta = 5r \cos \theta + 7\).

3. Rearrange the equation to isolate \(r\):

  \(r \sin \theta - 5r \cos \theta = 7\).

4. Factor out \(r\) on the left side of the equation:

  \(r(\sin \theta - 5 \cos \theta) = 7\).

5. Divide both sides of the equation by \(\sin \theta - 5 \cos \theta\):

     \(r = \frac{7}{\sin \theta - 5 \cos \theta}\).

6. Now, we need to express the denominator in terms of \(\cos \theta\) only.

  Using the relationship \(\sin \theta = \sqrt{1 - \cos^2 \theta}\), we can rewrite the denominator:

  \(\sin \theta - 5 \cos \theta = \sqrt{1 - \cos^2 \theta} - 5 \cos \theta\).

7. Convert the square root term to exponential form:

  \(\sqrt{1 - \cos^2 \theta} = \sqrt{\cos^2 \theta} \cdot \sqrt{1 - \cos^2 \theta} = \cos \theta \cdot \sqrt{1 - \cos^2 \theta}\).

8. Substitute this back into the equation:

  \(\sin \theta - 5 \cos \theta = \cos \theta \cdot \sqrt{1 - \cos^2 \theta} - 5 \cos \theta\).

9. Simplify the equation:

  \(\sin \theta - 5 \cos \theta = -4 \cos \theta \cdot \sqrt{1 - \cos^2 \theta}\).

10. Rearrange the equation:

   \(\frac{1}{\cos \theta - 3 \operatorname{cis} \theta} = -\frac{1}{4 \cos \theta \cdot \sqrt{1 - \cos^2 \theta}}\).

11. Finally, invert both sides of the equation to obtain the polar form:

   \[r = \frac{7}{\cos \theta - 3 \operatorname{cis} \theta}\].

Therefore, the correct option that gives the polar form of the equation \(y = 5x + 7\) is \[r = \frac{7}{\cos \theta - 3 \operatorname{cis} \theta}\].

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The product

18

sin

⁡

(

29

�

)

sin

⁡

(

20

�

)

18sin(29x)sin(20x) can be written as the difference of two trigonometric functions:

9

cos

⁡

(

9

�

)

−

9

cos

⁡

(

49

�

)

9cos(9x)−9cos(49x).

To express the product as a sum or difference, we can use the trigonometric identity:

sin

⁡

(

�

)

sin

⁡

(

�

)

=

1

2

(

cos

⁡

(

�

−

�

)

−

cos

⁡

(

�

+

�

)

)

sin(A)sin(B)=

2

1

​

(cos(A−B)−cos(A+B))

In this case, we have

�

=

29

�

A=29x and

�

=

20

�

B=20x. Plugging these values into the identity, we get:

sin

⁡

(

29

�

)

sin

⁡

(

20

�

)

=

1

2

(

cos

⁡

(

29

�

−

20

�

)

−

cos

⁡

(

29

�

+

20

�

)

)

sin(29x)sin(20x)=

2

1

​

(cos(29x−20x)−cos(29x+20x))

Simplifying the angles inside the cosine functions, we have:

sin

⁡

(

29

�

)

sin

⁡

(

20

�

)

=

1

2

(

cos

⁡

(

9

�

)

−

cos

⁡

(

49

�

)

)

sin(29x)sin(20x)=

2

1

​

(cos(9x)−cos(49x))

Finally, multiplying both sides of the equation by 18, we get:

18

sin

⁡

(

29

�

)

sin

⁡

(

20

�

)

=

9

cos

⁡

(

9

�

)

−

9

cos

⁡

(

49

�

)

18sin(29x)sin(20x)=9cos(9x)−9cos(49x)

Therefore, the product

18

sin

⁡

(

29

�

)

sin

⁡

(

20

�

)

18sin(29x)sin(20x) can be written as the difference of two trigonometric functions:

9

cos

⁡

(

9

�

)

−

9

cos

⁡

(

49

�

)

9cos(9x)−9cos(49x).

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when both x and y are even integers, their product xy cannot be odd

To prove the statement "If x and y are even integers, then xy is even" by contradiction, we assume the negation of the statement, which is "If x and y are even integers, then xy is not even."

So, let's assume that x and y are even integers, but their product xy is not even. This means that xy is an odd integer.

Since x and y are even, we can write them as x = 2a and y = 2b, where a and b are integers.

Now, substituting these values into the equation xy = 2a * 2b, we get xy = 4ab.

According to our assumption, xy is odd. However, we have expressed xy as 4ab, which is a product of two integers and therefore divisible by 2. This contradicts our assumption that xy is odd.

Hence, our assumption that xy is not even leads to a contradiction. Therefore, we can conclude that if x and y are even integers, then xy must be even.

This proof by contradiction demonstrates that when both x and y are even integers, their product xy cannot be odd, providing evidence for the original statement.

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The mean of the sampling distribution is 42, the variance of the sampling distribution is  3.14 and the standard deviation of the sampling distribution is 1.77.

To construct the sampling distribution of sample means, we need to calculate the mean, variance, and standard deviation.

Population: 40, 42, 44, 46, 48, 50

Sample Size: 3

Step 1:

Find all possible sample combinations of size 3 from the population.

This can do by simply list out all the possible combinations:

(40, 42, 44), (40, 42, 46), (40, 42, 48), (40, 42, 50), (40, 44, 46), (40, 44, 48), (40, 44, 50), (40, 46, 48), (40, 46, 50), (40, 48, 50), (42, 44, 46), (42, 44, 48), (42, 44, 50), (42, 46, 48), (42, 46, 50), (42, 48, 50), (44, 46, 48), (44, 46, 50), (44, 48, 50), (46, 48, 50)

Step 2:

Calculate the mean of each sample combination.

For each combination, calculate the mean by summing up the values and dividing by the sample size (3).

For example, for the first combination (40, 42, 44):

Mean = (40 + 42 + 44) / 3 = 42

After calculating the mean for all combinations:

42, 42.67, 44, 44, 43.33, 44, 44.67, 44.67, 45.33, 46, 44, 44.67, 45.33, 45.33, 46, 47.33, 46, 47.33, 48, 48.67

Step 3:

Calculate the mean, variance, and standard deviation of the sampling distribution.

Mean of the sampling distribution:

To find the mean of the sampling distribution, we calculate the mean of all the sample means.

Mean = Sum of all sample means / Number of sample means

Mean = (42 + 42.67 + 44 + 44 + 43.33 + 44 + 44.67 + 44.67 + 45.33 + 46 + 44 + 44.67 + 45.33 + 45.33 + 46 + 47.33 + 46 + 47.33 + 48 + 48.67) / 20

Mean = 45.33

Variance of the sampling distribution:

To find the variance, we calculate the sum of squared deviations from the mean, divided by the number of sample means minus 1.

Variance = Sum of ((Sample mean - Mean)²) / (Number of sample means - 1)

Variance = ((42 - 45.33)² + (42.67 - 45.33)² + ... + (48.67 - 45.33)²) / (20 - 1)

Variance = 3.14

Standard deviation of the sampling distribution:

To find the standard deviation, we take the square root of the variance.

Standard Deviation = [tex]\sqrt{3.14}[/tex]

Standard Deviation ≈ 1.77

Therefore, the mean of the sampling distribution is approximately 45.33, the variance is approximately 3.14, and the standard deviation is approximately 1.

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There is a function that has the properties = + +... +

4. Proof by contradiction that if  is even, then  is odd.Suppose the contrary that is , is even but  is even. Then by definition of evenness there exist integers  and  such that and .

Then substituting the expressions in the given equation yields.  = (  −  + 3 ) = 2 (  −  + 3/2 ) where  −  + 3/2 is an integer since  and  are integers.

Therefore,  is even since it can be expressed as twice an integer. This contradicts the given statement and thus our assumption is false and we can conclude that if  is even then  is odd.

7. Translate the following statements into symbolic statements without using definition: (i) The sum of the function
The sum of the function can be translated into symbolic form as follows.

Let  denote the sum of a function such that =  +  + ... + .

Then, the given statement can be translated as: There exist a function  such that =  +  + ... +  .

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The equation \( \frac{x^{2}}{0.01} + \frac{y^{2}}{0.01} = 1 \) has x-intercepts at \( x = -0.1 \) and \( x = 0.1 \), and y-intercepts at \( y = -0.1 \) and \( y = 0.1 \).

To find the x- and y-intercepts, if they exist, for the equation \(\frac{x^2}{0.01} + \frac{y^2}{0.01} = 1\), we need to determine the points where the equation intersects the x-axis and the y-axis.

The given equation represents an ellipse with its center at the origin \((0,0)\) and with semi-axes of length \(0.1\) in the x and y directions.

To find the x-intercepts, we set \(y = 0\) and solve for \(x\):

\(\frac{x^2}{0.01} + \frac{0^2}{0.01} = 1\)

This simplifies to:

\(\frac{x^2}{0.01} = 1\)

Multiplying both sides by \(0.01\), we get:

\(x^2 = 0.01\)

Taking the square root of both sides, we obtain two solutions:

\(x = \pm 0.1\)

Thus, the x-intercepts are at \((-0.1, 0)\) and \((0.1, 0)\).

To find the y-intercepts, we set \(x = 0\) and solve for \(y\):

\(\frac{0^2}{0.01} + \frac{y^2}{0.01} = 1\)

This simplifies to:

\(\frac{y^2}{0.01} = 1\)

Multiplying both sides by \(0.01\), we get:

\(y^2 = 0.01\)

Taking the square root of both sides, we obtain two solutions:

\(y = \pm 0.1\)

Thus, the y-intercepts are at \((0, -0.1)\) and \((0, 0.1)\).

In conclusion, the x-intercepts are \((-0.1, 0)\) and \((0.1, 0)\), and the y-intercepts are \((0, -0.1)\) and \((0, 0.1)\).

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(a) The union of sets A and B is {1, 2, 3, 4, 5, 6}.

(b) The intersection of sets A and B is {1, 3, 4}.

(c) Set A without the elements of set B is {5, 6}.

(d) Set B without the elements of set A is {2}.

Here are the required sets to be found:

(a) A∪B = {1, 2, 3, 4, 5, 6}

Union of the two sets A and B is a set which consists of all the elements that belong to set A and set B.

(b) A∩B = {1, 3, 4}

Intersection of the two sets A and B is a set which consists of all the common elements that belong to both sets A and set B.

(c) A\B = {5, 6}

A\B is a set which consists of all the elements that belong to set A but does not belong to set B.

(d) B\A = {2}B\A is a set which consists of all the elements that belong to set B but does not belong to set A.

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This means that angle ADC and angle BCD are supplementary angles. Since they share side CD, we can conclude that triangle ACD and triangle BDC are congruent (by SAS congruence), which means that angle ACD is congruent to angle BDC.

To get started, it's important to remember the following principles:

The sum of angles in a triangle is always 180 degrees.

Vertical angles are congruent (i.e. they have the same measure).

When two parallel lines are intersected by a transversal, alternate interior angles and corresponding angles are congruent.

With these principles in mind, let's look at an example problem:

Given:

ABCD is a parallelogram

AC is bisected by line segment CE

Prove:

Angle ACD is congruent to angle BDC

To prove that angle ACD is congruent to angle BDC, we need to use the fact that ABCD is a parallelogram. Specifically, we know that opposite angles in a parallelogram are congruent.

First, draw a diagram of the given information:

    A ____________ B

     |             |

     |             |

     |             |

    D|_____________|C

           *

          / \

         /   \

        /     \

       /       \

      /         \

     /           \

    /_____________\

          E

We can see that triangle ACD and triangle BDC share side CD. To show that angle ACD is congruent to angle BDC, we need to show that these triangles are congruent.

Using the given information, we know that AC is bisected by line segment CE. This means that angle ACE is congruent to angle BCE by definition of angle bisector. Also, since ABCD is a parallelogram, we know that angle ABC is congruent to angle ADC.

Now, we can use the fact that the sum of angles in a triangle is always 180 degrees. Since triangle ACE and triangle BCE share side CE, we can combine them into one triangle and write:

angle ACE + angle BCE + angle BCD = 180

Substituting in the known values, we get:

angle ABC + angle BCD = 180

Since ABCD is a parallelogram, we know that angle ABC is congruent to angle ADC. Substituting this in, we get:

angle ADC + angle BCD = 180

This means that angle ADC and angle BCD are supplementary angles. Since they share side CD, we can conclude that triangle ACD and triangle BDC are congruent (by SAS congruence), which means that angle ACD is congruent to angle BDC.

Therefore, we have proven that angle ACD is congruent to angle BDC using the given information.

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a. The area in the left tail more extreme than than z = -1.78 is 0.0367.

b. The standardized z-test statistic is 10.29

To find the area in the left tail more extreme than z = -1.78 in a standard normal distribution, we need to calculate the cumulative probability up to that point.

Using a standard normal distribution table or statistical software, we can find the cumulative probability corresponding to z = -1.78.

The cumulative probability for z = -1.78 is approximately 0.0367.

Therefore, the area in the left tail more extreme than z = -1.78 is 0.0367 (or 3.67% when expressed as a percentage).

Regarding the second question, to find the value of the standardized z-test statistic, we can use the formula:

z = (x - μ) / SE

where x is the sample mean, μ is the hypothesized population mean under the null hypothesis, and SE is the standard error.

Given:

n = 20 (sample size)

x = 82.2 (sample mean)

s = 3.0 (sample standard deviation)

SE = 0.7 (standard error)

Assuming the null hypothesis is μ = 75, we can calculate the standardized z-test statistic:

z = (x - μ) / SE

 = (82.2 - 75) / 0.7

 ≈ 10.29

The standardized z-test statistic is approximately 10.29 (rounded to two decimal places).

Please note that the z-test assumes a normal distribution and certain assumptions about the data.

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Part A: The statement that a/(b/c) = (a/b)/c for every a, b, c ∈ R+ is disproven by finding a counterexample where the equation does not hold true.

Part B: By assuming the opposite and deriving a contradiction, it is proven that the parabola y = x^2 and the line y = 2x - 2 do not intersect.

Certainly! Here's a step-by-step walkthrough for both Part A and Part B of the problem.

Part A: Disproving the statement

To disprove the statement that for every a, b, c ∈ R+, we have a/(b/c) = (a/b)/c, we need to find a counterexample where the equation does not hold true.

Let's choose specific values for a, b, and c to demonstrate this:

Let a = 2, b = 3, and c = 4.

Now, we will evaluate both sides of the equation:

Left side: a/(b/c) = 2/(3/4) = 2 * (4/3) = 8/3

Right side: (a/b)/c = (2/3)/4 = (2/3) * (1/4) = 2/12 = 1/6

Since 8/3 is not equal to 1/6, we have found a counterexample that disproves the given statement. Thus, the statement is false.

Part B: Proving with the contradiction method

To prove that the parabola y = x^2 and the line y = 2x - 2 do not intersect using the contradiction method, we will assume the opposite, that they do intersect. Then, we will derive a contradiction from this assumption.

Assume that the parabola y = x^2 and the line y = 2x - 2 intersect at some point (x, y).

Setting the equations equal to each other, we have:

x^2 = 2x - 2

Rearranging the equation, we get:

x^2 - 2x + 2 = 0

Now, let's solve this quadratic equation using the quadratic formula:

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

x = [2 ± √(4 - 8)] / 2

x = [2 ± √(-4)] / 2

Since the square root of a negative number is not defined in the real number system, we have encountered an imaginary solution. This contradicts our assumption that the parabola and line intersect.

Therefore, our assumption was incorrect, and we can conclude that the parabola y = x^2 and the line y = 2x - 2 do not intersect.

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We compared the accuracy of the estimation between the ARMA(1, 1) and AR(1) models. These numerical experiments help us understand the performance of the Yule-Walker estimators in different models.

In this question, we explore the Yule-Walker estimators in two models: AR(1) and ARMA(1, 1), and examine their numerical performance. The Yule-Walker estimators are used to estimate the parameters of these models based on observed data. Let's go through the steps and results for each part of the question.

(a) For the AR(1) model, we load the provided data from Data-AR.txt into R. We calculate the sample autocovariance function (ACF) using the ACF<-acf(Data) command. The second entry of the ACF, denoted as rhobX(1), represents the estimator of the autocorrelation at lag 1, which is equivalent to the Yule-Walker estimator ϕb for the AR(1) parameter ϕ. Additionally, we obtain the sample variance of the data using the var(Data) command, denoted as γbX(0). We can then use these values to compute the Yule-Walker estimators: ϕb = rhobX(1) and σb^2Z = γbX(0) - rhobX(1)^2 * γbX(0). Comparing ϕb with the true value of ϕ allows us to assess the accuracy of the estimation.

(b) Moving on to the ARMA(1, 1) model, which includes an autoregressive term and a moving average term, we aim to estimate the parameters ϕ, θ, and the variance of the noise term, σ^2Z. Using the provided formulas, we compute the estimators: ϕ = γX(2) / γX(1), γX(1) = ϕγX(0) + θσ^2Z, and γX(0) = σ^2Z / (1 + (θ + ϕ)^2) / (1 - ϕ^2). Here, γX(0) represents the variance of the data, and γX(1) and γX(2) correspond to the sample autocovariances at lag 1 and lag 2, respectively.

(c) For the ARMA(1, 1) numerical experiment, we load the provided data from Data-ARMA.txt into R. Similar to the previous steps, we compute the Yule-Walker estimators: ϕb, θb, and σb^2Z. By comparing the estimated ϕb with the true value of ϕ, we can evaluate the accuracy of the estimation. Finally, we compare the accuracy of the ϕb estimates between the ARMA(1, 1) and AR(1) models to determine which one provides a more accurate estimation.

To summarize, in this question, we developed Yule-Walker estimators for the AR(1) and ARMA(1, 1) models. We loaded data, calculated sample autocovariances, and used the formulas to estimate the model parameters and the variance of the noise term. Comparisons were made between the estimated values and the true values to evaluate the accuracy of the estimators.

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The solution to the equation is

a) x ≈ 1.8

b) x ≈ 2.6

a) To express 6x = 27 as a logarithm, we need to find the exponent that 6 needs to be raised to in order to equal 27. Taking the logarithm of both sides with base 6, we get log6(6x) = log6(27). Since log6(6x) simplifies to x, the equation becomes x = log6(27). Using a calculator, we find that log6(27) is approximately 1.8 (rounded to one decimal place). Therefore, the solution to the equation is x ≈ 1.8.

b) To express 4x + 2 = 23 as a logarithm, we need to isolate the exponential term. Subtracting 2 from both sides, we get 4x = 21. Next, we can rewrite 4x as (2^2)x, which simplifies to 2^(2x). Taking the logarithm of both sides with base 2, we have log2(2^(2x)) = log2(21). Using the logarithmic property that logb(b^x) = x, the equation becomes 2x = log2(21). Dividing both sides by 2, we find x = (1/2)log2(21). Using a calculator, we evaluate (1/2)log2(21) to be approximately 2.6 (rounded to one decimal place). Thus, the solution to the equation is x ≈ 2.6.

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