The equation of the line through the point (5, -4) perpendicular to the line with equation y = (1/2)x - 28 is y = -2x + 6.
To find the equation of a line perpendicular to another line, we need to determine the slope of the given line and then find the negative reciprocal of that slope.
The given line has the equation y = (1/2)x - 28. Comparing this equation with the standard slope-intercept form, y = mx + b, we can see that the slope of the given line is 1/2.
To find the slope of the line perpendicular to the given line, we take the negative reciprocal of 1/2, which is -2.
Now we have the slope (-2) and the point (5, -4) through which the perpendicular line passes. We can use the point-slope form of a line, y - y1 = m(x - x1), where (x1, y1) is the given point and m is the slope, to find the equation of the perpendicular line. Plugging in the values, we get y - (-4) = -2(x - 5). Simplifying this equation, we have y + 4 = -2x + 10.
Finally, we can rewrite the equation in the standard slope-intercept form, y = mx + b, by isolating y. Subtracting 4 from both sides of the equation, we have y = -2x + 6, which is the equation of the line through the point (5, -4) perpendicular to the given line y = (1/2)x - 28.
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Convert this system to a second order differential equation in y by differentiating the second equation with respect to t and substituting for x from the first equation.
Solve the equation you obtained for y as a function of t; hence find x as a function of t. If we also require x(0)=1 and y(0)=-4, what are x and y?
x(t)=
y(t)=
The second-order differential equation in y is d²y/dt² = 3y + 6t - 1. Solving this equation gives the general solution y(t) = c₁e^(sqrt(6t + 2)t) + c₂e^(-sqrt(6t + 2)t). Substituting the initial conditions x(0) = 1 and y(0) = -4, we can find the specific values of c₁ and c₂ and determine x(t) as a function of t.
To convert the system of equations into a second-order differential equation, we differentiate the second equation with respect to t and substitute for x using the first equation.
Given the system of equations:
1) dx/dt = y + 2t
2) dy/dt = 3x - t
Differentiating equation 2) with respect to t:
d²y/dt² = 3(dx/dt) - dt/dt
= 3(y + 2t) - 1
= 3y + 6t - 1
Now we have a second-order differential equation in terms of y:
d²y/dt² = 3y + 6t - 1
To solve this equation, we need initial conditions. Given x(0) = 1 and y(0) = -4, we can find the particular solution for y(t). Then, we can substitute the solution for y(t) back into the first equation to find x(t).
Solving the differential equation:
d²y/dt² = 3y + 6t - 1
We can solve this second-order linear homogeneous differential equation by assuming a solution of the form y(t) = e^(rt). By substituting this into the differential equation, we find the characteristic equation:
r²e^(rt) = 3e^(rt) + 6te^(rt) - e^(rt)
r² = 3 + 6t - 1
r² = 6t + 2
Solving the characteristic equation, we find two roots:
r₁ = sqrt(6t + 2)
r₂ = -sqrt(6t + 2)
The general solution for y(t) is then given by:
y(t) = c₁e^(sqrt(6t + 2)t) + c₂e^(-sqrt(6t + 2)t)
Now, we can substitute the initial condition y(0) = -4 to find c₁ and c₂:
-4 = c₁e^(sqrt(2) * 0) + c₂e^(-sqrt(2) * 0)
-4 = c₁ + c₂
Now, to find x(t), we substitute the solution for y(t) back into the first equation:
dx/dt = y + 2t
dx/dt = (c₁e^(sqrt(6t + 2)t) + c₂e^(-sqrt(6t + 2)t)) + 2t
Integrating both sides with respect to t, we obtain:
x(t) = ∫ [(c₁e^(sqrt(6t + 2)t) + c₂e^(-sqrt(6t + 2)t)) + 2t] dt
The integration of the right side can be evaluated to find x(t) as a function of t.
Given the initial condition x(0) = 1, we can substitute t = 0 into the equation for x(t) and solve for c₁ and c₂. This will give us the specific values of c₁ and c₂.
Once we have determined the values of c₁ and c₂, we can substitute them back into the expressions for y(t) and x(t) to find the specific solutions for y and x, respectively.
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Determine whether each of the following integers is a prime
a) 33337777
b) 10001
c) 159
d) 498371
The integer which is a prime number is d) 498371.
A prime integer is an integer that can only be divided by 1 and itself.
It is an integer greater than 1 that cannot be formed by multiplying two smaller integers.
We can use the following steps to determine whether the given integers are prime.
Step 1: Divide the integer by the integers greater than 1 and smaller than the integer itself.
Step 2: If the remainder is zero in any case, then the integer is not prime. Otherwise, it is prime.
Determine whether each of the following integers is a prime:
a) Divide 33337777 by integers greater than 1 and less than 33337777.33337777 is divisible by 7, 11, 13, 37, and other integers. Therefore, it is not a prime number.
b) Divide 10001 by integers greater than 1 and less than 10001.10001 is divisible by 73. Therefore, it is not a prime number.
c) Divide 159 by integers greater than 1 and less than 159.159 is divisible by 3, 53. Therefore, it is not a prime number.
d) Divide 498371 by integers greater than 1 and less than 498371.498371 is not divisible by any integer except 1 and 498371. Therefore, it is a prime number.
Thus, the correct answer is d) 498371.
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A house was valued at $110,000 in the year 1987. The value appreciated to $155,000 by the year 2000 Use the compund interest formula S= P(1 + r)^t to answer the following questions A) What was the annual growth rate between 1987 and 2000? r = ____ Round the growth rate to 4 decimal places. B) What is the correct answer to part A written in percentage form? r= ___ %
C) Assume that the house value continues to grow by the same percentage. What will the value equal in the year 2003 ? value = $ ____ Round to the nearest thousand dolliars
A) The annual growth rate is 6.25%.
B) The annual growth rate in percentage form is 6.25%.
C) The value of the house in the year 2003 is $194,000.
Given data: A house was valued at $110,000 in the year 1987.
The value appreciated to $155,000 by the year 2000.
We need to find:
Annual growth rate and percentage form of annual growth rate.
Assuming the house value continues to grow by the same percentage, the value equal in the year 2003 is:
Solution:
A) We have been given the formula to calculate the compound interest:
S = [tex]P(1 + r)^{t}[/tex]
Here, P = 110000 (Initial value in 1987)
t = 13 years (2000 - 1987)
r = Annual growth rate
We have to find the value of r.
S = [tex]P(1 + r)^{t155000 }[/tex]
=[tex]110000(1 + r)^{12} (1 + r)^{13}[/tex]
= 1.409091r
=[tex](1.409091)^{(1/13)}[/tex] - 1r
= 0.0625
= 6.25% (rounded to 4 decimal places)
B) The annual growth rate in percentage form is 6.25%.
C) We can use the formula we used to find the annual growth rate to find the value in the year 2003:
S = [tex]P(1 + r)^{tS}[/tex]
= 155000[tex](1 + 0.0625)^{3S}[/tex]
= 193,891 (rounded to the nearest thousand dollars)
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Simplify the Boolean Expression F= AB'C'+AB'C+ABC
The simplified Boolean expression of F= AB'C'+AB'C+ABC is:
F = A(B'C' + C) + B'C'
To simplify the expression, we can use the following Boolean algebra rules:
Distributive Law:Now, let's simplify the expression:
F = AB'C' + AB'C + ABC
Applying the distributive law to the first two terms:
AB'C' + AB'C = A(B'C' + C)
Now, we can simplify the expression further:
A(B'C' + C) + ABC = A(B'C' + C + BC)
Applying the absorption law to the second term:
B'C' + C + BC = B'C' + C
Therefore, the simplified Boolean expression is:
F = A(B'C' + C) + B'C'
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Suppose c(x) = x3 -24x2 + 30,000x is the cost of manufacturing x items.Find a production level that will minimize the average cost ofmaking x items.
a) 13 items
b) 14 items
c) 12 items
d) 11 items
The correct option is B, the minimum is at 14 items.
How to find the value of x that minimizes the cost?The cost function is given by:
c(x) = x³ - 24x² + 30,000x
The average cost is:
c(x)/x = x² -48x + 30000
The minimum of that is at the vertex of the quadratic, remember that for the general quadratic:
y = ax² + bx + c
The vertex is at:
x = -b/2a
So in this case the minimum is at:
x = 24/(2*1) = 14
So the correct option is B.
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Evaluate the following indefinite integrals using integration by trigonometric substitution.
du/(u² + a²)²
xdx/(1=x)3
dx/ 1 + x
1 - xdx
To evaluate the given indefinite integrals using integration by trigonometric substitution:
1. ∫ du / (u² + a²)²
2. ∫ xdx / (1 - x)³
3. ∫ dx / (1 + x)
4.∫ (1 - x)dx
For the first integral, substitute u = a * tanθ (trigonometric substitution) to simplify the expression. The integral will involve trigonometric functions and can be solved using standard trigonometric identities.
The second integral requires a substitution of x = 1 - t (algebraic substitution). After substitution, simplify the expression and solve the resulting integral.
The third integral can be solved directly by using the natural logarithm function. Apply the integral rule for ln|x| to evaluate the integral.
The fourth integral involves a polynomial expression. Expand the expression, integrate term by term, and apply the power rule of integration to find the result.
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Please solve for JL. Only need answer, not work.
Step-by-step explanation:
Hi
Please mark brainliest ❣️
The answer is 21.4009
Since you don't need workings
a is a geometric sequence where the 9/2 and the 8th term of the sequence is 576. Find the 6th partial sum of the sequence
The 6th partial sum of the given sequence is approximately equal to 306.27.
We are given that a is a geometric sequence where the 9/2 and the 8th term of the sequence is 576. Let the first term be 'a' and the common ratio be 'r'.
Then, according to the given information, we have:
[tex]\[\large \frac{a(r^{9}-1)}{r-1} = \frac{9}{2}\][/tex] ...........(1)
Also,[tex]\[\large ar^{7} = 576\][/tex] ...........(2)
From (2), we have 'a' in terms of 'r' as: [tex]\[\large a = \frac{576}{r^{7}}\][/tex]
Substituting the value of 'a' in equation (1), we get:[tex]\[\large \frac{\frac{576}{r^{7}}(r^{9}-1)}{r-1} = \frac{9}{2}\][/tex]
Simplifying this, we get:[tex]\[\large r^{16}-r^{9}-\frac{64}{27}=0\][/tex]
Now we can solve this quadratic equation to get the value of 'r'.
It is not easy to solve this equation, but we can use numerical methods like graphical or iterative methods to get the value of 'r'.Let's assume the value of 'r' to be 'x'.
Then the 6th term of the sequence will be:
[tex]\[\large ar^{5} = \frac{576x^{5}}{r^{2}}\][/tex]
And the 6th partial sum of the sequence will be:
[tex]\[\large S_{6} = a\frac{1-r^{6}}{1-r} = \frac{576}{r^{7}}\frac{1-x^{6}}{1-x}\][/tex]
The value of 'r' can be approximated to be 1.388, using numerical methods.
Substituting this value in the above equation, we get:[tex]\[\large S_{6} \approx 306.27\][/tex]
Therefore, the 6th partial sum of the given sequence is approximately equal to 306.27.
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1. Consider the complex numbers below. Simplify, give the real and imaginary parts, and convert to polar form. Give the angles in degrees. (6 marks: 3 marks each) (a) √-8+j² (b) (7+j³)² 2. Convert the complex numbers below to Trigonometric form, with the angle 0. Clearly write down what are the values of r and 0 (in radians)? (6 marks: 3 marks each) (a) √3+j (b) √√+j4/3 3. Give the sinusoidal functions in the time domain for the current and voltages below. Simplify your answer. Remember that w 2πf. (6 marks: 3 marks each) (a) √32/30° A, f = 2 Hz, 10 Hz, 200 (b) √8/-60° V, f = 10
(a) The complex numbers to Trigonometric form, Polar form = 3∠90°
(b) The complex numbers to Trigonometric form, Polar form: 50.089∠(-16.699°)
(a) √(-8 + j²) = √(-8 + j(-1))
= √(-8 - 1)
= √(-9)
Since we have a square root of a negative number, the result is an imaginary number
√(-9) = √9 × √(-1) = 3j
Real part: 0
Imaginary part: 3
Polar form: 3∠90° (magnitude = 3, angle = 90°)
(b) (7 + j³)² = (7 + j(-1))² = (7 - j)² = 7² - 2(7)(j) + (j)² = 49 - 14j - 1 = 48 - 14j
Real part: 48
Imaginary part: -14
Polar form: √(48² + (-14)²)∠(-tan^(-1)(-14/48))
Magnitude: √(48² + (-14)²) ≈ 50.089
Angle: -tan^(-1)(-14/48) ≈ -16.699°
Polar form: 50.089∠(-16.699°)
(a) √3 + j
To convert to trigonometric form, we need to find the magnitude (r) and the angle (θ).
Magnitude (r): √(√3)² + 1² = √(3 + 1) = 2
Angle (θ): tan^(-1)(1/√3) ≈ 30° (in degrees) or π/6 (in radians)
Trigonometric form: 2∠30° or 2∠π/6
(b)√√ + j(4/3)
Magnitude (r):
√(√√)² + (4/3)² = √(2 + 16/9) = √(18/9 + 16/9) = √(34/9) = √34/3
Angle (θ):
tan^(-1)((4/3)/(√√))
= tan^(-1)((4/3)/1)
= tan^(-1)(4/3) ≈ 53.13° (in degrees) or ≈ 0.93 radians
Trigonometric form: (√34/3)∠53.13° or (√34/3)∠0.93 radians
(a) Sinusoidal function in the time domain for the current and voltages: (a) √32/30° A, f = 2 Hz, 10 Hz, 200 Hz
The general form of a sinusoidal function is given by:
x(t) = A sin(2πft + φ)
Amplitude (A) = √32/30° A
Frequency (f) = 2 Hz, 10 Hz, 200 Hz
Phase angle (φ) = 0°
Sinusoidal functions:
Current: i(t) = (√32/30°) × sin(2π × 2t)
Voltage: v(t) = (√32/30°) × sin(2π × 2t)
Current: i(t) = (√32/30°) × sin(2π × 10t)
Voltage: v(t) = (√32/30°) × sin(2π × 10t)
Current: i(t) = (√32/30°) × sin(2π × 200t)
Voltage: v(t) = (√32/30°) × sin(2π × 200t)
(b) Sinusoidal function in the time domain for the current and voltage
√8/-60° V, f = 10 Hz
Voltage: v(t) = (√8/-60°) × sin(2π × 10t)
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A. The manager of a small business reported 30 days of profit which revealed that $200 was made on the first day, $210 on the second day, $220 on the third day and so on.
i. Determine the general rule that can be used to find the profit for each day. (2 marks)
ii. What is the difference between the profit made on the 17ℎ and 23 day? (3 marks
) iii. In total, calculate how much profit was made over the course of the 30 days if the profit follows the same pattern throughout the period.
i. The general rule to find the profit for each day can be determined by observing that the profit increases by $10 each day. Therefore, the general rule can be expressed as:
Profit = $200 + ($10 × Day)
ii. To find the difference between the profit made on the 17th and 23rd day, we need to subtract the profit on the 17th day from the profit on the 23rd day. Using the general rule from part i, we can calculate:
Profit on 17th day = $200 + ($10 × 17) = $200 + $170 = $370
Profit on 23rd day = $200 + ($10 × 23) = $200 + $230 = $430
Difference = Profit on 23rd day - Profit on 17th day = $430 - $370 = $60.
iii. To calculate the total profit made over the course of the 30 days, we can use the formula for the sum of an arithmetic series. The first term is $200, the common difference is $10, and the number of terms is 30.
Total Profit = (n/2) * (2a + (n-1)d)
= (30/2) * (2 * $200 + (30-1) * $10)
= 15 * ($400 + 290)
= 15 * $690
= $10,350.
Therefore, the total profit made over the 30-day period following the same pattern is $10,350.
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In APQR, the measure of /R=90°, QP = 85, RQ = 84, and PR = 13. What ratio
represents the sine of ZP?
The ratio of that represents the sine of angle P is 4/5
What is trigonometric ratio?The trigonometric functions are real functions which relate an angle of a right-angled triangle to ratios of two side lengths.
Trigonometric ratios are the ratios of the length of sides of a triangle.
sinθ = opp/hyp
cosθ = adj/hyp
tanθ = opp/adj
Since angle R is the 90° , them QP is the hypotenuse of the triangle and taking angle P as reference, QR is the opposite and PR is the hypotenuse.
sinP = 84/85
therefore, the ratio that represents the sine of angle P is 84/85.
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2 Question 1 (3 points). Let A = (ATA)-¹AT. G¦₁ 0 {]. 1 Calculate the pseudoinverse of A, i.e., 1 0 1 -2
The resulting pseudoinverse of matrix A is: [5 -2; -2 1; -1 2]
To calculate the pseudoinverse of matrix A, we need to follow these steps:
1. Compute the transpose of matrix A: AT
AT = [1 0; 0 1; 1 -2]
2. Multiply A with its transpose: A * AT
A * AT = [1 0 1; 0 1 -2; 1 -2 5]
3. Calculate the inverse of the result from step 2: (A * AT)^(-1)
(A * AT)^(-1) = [5 -2 -1; -2 1 0; -1 0 1]
4. Finally, multiply the result from step 3 with AT: (A * AT)^(-1) * AT
(A * AT)^(-1) * AT = [5 -2 -1; -2 1 0; -1 0 1] * [1 0; 0 1; 1 -2]
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If A is a 3 x 5 matrix, what are the possible values of nullity(A)? (Enter your answers as a comma-separated list.) nullity(A) = Find a basis B for the span of the given vectors. [0 1 -4 1], [7 1 -1 0], [ 4 1 9 1] B =
If A is a 3 x 5 matrix, the possible values of nullity(A) are 0, 1, 2, 3, and 4. It can't be 5. This is because the rank-nullity theorem states that the rank of a matrix plus its nullity is equal to the number of columns of the matrix.
The number of columns in this case is 5.The rank of the matrix is at most 3 since it has only 3 rows. Therefore, the nullity of the matrix is at least 2 (5 - 3 = 2). Hence, nullity(A) = {0, 1, 2, 3, 4}.The given vectors are:[0 1 -4 1], [7 1 -1 0], [ 4 1 9 1]To find a basis B for the span of these vectors, we will first row reduce the matrix containing these vectors as columns:$$\begin{bmatrix}0 & 7 & 4 \\ 1 & 1 & 1 \\ -4 & -1 & 9 \\ 1 & 0 & 1\end{bmatrix} \sim \begin{bmatrix}1 & 0 & 1 \\ 0 & 1 & -1 \\ 0 & 0 & 0 \\ 0 & 0 & 0\end{bmatrix}$$This means that the first two columns of the original matrix form a basis for the span of the given vectors. Therefore, B = {[0 1 -4 1], [7 1 -1 0]}.
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The first two columns of the original matrix form a basis for the span of the given vectors. Therefore, B = {[0 1 -4 1], [7 1 -1 0]}.
If A is a 3 x 5 matrix, the possible values of nullity(A) are 0, 1, 2, 3, and 4. It can't be 5. This is because the rank-nullity theorem states that the rank of a matrix plus its nullity is equal to the number of columns of the matrix.
The number of columns in this case is 5. The rank of the matrix is at most 3 since it has only 3 rows. Therefore, the nullity of the matrix is at least 2 (5 - 3 = 2). Hence, nullity(A) = {0, 1, 2, 3, 4}. The given vectors are: [0 1 -4 1], [7 1 -1 0], [ 4 1 9 1]
To find a basis B for the span of these vectors, we will first row reduce the matrix containing these vectors as columns:
[tex]$$\begin{bmatrix}0 & 7 & 4 \\ 1 & 1 & 1 \\ -4 & -1 & 9 \\ 1 & 0 & 1\end{bmatrix} \sim \begin{bmatrix}1 & 0 & 1 \\ 0 & 1 & -1 \\ 0 & 0 & 0 \\ 0 & 0 & 0\end{bmatrix}$$[/tex]
This means that the first two columns of the original matrix form a basis for the span of the given vectors. Therefore, B = {[0 1 -4 1], [7 1 -1 0]}.
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Find all solutions of the equation in the interval [0, 21). tan²0-2 sec 0 = −1 Write your answer in radians in terms of . If there is more than one solution, separate them with commas. 0 = 0 П 0,0
The solution to the equation tan²θ - 2secθ = -1 in the interval [0, 21) is θ = 0, π.
Interval's equation solutions within [0, 21)?To solve the equation tan²θ - 2secθ = -1 in the interval [0, 21), we'll apply trigonometric identities and algebraic manipulation. First, we'll rewrite secθ as 1/cosθ and substitute it into the equation:
tan²θ - 2/cosθ = -1
Next, we'll convert tan²θ to its equivalent in terms of sin and cos:
(sinθ/cosθ)² - 2/cosθ = -1
Simplifying the equation further, we obtain:
(sin²θ - 2cosθ)/cos²θ = -1
Multiplying through by cos²θ, we have:
sin²θ - 2cosθ = -cos²θ
Rearranging the terms, we get:
sin²θ + cos²θ - 2cosθ = 0
Using the Pythagorean identity sin²θ + cos²θ = 1, we can rewrite the equation as:
1 - 2cosθ = 0
Solving for cosθ, we find:
cosθ = 1/2
Since we're interested in solutions within the interval [0, 21), we need to find the values of θ for which cosθ = 1/2 within this range. The cosine of π/3 and 5π/3 is indeed 1/2. However, only π/3 lies within the interval [0, 21), so it is the solution to the equation.
Hence, the solution to the equation tan²θ - 2secθ = -1 in the interval [0, 21) is θ = π/3.
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Find the x-intercepts (if any) for the graph of the quadratic function. f(x) = (x + 1)² - 1 Select one: O A. (0, 0) and (2, 0) O B. (0, 0) and (-1,0) C. (0, 0) and (-2, 0) O D. (2, 0) and (-2, 0)
(0, 0) and (-2, 0). are the x-intercepts (if any) for the graph of the quadratic function.
The given function is f(x) = (x + 1)² - 1.
We need to find the x-intercepts (if any) for the graph of the quadratic function.
The x-intercepts occur when f(x) = 0.
So we will substitute 0 for f(x) and solve for x.
Let's do this now:f(x) = 0⇒ (x + 1)² - 1 = 0⇒ (x + 1)² = 1⇒ x + 1 = ±√1⇒ x = -1 ± 1
Now, we have two solutions for x: x = -1 + 1 = 0 and x = -1 - 1 = -2
Hence, the x-intercepts are (0, 0) and (-2, 0).
Thus, the correct option is C. (0, 0) and (-2, 0)..
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Let u(x,y)= In(x2 + y2) for any (x,y) # (0,0). Define B₂ ((2,3)) to be the ball whose center is (2,3) and whose radius is 2. Denote JB₂ ((2,3)) to be the boundary of the ball B₂
The function [tex]u(x,y)[/tex] is a harmonic function over the domain (x,y) # (0,0) and B₂ ((2,3)) denotes the ball whose center is (2,3) and whose radius is 2.
Harmonic functions are functions that satisfy the Laplace equation, which is a partial differential equation that appears frequently in various fields such as engineering, physics, and mathematics. The given function [tex]u(x,y)[/tex] is a harmonic function over the domain (x,y) # (0,0). B₂ ((2,3)) denotes the ball whose center is (2,3) and whose radius is 2.
We can say that B₂ ((2,3)) is an open ball, and JB₂ ((2,3)) denotes the boundary of the ball B₂ ((2,3)). The boundary of a ball is a circle with a radius of r, and the center at the origin. In this case, the boundary JB₂ ((2,3)) is the circle of radius 2 centered at (2,3).
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Normal distribution The random variable X is normally distributed with mean 98 and standard deviation 18. Find P(77 < X < 122), giving your answer to 2 decimal places. P(77 < X < 122) = |___
P(77 < X < 122) = 0.85.
To find the probability of a range of values in a normal distribution, we need to calculate the area under the curve between those values. In this case, we want to find the probability that X falls between 77 and 122.
First, we need to standardize the values by converting them into z-scores. The formula for calculating the z-score is (X - μ) / σ, where X is the value, μ is the mean, and σ is the standard deviation.
For 77, the z-score is (77 - 98) / 18 = -1.17, and for 122, the z-score is (122 - 98) / 18 = 1.33.
Using a standard normal distribution table or calculator, we can find that the area to the left of -1.17 is 0.121 and the area to the left of 1.33 is 0.908. To find the area between the two z-scores, we subtract the smaller area from the larger area: 0.908 - 0.121 = 0.787.
Therefore, P(77 < X < 122) = 0.787, rounded to 2 decimal places, is 0.79.
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There are three types of grocery stores in a given community. Within this community there always exists a shift of customers from one grocery store to another. On January 1, 1/4 shopped at store 1, 1/3 at store 2 and 5/12 at store 3. Each month store 1 retains 90% of its customers and loses 10% of them to store 2. Store 2 retains 5% of its customers and loses 85% of them to store 1 and 10% of them to store 3. Store 3 retains 40% of its customers and loses 50% to store 1 and 10% to store 2.
a.) Assuming the same pattern continues, what will be the long-run distribution (equilibrium) of customers among the three stores?
b.)Prove that an equilibrium has actually been reach in part (a)
The long-run distribution (equilibrium) of customers among the three stores will be 7/25, 8/25 and 10/25 or 28%, 32% and 40% respectively.
Let's solve the problem to understand how to arrive at this result. Let's assume that on January 1, there were a total of 12 customers: 3 at store 1, 4 at store 2, and 5 at store 3. As per the question, each month store 1 retains 90% of its customers and loses 10% of them to store 2. Let's use a table to keep track of the monthly shifts. Month123123123Store 1 Current Customers3010 New Customers0.3 (0.9 x 3)0.9 (0.1 x 3)0.27 (0.1 x 3) Total Customers3.33.6 Store 2 Current Customers404 New Customers0.2 (0.05 x 4)3.2 (0.85 x 4)0.4 (0.1 x 4) Total Customers4.64.8 Store 3 Current Customers505 New Customers20 (0.4 x 5)2.5 (0.5 x 5)0.4 (0.1 x 4) Total Customers6.06 The table above shows that by the end of the first month, the total number of customers increased from 12 to 14 and the distribution changed to 10/14, 4/14 and 0. Now let's keep track of the monthly changes. Month123123123Store 1 Current Customers3.33.6 4.0 New Customers0.27 (0.1 x 3)0.36 (0.1 x 4)1.44 (0.1 x 16) Total Customers3.63.96 Store 2 Current Customers4.64.8 4.4 New Customers0.4 (0.1 x 4)0.36 (0.05 x 3 + 0.1 x 4)1.44 (0.05 x 3 + 0.85 x 4 + 0.1 x 5) Total Customers5.45.8 Store 3 Current Customers6.06 5.5 New Customers0.4 (0.1 x 4)1.96 (0.4 x 4 + 0.5 x 5) Total Customers6.86 The table above shows that by the end of the second month, the total number of customers increased from 14 to 16 and the distribution changed to 7/25, 8/25 and 10/25 or 28%, 32% and 40% respectively. (b) Prove that an equilibrium has actually been reach in part (a)We can prove that an equilibrium has been reached in part (a) by showing that no further changes are expected. This can be done by checking if the current distribution of customers will remain the same even if it is used as the starting point for another round of monthly shifts. Let's check this by calculating the expected distribution of customers after another month. Month123123123Store 1 Current Customers3.63.96 4.49 New Customers0.36 (0.1 x 3 + 0.05 x 4)0.4 (0.1 x 4 + 0.05 x 3 + 0.85 x 4 + 0.5 x 5)1.2 (0.05 x 4 + 0.85 x 4 + 0.4 x 4 + 0.1 x 5) Total Customers4.0 4.36 Store 2 Current Customers5.45.8 5.64 New Customers0.36 (0.05 x 3 + 0.1 x 4)0.4 (0.05 x 4 + 0.1 x 3 + 0.85 x 4 + 0.5 x 5)1.2 (0.1 x 3 + 0.85 x 4 + 0.4 x 4 + 0.1 x 5) Total Customers6.08 Store 3 Current Customers6.86 6.06 New Customers1.96 (0.4 x 4 + 0.5 x 5)0.8 (0.5 x 4 + 0.1 x 4) Total Customers8.02
The table above shows that by the end of the third month, the total number of customers increased from 16 to 18 and the distribution changed to 7/25, 8/25 and 10/25 or 28%, 32% and 40% respectively, which is the same as the distribution after the second month. Therefore, an equilibrium has been reached.
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Solve the system of equations using determinants.
-img
A)(0, 15)
B)(5, -5)
C)infinite number of solutions
D)no solution
The solution is:
[tex]x = |A1| / |A| \\= 15 / 4 \\= 3.75y \\= |A2| / |A|\\= 15 / 4 \\= 3.75.[/tex]
Therefore, the answer is A)(0, 15)
The given system of equations is: [tex]y = -3x + 15 y = x[/tex]
The system of equations using determinants can be solved using Cramer's rule:
Here, the coefficient matrix is: [tex]A = [ 1 -1 , 3 1 ][/tex], and the matrix of constants is [tex]B = [ 15, 0 ][/tex]
The determinant of the coefficient matrix is |A| = 1 × 1 - ( -1 ) × 3 = 4.
The determinant obtained by replacing the first column of the coefficient matrix with the matrix of constants is[tex]|A1| = 15 × 1 - 0 × ( -1 ) = 15.[/tex]
The determinant obtained by replacing the second column of the coefficient matrix with the matrix of constants is
|[tex]A2| = 1 × 0 - ( -1 ) × 15 \\= 15.[/tex]
Now, the solution is:
[tex]x = |A1| / |A| \\= 15 / 4 \\= 3.75y \\= |A2| / |A| \\= 15 / 4 \\= 3.75[/tex]
Therefore, the answer is A)(0, 15)
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The sampling distribution of a statistic is:
a. the probability that we obtain the statistic in repeated random samples.
b. the mechanism that determines whether randomization was effective.
c. the distribution of values taken by a statistic in all possible samples of the same sample size.
d. the extent to which the sample results differ systematically from the truth.
e. none of these
The sampling distribution of a statistic is: c. the distribution of values taken by a statistic in all possible samples of the same sample size.
The sampling distribution of a statistic refers to the distribution of values that the statistic takes on when calculated from all possible samples of the same sample size taken from a population. It represents the variability or spread of the statistic's values across different samples. The sampling distribution is important because it allows us to make inferences about the population parameter based on the observed sample statistic. By understanding the distribution of the statistic, we can estimate the parameter and assess the uncertainty associated with our estimation.
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Solve the following
2.1 (D² + 4D + 4)y = 10e-2x
2.2 (D² + 3D + 2)y = x³e¯x
2.3 D²y - 3Dy + 2y = 4ex cosh3x
The first equation has a particular solution y_p = -5e^(-2x), while the second equation has y_p = (1/2)x^3e^(-x). The third equation has y_p = (1/2)ex cosh(3x) as its particular solution.
:
For equation 2.1, we assume a particular solution of the form y_p = Ae^(-2x) and solve for A. Plugging this into the equation, we get A = -5. Thus, the particular solution is y_p = -5e^(-2x). The associated homogeneous equation is (D² + 4D + 4)y = 0, which can be factored as (D + 2)²y = 0. The complementary solution is y_c = (C1 + C2x)e^(-2x), where C1 and C2 are constants determined by initial conditions.
For equation 2.2, we assume a particular solution of the form y_p = Ax^3e^(-x) and solve for A. Substituting this into the equation, we find A = 1/2. Hence, the particular solution is y_p = (1/2)x^3e^(-x). The associated homogeneous equation is (D² + 3D + 2)y = 0, which factors as (D + 2)(D + 1)y = 0. The complementary solution is y_c = (C1e^(-2x) + C2e^(-x)), where C1 and C2 are constants determined by initial conditions.
For equation 2.3, we assume a particular solution of the form y_p = Aex cosh(3x) and solve for A. Substituting this into the equation, we find A = 1/2. Therefore, the particular solution is y_p = (1/2)ex cosh(3x). The associated homogeneous equation is (D² - 3D + 2)y = 0, which factors as (D - 2)(D - 1)y = 0. The complementary solution is y_c = (C1e^2x + C2e^x), where C1 and C2 are constants determined by initial conditions.
In summary, the solutions to the given differential equations involve combining the particular solutions obtained using the method of undetermined coefficients with the complementary solutions obtained from solving the associated homogeneous equations.
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Direction: I have the answer, however, I don't know how to do it. That is why I need you to do it by showing your working.
1. Suppose the lighthouse B in the example is sighted at S30°W by a ship P due north of the church C. Find the bearing P should keep to pass B at 4 miles distance.
Answer: S64°51' W
2. In the fog, the lighthouse keeper determines by radar that a boat 18 miles away is heading to the shore. The direction of the boat from the lighthouse is S80°E. What bearing should the lighthouse keeper radio the boat to take to come ashore 4 miles south of the lighthouse?
Answer: S87.2°E
3. To avoid a rocky area along a shoreline, a ship at M travels 7 km to R, bearing 22°15’, then 8 km to P, bearing 68°30', then 6 km to Q, bearing 109°15’. Find the distance from M to Q.
Answer: 17.4 km
The bearing P should keep to pass B at 4 miles distance is S64°51' W and the distance from M to Q is 17.4 km.
1. To find the bearing P should keep to pass B at 4 miles distance, we can use the formula for finding the bearing between two points.
This formula is based on the Law of Cosines and is given by:
θ = arccos (a² + b² - c²)/2ab
Where a, b, and c are the side lengths of the triangle formed by A, B, and P, and θ is the bearing from A to B.
In this case we have:
a = 4 miles (distance between P and B)
b = 4 miles (distance between C and B)
c = √(8² + 4²) = 6.32 miles (distance between P and C)
Substituting these values in the formula, we get:
θ = arccos (4² + 4² - 6²)/2×(4×4)
θ = arccos(-2.32)/32
θ = S64°51' W
2. To find the bearing the lighthouse keeper should radio the boat to take to come ashore 4 miles south of the lighthouse, we can use the formula for finding the bearing between two points.
This formula is based on the Law of Cosines and is given by:
θ = arccos (a² + b² - c²)/2ab
Where a, b, and c are the side lengths of the triangle formed by A, B, and P, and θ is the bearing from A to B.
In this case we have:
a = 4 miles (distance between lighthouse and P)
b = 18 miles (distance between lighthouse and boat)
c = √(18² + 4²) = 18.24 miles (distance between boat and P)
Substituting these values in the formula, we get:
θ = arccos (42 + 182 - 182.24)/2×(4×18)
θ = arccos(140.76)/72
θ = S87.2°E
3. To find the distance from M to Q, we can use the formula for finding the distance between two points using the Pythagorean Theorem. This formula is given by:
d = √((x2 - x1)² + (y2 - y1)²
Where x1 and y1 are the coordinates of point M, and x2 and y2 are the coordinates of point Q.
In this case, we have:
x1 = 0 km
y1 = 0 km
x2 = 7 km + 8 km + 6 km = 21 km
y2 = 22°15’ + 68°30’ + 109°15’ = 199°60’
Substituting these values in the formula, we get:
d = √((212 - 02)² + (199°60’ - 00)²
d = √(441 + 199.77)
d = 17.4 km
Therefore, the bearing P should keep to pass B at 4 miles distance is S64°51' W and the distance from M to Q is 17.4 km.
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Find the 95% lower confidence bound on the population mean (u) for a sample with =15, X=0.84, and s=0.024 a. None of the answers O b. 0.83 O c. 0.14 O d. 0.24
The correct option is[tex]`b. 0.83`[/tex].Confidence intervals is an interval or range of values for a given parameter that, with a given degree of confidence, contains the true value of that parameter.
The interval can be computed from the sample data. There are different methods of constructing confidence intervals for means; in this answer, we use the t-distribution.The 95% lower confidence bound on the population mean (u) for a sample with `n = 15`, `x = 0.84`, and
`s = 0.024` can be calculated using the following formula:lower bound
=[tex]`x - tα/2 * (s / √n)`[/tex]where `tα/2` is the t-value with `n - 1` degrees of freedom and α/2 area to the left. For a 95% confidence interval with `n - 1 = 14` degrees of freedom,
`tα/2` = 2.145.
Therefore,lower bound = `0.84 - 2.145 * (0.024 / √15)
= 0.820`.
The 95% lower confidence bound on the population mean is 0.820, which is less than the sample mean 0.84. This means that there is strong evidence that the true population mean is greater than 0.820. The correct option is `b. 0.83`.
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You draw a card from a standard deck of cards, put it back, and then draw another card. What is the probability of drawing a diamond and then a black card
Step-by-step explanation:
There are 52 cards 13 are diamonds 26 are black
13 out of 52 times 26 out of 52 =
13/52 X 26/52 = 1/8 = .125
Find the amount that results from the given investment. $300 invested at 12% compounded quarterly after a period of 3 years After 3 years, the investment results in $ (Round to the nearest cent as nee
After a period of 3 years, the investment results in approximately $427.73. To find the amount that results from the given investment, we can use the compound interest formula:
A = [tex]P(1 + r/n)^(nt)[/tex]
Where:
A = the final amount
P = the principal amount (initial investment)
r = the annual interest rate (in decimal form)
n = the number of times interest is compounded per year
t = the number of years
Given:
P = $300
r = 12% or 0.12 (decimal form)
n = 4 (quarterly compounding)
t = 3 years
Substituting the values into the formula:
A =[tex]300(1 + 0.12/4)^(4*3)[/tex]
A = [tex]300(1 + 0.03)^(12)[/tex]
A = [tex]300(1.03)^12[/tex]
Calculating the expression:
A ≈ 300(1.425761)
A ≈ $427.73
Therefore, after a period of 3 years, the investment results in approximately $427.73.
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the range of feasible values for the multiple coefficient of correlation is from ________.
The range of feasible values for the multiple coefficients of correlation is from -1 to 1.
The multiple coefficients of correlation, also known as the multiple R or R-squared, measures the strength and direction of the linear relationship between a dependent variable and multiple independent variables in a regression model. It quantifies the proportion of the variance in the dependent variable that is explained by the independent variables.
The multiple coefficients of correlation can take values between -1 and 1.
A value of 1 indicates a perfect positive linear relationship, meaning that all the data points fall exactly on a straight line with a positive slope.
A value of -1 indicates a perfect negative linear relationship, meaning that all the data points fall exactly on a straight line with a negative slope.
A value of 0 indicates no linear relationship between the variables.
Values between -1 and 1 indicate varying degrees of linear relationship, with values closer to -1 or 1 indicating a stronger relationship. The sign of the multiple coefficients of correlation indicates the direction of the relationship (positive or negative), while the absolute value represents the strength.
The range from -1 to 1 ensures that the multiple coefficients of correlation remain bounded and interpretable as a measure of linear relationship strength.
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"
The graph below is the function f(2) d Determine which one of the following rules for continuity is violated first at I= = 2. Of(a) is defined. O lim f() exists. I-a Olim f(3) = f(a).
The given graph represents the function f(2), and we need to determine the first rule for continuity that is violated at I = 2.Let us first recall the rules of continuity:a function f(x) is continuous at x = a if1. f(a) is defined,2. limx→a exists and is finite,3. limx→a f(x) = f(a).
Now, let us analyze the graph provided. We see that the graph is a curve that approaches (2,3) from both sides, but it is undefined at x = 2. Hence, the function violates the first rule of continuity, i.e., f(a) is not defined, since the value of the function at x = 2 is undefined. Therefore, the correct option is (a) is defined.Continuity is an essential concept in calculus and analysis. It is used to define and understand functions that are differentiable or integrable.
A function is said to be continuous if it does not have any jumps or discontinuities. A function that is not continuous at a point is said to be discontinuous at that point.
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Define predicates as follows: . M(x) = "x is a milk tea" • S(x) = "x is strawberry flavored" • H(x) = "x is a hot drink" The domain for all variables is the drinks at a boba shop. is directly in front of Negate the following statements and simplify them so that the each predicate, and then translate them into English. (a) Ex-M(2) (b) Vx[H(x) A M(x)] (c) 3x[S(2) A-M(x)
Negate the following statements and simplify them:
(a) No milk tea is labeled as 2.
(b) Are all hot drinks also milk tea?
What is the labeling situation of milk tea?In these statements, predicates are used to define properties of drinks at a boba shop. M(x) represents the property of being a milk tea, S(x) represents the property of being strawberry flavored, and H(x) represents the property of being a hot drink. The domain for all variables is the drinks at a boba shop.
(a) The negation of "∃x(M(x)² )" is "¬∃x(M(x)² )," which can be translated to "There is no milk tea that is 2." This statement implies that there is no milk tea with the number 2 associated with it.
(b) The negation of "∀x(H(x)[tex]∧ M(x))[/tex]" is "¬∀x(H(x)[tex]∧ M(x))[/tex]," which can be translated to "Is every hot drink also milk tea?" This statement questions whether every hot drink at the boba shop is also a milk tea.
(c) The negation of "∃x(S(2)[tex]∧ ¬M(x))[/tex]" is "¬∃x(S(2)[tex]∧ ¬M(x))[/tex]," which can be translated to "Is there a strawberry-flavored drink that is not milk tea?" This statement asks whether there exists a drink at the boba shop that is strawberry flavored but not classified as a milk tea.
Predicates are logical statements used to define properties or conditions. They help in expressing relationships between objects and describing specific characteristics. In this context, the predicates M(x), S(x), and H(x) are used to define properties related to milk tea, strawberry flavor, and hot drinks, respectively. The negation of each statement introduces the concept of negating an existential quantifier (∃x) or universal quantifier (∀x). It allows us to express the absence of an object or question the relationship between different properties. By understanding how to negate and simplify statements involving predicates, we gain a deeper insight into logical reasoning and the interpretation of statements within a specific domain.
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(1 point) Find the solution to the boundary value problem: The solution is y = d²y dt² 4 dy dt + 3y = 0, y(0) = 3, y(1) = 8
The solution to the boundary value problem is: y(t) ≈ -6.688e^(-t) + 9.688e^(-3t)
To solve the given boundary value problem, we'll solve the second-order linear homogeneous differential equation and apply the given boundary conditions.
The differential equation is:
d²y/dt² + 4(dy/dt) + 3y = 0
To solve this equation, we'll first find the characteristic equation by assuming a solution of the form y = e^(rt):
r² + 4r + 3 = 0
Simplifying the characteristic equation, we get:
(r + 1)(r + 3) = 0
This equation has two distinct roots: r = -1 and r = -3.
Case 1: r = -1
If we substitute r = -1 into the assumed solution form y = e^(rt), we have y₁(t) = e^(-t).
Case 2: r = -3
Similarly, substituting r = -3 into the assumed solution form, we have y₂(t) = e^(-3t).
The general solution of the differential equation is given by the linear combination of the two solutions:
y(t) = C₁e^(-t) + C₂e^(-3t),
where C₁ and C₂ are constants to be determined.
Next, we'll apply the boundary conditions to find the specific values of the constants.
Given y(0) = 3, substituting t = 0 into the general solution, we have:
3 = C₁e^(0) + C₂e^(0)
3 = C₁ + C₂.
Given y(1) = 8, substituting t = 1 into the general solution, we have:
8 = C₁e^(-1) + C₂e^(-3).
We now have a system of two equations with two unknowns:
3 = C₁ + C₂,
8 = C₁e^(-1) + C₂e^(-3).
Solving this system of equations, we can find the values of C₁ and C₂.
Subtracting 3 from both sides of the first equation, we have:
C₁ = 3 - C₂.
Substituting this expression for C₁ into the second equation:
8 = (3 - C₂)e^(-1) + C₂e^(-3).
Multiplying through by e to eliminate the exponential terms:
8e = (3 - C₂)e^(-1)e + C₂e^(-3)e
8e = 3e - C₂e + C₂e^(-3).
Simplifying and rearranging the terms:
8e - 3e = C₂e - C₂e^(-3)
5e = C₂(e - e^(-3)).
Dividing both sides by (e - e^(-3)):
5e / (e - e^(-3)) = C₂.
Using a calculator to evaluate the left side, we find the approximate value of C₂ to be 9.688.
Substituting this value for C₂ back into the first equation, we have:
C₁ = 3 - C₂
C₁ = 3 - 9.688
C₁ ≈ -6.688.
Therefore, the specific solution to the boundary value problem is:
y(t) ≈ -6.688e^(-t) + 9.688e^(-3t).
The aim of this question was to solve a second-order linear homogeneous differential equation with given boundary conditions. The solution involved finding the characteristic equation, obtaining the general solution by combining the solutions corresponding to distinct roots, and determining the specific values of the constants by applying the boundary conditions.
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1) Given a triangle ABC, such that: BC = 6 cm; ABC = 40° and ACB = 60°. 1) Draw the triangle ABC. 2) Calculate the measure of the angle BAC. 3) The bisector of the angle BAC intersects [BC] in a point D. Show that ABD is an isosceles triangle. 4) Let M be the midpoint of the segment [AB]. Show that (MD) is the perpendicular bisector of the segment [AB]. 5) Let N be the orthogonal projection of D on (AC). Show that DM = DN.
Step-by-step explanation:
1) To draw triangle ABC, we start by drawing a line segment BC of length 6 cm. Then we draw an angle of 40° at point B, and an angle of 60° at point C. We label the intersection of the two lines as point A. This gives us triangle ABC.
```
C
/ \
/ \
/ \
/ \
/ \
/ \
/ \
/_60° 40°\_
B A
```
2) To find the measure of angle BAC, we can use the fact that the angles in a triangle add up to 180°. Therefore, angle BAC = 180° - 40° - 60° = 80°.
3) To show that ABD is an isosceles triangle, we need to show that AB = AD. Let E be the point where the bisector of angle BAC intersects AB. Then, by the angle bisector theorem, we have:
AB/BE = AC/CE
Substituting the given values, we get:
AB/BE = AC/CE
AB/BE = 6/sin(40°)
AB = 6*sin(80°)/sin(40°)
Similarly, we can use the angle bisector theorem on triangle ACD to get:
AD/BD = AC/BC
AD/BD = 6/sin(60°)
AD = 6*sin(80°)/sin(60°)
Since AB and AD are both equal to 6*sin(80°)/sin(40°), we have shown that ABD is an isosceles triangle.
4) To show that MD is the perpendicular bisector of AB, we need to show that MD is perpendicular to AB and that MD bisects AB.
First, we can show that MD is perpendicular to AB by showing that triangle AMD is a right triangle with DM as its hypotenuse. Since M is the midpoint of AB, we have AM = MB. Also, since ABD is an isosceles triangle, we have AB = AD. Therefore, triangle AMD is isosceles, with AM = AD. Using the fact that the angles in a triangle add up to 180°, we get:
angle AMD = 180° - angle MAD - angle ADM
angle AMD = 180° - angle BAD/2 - angle ABD/2
angle AMD = 180° - 40°/2 - 80°/2
angle AMD = 90°
Therefore, we have shown that MD is perpendicular to AB.
Next, we can show that MD bisects AB by showing that AM = MB = MD. We have already shown that AM = MB. To show that AM = MD, we can use the fact that triangle AMD is isosceles to get:
AM = AD = 6*sin(80°)/sin(60°)
Therefore, we have shown that MD is the perpendicular bisector of AB.
5) Finally, to show that DM = DN, we can use the fact that triangle DNM is a right triangle with DM as its hypotenuse. Since DN is the orthogonal projection of D on AC, we have:
DN = DC*sin(60°) = 3
Using the fact that AD = 6*sin(80°)/sin(60°), we can find the length of AN:
AN = AD*sin(20°) = 6*sin(80°)/(2*sin(60°)*cos(20°)) = 3*sin(80°)/cos(20°)
Using the Pythagorean theorem on triangle AND, we get:
DM^2 = DN^2 + AN^2
DM^2 = 3^2 + (3*sin(80°)/cos(20°))^2
Simplifying, we get:
DM^2 = 9 + 9*(tan(80°))^2
DM^2 = 9 + 9*(cot(10°))^2
DM^2 = 9 + 9*(tan(80°))^2
DM^2 = 9 + 9*(cot(10°))^2
DM^2 = 9 + 9*(1/tan(10°))^2
DM^2= 9 + 9*(1/0.1763)^2
DM^2 = 9 + 228.32
DM^2 = 237.32
DM ≈ 15.4
Similarly, using the Pythagorean theorem on triangle ANC, we get:
DN^2 = AN^2 - AC^2
DN^2 = (3*sin(80°)/cos(20°))^2 - 6^2
DN^2 = 9*(sin(80°)/cos(20°))^2 - 36
DN^2 = 9*(cos(10°)/cos(20°))^2 - 36
Simplifying, we get:
DN^2 = 9*(1/sin(20°))^2 - 36
DN^2 = 9*(csc(20°))^2 - 36
DN^2 = 9*(1.0642)^2 - 36
DN^2 = 3.601
Therefore, we have:
DM^2 - DN^2 = 237.32 - 3.601 = 233.719
Since DM^2 - DN^2 = DM^2 - DM^2 = 0, we have shown that DM = DN.