CD is the altitude to side AB of right [tex]\triangle[/tex]ABC, where m[tex]\angle[/tex]ACB = [tex]90^o[/tex] The value of BC is 7.28 units.
What is value?Value in math is a concept that describes the magnitude, or size, of a number. It can refer to absolute value, which is the actual number, or it can refer to relative value, which is the number compared to other numbers. Value is important in math because it is used to compare and measure different quantities. For example, in addition and subtraction, the value of the numbers being added or subtracted determines the answer. In multiplication, the value of the factors determines the product. Value is also important for performing calculations, such as finding averages, which requires knowledge of numbers and their relative values.
The given triangle is a right triangle, with ∠acb as the right angle. Using the Pythagorean Theorem, we can find the length of the side BC. The Pythagorean Theorem states that the square of the hypotenuse (the longest side) is equal to the sum of the squares of the other two sides.
Therefore, BC² = AC² + BD²
Substituting the given values in the equation,
BC² = 52 + (5 1/3)²
Simplifying the equation,
BC² = 25 + 27.69
Therefore, BC² = 52.69
Taking the square root of both sides,
BC = √52.69
Therefore, BC = 7.28 units.
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Consider the series
∑n=1[infinity]an=(x−6)^3+((x−6)^6)/(3⋅2!)+((x−6)^9)/(9⋅3!)+((x−6)^12)/(27⋅4!)+⋯
Find an expression for an.
The final expression for the nth term of the series is an = [tex]((x-6)^3 * 3! * (x-6)^{(3n-6))}/(3^{(n-1)} * (3n-3)(3n-4)(3n-5)...(6)(5)(4)(3)(2))[/tex].
To find an expression for an, we first need to notice that each term in the series is a power of (x-6) raised to a multiple of 3, divided by the product of that multiple and the factorial of that multiple divided by 3. In other words, the general term of the series can be written as:
an = [tex]((x-6)^{(3n-3))}/((3n-3)!(3^{(n-1)))[/tex]
We can simplify this expression by factoring out [tex](x-6)^3[/tex] from the numerator:
an = [tex]((x-6)^3 * (x-6)^{(3n-6))}/((3n-3)!(3^{(n-1)))[/tex]
Now we can simplify further by using the formula for the product of consecutive integers:
(3n-3)! = (3n-3)(3n-4)(3n-5)...(6)(5)(4)(3)(2)(1)
We can rewrite this expression as:
(3n-3)! = [(3n-3)(3n-4)(3n-5)...(6)(5)(4)(3)(2)] / (3⋅2)
Notice that the denominator is equal to 3⋅2!, which is exactly what we need in the denominator of our original expression. Therefore, we can substitute this new expression for (3n-3)! in our original expression for an:
an = [tex]((x-6)^3 * (x-6)^{(3n-6))}[/tex]/([(3n-3)(3n-4)(3n-5)...(6)(5)(4)(3)(2)] / (3⋅2))
Simplifying this expression, we get:
an = [tex]((x-6)^3 * 3! * (x-6)^{(3n-6))}/(3^{(n-1)} * (3n-3)(3n-4)(3n-5)...(6)(5)(4)(3)(2))[/tex]
This is our final expression for the nth term of the series.
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Determine the equation of the ellipse with center (10,-8), a focus at (10, -14),
and a vertex at (10, -18).
Answer:
(x -10)²/64 +(y +8)²/100 = 1
Step-by-step explanation:
You want the equation of the ellipse with center (10,-8), a focus at (10, -14), and a vertex at (10, -18).
AxesThe length of the semi-major axis is the distance between the center and the give vertex: a = -8 -(-18) = 10 units.
The distance from the center to the focus is -8 -(-14) = 6.
The distance from the center to the covertex is the other leg of the right triangle with these distances as the hypotenuse and one leg.
b = √(10² -6²) = √64 = 8 . . . . units
EquationThe equation for the ellipse with semi-axes 'a' and 'b' with center (h, k) is ...
(x -h)²/b² +(y -k)²/a² = 1
(x -10)²/64 +(y +8)²/100 = 1
__
Additional comment
The center, focus, and given vertex are all on the vertical line x=10, This means the major axis is in the vertical direction, and the denominator of the y-term will be the larger of the two denominators.
You will notice the center-focus-covertex triangle is a 3-4-5 right triangle with a scale factor of 2.
convert the integral =∫1/2√0∫1−2√32 32 to polar coordinates, getting ∫∫ℎ(,),
The Polar cordinates is ∫∫h(ρ, θ) = ∫(0 to 2√32)∫(0 to π/4) ρ dρ dθ.
To convert the given integral to polar coordinates, follow these steps:
1. Identify the Cartesian integral bounds: x ranges from 1/2√0 to 1 and y ranges from 1 - 2√32 to 32.
2. Determine the polar integral bounds: ρ ranges from 0 to 2√32, and θ ranges from 0 to π/4 (as the angle θ increases from 0 to π/4, the polar curve covers the region of interest).
3. Express the integrand in polar coordinates: The Jacobian of the polar coordinate transformation is ρ, so the integrand becomes ρ.
4. Write the integral in polar coordinates: ∫(0 to 2√32)∫(0 to π/4) ρ dρ dθ.
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At a bus stop you can take bus A or bus B. Bus A passes 10 minutes after bus B has passed, whereas bus B passes 20 minutes after bus 1 has passed. How long will you wait on average to get on a bus at the bus stop?
On average, an individual waiting at the bus stop will wait 15 minutes to get on a bus.
What is time?Time in mathematics is a concept that is used to measure and record the passing of events. It is used to measure the duration between two events. Time is also used to measure the rate of change of a certain quantity over time. Time is expressed as a numerical quantity, such as seconds, minutes, hours, days, weeks, months, and years, and can be measured in increments such as fractions of a second, milliseconds, and nanoseconds. In mathematics, time is often represented using the Cartesian coordinate system, with the x-axis representing the passing of time and the y-axis representing the value of the quantity being measured.
The average wait time at the bus stop is 15 minutes. This is because Bus A and Bus B pass in a 30-minute cycle. Bus A passes 10 minutes after Bus B has passed, and Bus B passes 20 minutes after Bus A has passed. Therefore, an individual waiting at the bus stop will wait an average of 15 minutes to get on a bus.
To calculate this average wait time, we can use the following formula:
AverageWaitTime = (TimeBusAPasses + TimeBusBPasses) / 2
Using the given information, we can plug in the values for each bus:
AverageWaitTime = (10 minutes + 20 minutes) / 2
AverageWaitTime = 15 minutes
Therefore, on average, an individual waiting at the bus stop will wait 15 minutes to get on a bus.
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identify the line of discontinuity: f ( x , y ) = ln | x y | f(x,y)=ln|x y|
The function f(x,y) has a line of discontinuity along the x-axis (i.e., y=0) and the y-axis (i.e., x=0).
What is function?
In mathematics, a function is a relationship between two sets of elements, called the domain and the range, such that each element in the domain is associated with a unique element in the range. In simpler terms, a function is a set of rules that takes an input value and produces a corresponding output value.
The function f(x,y) = ln|xy| is discontinuous along the lines x=0 and y=0.
To see this, consider approaching the origin along different paths. For example, if we approach the origin along the x-axis (i.e., y=0), then we have f(x,0) = ln|0|, which is undefined. Similarly, if we approach the origin along the y-axis (i.e., x=0), then we have f(0,y) = ln|0|, which is also undefined.
Therefore, the function f(x,y) has a line of discontinuity along the x-axis (i.e., y=0) and the y-axis (i.e., x=0).
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The function f(x,y) has a line of discontinuity along the x-axis (i.e., y=0) and the y-axis (i.e., x=0).
What is function?
In mathematics, a function is a relationship between two sets of elements, called the domain and the range, such that each element in the domain is associated with a unique element in the range. In simpler terms, a function is a set of rules that takes an input value and produces a corresponding output value.
The function f(x,y) = ln|xy| is discontinuous along the lines x=0 and y=0.
To see this, consider approaching the origin along different paths. For example, if we approach the origin along the x-axis (i.e., y=0), then we have f(x,0) = ln|0|, which is undefined. Similarly, if we approach the origin along the y-axis (i.e., x=0), then we have f(0,y) = ln|0|, which is also undefined.
Therefore, the function f(x,y) has a line of discontinuity along the x-axis (i.e., y=0) and the y-axis (i.e., x=0).
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compute the laplace transform of f(t) f(t)={0 if 0
The Laplace transform of f(t) can be computed using the integral formula and the exponential integral, and is given by [tex]-Ei(-(s+2))[/tex] for [tex]Re(s) > -2[/tex].
To compute the Laplace transform of a function, we first need to define the function and then apply the Laplace transform integral formula. In this case, we have:
f(t) = { 0 if [tex]t < 0, e^(-2t)[/tex] if [tex]t >= 0[/tex]}
The Laplace transform of this function can be computed using the integral formula:
F(s) = L{f(t)} = ∫[0, ∞)[tex]e^(-st) f(t) dt[/tex]
where s is a complex variable.
Using the definition of f(t) and splitting the integral into two parts, we can write:
F(s) = ∫[0, ∞) [tex]e^(-st) e^(-2t) dt[/tex]
To evaluate this integral, we can use integration by substitution, letting u = (s+2)t. Then, du/dt = s+2 and dt = du/(s+2). Substituting in the integral, we get:
F(s) = ∫[0, ∞) [tex]e^(-u) du/(s+2)[/tex]
Using the definition of the exponential integral, Ei(x) = - ∫[-x, ∞) [tex]e^(-t)/t dt[/tex], we can write:
F(s) = -Ei(-(s+2))
Therefore, the Laplace transform of f(t) is given by:
F(s) = { -Ei(-(s+2)) if Re(s) > -2, ∞ if Re(s) <= -2 }
where Re(s) denotes the real part of s.
In summary, the Laplace transform of f(t) can be computed using the integral formula and the exponential integral, and is given by -Ei(-(s+2)) for Re(s) > -2.
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Rate data often follow a lognormal distribution Average power usage (dB per hour) for a particular company is studied and is known to have a lognormal distribution with parameters 4 and ơ-2. what is the mean power usage (average db per hour)? what is the variance?
Therefore, the variance of the lognormal distribution for this company is approximately 322196.29 (dB/hour)^2.
To find the mean power usage (average dB per hour) for a lognormal distribution with parameters 4 and ơ-2, we use the formula:
[tex]Mean = e^{u+ o^{2/2}}\\=e^{u+o}[/tex]
where μ is the mean of the logarithm of the data (in this case, μ = 4) and σ is the standard deviation of the logarithm of the data (in this case, σ = -2).
Substituting the values, we get:
Mean = [tex]e^{(4 + (-2)^{2/2}}
= e^{(4 + 2)}
= e^6[/tex]
≈ 403.43 dB/hour
Therefore, the mean power usage for this company is approximately 403.43 dB per hour.
To find the variance of the lognormal distribution, we use the formula:
[tex]Variance = (e^{o^2} - 1) * e^{2u + o^2}[/tex]
Substituting the values, we get:
[tex]Variance = (e^(-2) - 1) * e^(2*4 + (-2)^2)\\ = (1/e^2 - 1) * e^(8 + 4)\\ = (1/7.389 - 1) * e^{1/2}\\ = 322196.29[/tex]
Therefore, the variance of the lognormal distribution for this company is approximately 322196.29 (dB/hour)^2.
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A survey of 1000 adults in the US conducted in March 2011 asked "Do you favor or oppose 'sin taxes' on soda and junk food? The proportion in favor of taxing these foods was 32 %.
(a) Find a 90% confidence interval for the proportion of US adults favoring taxes on soda and junk food.
(b) What is the margin of error?
(c) If we want a margin of error of only 1% (with 90% confidence), what sample size is needed?
(a) A 90% confidence interval for the proportion of US adults favoring taxes on soda and junk food is (0.293, 0.347).
(b) The margin of error is 2.7%.
(c) To achieve a 1% margin of error with 90% confidence, a sample size of 6,811 is needed.
(a) To find the 90% confidence interval, use the formula CI = p ± Z * √(p(1-p)/n), where p is the proportion, Z is the Z-score for 90% confidence (1.645), and n is the sample size.
p = 0.32, n = 1000
CI = 0.32 ± 1.645 * √(0.32(1-0.32)/1000) = (0.293, 0.347)
(b) The margin of error is half the width of the confidence interval.
Margin of error = (0.347 - 0.293) / 2 = 0.027 or 2.7%.
(c) To find the needed sample size for a 1% margin of error, use the formula n = (Z²* p * (1-p)) / E², where E is the desired margin of error (0.01).
n = (1.645² * 0.32 * (1-0.32)) / 0.01² = 6810.8, rounding up to 6,811.
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Which sign makes the statement true?
5.71 x 10^-6 ___ 5.71 x 10^-8
>,<, =
5.71 x [tex]10^{-6}[/tex] > 5.71 x [tex]10^{-8}[/tex] becomes a true statement.
To compare 5.71 x [tex]10^{-6}[/tex] and 5.71 x [tex]10^{-8}[/tex], we can rewrite them with the same exponent (since the base is the same):
5.71 x [tex]10^{-6}[/tex] = 0.00000571
5.71 x [tex]10^{-8}[/tex] = 0.0000000571
Now we can see that 0.00000571 is greater than 0.0000000571, so:
5.71 x [tex]10^{-6}[/tex] > 5.71 x [tex]10^{-8}[/tex]
Therefore, the sign that makes the statement true is > (greater than).
What is an exponent?
An exponent is a mathematical notation that indicates the number of times a quantity is multiplied by itself. It is usually written as a small raised number to the right of a base number, such as in the expression "3²" where 3 is the base and 2 is the exponent. The exponent tells us how many times to multiply the base by itself.
For example, 3² means "3 raised to the power of 2" or "3 squared" and is equal to 3 × 3 = 9. Similarly, 2³ means "2 raised to the power of 3" or "2 cubed" and is equal to 2 × 2 × 2 = 8.
Exponents are commonly used in algebra and other branches of mathematics to simplify expressions and to represent very large or very small numbers in a compact way. They are also used in scientific notation to represent numbers in a format that is easier to work with than writing out all the digits of the number.
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1) Suppose that a group of U.S. election reformers argues that switching to a system based on proportional representation (PR) would significantly increase turnout. Skeptics claim that the reform would not have a significant effect on turnout. The following table, which reports mean turnouts and accompanying standard errors for PR and non-PR countries, will help you determine which side— the reformers or the skeptics— is more correct.Electoral system Mean turnout Standard errorPR 69.5 1.9Non-PR 61.2 1.7a) State the null hypothesis for the relationship between type of electoral system (PR/ non-PR) and turnout.b) (i) Calculate and write down the 95 percent confidence intervals for turnouts in PR and non-PR countries. (ii) Based on a comparison of the 95 percent confidence intervals, should the null hypothesis be rejected or not be rejected? (iii) Explain how you know.c) (i) Calculate and write down the mean difference between PR and non-PR countries. (ii) What is the standard error of the difference between the PR mean and the non-PR mean? (iii) Does the mean difference pass the eyeball test of significance? (iv) Explain how you know.
a. null hypothesis [tex]H_0[/tex]: PRmean=non-PRmean
b. the sample mean lies in the interval, so we fail to reject null hypothesis
c. critical value z(0.05)=1.96 is less than calculated z=3.56 so we fail to accept null hypothesis.
What is null hypothesis?A null hypothesis states that there is no statistical significance to be discovered in the set of presented observations. The validity of a theory is assessed through hypothesis testing on sample data. Sometimes known as the "null," it is represented by the symbol [tex]H_0[/tex].
(a)
null hypothesis [tex]H_0[/tex]: PRmean=non-PRmean
(b).
i. [tex](1-\alpha)\times 100\%[/tex] confidence interval for sample
[tex]mean=mean \pm z(\frac{\alpha }{2} )*SE(mean)[/tex]
95% confidence interval for sample PRmean=PRmean±z(.05/2)*SE(mean)=69.5±1.96*1.9
=69.5±3.724=(65.776,73.224)
95% confidence interval for sample non-PRmean=non-PRmean±z(.05/2)*SE(mean)=61.2±1.96*1.7
=69.5±3.332=(57.868, 64.532)
ii. null hypothesis not be rejected
iii. since the sample mean lies in the interval, so we fail to reject null hypothesis
(c).
i. mean difference=69.5-61.5=8
ii. SE(difference)=[tex]\sqrt{SE(PR)^2+SE(non-PR)^2}[/tex]
[tex]=\sqrt{1.9\times 1.9+1.2\times 1.2}[/tex]
=2.2472
iii. we use z-test and z=(mean difference)/SE(difference)=8/2.2472=3.56
iv. here level of significance alpha is not mentioned,
let [tex]\alpha[/tex] =0.05
critical value z(0.05)=1.96 is less than calculated z=3.56 so we fail to accept null hypothesis.
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In a class of 30 students, 5 have a cat and 18 have a dog. There are 10 students who
do not have a cat or a dog. What is the probability that a student chosen randomly
from the class has a cat or a dog?
when you add all the answers up and divide by 2 is your answer
Answer:
P=17/30
Step-by-step explanation:
I. Convert the equation to polar form. (Use variables r and θ as needed.) x=3
J. Convert the equation to polar form. (Use variables r and θ as needed.) x^2 − y^2 = 9
The following parts can bee answered by the concept of polar form.
I. The polar form of the equation x=3 is r = 3/cos θ.
J. The polar form of the equation x² − y² = 9 is r = 3/√(cos(2θ)) or r = -3/√(cos(2θ)).
I. To convert the equation x=3 to polar form, we need to express x and y in terms of r and θ. Since x is a constant, we can write x = r cos θ. Substituting x=3, we get 3 = r cos θ. Solving for r, we have r = 3/cos θ.
Therefore, the polar form of the equation x=3 is r = 3/cos θ.
J. To convert the equation x² − y² = 9 to polar form, we can use the identity x = r cos θ and y = r sin θ. Substituting these expressions into the equation, we get r² cos² θ - r² sin² θ = 9. Simplifying, we get r² (cos² θ - sin² θ) = 9. Using the identity cos² θ - sin² θ = cos(2θ), we get r² cos(2θ) = 9. Solving for r, we have r = ±3/√(cos(2θ)).
Therefore, the polar form of the equation x² − y² = 9 is r = 3/√(cos(2θ)) or r = -3/√(cos(2θ)).
Therefore,
I. The polar form of the equation x=3 is r = 3/cos θ.
J. The polar form of the equation x² − y² = 9 is r = 3/√(cos(2θ)) or r = -3/√(cos(2θ)).
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is y= 8x^2-10 a function and how do i prove it?
Yes , y = 8x² - 10 is a function .
What is a linear equation in mathematics?
A linear equation in algebra is one that only contains a constant and a first-order (direct) element, such as y = mx b, where m is the pitch and b is the y-intercept.
Sometimes the following is referred to as a "direct equation of two variables," where y and x are the variables. Direct equations are those in which all of the variables are powers of one. In one example with just one variable, layoff b = 0, where a and b are real numbers and x is the variable, is used.
y = 8x² - 10
the graph attached below
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evaluate dy for the given values of x and dx. y = cosπx, x = 1 3 , dx = −0.02.
The derivative of the function y = cosπx at x = 1 is 0.02sinπ(1) - 0.02sinπ(0.98).
What is function?Function is a block of code that performs a specific task. It is a self-contained unit of code that takes inputs, performs certain operations, and returns an output. Functions are often used to reduce code repetition and increase code readability. It is also used to make programs more efficient and easier to maintain.
Using the definition of the derivative, we can calculate dy by taking the limit as dx approaches 0.
dy = lim dx→0 (cosπ(1 + dx) - cosπ(1))/dx
= lim dx→0 (cosπ(1 - 0.02) - cosπ(1))/(-0.02)
= lim dx→0 (cosπ(0.98) - cosπ(1))/(-0.02)
= lim dx→0 (-(cosπ(1) - cosπ(0.98))/-0.02)
= lim dx→0 (0.04sinπ(1) - 0.04sinπ(0.98))/0.02
= lim dx→0 (0.04sinπ(1) - 0.04sinπ(0.98))/0.02
= (0.04sinπ(1) - 0.04sinπ(0.98))/0.02
= 0.02sinπ(1) - 0.02sinπ(0.98)
Therefore, dy = 0.02sinπ(1) - 0.02sinπ(0.98).
This calculation shows that the derivative of the function y = cosπx at x = 1 is equal to 0.02sinπ(1) - 0.02sinπ(0.98). This result is consistent with the definition of the derivative, which states that the derivative is the rate of change of a function with respect to its independent variable. In this case, the rate of change of the cosine function with respect to x is 0.02sinπ(1) - 0.02sinπ(0.98).
In conclusion, the derivative of the function y = cosπx at x = 1 is 0.02sinπ(1) - 0.02sinπ(0.98).
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A guy connects top of an antenna to a point on the level ground 7 feet from the base of the antenna the angle of elevation formed by this wire is 75 degrees
Answer:
Step-by-step explanation:
We can use trigonometry to solve this problem. Let's call the height of the antenna h and the length of the wire connecting the top of the antenna to the ground d.From the problem statement, we know that d = 7 feet and the angle of elevation θ is 75 degrees. The angle of elevation is the angle between the horizontal and the line of sight to the top of the antenna.We can use the tangent function to find h:tan(θ) = opposite / adjacentIn this case, the opposite side is the height of the antenna h, and the adjacent side is the length of the wire d + 0. This is because the wire touches the ground at a point 7 feet away from the base of the antenna, so the total length of the wire is d + 0.Substituting the values we have:tan(75 degrees) = h / (7 feet + 0)Simplifying:h = (7 feet) × tan(75 degrees)Using a calculator:h ≈ 24.16 feetTherefore, the height of the antenna is approximately 24.16 feet.
The digits 0 through 9 are written on slips of paper (both O and 9 are included). An experiment consists of randomly selecting one numbered slip of paper. Event A: obtaining a prime number Event B: obtaining an odd number (Select 1 BEST answer) Events A and B are OA. mutually exclusive OB. complementary O c. non-mutually exclusive
Events A and B are mutually exclusive.
Prime numbers are numbers that are greater than 1 and have only two distinct positive divisors, which are 1 and the number itself. In this case, the prime numbers among the digits 0 through 9 are 2, 3, 5, and 7, as they are not divisible by any other number within the given range.
Odd numbers are numbers that are not divisible by 2, meaning they have a remainder of 1 when divided by 2. In this case, the odd numbers among the digits 0 through 9 are 1, 3, 5, 7, and 9.
Upon comparing the prime numbers (2, 3, 5, 7) and odd numbers (1, 3, 5, 7, 9) within the range of 0 through 9, it is evident that the numbers 3 and 5 are common to both events A and B, as they are both prime and odd.
Mutually exclusive events refer to events that cannot occur simultaneously. If one event occurs, the other cannot occur at the same time. In this case, event A (obtaining a prime number) and event B (obtaining an odd number) are mutually exclusive, as the numbers 3 and 5 are the only numbers that satisfy both events, and only one outcome can occur.
Therefore, events A and B are mutually exclusive, as they cannot occur simultaneously.
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A boat is heading towards a lighthouse, whose beacon-light is 126 feet above the water. The boat’s crew measures the angle of elevation to the beacon, 13∘
What is the ship’s horizontal distance from the lighthouse (and the shore)? Round your answer to the nearest tenth of a foot if necessary.
The ship’s horizontal distance from the lighthouse is approximately 480.1 feet.
To solve it, we can make use of the tangent function.
Let x represent the horizontal separation between the boat and the lighthouse.
The lighthouse beacon is then at the top of the triangle, the boat is at the bottom, and the adjacent side is the horizontal distance x. 13° is the elevation angle, which is the angle perpendicular to x. The 126-foot height of the lighthouse beacon above the water is on the opposing side.
tan(13°) = [tex]\frac{126}{x}[/tex]
Multiplying both sides by x, we get:
x × tan(13°) = 126
Dividing both sides by tan(13°), we get:
x = [tex]\frac{126}{tan(13)}[/tex]
Using a calculator, we find:
x ≈ 480.1 feet
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are the two triangles similar?
Step-by-step explanation:
Angles R and D are the same just as RSW is to ESD
what is the surface area of the net of the cylinder shown?
Answer:
=715.92ft-2
Step-by-step explanation:
first find the area of the two circles by 2πr-2
then find the perimeter of one circle and use it as length and multiply it with 13ft and add the areas to get the answer
evaluate the integral by making an appropriate change of variables. double integral (x y)8e^x^2 y^2da, where r is the rectangle enclosed by the lines x-y=0, x-y=2, x y=0, and x y=3
The value of the integral is approximately 106.438.
To evaluate the integral, we can make the substitution u = x² and v = y². Then, we have the Jacobian of the transformation as J = 2xy.
Next, we need to find the new limits of integration for u and v.
When x-y=0, we have u - v = 0, so u = v. When x-y=2, we have u - v = 2, so u = v + 2. When xy=0, either u or v must be 0. When xy=3, we have u × v = 3.
Converting these limits of integration to u and v, we have:
0 <= v <= 3/u
v <= u <= v+2
Using the Jacobian and the change of variables, the original integral becomes:
double integral (x y)8e^x² y²da = double integral (uv)8e^(u+v) × 2√(uv) dudv
Integrating with respect to u first, we get:
integral from v to v+2 of [16√(v) × e^(u+v)] du
Using integration by parts, we can evaluate this integral to get:
16sqrt(v) × (e^(2v) - e^v)
Then, integrating with respect to v, we get:
integral from 0 to 3/u of [16sqrt(v) × (e^(2v) - e^v)] dv
This integral can be evaluated using integration by parts again, and we get:
32/3 × (u^(3/2) - 1/e × u^(3/2))
Finally, substituting back in for u and v, we have:
integral from 0 to 3 of [32/3 × (x^3/2 - 1/e × x^3/2)] dx
This can be evaluated using basic calculus, and the final answer is:
(32/3) × (27/2 - 2/e)
Therefore, the value of the integral is approximately 106.438.
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Let’s assume that you have a project completion time of 60 days. A non-critical task with 5 days of slack was delayed 10 days? What can be the new project completion time? (Select all apply)
i.60
ii.65
iii.70
iv.55
You have a project completion time of 60 days, and a non-critical path with 5 days of slack was delayed by 10 days. The correct answer is option ii. 65. The new project completion time after the delay of the non-critical task is 65 days.
To determine the new project completion time, follow these steps:
1. Determine the impact of the delay on the project completion time:
Since the non-critical path has 5 days of slack, it means that it can be delayed by up to 5 days without affecting the project completion time. However, the task was delayed by 10 days, which is 5 days more than its slack.
2. Calculate the new project completion time:
To find the new project completion time, add the extra delay (5 days) to the original project completion time (60 days).
New project completion time = Original project completion time + Extra delay
New project completion time = 60 days + 5 days
New project completion time = 65 days
So, the new project completion time is 65 days.
Based on the given options:
i. 60 - Incorrect, as the delay affects the project completion time.
ii. 65 - Correct, as calculated above.
iii. 70 - Incorrect, as the delay is not long enough to push the project completion time to 70 days.
iv. 55 - Incorrect, as the delay increases the project completion time, not decreases it.
Therefore, the correct answer is option ii. 65. The new project completion time after the delay of the non-critical path is 65 days.
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a mass weighing 2 n is attached to a spring whose spring constant is 4 n/m. what is the period of simple harmonic motion? (Use
g = 9.8 m/s2
for the acceleration due to gravity.)
s
For this mass and spring system, the period of the simple harmonic motion is 1.42 seconds.
The period of simple harmonic motion can be calculated using the formula T = 2π√(m/k), where T is the period, m is the mass, and k is the spring constant.
In this case, the mass is 2 N, which is equivalent to 0.204 kg (using g = 9.8 m/s^2). The spring constant is 4 N/m.
So, plugging the values into the formula, we get:
T = 2π√(0.204 kg/4 N/m)
T = 2π√(0.051 m)
T = 2π(0.226 s)
T = 1.42 s
Therefore, the period of simple harmonic motion for this mass and spring system is 1.42 seconds.
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The dimensions of a rectangle are 5 inches by 3 inches. The rectangle is dilated by a scale factor such that the area of the new rectangle is 135 square inches. Find the scale factor
Answer:
9
Step-by-step explanation:
Find the area of the rectangle. 5 x 3 = 15
Because the dilated area is 135, all you have to do it 135 divided by 15 which gives you 9!
Write out the joint probability for the following sentence using the chain rule: p(There, is, only, one, person, who, is, not, ordinary) Write out the probability above using the second-order Markov assumption.
Each conditional probability is computed based on the two preceding words. For example, we can write: p(is|There) = p(is|There, _)
Define term probability?Assuming that we are working with a corpus of text and that the probabilities are based on the frequency of co-occurring words, we can use the chain rule to write the joint probability as:
p(There, is, only, one, person, who, is, not, ordinary) = p(There) × p(is|There) × p(only|There is) × p(one|is only) × p(person|only one) × p(who|one person) × p(is|person who) × p(not|who is) × p(ordinary|is not)
To compute this joint probability using the second-order Markov assumption, we would need to consider the probabilities of words given the two previous words. We can write this as:
p(There, is, only, one, person, who, is, not, ordinary) = p(There) × p(is|There) × p(only|There is) × p(one|is only) × p(person|only one) × p(who|one person) × p(is|person who) × p(not|who is) × p(ordinary|is not)
where each conditional probability is computed based on the two preceding words. For example, we can write: p(is|There) = p(is|There, _)
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You are making a canvas frame for a painting. The rectangular painting will be 18 inches long and 24 inches wide. Using a yardstick,
how can you be certain that the corners of the frame are 90° ?
The corners of the frame are 90°
How can you be certain that the corners of the frame are 90°You should recall that a right triangle is an orthogonal triangle in which one angle is 90°. The sides of a right triangle are commonly referred to with the variables a, b, and c, where c is the hypotenuse and a and b are the lengths of the shorter sides. Their angles are also typically referred to using the capitalized letter corresponding to the side length.
Let the corners of the canvas frame be right angle triangles
the AB² = aC² + BC²
THE AB = AC = √18²+24²
⇒ AC =√324 + 576
This means that Ac = √900
AC = 30
Therefore fore when the ruler measure 30 inches feet on the diagonal, the angle of the frame is a right angle
If the sides of a right angle are A,B and the hypothenuse is C
The A² + B² = C²
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let f(x)=(5)x 12. evaluate f(0) without using a calculator. do not include f(0) in your answer.
To evaluate f(0) for the function f(x) = (5)x + 12, we need to substitute 0 for x in the equation.
This gives us f(0) = (5)(0) + 12.
In the second step, we need to multiply 5 by 0, which gives us 0.
Therefore, the expression simplifies to f(0) = 0 + 12.
Finally, we add 0 and 12 to get the value of f(0). This gives us f(0) = 12.
Therefore, the value of the function at x = 0 is 12.
It's important to note that when we substitute a value for a variable in a function, we are evaluating the function at that particular value.
In this case, we evaluated f(x) at x=0, and found that the value of the function at x=0 is 12.'
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in problems 63–70 use the laplace transform to solve the given initial-value problem. y'+y=f(t), y(0)=0, where. f(t) = {1, 0 ≤t<0. -1, t≥1
The solution to the initial-value problem is y(t) = sin(t) - [e^(-πt) - e^(-2πt)] × u(t-π)/2, 0 ≤ t < ∞.
To solve this initial-value problem using Laplace transform, we will apply the Laplace transform to both sides of the differential equation and use the initial conditions to find the Laplace transform of y.
Taking the Laplace transform of both sides of the differential equation, we get
Ly'' + Ly = Lf(t)
Using the properties of Laplace transform, we can find Ly' and Ly as follows
Ly' = sLy - y(0) = sLy - 0 = sLy
Ly'' = s^2Ly - s*y(0) - y'(0) = s^2Ly - 1
Substituting these expressions into the differential equation, we get:
s^2Ly - 1 + Ly = Lf(t)
Simplifying, we get
Ly = Lf(t) / (s^2 + 1) + 1/s
Now we need to find the Laplace transform of f(t). Using the definition of Laplace transform, we get
Lf(t) = ∫[0,π] 0e^(-st) dt + ∫[π,2π] 1e^(-st) dt + ∫[2π,∞) 0*e^(-st) dt
= 1/s - (e^(-πs) - e^(-2πs))/s
Substituting this expression into the equation for Ly, we get
Ly = [1/s - (e^(-πs) - e^(-2πs))/s] / (s^2 + 1) + 1/s
Now we need to find y(t) by taking the inverse Laplace transform of Ly. We can use partial fraction decomposition to simplify the expression for Ly
Ly = [(1/s)/(s^2 + 1)] - [(e^(-πs) - e^(-2πs))/s]/(s^2 + 1) + 1/s
Using the inverse Laplace transform of 1/(s^2 + 1), we get
y(t) = sin(t) - [e^(-πt) - e^(-2πt)]*u(t-π)/2
where u(t) is the unit step function.
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2. Write an exponential function for the graph of g(x) whose parent function is y= 2*. Describe e
transformation.
g(x)
Parent Function:
y = 2*
1st Transformation:
Add 2nd Transformation:
(-2,3)
(-1,1)
(0,0)
(1,-0.5)
-1
2
(2,-0.75)
gebra 2
IT 7 Summative Assessment (LTTD
Show all your work indicate deg
your methods as well as on the
This is a no calculato
19. LI
LITF I can
The equation of the transformed exponential function g(x) is g(x) = 2^-x - 1
Writing an exponential function for the graph of g(x)From the question, we have the following parameters that can be used in our computation:
Parent function: y = 2^x
The graph of the transformed exponential function g(x) passes through the points (-2,3), (-1,1), (0,0), (1,-0.5) and (2, -0.75)
So, we have the following transformation steps:
1st Transformation:
Reflect y = 2^x across the y-axis
So, we have
y = 2^-x
2nd Transformation:
Translate y = 2^-x down by 1 unit
So, we have
y = 2^-x - 1
This means that
g(x) = 2^-x - 1
Hence, the equation of the function g(x) is g(x) = 2^-x - 1
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A machine used to regulate the amount of dye dispensed for mixing shades of paint can be set so that it discharges an average of milliers of dye per can of paint. The amount of dye discharged is known to have a normal distribution with a standard deviation equal to 0.1342. If more than 6,4 milliliters of dye are discharged when making a particular shade of blue paint, the shade is unacceptable. Determine the setting of so that no more than 2.5 of the cans of paint will be unacceptable 8.09 ml 9.08 ml6.13 ml3.23 ml 4.87 ml
The setting of the machine should be no more than 6.135 milliliters per can of paint to ensure that no more than 2.5% of the cans of paint will be unacceptable.
What is normal distribution?A continuous probability distribution known as the normal distribution is frequently used to simulate symmetric and bell-shaped real-world phenomena. The mean and the standard deviation are the two factors that define it. Because of its numerous characteristics and uses, the normal distribution is significant in statistics and data analysis. The assumption that the data are normally distributed or may be approximated by a normal distribution is made by many statistical tests and confidence ranges, for instance.
Let us suppose the amount of dye discharged = X.
Thus, X ~ N(μ, σ).
Now, for μ such that no more than 2.5%:
P(X > 6.4) ≤ 0.025
Using the z-score we have:
Z = (X - μ) / σ
P(X > 6.4) = P((X - μ) / σ > (6.4 - μ) / σ) = P(Z > (6.4 - μ) / σ)
(6.4 - μ) / 0.1342 > 1.96
μ < 6.4 - 1.96(0.1342) = 6.135
Hence, the setting of the machine should be no more than 6.135 milliliters per can of paint to ensure that no more than 2.5% of the cans of paint will be unacceptable.
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a manufacturing machine has a 9 efect rate. if 7 items are chosen at random, what is the probability that at least one will have a defect? incorrect
The probability that at least one of the 7 randomly chosen items will have a defect is approximately 52.17%
A manufacturing machine has a 9% defect rate. If 7 items are chosen at random, the probability that at least one will have a defect can be found using the complement probability.
First, find the probability of an item not having a defect, which is 91% (100% - 9%). Then, calculate the probability of all 7 items being defect-free: (0.91)7 ≈ 0.4783.
To find the probability that at least one item has a defect, subtract the probability of all items being defect-free from 1: 1 - 0.4783 ≈ 0.5217.
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