The general solution to the non-homogeneous equation is
[tex](c_1 + 3) e^{t/2} + c_2 e^{-t/2}[/tex]
We have,
To solve the differential equation 4y" - y = 8e^{t/2}/2 + e^{t/2}, we first need to find the complementary solution by solving the homogeneous equation 4y" - y = 0.
The characteristic equation is 4r² - 1 = 0, which has roots r = ±1/2. Therefore, the complementary solution is:
y_c(t) = c_1 e^{t/2} + c_2 e^({-t/2}
where c_1 and c_2 are constants determined by the initial or boundary conditions.
Next, we need to find a particular solution to the non-homogeneous equation. Since the right-hand side contains e^{t/2}, we try a particular solution of the form:
y_p(t) = A e^{t/2}
where A is a constant to be determined.
Taking the first and second derivatives of y_p(t), we get:
y_p'(t) = A/2 e^{t/2}
y_p''(t) = A/4 e^{t/2}
Substituting these into the original differential equation, we get:
4(A/4 e^{t/2}) - A e^{t/2} = 8e^{t/2}/2 + e^{t/2}
Simplifying, we get:
A = 3
Therefore,
The particular solution is:
y_p(t) = 3 e^{t/2}
The general solution to the non-homogeneous equation is then:
y(t) = y_c(t) + y_p(t)
= c_1 e^{t/2} + c_2 e^{-t/2} + 3 e^{t/2}
= (c_1 + 3) e^{t/2} + c_2 e^{-t/2}
where c_1 and c_2 are constants determined by the initial or boundary conditions.
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Subjects who participate in a study of patients with inflammatory bowel disease are described as the:a. accessible population. b. element. c. sample. d. target population.
The target population is the population of interest that researchers aim to generalize their findings to.
The correct answer is c. sample.
In a research study, the population of interest is often too large or too difficult to access entirely. Therefore, researchers select a representative subset of the population to study, which is called a sample. In this case, patients with inflammatory bowel disease are the population of interest, and those who participate in the study are the sample.
The accessible population refers to the portion of the population that is accessible to the researcher. For example, if a researcher is studying the prevalence of a disease in a certain region, the accessible population would be the individuals living in that region.
An element refers to a single member of the population or sample.
The target population is the population of interest that researchers aim to generalize their findings to.
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A bank's loan officer rates applicants for credit. The ratings are normally distributed with a mean of 350 and a standard deviation of 50. If an applicant is randomly selected, find the probability of a rating that is between 310 and 295.
The loan ratings are normally distributed. The probability of a rating that is between 310 and 295 is equals to the 0.027.
We have a bank's loan officer rates applicants for credit. The loan ratings are normally distributed. Let X be a random variable for Lona rating.
Mean of rating, μ= 350
Standard deviations of rating, σ = 50
We have to determine the probability of a rating that is between 310 and 295, P ( 310< X < 295). Using Z-score formula for normal distribution is [tex]z = \frac{X - \mu}{\sigma}[/tex]
where X--> observed value
μ--> mean
σ --> standard deviations
Substitute all known values in above formula, at X = 310, [tex] z = \frac{310 - 350}{50}[/tex]
= [tex] \frac{-40}{50} = - 0.8[/tex]
In case of X = 295, [tex] z = \frac{295 - 350}{50}[/tex]
= [tex]\frac{-45}{50} = - 0.9[/tex]
Now, the required probability value P(310< X< 295),
= [tex]P (\frac{310 - 350}{50}<\frac{ X- \mu}{\sigma} < \frac{295-350}{50})[/tex]
[tex]= P (-0.8< z < -0.9)[/tex]
= P (z < -0.9) - P( z< - 0.8)
= 0.316 -0.289
= 0.027
Hence, required probability value is 0.027.
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help me pls UWU IM HOPELESS UWU
Answer:
The answer is (3,9)
Step-by-step explanation:
sketchbook=1$
puzzle=3$
3sketchbook=3×1$=3$
3puzzle=3×3$=9$
sketch book=x
puzzle=y
(3,9)
Answer:
the answer is C. (3,9). By the way the word uwu makes you sus
Step-by-step explanation:
The cost of 3 sketchbooks is $1 each, so 3 sketchbooks cost $3. The cost of 3 puzzles is $3 each, so 3 puzzles cost $9. Therefore, the order pair that represents the cost of 3 sketchbooks as x-value and the cost of 3 puzzles as the y-value is (3,9).
So, the answer is C. (3,9).
distance from the origin formula (bc why not?)
The formula for the distance from the origin is distance = √(x² + y²)
In this case, the hypotenuse is the distance from the origin to the point (x, y), and the other two sides are the horizontal distance from the origin to the point, which is x, and the vertical distance from the origin to the point, which is y. Therefore, the distance from the origin to the point (x, y) is given by the following formula:
distance = √(x² + y²)
This formula is also known as the distance formula or the Pythagorean distance formula. It can be used to find the distance between any two points in a two-dimensional coordinate system.
The distance from the origin can also be expressed in terms of polar coordinates, which are a different way of describing points in a two-dimensional space.
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"A food truck's profit from the sale of beef burgers and veggie burgers can be described bY the function P(b,v) dollars The following values are given: P(50,30) 240 Pb(50,30) = 2.7 Pv(50,30)-3.4 (a) Estimate the food truck's profit If they continue to sell 30 veggie burgers_ but are only able to sell 45 beef burgers_ (Round to the nearest cent:) (b)If the food truck only able to sell 45 beef burgers but wants to maintain their profit of 5240_ how many veggie burg ers would they need sell to compensate for the decrease in beef burgers? (Round decimal values up to the next whole number:) veggie burgers"
a) The estimated profit for selling 45 beef burgers and 30 veggie
burgers is 546.
b) The food truck would need to sell approximately 643 veggie burgers
to compensate for the decrease in beef burger sales and maintain a
profit of 5240. Rounded up to the nearest whole number, the answer is
644 veggie burgers.
(a) To estimate the food truck's profit when they sell 30 veggie burgers
and only 45 beef burgers, we can use the profit function P(b,v) and
substitute b=45 and v=30:
P(45,30) = 240Pb(45,30) + Pv(45,30)
= 240(2.7) + (-3.4)(30)
= 648 - 102
= 546
(b) To maintain a profit of 5240 when they only sell 45 beef burgers, we
need to find the number of veggie burgers they need to sell.
Let's call this number x.
We can set up an equation using the profit function P(b,v) and the given
information:
P(45,x) = 5240
240Pb(45,x) + Pv(45,x) = 5240
240(2.7)(45) + (-3.4)x = 5240
3060 - 3.4x = 5240
-3.4x = 2180
x ≈ 643
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an algae bloom, if untreated, covers a lake at the rate of 2.5% each week. If it currently covers 13 square feet, how many weeks will it take to cover 100 square feet?
If I tell you a situation is binomial, it is very easy to calculate a probability using a calculator such as StatCrunch. However, the difficult piece is determining if a situation is binomial in the first place, without anyone prompting you to check if it is so. In order to improve our understanding of binomial situations, it helps to write some of your own. 1. Create and write your own short paragraph that describes a situation that you think can be modeled using the binomial distribution. Example Post: 33% of American workers feel engaged in their workplace. If 500 American workers are randomly selected, we can count the number of people who feel engaged in their workplace.
If we randomly select 150 American workers, we can model the number of people who prefer flexible working hours using the binomial distribution.
In a manufacturing company, 20% of the workers are trained to operate a new machine. The company is hiring 100 workers, and we want to calculate the probability that 25 or more workers are trained to operate the machine. This situation can be modeled using the binomial distribution as it involves a fixed number of trials (100), each with only two possible outcomes (trained or not trained), and the probability of success (being trained) is constant for each trial.
Approximately 70% of American workers prefer flexible working hours. If we randomly select 150 American workers, we can model the number of people who prefer flexible working hours using the binomial distribution.
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The most common purpose for Pearson correlational is to examine
For Pearson correlation the most common purpose to examine is given by option a. The relationship between 2 variables.
The Pearson correlation is a statistical measure that indicates the extent to which two continuous variables are linearly related.
It measures the strength and direction of the relationship between two variables.
Ranging from -1 perfect negative correlation to 1 perfect positive correlation.
And with 0 indicating no correlation.
It is commonly used in research to examine the association between two variables.
Such as the relationship between height and weight, or between income and education level.
Therefore, the most common purpose of a Pearson correlation is to examine the relationship between 2 variables.
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The above question is incomplete, the complete question is:
The most common purpose for a Pearson correlation is to examine,
a. The relationship between 2 variables
b. Relationships among groups
c. Differences between variables
d. Differences between two or more groups
I NEED HELP ASAP
i’ve been struggling with this can someone please help!!!
the question is “is the community in The Giver a cult? why or why not?”
The community in "The Giver" is a utopian society that avoids suffering many of society's ills but, it is subject to strict control by the Elders. So, it is not a cult.
Is the community in The Giver a cult?The community in The Giver, as depicted in Lois Lowry's novel, does not meet the definition of a cult. Despite that it have some characteristics of cults present in the community, such as strict rules and conformity, there are significant differences.
Unlike cults, the community in The Giver is a controlled and regulated society that is designed to eliminate pain and suffering by eradicating individuality and emotions. The governing body in the community has established a set of rules and rituals to maintain order and stability, but it does not exhibit the manipulative and exploitative behavior often associated with cults.
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find the value(s) of x which the tangent line to y=x^4 [ln(2x)]^2is horizontal. leave your answer as exact values.
The value of x where the tangent line to y = x⁴[ln(2x)]² is horizontal is x = e⁻⁴/2.
To find where the tangent line to the function y = x⁴[ln(2x)]² is horizontal, we need to find where the derivative of the function is equal to 0.
Let's start by finding the derivative of the function
y = x⁴[ln(2x)]²
Taking the natural logarithm of both sides:
ln(y) = ln(x⁴[ln(2x)]²)
Using the logarithmic properties, we can simplify:
ln(y) = 4ln(x) + 2ln[ln(2x)]
Differentiating both sides with respect to x
1/y × dy/dx = 4/x + 2/ln(2x) × 1/(2x)
Simplifying:
dy/dx = y × (4/x + 1/xln(2x))
Substituting y = x^4[ln(2x)]²:
dy/dx = x⁴[ln(2x)]² × (4/x + 1/xln(2x))
Now we can set dy/dx equal to 0 to find the values of x where the tangent line is horizontal:
x⁴[ln(2x)]² × (4/x + 1/xln(2x)) = 0
This equation is equal to 0 when either x = 0 or ln(2x) = -4.
Solving for ln(2x) = -4
ln(2x) = -4
2x = e⁻⁴
x = e⁻⁴/2
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For the given cost function C(x) = 25600 + 600x + x² find: a) The cost at the production level 1300 b) The average cost at the production level 1300 c) The marginal cost at the production level 1300 d) The production level that will minimize the average cost e) The minimal average cost
a) The cost at the production level 1300:
To find the cost at the production level 1300, simply substitute x with 1300 in the cost function.
C(1300) = 25600 + 600(1300) + (1300)²
b) The average cost at the production level 1300:
To find the average cost, divide the cost function by x.
Average Cost = C(x) / x
Now, substitute x with 1300.
Average Cost = C(1300) / 1300
c) The marginal cost at the production level 1300:
To find the marginal cost, differentiate the cost function with respect to x.
Marginal Cost = dC(x) / dx
Now, substitute x with 1300.
Marginal Cost = dC(1300) / dx
d) The production level that will minimize the average cost:
To find the production level that minimizes the average cost, set the derivative of the average cost function equal to zero and solve for x.
d(Average Cost) / dx = 0
e) The minimal average cost:
Once you find the production level that minimizes the average cost from part d, substitute this value into the average cost function to find the minimal average cost.
Minimal Average Cost = Average Cost at the production level found in part d
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You may need to use the appropriate appendix table or technology to answer this question. A survey asked senior executives at large corporations their opinions about the economic outlook for the future. One question was, "Do you think that there will be an increase in the number of full-time employees at your company over the next 12 months?" In the current survey, 228 of 400 executives answered Yes, while in a previous year survey, 168 of 400 executives had answered Yes. Provide a 95% confidence interval estimate for the difference between the proportions at the two points in time. (Use current year - previous year. Round your answer to four decimal places.
The 95% confidence interval estimate for the difference between the proportions at the two points in time is (0.055, 0.245).
To answer this question, we need to use the appropriate technology, specifically a two-proportion z-test. First, we need to calculate the sample proportions for both years:
Current year: 228/400 = 0.57
Previous year: 168/400 = 0.42
Next, we can calculate the standard error for the difference in proportions:
SE = sqrt[(0.57*(1-0.57))/400 + (0.42*(1-0.42))/400]
SE = 0.0485
Using a 95% confidence level and a z-score of 1.96 (from the standard normal distribution), we can calculate the margin of error:
ME = 1.96*0.0485
ME = 0.095
Finally, we can calculate the confidence interval by taking the difference in sample proportions and adding/subtracting the margin of error:
0.57 - 0.42 +/- 0.095
0.15 +/- 0.095
Therefore, the 95% confidence interval estimate for the difference between the proportions at the two points in time is (0.055, 0.245), rounded to four decimal places.
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The cost (in thousands of dollars) of producing x thousand units of Acrosonic loudspeaker systems is: TC=12x2+50x+3. Price p (in $ per unit) and quantity demanded x (in thousand units), which are both required to be non-negative, are related as: p=170−3x.
(a) Find the marginal cost (MC) function.
(b) Find marginal revenue (MR) as a function of output.
(c) Find the profit as a function of output.
(d) What quantity maximizes profit, and how much is that profit?
(a) The marginal cost (MC) function is:
M(x) = 24x + 50
(b) The marginal revenue (MR) as a function of output is: M(x) = 170 - 6x
(c) The profit as a function of output is:
[tex]P(x) = 170 x-3x^{2} -(12x^2+50x+3)\\ \\P(x) = -15x^{2} +120x-3[/tex]
(d) The maximum profit is equal to: P(x) = $237
Maximizing Profit Function:In economics, the profit function is calculated when the total cost function is subtracted from the total revenue function
P(x) = R(x) - C(x) The graph of the profit function is an inverted parabola and at the point where profit is maximum, the marginal profit is equal to zero.
[tex]\frac{dP(x)}{dx}=0[/tex]
(a) Find the marginal cost (MC) function.
The total cost equation is :
[tex]TC=12x^2+50x+3.[/tex]
The marginal cost is the derivative of the cost function. Therefore, the marginal cost is equal to:
[tex]MC(x) =\frac{dR(x)}{dx}[/tex]
M(x) = 24x + 50
b) Find marginal revenue (MR) as a function of output.
The demand equation is :
p = 170 - 3x
The total revenue is calculated as:
R(x) = p × x
Therefore, the revenue function is equal to:
R(x) = (170 - 3x)x
Expanding the revenue function, we get:
R(x) = 170x - [tex]3x^{2}[/tex]
The marginal revenue is the derivative of the revenue function. Therefore, the marginal revenue is equal to:
[tex]MR(x) =\frac{dR(x)}{dx}[/tex]
M(x) = 170-6x
(c) Find the profit as a function of output.
The profit function is calculated as:
P(x) = R-C
Therefore, the profit function is:
[tex]P(x) = 170 x-3x^{2} -(12x^2+50x+3)\\ \\P(x) = -15x^{2} +120x-3[/tex]
(d) What quantity maximizes profit, and how much is that profit?
At the point where profit is at its maximum, the marginal profit is equal to zero.
[tex]\frac{dP(x)}{dx}=0[/tex]
[tex]\frac{dP(x)}{dx}=-30x+120=0[/tex]
-30x + 120 = 0
30x = 120
x = 4
The output that will maximize profit is 4 units.
At the profit-maximizing output, the maximum profit is equal to:
[tex]P(x) = -15(4)^{2} +120(4)-3[/tex]
P(x) = $237
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A population of values has an unknown distribution with u = 25.6 and o = 17.7. You intend to draw a random sample of size n = 121. What is the mean of the distribution of sample means? uc = (Please enter an exact answer.) What is the standard deviation of the distribution of sample means? 0 = (Please report your answer accurate to 2 decimal places.)
Mean of the distribution of sample means (µ) = 25.6. The standard deviation of the distribution of sample means (σ) = 1.61
In this situation, the population has an unknown distribution with a mean (µ) of 25.6 and a standard deviation (σ) of 17.7. We intend to draw a random sample of size n = 121.
The mean of the distribution of sample means, often denoted as µ, is equal to the population mean (µ). Therefore, µx= 25.6.
The standard deviation of the distribution of sample means, also known as the standard error (σ), is calculated as σ/√n. In this case, σ= 17.7/√121 = 17.7/11.
So, the standard deviation of the distribution of sample means (σ) is approximately 1.61 (rounded to 2 decimal places).
Mean of the distribution of sample means (µ) = 25.6
The standard deviation of the distribution of sample means (also known as the standard error) is equal to the population standard deviation divided by the square root of the sample size. Therefore,
o/sqrt(n) = 17.7/sqrt(121) = 1.61
So the standard deviation of the distribution of sample means is 1.61 (accurate to 2 decimal places).
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The following table shows the political affiliation of voters in one city and their positions on stronger gun control laws. Favor Oppose Republican 0.09 0.26 Democrat 0.22 0.2 Other 0.11 0.12 What is the probability that a voter who favors stronger gun control laws is a Republican?
The probability that a voter who favors stronger gun control laws is a Republican is 0.09 or 9%.
The probability that a voter who favors stronger gun control laws is a Republican can be found by using Bayes' theorem.
Let A be the event that a voter is a Republican and B be the event that a voter favors stronger gun control laws. Then, we want to find P(A|B), the probability that a voter is a Republican given that they favor stronger gun control laws.
Using Bayes' theorem:
P(A|B) = P(B|A) × P(A) / P(B)
P(B|A) is the probability that a voter favors stronger gun control laws given that they are a Republican, which is 0.09.
P(A) is the probability that a voter is a Republican, which is 0.09 + 0.22 + 0.11 = 0.42 (sum of Republican, Democrat, and Other probabilities).
P(B) is the overall probability that a voter favors stronger gun control laws, which is 0.09 + 0.22 + 0.11 = 0.42 (sum of Favor and Oppose probabilities for all political affiliations).
Therefore,
P(A|B) = 0.09 × 0.42 / 0.42 = 0.09
So the probability that a voter who favors stronger gun control laws is a Republican is 0.09 or 9%.
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We describe the dynamics of a population of ants by the DTDS xt+1=f(xt) for t = 0,1,2,3,…,measured in ants per cm² or surface area. Wt discover that the updating function is f(x)=9xe ^-0.6xa) Find the ecuilbrium points. Separate each value by a semi-colon. Give the exact valuesb) compute f' (x)c. If P1 < P2 are the two equilibrium points that you have found in (a) , compute the exact value of f'(p1) and f'(p2). Hint: if you simplify, they will be short formulas.
(a) The equilibrium points are x = -0.805 and x = 0.
(b) [tex]f'(x) = 9e^{((-0.6x) (1 - 0.6x))}[/tex]
(c) f'(P1) is approximately 3.905 and f'(P2) is 0.
a) Equilibrium points are the values of x such that f(x) = x. Therefore, we have:
[tex]9xe^{(-0.6x)} = x[/tex]
Dividing both sides by x and multiplying by e^(0.6x), we get:
[tex]9e^{(0.6x)} = 1[/tex]
Taking the natural logarithm of both sides, we get:
0.6x = ln(1/9)
x = ln(1/9) / 0.6 ≈ -0.805; x = 0
Therefore, the equilibrium points are x = -0.805 and x = 0.
b) Taking the derivative of f(x) with respect to x, we get:
f'(x) = 9e^(-0.6x) (1 - 0.6x)
c) Evaluating f'(P1) and f'(P2), we get:
f'(P1) = [tex]9e^{(-0.6P1) (1 - 0.6P1)}[/tex] ≈ 3.905
f'(P2) = [tex]9e^{(-0.6P2) (1 - 0.6P2)}[/tex] = 0
Therefore, f'(P1) is approximately 3.905 and f'(P2) is 0.
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For a standard normal distribution, find:P(0.68 < z < 0.78)
For a standard normal distribution, the area between 0.68 and 0.78 on the z-score table is 0.0694. Therefore, P(0.68 < z < 0.78) is 0.0694 or approximately 6.94%.
For a standard normal distribution, to find the probability P(0.68 < z < 0.78), you can use the standard normal (z) table or a calculator with a built-in z-table function. This table gives you the area to the left of a specific z-score.
To find P(0.68 < z < 0.78), you'll first find the area to the left of z = 0.78 and then subtract the area to the left of z = 0.68:
P(0.68 < z < 0.78) = P(z < 0.78) - P(z < 0.68)
Using a z-table or calculator, you can find:
P(z < 0.78) ≈ 0.7823
P(z < 0.68) ≈ 0.7486
Now, subtract the two probabilities:
P(0.68 < z < 0.78) = 0.7823 - 0.7486 ≈ 0.0337
So, for a standard normal distribution, the probability P(0.68 < z < 0.78) is approximately 0.0337.
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For the given cost function C(x) = 28900 + 600.c + find: a) The cost at the production level 1500 b) The average cost at the production level 1500 c) The marginal cost at the production level 1500 d) The production level that will minimize the average cost e) The minimal average cost
a) The cost at the production level of 1500 is 9,649,000.
b) The average cost at the production level of 1500 is 6,432.67.
c) The marginal cost at the production level of 1500 is 600.
d) There is no production level that will minimize the average cost.
e) There is no production level that will minimize the average cost, the minimal average cost is undefined.
a) To find the cost at the production level of 1500, we simply substitute
x=1500 in the cost function:
C(1500) = 28900 + 600(1500) = 9649000
b) The average cost is given by the formula:
AC(x) = C(x) / x
Substituting x=1500 in this formula, we get:
AC(1500) = 9649000 / 1500 = 6432.67
c) The marginal cost is the derivative of the cost function with respect to x:
MC(x) = dC(x) / dx
Since the derivative of a constant is zero, the marginal cost is simply the coefficient of x in the cost function, which is:
MC(x) = 600
d) To find the production level that will minimize the average cost, we need to find the value of x that minimizes the average cost function AC(x). This can be done by finding the derivative of AC(x) and setting it equal to zero:
[tex]d/dx (C(x)/x) = (dC(x)/dx \times x - C(x))/x^2 = 0[/tex]
Solving for x, we get:
dC(x)/dx = C(x)/x
600 = (28900 + 600x) / x
600x = 28900 + 600x
28900 = 0
This is a contradiction, so there is no production level that will minimize
the average cost.
e) Since there is no production level that will minimize the average cost,
the minimal average cost is undefined.
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PLEASE ANSWER QUICKLY WILL PUT YOUR BRAINLIST!!!!!!!!!!
The measure of ∠1 is 71°. What is the measure of ∠N ?
Required value of ∠N is 19°.
What are complementary angles?
Angles are a type of angle that add up to a total of 90 degrees are called Complementary angles.
If two angles are complementary
then the sum of those angles equals 90 degrees.
All these angles are often denoted as "C" or "C-angle" in mathematical equations or diagrams.
For example if one angle is 30 degrees then its complementary angle is 60 degrees because 30 + 60 = 90.
If one angle is 45 degrees, then its complementary angle is 45 degrees because 45 + 45 = 90.
Complementary angles can be found in many geometric shapes such as triangles,squares, rectangles .
In a right triangle, the two acute angles are complementary because they add up to the right angle, which is always 90 degrees. In a rectangle or square, opposite angles are complementary because they add up to 180 degrees which is the sum of all angles in these shapes.
Here given that measure of ∠N is 71°.
Now ∠N and ∠M are complementary angles.
So, ∠N + ∠M = 90°
∠N = 90° - 71° = 19°
Therefore, required value of ∠N is 19°.
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Correct question is "The measure of ∠M is 71° and ∠N and ∠M are complementary angles.What is the measure of ∠N ?"
what is the y- intercept of
h(x)=29(5.2)^x
Step-by-step explanation:
The y-axis is intercepted when x = 0
put in '0' for 'x' and compute:
y = 29(5.2)^0 = 29
What is a Cartesian coordinate system? How are the axes related to one another?
A coordinate system known as a Cartesian coordinate system in a plane uniquely identifies each point by a pair of real numbers known as coordinates.
The coordinates that describe its separations from parallel lines that cross at a location known as the origin.
The x-axis, a horizontal line, and the y-axis, a vertical line, are two perpendicular lines that split the number plane, also known as the Cartesian plane, into four quadrants. The origin is the location where these axes converge.
A plane created by the intersection of two perpendicular coordinate axes is known as a cartesian plane. The x-axis is the horizontal axis and the y-axis is the vertical axis. The intersection of these axes (0, 0) is the origin, whose location is depicted as.
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Calculate, to four decimal places, the first ten terms of the sequence.
an=1+(−3/7)n
The first ten terms of the sequence are 0.5714, 0.4489, 0.4149, 0.3986, 0.3998, 0.4195, 0.4600, 0.5318, 0.5559, and 0.5734, obtained by evaluating the formula for each integer value of n from 1 to 10.
To find the first ten terms of the sequence, we substitute n = 1, 2, 3, ..., 10 into the formula for an, an = 1 + (-3/7)^n.
To obtain each term, the formula is evaluated for each integer value of n from 1 to 10.
a1 = 1 + (-3/7)¹ = 4/7 = 0.5714
a2 = 1 + (-3/7)² = 22/49 = 0.4489
a3 = 1 + (-3/7)³ = 142/343 = 0.4149
a4 = 1 + (-3/7)⁴ = 958/2401 = 0.3986
a5 = 1 + (-3/7)⁵ = 6722/16807 = 0.3998
a6 = 1 + (-3/7)⁶ = 49442/117649 = 0.4195
a7 = 1 + (-3/7)⁷ = 378898/823543 = 0.4600
a8 = 1 + (-3/7)⁸ = 3067222/5764801 = 0.5318
a9 = 1 + (-3/7)⁹ = 26156618/47045881 = 0.5559
a10 = 1 + (-3/7)¹⁰ = 231538342/40353607 = 0.5734
The first term is found to be 0.5714, the second term is 0.4489, and so on, with each term being rounded to four decimal places.
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If henri places the scissors on the right pan the two pans will be balanced what is the mass of the scissors
Answer: We can't determine the mass of the scissors.
Step-by-step explanation:
The information we have is that if Henri places the scissors on the right pan, the two pans will be balanced. This tells us that the mass of the scissors is equal to the mass of the object on the left pan. However, we don't know the mass of the object on the left pan. Therefore, we can't determine the mass of the scissors.
An object initially at rest at (3,3) moves with acceleration a(t)={2, e^-t}. Where is the object at t=2?
According to the acceleration, the object is at the point (-7, -3e³ + e⁻²) at t = 2.
To find the position of the object at t = 2, we need to integrate the acceleration twice with respect to time to get the position function. The first integration gives us the velocity function v(t) = {2t + c₁, -e⁻ᵃ + c₂}, where c₁ and c₂ are constants of integration.
We can find these constants by using the initial condition that the object is initially at rest at (3,3). This means that v(0) = {0, 0}, which gives us c₁ = -6 and c₂ = e³.
The second integration gives us the position function r(t) = {t² - 6t + C3, e⁻ᵃ - e³t + C4}, where C3 and C4 are constants of integration.
Again, we can find these constants using the initial condition that the object is initially at rest at (3,3). This means that r(0) = {3, 3}, which gives us C3 = 3 and C4 = 2 - e³.
Finally, we can substitute t = 2 into the position function to find the position of the object at t = 2.
This gives us r(2) = {2² - 6(2) + 3, e⁻² - e³(2) + 2 - e³} = {-7, -3e³ + e⁻²}.
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If ∫(1 to x) f(t)dt = 20x/sqrt of (4x2 + 21) - 4, then ∫(1 to [infinity]) f(t)dt is?
A. 6
B. 1
C. -3
D. -4
E. divergent
For the integration of function ∫(1 to ∞) f(t)dt = 20n/√(4n² + 21) - 4, the value is obtained as Option A: 6.
What is Integration?
The summing of discrete data is indicated by the integration. To determine the functions that will characterise the area, displacement, and volume that result from a combination of small data that cannot be measured separately, integrals are calculated.
To find ∫(1 to ∞) f(t)dt, we can use the limit definition of the definite integral:
∫(1 to ∞) f(t)dt = lim(n→∞) ∫(1 to n) f(t)dt
Using the given formula for the indefinite integral, we can evaluate the definite integral -
∫(1 to n) f(t)dt = 20n/√(4n² + 21) - 4 - [20/√25]
= 20n/√(4n² + 21) - 4/5
Taking the limit as n approaches infinity -
lim(n→∞) ∫(1 to n) f(t)dt = lim(n→∞) [20n/√(4n² + 21) - 4/5]
Since the denominator of the fraction inside the limit approaches infinity much faster than the numerator, we can use the limit of the numerator only -
lim(n→∞) [20n/√(4n² + 21)] = lim(n→∞) [20n/(2n√(1 + 21/4n²))]
= lim(n→∞) [10/√(1 + 21/4n²)]
= 10/√1 = 10
Therefore, ∫(1 to ∞) f(t)dt is equal to 10, so the answer is (A) 6.
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In order to study how many hours that U of S students spend on studying per week, we drew a simple random sample of size n = 475 out of a total of 5000 U of S students. We then found that the mean of the hours (denoted bysvg.image?\bar{x}) that the 475 students spent on studying is 25.3 hours. In this example, we observed 475 samples from the population distribution. How many samples (or realizations) did we observe from the sampling distribution of the sample mean of the hours that 475 students spend on studying?
In this example, we observed one sample of size 475 from the population distribution. However, we can generate many samples of size 475 from the population distribution and calculate their sample means to create a sampling distribution of the sample mean.
So, we can observe an infinite number of samples (or realizations) from the sampling distribution of the sample mean of the hours that 475 students spend on studying. you've drawn a simple random sample of size n = 475 out of a total of 5,000 U of S students. The mean of the hours spent on studying for these 475 students is 25.3 hours. This single mean value is obtained by observing 475 samples from the population distribution.
Now, you're asking about the number of samples (or realizations) from the sampling distribution of the sample mean of hours that 475 students spend on studying. In this specific example, you have only drawn one simple random sample of size n = 475, so you have observed only one realization from the sampling distribution of the sample mean.
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Find the total amount and total interest after one year if the interes compounded half yearly.
Principal = 34000
Rate of interest = 10% per annum
Total amount = 7
Total interest = 3
The total amount after one year is approximately 37722.50 and the total interest earned is approximately 3722.50.
What is total interest?Total interest refers to the sum of all interest payments made over the life of a loan or investment. In the case of a loan, it represents the amount of money paid in addition to the original principal amount borrowed, and in the case of an investment, it represents the amount of money earned in addition to the original amount invested.
According to given information:It seems that the values you provided are incomplete and unclear. However, I can provide you with a general formula for calculating the total amount and total interest when interest is compounded half-yearly.
Let P be the principal amount, r be the rate of interest per annum, n be the number of times interest is compounded in a year, and t be the time period in years.
Then, the total amount (A) and total interest (I) can be calculated using the following formulas:
[tex]A = P(1 + r/n)^{(n*t)[/tex]
I = A - P
Using the given values:
P = 34000
r = 10% per annum
n = 2 (since interest is compounded half-yearly)
t = 1 year
Plugging these values into the formulas, we get:
A = [tex]34000(1 + 0.1/2)^{(2*1)[/tex] ≈ 37722.50
I = 37722.50 - 34000 ≈ 3722.50
Therefore, the total amount after one year is approximately 37722.50 and the total interest earned is approximately 3722.50.
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The solution to a radical expression numbers in pictures
now, that radical expression above is just the simplification of a longer expression, and that could have been many really, but off the many, this would be one that simplifies like so
[tex]\boxed{4\sqrt[4]{65610}~~ - ~~3\sqrt[4]{146410}} \\\\[-0.35em] ~\dotfill\\\\ 4\sqrt[4]{(6561)(10)}~~ - ~~3\sqrt[4]{(14641)(10)}\implies 4\sqrt[4]{(9^4)(10)}~~ - ~~3\sqrt[4]{(11^4)(10)} \\\\\\ 4(9)\sqrt[4]{10}~~ - ~~3(11)\sqrt[4]{10}\implies 36\sqrt[4]{10}~~ - ~~33\sqrt[4]{10}\implies 3\sqrt[4]{10}[/tex]
The width of a recatangle is m cm it’s length is 5 times the width. Find the area
The area of the rectangle with width m cm is 5m² cm².
What is area of rectangle?A rectangle is a closed 2-D shape, having 4 sides, 4 corners, and 4 right angles (90°). The opposite sides of a rectangle are equal. A square is also a type of rectangle.
The area of a rectangle is is expressed as ;
A = l×w
Where l is the length and w is the width of the rectangle.
The width is m
length = 5 × W = 5m
Therefore the area of the rectangle will be
A = 5m × m
A = 5m² cm²
therefore the area of the rectangle is 5m²
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Evaluate using synthetic substitution
Answer:
[tex]\large\boxed{\tt f(-1)=-13}[/tex]
Step-by-step explanation:
[tex]\textsf{We are asked to identify the value of f(-1) given a function.}[/tex]
[tex]\large\underline{\textsf{What are Functions?}}[/tex]
[tex]\textsf{Functions represent relations to a given in\textsf{put} (x) and to the out\textsf{put}. (Right Side)}[/tex]
[tex]\textsf{Whenever we are given an in\textsf{put}, we can identify the out\textsf{put} of the function.}[/tex]
[tex]\underline{\textsf{How are we able to solve for f(-1)?}}[/tex]
[tex]\textsf{When we are asked to find f(-1), we are asked to find the out\textsf{put} which is to}[/tex]
[tex]\textsf{simplify the right side where the in\textsf{put} is substituted in.}[/tex]
[tex]\large\underline{\textsf{Solving;}}[/tex]
[tex]\textsf{Solve for the Out\textsf{put} by substituting -1 for the in\textsf{put} placeholders (x).}[/tex]
[tex]\tt f(-1)=7x^{3} - 3x^{2} + 2x - 1[/tex]
[tex]\tt f(-1)=7(-1)^{3} - 3(-1)^{2} + 2(-1) - 1[/tex]
[tex]\underline{\textsf{Follow PEMDAS, Evaluate the Exponents First;}}[/tex]
[tex]\tt 7(-1)^{3} = 7(-1 \times -1 \times -1) = 7(-1) = \boxed{\tt -7}[/tex]
[tex]\tt -3(-1)^{2} = -3(-1 \times -1) = -3(1) = \boxed{\tt -3}[/tex]
[tex]\underline{\textsf{Evaluate Further;}}[/tex]
[tex]\tt 2(-1) = \boxed{\tt -2}[/tex]
[tex]\underline{\textsf{We should have;}}[/tex]
[tex]\tt f(-1)=-7 - 3 - 2 - 1[/tex]
[tex]\underline{\textsf{Simplify;}}[/tex]
[tex]\large\boxed{\tt f(-1)=-13}[/tex]