To determine whether the function f(z) = 1/(z^2 + 1) has an antiderivative on a given domain, we need to check if the function is analytic on that domain.
(a) For the domain G = C\{i, -i}, the function f(z) = 1/(z^2 + 1) is analytic on G. This is because it is a rational function and does not have any singularities (poles) within the domain. Hence, it has an antiderivative on G.
(b) For the domain G = {z Re(z) > 0}, the function f(z) = 1/(z^2 + 1) does not have an antiderivative on G. This is because the function has singularities at z = i and z = -i, which lie on the imaginary axis. Since the domain excludes these points, f(z) is not analytic on G and does not have an antiderivative on G.In summary, the function f(z) = 1/(z^2 + 1) has an antiderivative on the domain G = C\{i, -i} but does not have an antiderivative on the domain G = {z Re(z) > 0}.
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What’s the answer???
Answer:
Question 7 = $2
Question 8 = $16
please help me ..........
Answer:
It’s either A OR B
Step-by-step explanation:
A function is defined by f(x) = x²+2, ≥0. A region R is enclosed by y = f(x), the y-axis line y = 4.
Find the exact volume generated when the region R is rotated through 27 radians about the y-axis.
Given that a function is defined by `f(x) = x² + 2`, and the region R is enclosed by `y = f(x)`, the `y-axis` line `y = 4`. We need to find the exact volume generated when the region R is rotated through `27 radians` about the `y-axis`.
Explanation: The formula for finding the volume generated by rotating the region R about the `y-axis` is given by: `V = ∫ [from a to b] 2πxf(x) dx`. Here, the value of `a` is `0` because it's given that `f(x) = x² + 2`, and `f(x)` is greater than or equal to `0`. Also, the line `y = 4` intersects `f(x)` at `x = 2`. So, the value of `b` is `2`.
Therefore, the volume generated is given by: V = ∫ [from 0 to 2] 2πx (x² + 2) dx`=`2π ∫ [from 0 to 2] (x³ + 2x) dx`=`2π [(x⁴/4) + x²] {from 0 to 2}`=`2π [(2⁴/4) + 2²] - 0`=`2π [4 + 4]`=`16π` cubic units.
So, the exact volume generated when the region R is rotated through `27 radians` about the `y-axis` is `16π` cubic units.
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What is the solution to this system of equations?
X+ 2y = 4
2x-2y = 5
0 (3.-52
0 (3.3
O no solution
infinitely many solutions
Answer:
3, 1/2
Step-by-step explanation:
x + 2y = 4
2x - 2y = 5
_______________ +
2x + x + 2y + (-2y) = 4 + 5
3x + 0 = 9
3x = 9
x = 9/3
x = 3
if you want to find the value of y, you just have to choose one of the equation. I will choose x + 2y = 4, even if you choose 2x - 2y = 5 the result remains same
x + 2y = 4
3 + 2y = 4
2y = 4 - 3
y = 1/2
x, y = 3, 1/2
#CMIIWi'm sorry, i'm not good at english ^^
Plz answer quickly will you brainlist
Answer:
Positive association is correct
Step-by-step explanation: The dots form are going up, forming a positive line. If they were to go down they would be negative. So in this case positive association is correct
Let A and B be two matrices of size 4 x 4 such that det(A)= 1. If B is a singular matrix then det(3A^-2 B^T) +1 =
0
1
None of the mentioned
-1
2
The value of det(3A^-2B^T) + 1, given det(A) = 1 and B is a singular matrix, is :
1
To find the determinant of the given expression, let's break it down step by step.
Matrix A is 4x4 with det(A) = 1.
Matrix B is a singular matrix.
Find the inverse of matrix A.
Since A is given to be a 4x4 matrix with det(A) = 1, we know that A is invertible. Therefore, A^-1 exists.
Find the determinant of the expression 3A^-2B^T.
Let's calculate the determinant of 3A^-2B^T:
det(3A^-2B^T) = det(3) * det(A^-2) * det(B^T)
We know that det(A^-2) = (det(A))^(-2) = 1^(-2) = 1.
Also, det(B^T) = det(B) because the determinant of a transpose is the same as the determinant of the original matrix.
So, det(3A^-2B^T) = 3 * 1 * det(B) = 3 * det(B)
Determine the value of det(3A^-2B^T) + 1.
Since B is given to be a singular matrix, its determinant is 0.
Therefore, det(3A^-2B^T) + 1 = 3 * det(B) + 1 = 3 * 0 + 1 = 1.
So, the value of det(3A^-2B^T) + 1 is 1.
Therefore, the correct answer is 1.
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Find the perimeter of the figure
Answer: 132ft
Step-by-step explanation:
9x4=36+36=72
30-9=21
21+21+9+9=60
60+72=132ft
Consider the rectangular prism.What is the surface area of the rectangular prism?
124 in
208 in
240 in
248 in
Answer: 240 in 2
Step-by-step explanation:
just did it
Branliest!!!! 100 points! solve for x in the image below:
also here's the equation: 3x+9= 90 degrees
Answer:
Hi! The answer to your question is x = 27
Step-by-step explanation:
☆*: .。..。.:*☆☆*: .。..。.:*☆☆*: .。..。.:*☆☆*: .。..。.:*☆
☁Brainliest is greatly appreciated!☁
Hope this helps!!
- Brooklynn Deka
Answer:
x=27
Step-by-step explanation:
3x+9=90
subtract 9 from both sides
3x=90-9
3x=81
divide by 3
x= 27
checking
3x27 +9= 90
81+9=90
I hope this makes sense
A cylinder has a base diameter of 20 inches and a height of 11 inches. What is its
volume in cubic inches, to the nearest tenths place?
Step-by-step explanation:
Volume=base area * height
=πr^2h
22/7 * 10^2 *11
=3457.1cm3
Answer:
The volume of a cylinder with a diameter of 10 inches and height of 20 inches is 1,570.8 cubic inches.
The 50th percentile of the numbers: 13. 10, 12, 10, 11 is
A. 125. B. 11 C. 10 D. 11.5
Answer:
B. 11
Step-by-step explanation:
The 50th percentile represents the halfway point of a data set and therefore, it is simply another name for the median.
We can use the following steps to find the median:
Step 1: Arrange the numbers in ascending numerical order:
10, 10, 11, 12, 13.
Step 2: Find the middle of the numbers:
Since there are 5 numbers, the median will have two numbers to the left and right of it. 11 satisfies this requirement so it is the median and thus the 50th percentile of the numbers.
The county recreation department cleared 3/4 of a mile for a trail in Washington Park. There will be a small sign every 1/12 mile along the trail. How many signs are needed?
Answer:
its 9 signs
Step-by-step explanation:
in order to find number of signs you gonna divide total distance by distance of a small sign
3/4 ÷ 1/12
= 3/4 × 12/1 = 3 × 3
therefore, the answer is 9 sign
Find the value of x. 2 3 6
What is the total weight of 3 bags if their individual weights are 2/5, 7/10 and 3/5 pound? Give your answer as a mixed number in siplest form
Answer:
1 7/10
Step-by-step explanation:
Given that:
Weight of bag 1 = 2/5 pounds
Weight of bag 2 = 7/10 pounds
Weight of bag 3 = 3/5 pounds
Total weight of the three bags :
2/5 + 7/10 + 3/5
Take the lcm of 5 and 10
Lcm of 5 and 10 = 10
(4 + 7 + 6) / 10
17 /10
= 1 7/10
Evaluate the requested derivatives: a) g(x) = 3x^3 -8x^2 -2x + 35 Find g'(2). b) k(x) = 1 /x^5 Find k"(1) c) n(x) = (-4x + 2)(3x^2 - 5x + 2) Find n'(0)
a) The derivative of g(x) at x=2 is g'(2) = 2.
b) The second derivative of k(x) at x=1 is k"(1) = -30.
c) The derivative of n(x) at x=0 is n'(0) = -18.
a) To find g'(x), we need to take the derivative of g(x) with respect to x. Let's differentiate each term separately:
g(x) = 3x³ - 8x² - 2x + 35
The derivative of 3x³ is obtained by applying the power rule, which states that if we have a term of the form [tex]ax^n[/tex], the derivative is given by [tex]nax^{(n-1)[/tex]. In this case, the derivative of 3x³ is 3 * 3x², which simplifies to 9x².
The derivative of -8x² is obtained in a similar manner, resulting in -16x.
The derivative of -2x is -2.
Since 35 is a constant term, its derivative is zero.
Now, let's combine these derivatives to find g'(x):
g'(x) = 9x² - 16x - 2
To find g'(2), we substitute x = 2 into the derivative:
g'(2) = 9(2)² - 16(2) - 2
= 9(4) - 32 - 2
= 36 - 32 - 2
= 2
Therefore, g'(2) = 2.
b) To find k"(x), we need to take the second derivative of k(x) with respect to x. Let's differentiate each term:
k(x) = 1 / [tex]x^5[/tex]
The derivative of 1/[tex]x^5[/tex] can be found using the power rule and the chain rule. The power rule states that the derivative of [tex]x^n[/tex] is n[tex]x^{(n-1)[/tex], and the chain rule applies when we have a function within another function. In this case, the derivative of 1/[tex]x^5[/tex] is -5/[tex]x^6[/tex].
Taking the derivative of -5/[tex]x^6[/tex], we apply the power rule again, resulting in 30/[tex]x^7[/tex].
Now, let's find k"(x) by differentiating -5/[tex]x^6[/tex] again:
k"(x) = -30/[tex]x^7[/tex]
To find k"(1), we substitute x = 1 into the second derivative:
k"(1) = -30/([tex]1^7[/tex])
= -30/1
= -30
Therefore, k"(1) = -30.
c) To find n'(x), we need to take the derivative of n(x) with respect to x. We can apply the product rule to differentiate the two factors of n(x):
n(x) = (-4x + 2)(3x² - 5x + 2)
Using the product rule, the derivative of n(x) is given by:
n'(x) = (-4x + 2)(d/dx)(3x² - 5x + 2) + (3x² - 5x + 2)(d/dx)(-4x + 2)
To differentiate each term, we use the power rule:
(d/dx)(3x² - 5x + 2) = 6x - 5
(d/dx)(-4x + 2) = -4
Substituting these derivatives back into n'(x), we get:
n'(x) = (-4x + 2)(6x - 5) + (3x² - 5x + 2)(-4)
Now, let's find n'(0) by substituting x = 0 into the derivative:
n'(0) = (-4(0) + 2)(6(0) - 5) + (3(0)² - 5(0) + 2)(-4)
= (2)(0 - 5) + (0 - 0 + 2)(-4)
= (2)(-5) + (2)(-4)
= -10 - 8
= -18
Therefore, n'(0) = -18.
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What is the length of the legs of the triangle if the hypotenuse of an isosceles right triangle is (sqrt)23 feet?
4 feet
8 feet
16 feet
16.2 feet
A cylinder has a volume of 792 m and a radius of 6 m. Find its height.
Answer:
7 m
Step-by-step explanation:
you divide the volume by the radius I'm pretty sure. that's what I did and I got 7
A random variable has a normal distribution with mean 7.5 and standard deviation 2.5. For which of the following is the probability equal to 0?
a) Less than 5.0
b) Between 4.0 and 10.0
c) Greater than 9.0
d) Between 6.0 and 8.0
The probability is equal to 0 for the option "a) Less than 5.0."Explanation:Given, the mean of the normal distribution, μ = 7.5 and the standard deviation of the normal distribution, σ = 2.5 The formula to find the Z-score, z is given by;z = (x - μ)/σwhere x is the value of the random variable under consideration.
a) To find the probability of the random variable being less than 5, we find the Z-score;z = (5 - 7.5)/2.5 = -1 Therefore, P(X < 5) = P(Z < -1)Using the standard normal table, the probability corresponding to the Z-score -1 is 0.1587.Therefore, the probability of the random variable being less than 5 is 0.1587.
b) To find the probability of the random variable being between 4.0 and 10.0, we find the Z-score corresponding to each value and calculate the difference in their probability. The probability required will be the absolute value of this difference. z 1 = (4 - 7.5)/2.5 = -1.4 z 2 = (10 - 7.5)/2.5 = 1 Therefore, P(4 < X < 10) = P(-1.4 < Z < 1) = P(Z < 1) - P(Z < -1.4) = 0.8413 - 0.0808 = 0.7605
c ).To find the probability of the random variable being greater than 9.0, we find the Z-score;z = (9 - 7.5)/2.5 = 0.6 Therefore, P(X > 9) = P(Z > 0.6)Using the standard normal table, the probability corresponding to the Z-score 0.6 is 0.2743.Therefore, the probability of the random variable being greater than 9.0 is 0.2743
d) To find the probability of the random variable being between 6.0 and 8.0, we find the Z-score corresponding to each value and calculate the difference in their probability. The probability required will be the absolute value of this difference. z 1 = (6 - 7.5)/2.5 = -0.6z2 = (8 - 7.5)/2.5 = 0.2Therefore, P(6 < X < 8) = P(-0.6 < Z < 0.2) = P(Z < 0.2) - P(Z < -0.6) = 0.5793 - 0.2743 = 0.305Therefore, the probability is equal to 0 for the option "a) Less than 5.0."
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A random variable has a normal distribution with mean 7.5 and standard deviation 2.5. The following is the probability equal to 0.
Option a) Less than 5.0 is correct.
Note that the normal distribution is symmetrical. So, the probabilities of events occurring are equal on either side of the mean.
The probability is zero when the range of events is beyond the limits of the standard normal distribution, which is from -3 to +3. Now let's standardize the values below:
a. less than 5.0: The formula to standardize is
[tex]z = (x - \mu) / \sigma[/tex]
z = (5 - 7.5) / 2.5
z = -1
Thus, the area of the left side of the standard normal distribution is zero, indicating that the probability of less than 5 is zero. Therefore, option a) is correct.
Other options are: b. Between 4.0 and 10.0: The probability that the values fall between 4 and 10 is 0.974 c. Greater than 9.0: The probability that the values are greater than 9 is 0.080 d. Between 6.0 and 8.0: The probability that the values fall between 6 and 8 is 0.329.
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Please help with the square roots
Step-by-step explanation:
-√81=-√(9)²=-9
A number inside a Square root cannot ne negative. So, the second one is not a real no.
Answer:
[tex] - \sqrt{81} = - 9 \\ \sqrt{ - 25 = - 5} [/tex]
Step-by-step explanation:
-81/9 9+9+9+9+9+9+9+9+9(81)
-9
-25/5 (5+5+5+5+5(25)
-5
What is the equation in standard form of
the line that passes through the points
(3, 5) and (-7, 2)?
Answer:
3x-10y=-41
Step-by-step explanation:
"standard form of the line" is ax+by=c, where a, b, and c are free coefficients
first, we need to find the slope (m) of the line
that is calculated with the formula (y2-y1)/(x2-x1)
we have the points (3,5) and (-7,2)
label the points:
x1=3
y1=5
x2=-7
y2=2
substitute into the equation
m=(2-5)/(-7-3)
m=-3/-10
m=3/10
the slope is 3/10
before we put a line into standard form, we need to put it into another form first-- like slope-intercept form (y=mx+b, where m is the slope and b is the y intercept)
we already know the slope
here's our line so far:
y=3/10x+b
we need to find b; since the line will pass through the points (3,5) and (-7,2) we can use either one of them to find b
let's use (3,5) as an example. Substitute into the equation
5=3/10(3)+b
5=9/10+b
41/10=b
b is 41/10
this is the equation:
y=3/10x+41/10
now we can find the equation in standard form. Subtract 3/10x from both sides
-3/10x+y=41/10
a (the number in front of x cannot be negative OR less than one. First, let's multiply both sides by -1)
3/10x-y=-41/10
multiply both sides by 10 to clear the fraction
3x-10y=-41
^^ is the equation
hope this helps!
15 points!!! PLEASE HELP!!!
Find the solution to the following equations below and identify either one solution, no solution, or infinite solutions. Be able to explain your choice.
3(x+4)=3x+11
-2(x+3)=-2x-6
4(x-1) = 1/2(x-8)
3x-7=4+6 +4x
Answer:
3(x+4)=3x+11
3x + 12 = 3x + 11
3x + 1 = 3x
No solution
-2(x+3)=-2x-6
-2x - 6 = -2x - 6
x = x
Infinite solutions
4(x-1) = 1/2(x-8)
4x - 4 = 1/2x - 4
8x - 8 = x - 8
7x = 0
x = 0
One solution
3x-7=4+6 +4x
3x - 7 = 10 + 4x
x = -17
One solution
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Answer:
hi
Step-by-step explanation:
hope it helps
have a nice day
Answer:
3.14, 5.8, 0.3, negative 2
Step-by-step explanation:
3.14 is found bn 2 and 3 but very close to 3 u can just take 3.1 and for 5.8 it's bn 5 and 6 very close to 6 but not six , and we'll negative 2 is right on negative 2
Studies have shown that a high percentage of analytical models actually used in the business world are simply wrong.
What's a good strategy - which I've repeatedly emphasized in this class - to avoid depending on wrong answers?
(Limit your answer to 10 words of less.)
A good strategy to avoid depending on wrong answers is to conduct rigorous testing and validation.
In the business world, many analytical models are found to be incorrect, as studies have shown. To avoid relying on flawed answers, it is crucial to implement a strategy that emphasizes rigorous testing and validation. This involves thoroughly evaluating the model's performance by comparing its outputs with known or expected outcomes. By subjecting the model to various scenarios and testing its predictions against real-world data, discrepancies can be identified and corrected.
Regularly testing and validating analytical models helps to uncover potential flaws and inaccuracies. This iterative process allows for adjustments and improvements to be made, ensuring that the model provides reliable and accurate results. By implementing a robust testing and validation strategy, businesses can minimize the risks associated with using incorrect analytical models and make informed decisions based on reliable insights.
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PUT THEM IN ORDER PLEASE
Answer:
3,2,4, then 1
are 2x-1 +3x=0 and 5x-1=0 equivalent
Answer:
yes
Step-by-step explanation:
they both equal 5x=1 where x = 1/5
A researcher was interested in seeing if cats or dogs are more playful with their owners overall. The null hypothesis of this study is
a. dogs will play with their owners more than cats
b. cats will play with their owners more than dogs
c. cats and dogs play with their owners at the same rate
d. more information is needed
The null hypothesis of this study is the statement that there is no significant difference between the playfulness of cats and dogs with their owners. In other words, the researcher assumes that both cats and dogs will play with their owners at the same rate. This is option c.
To test this hypothesis, the researcher would need to collect data on the playfulness of both cats and dogs with their owners. This could involve observing the animals during playtime or asking owners to self-report how often their pets play with them. The data would then be analyzed using statistical tests to determine if there is a significant difference in the average rates of playfulness between cats and dogs.
It is important to note that the null hypothesis does not necessarily reflect the researcher's personal beliefs or assumptions about the topic. Instead, it serves as a baseline assumption that can be tested through empirical research. If the data collected suggests that cats and dogs do not play with their owners at the same rate, then the null hypothesis would be rejected, and the researcher would need to explore alternative explanations for the observed differences.
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Elena cashed a check for $$4350 at Quick Cash. The fee to cash
a check is 12% of the amount of the check. How much did Elena
pay to cash her check?
Answer:
522
Step-by-step explanation:
Which of the following expressions are equivalent to 10 – 12? Choose all answers that apply:
А. 2.5 - 6
B.2(5 - 6)
C.None of the above
Answer:
B: 2(5−6)
Step-by-step explanation:
ok so Im getting banned and these cant go to waist so have fun :D
Answer:
Thx u
Step-by-step explanation:
that's not good oof
:3
:)
:0
:>
For the following nonlinear system, 73 2 = y + 3x2 + 3x 91(x, y) = 7 y2 + 2y – X – 2 92(x, y) = 2 y = use the initial approximation (po, qo) = (-0.3, -1.3), and compute the next three approximations to the fixed point using (a) Jacobi iteration (b) Seidel iteration.
To compute the next three approximations to the fixed point using Jacobi iteration and Seidel iteration, we will use the initial approximation (p0, q0) = (-0.3, -1.3) for the given nonlinear system.
(a) Jacobi Iteration:
In Jacobi iteration, we update the variables simultaneously using the previous values.
(b) Seidel Iteration:
In Seidel iteration, we update the variables using the most recently computed values.
To compute the next three approximations to the fixed point using Jacobi iteration and Seidel iteration, we will use the initial approximation (p0, q0) = (-0.3, -1.3) for the given nonlinear system.
(a) Jacobi Iteration:
In Jacobi iteration, we update the variables simultaneously using the previous values. The iteration formula for this system is as follows:
p(n+1) = (y(n) + 3x(n)^2 + 3x(n) - 73)/3
q(n+1) = (7y(n)^2 + 2y(n) - x(n) - 2)/92
Using the initial approximation (-0.3, -1.3), we can compute the next three approximations as follows:
Iteration 1:
p(1) = (1 + 3(-0.3)^2 + 3(-0.3) - 73)/3 ≈ -8.300
q(1) = (7(-1.3)^2 + 2(-1.3) - (-0.3) - 2)/92 ≈ -1.317
Iteration 2:
p(2) = (1 + 3(-8.300)^2 + 3(-8.300) - 73)/3 ≈ -209.034
q(2) = (7(-1.317)^2 + 2(-1.317) - (-8.300) - 2)/92 ≈ -2.924
Iteration 3:
p(3) = (1 + 3(-209.034)^2 + 3(-209.034) - 73)/3 ≈ -14314.328
q(3) = (7(-2.924)^2 + 2(-2.924) - (-209.034) - 2)/92 ≈ -6.344
(b) Seidel Iteration:
In Seidel iteration, we update the variables using the most recently computed values. The iteration formula for this system is as follows:
p(n+1) = (y(n) + 3x(n)^2 + 3x(n) - 73)/3
q(n+1) = (7y(n+1)^2 + 2y(n+1) - x(n) - 2)/92
Using the initial approximation (-0.3, -1.3), we can compute the next three approximations as follows:
Iteration 1:
p(1) = (1 + 3(-0.3)^2 + 3(-0.3) - 73)/3 ≈ -8.300
q(1) = (7(-1.3)^2 + 2(-1.3) - (-0.3) - 2)/92 ≈ -1.315
Iteration 2:
p(2) = (1 + 3(-1.315)^2 + 3(-1.315) - 73)/3 ≈ -8.264
q(2) = (7(-8.264)^2 + 2(-8.264) - (-1.315) - 2)/92 ≈ -3.471
Iteration 3:
p(3) = (1 + 3(-3.471)^2 + 3(-3.471) - 73)/3 ≈ -1.252
q(3) = (7(-1.252)^2 + 2(-1.252) - (-3.471) - 2)/92 ≈ -1.100
These are the next three approximations to the fixed point using Jacobi iteration and Seidel iteration with the given initial approximation.
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