The first property states that the Fourier transform of a function evaluated at a certain frequency is equal to 2π times the inverse Fourier transform of the function evaluated at the negative of that frequency.
The second property states that the Fourier transform of a modulated function is equal to the Fourier transform of the original function shifted by the modulation frequency.
To verify the given properties of the Fourier transform, we can use the definitions and properties of the Fourier transform. Here's how we can verify each property:
1. Property: (Fu)(ω) = 2π (F^-1u)(-ω)
To verify this property, we need to use the definitions of the Fourier transform and its inverse. Let's denote the Fourier transform operator as F and its inverse as F^-1.
According to the definition of the Fourier transform, for a function u(t), its Fourier transform is given by:
(Fu)(ω) = ∫[from -∞ to ∞] u(t) e^(-iωt) dt
Similarly, the inverse Fourier transform of a function U(ω) is given by:
(F^-1U)(t) = (1/2π) ∫[from -∞ to ∞] U(ω) e^(iωt) dω
Now, let's substitute -ω for ω in the inverse Fourier transform:
(F^-1u)(-ω) = (1/2π) ∫[from -∞ to ∞] u(t) e^(i(-ω)t) dt
= (1/2π) ∫[from -∞ to ∞] u(t) e^(iωt) dt
Comparing this with the Fourier transform, we see that (F^-1u)(-ω) is equal to (Fu)(ω) multiplied by 2π, which verifies the first property.
2. Property: (F(e^(iat)u))(ω) = (Fu)(ω + a)
To verify this property, we use the modulation property of the Fourier transform. According to this property, if u(t) has a Fourier transform U(ω), then the Fourier transform of e^(iat)u(t) is given by:
(F(e^(iat)u))(ω) = (Fu)(ω + a)
Applying this property to the given expression, we have:
(F(e^(iat)u))(ω) = (Fu)(ω + a)
This verifies the second property.
In summary, we have verified both properties of the Fourier transform as stated.
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thanks for the help! i dont really understand numbers with letters easily : )
Answer: x=6
Step-by-step explanation: Hope this help :D
What is the range of the function f : [0,[infinity]) → R, defined by the rule f(t) = e^-2x ? (a) (0,1] (b) R (c) ([0,1] (d) (0,[infinity]).
The range of the function f is (0, [infinity]). The correct option is d.
The range of the function f : [0, [infinity]) → R, defined by the rule f(t) = e^(-2x), can be determined by analyzing the behavior of the exponential function.
As x approaches infinity, e^(-2x) approaches 0, but it never reaches 0. This means that the function f(t) will approach 0 as t approaches infinity, but it will never actually reach 0.
On the other hand, as x approaches negative infinity, e^(-2x) approaches positive infinity. Therefore, the function f(t) will approach positive infinity as t approaches 0.
Based on this analysis, we can conclude that the range of the function f is (0, [infinity]), which means option (d) is the correct answer.
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Find the minimum or maximum value of the function. What is the H? (Desmos)
Answer:
Minimum: (2,4)
Step-by-step explanation:
h(x)=3([tex]x^{2}[/tex]-4x)+16
=3([tex]x^{2}[/tex]-4x+4-4)+16 (- For the balance of equation, and attention 1)
=3[tex](x-2)^{2}[/tex]-3*4+16
=3[tex](x-2)^{2}[/tex]+4
Attention:1. [tex](a-b)^{2}=a^{2} -2ab+b^{2}[/tex]
2. The formula for the vertex form is y = [tex]a(x-h)^{2}+k[/tex], the vertex is (h,k)
PLEASE ANSWER THIS ASAP I WILL MARK YOU THE BRAINLIEST
SHOW YOUR WORK!!!
Calculate the volume of the following three-dimensional object
Answer:
2305.33π square inches
Step-by-step explanation:
The volume of a sphere is V = (4/3) πr ^ 3
Because the diameter is 24, the radius is 12.
Substituting 12 for r in the above equation:
V = (4/3) π (12 ^ 3) = (4/3) (1728) π = 2305.33π square inches, or 7238.23 square inches.
Answer:
Measure the length, width and height of the square or rectangle prism or object in inches. Record each of these on paper. Multiply the three measurements together to find the volume using either paper and pencil or a calculator. This is the equation: Volume = length x width x height.
I think that is:
24/2 = 12² = 144 x 3.14 = 452.16.
¯\_(ツ)_/¯
Grayson can read 18 pages of a book in 30 minutes. At that rate, how long would it take Grayson to read 150 pages? Express your answer in hours and minutes.
Answer:
4 hours and 10 min
Step-by-step explanation:
For this equation we will do ratios:
[tex]\frac{18}{30} =\frac{150}{x} \\\\18x=4500\\x=250[/tex]
250 min =
4 hours and 10 min
4(60) = 240
240 + 10 = 250 minutes
HELP PLZ I'LL MARK BRAINLIEST!
Answer:
138.23
Step-by-step explanation:
Consider the seriesn+1
(-1)
(n +1)
7t
ns1
Reviewing the Alternating Series Test to determine which of the following statements is true for the given series. Assume you can only use the Alternate Series Test. Do not go beyond it.
a) The series converges
b) Sincelim anメ0, the series diverges
c) Sincean+i S ancannot be shown to be true for all n, the series diverges
d)Sincean+i S ancannot be shown to be true for all n, the Alternating Series Test cannot be applied
e)Sincelim anメ0, the Alternating Series Test cannot be applied
The correct option is (a). The other options are incorrect because the given series satisfies all the conditions of the alternating series test, and thus, the test is applicable.
The given series is as follows: n+1
(-1)
(n +1)
7t
ns1
An alternating series test is a significant tool for determining whether or not a given series converges. A series is said to be convergent if the sequence of partial sums converges to a finite limit, and divergent otherwise. For the alternating series test to apply to a series, there must be the following three conditions: The series must have alternating terms, meaning that every other term is negative. The sequence of absolute values of the terms of the series must be monotonically decreasing, meaning that the absolute values of each successive term must be smaller than the preceding term's absolute value. The sequence of absolute values must approach zero in the limit. Thus, it can be observed that for the given series, the first two conditions are met. Now, to check the third condition, we must calculate the limit of the terms.
Let us take an=1/(n+1)7tnSince lim an=0, the series passes the third test as well.
Thus, we can apply the alternating series test to the given series. By the alternating series test, we have that the series converges. Thus, the correct option is (a). The other options are incorrect because the given series satisfies all the conditions of the alternating series test, and thus, the test is applicable. Thus, we can safely conclude that option (a) is correct.
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A cup of milk has 10 grams of protein. How much protein is in 2.5 cups of milk?
Answer:
25 grams of protein
Step-by-step explanation:
10 grams of protein is in 1 cup of milk.
To understand how many grams of protein are in 0.5 cups of milk, I would need to divide 10 by 2, to get 5.
There are 5 grams of protein in 0.5 cups of milk.
Now if I want to see how many grams of protein are in 2 cups of milk, I would multiply 10 by 2, to get 20.
There are 20 grams of protein in 2 cups of milk.
But, the question is asking for how much protein is in 2.5 cups of milk.
Since we know how much is in 2 cups, and 0.5, we can just add them together, because 2+0.5 is 2.5.
20+5 is 25 grams.
There are 25 grams of protein in 2.5 cups of milk.
A booster club sells raffle tickets • Before tickets go on sale to the public, 120 tickets are sold to student athletes. • After tickets go on sale to the public, the tickets sell at a constant rate for a total of 8 hours spread over I days. • At the end of this time, all tickets have been sold. If represents the hours since tickets go on sale to the public and represents the number of raffle tickets sold, which graph best represents the scenario?
Answer:
The top graph.
Step by step:
Before the tickets go on sale, 120 tickets were already sold.
After that, the tickets sell at a constant rate for a total of 8 hours.
At the end of this time, all the tickets were sold (we have 0 tickets left)
If x (horizontal axis) represents the hours since tickets go on sale, and y (vertical axis) represents the number of raffle tickets sold.
Then, at x = 0, we should already see y = 120
Because we start with 120 tickets sold.
Then, as x increases, the number of tickets sold also should increase, until we get x = 8 hours, where y stops increasing because all tickets are already sold.
Then we should have an increasing line that stops increasing at x = 8 hours.
Then the correct option is the above graph, where we have:
An increasing line.
y = 120 in the vertical axis (y = 120 when x = 0)
Question 3
0 / 20 pts
When Darrell went to bed, the temperature outside was 4 degrees below
zero (-4). When he woke up, the temperature was even colder. Select the
values that could represent the temperature when Darrell woke up?
-10°
A. -2
B. -6
C. -10
D. -0
E. -15
It’s multiple choice also
what is 22/25 as a equivalent fraction out of 100
Answer:
hope this helps :)
Step-by-step explanation:
The slope of the line containing the points (6, 4) and (-5, 3) is:
1
-1
1/11
Answer:
1/11
Step-by-step explanation:
(6, 4) and (-5, 3)
Slope:
m=(y2-y1)/(x2-x1)
m=(3-4)/(-5-6)
m= (-1)/(-11)
m = 1/11
solve the integral given below for suitable using the Beta function 1 (₁-t²g x dt = ?
The solution to the given integral is: frac{pi}{4}g(x) + frac{1}{2}cdot frac{Gamma(frac{3}{2})Gamma(frac{1}{2})}{Gamma(2)} cdot g(x).
Given integral: int_0^1 (1-t^2)g(x) dt
To solve the given integral, we will make use of Beta function.
The Beta function is defined as follows:
B(p,q) = int_0^1 t^{p-1}(1-t)^{q-1} dt
Using substitution, t = sin theta, we get:
int_0^1 (1-t^2)g(x) dt = int_0^{frac{pi}{2}} (1-sin^2 theta)g(x) cos theta dtheta
= int_0^{frac{\pi}{2}} cos^2 theta g(x) d\theta
= frac{1}{2}\int_0^{\frac{\pi}{2}} (1+\cos 2\theta) g(x) d\theta
= frac{1}{2} \left(\int_0^{\frac{\pi}{2}} g(x) dtheta + int_0^{frac{pi}{2}} g(x) cos 2theta dtheta right)
Using B(p,q)$ for the second integral, we get:
int_0^1 (1-t^2)g(x) dt = frac{1}{2}left(frac{pi}{2}g(x) + frac{1}{2}cdot frac{Gamma(frac{3}{2})Gamma(frac{1}{2})}{Gamma(2)} cdot g(x) right)
= frac{pi}{4}g(x) + frac{1}{2}cdot frac{Gamma(frac{3}{2})Gamma(frac{1}{2})}{Gamma(2)} cdot g(x).
Hence, the value of the given integral int_0^1 (1-t^2)g(x) dt is frac{pi}{4}g(x) + frac{1}{2}cdot frac{Gamma(frac{3}{2})Gamma(frac{1}{2})}{Gamma(2)} cdot g(x).
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From a bag of 12kg flour, mother used 7 2/3 kg to bake cakes. How much flour reminded?
help please i have 0 clue on what to do
Answer:
Step-by-step explanation:
[tex]9x6x12[/tex]= 648 the length(12m), width(6m), and height(9m) that all i can give you for now because this got me losing brain sells
Answer:
for the first question the answer is 3
for the second question the answer is 9
Step-by-step explanation:
12/4=3, 6/2=3, 9/3=3
8+8+12+12+6+6 = 52 & 108 + 108 + 72 + 72 + 54 + 54= 468
468 / 52 = 9
A gym is open for children to play from eleven o clock to three o clock how many hours is the gym open for children to play
Answer:
5 o clock
Step-by-step explanation:
Let L be the linear operator in R2 defined by
L(x)=(3x1-2x2,9x1-6x2)T
Find bases of the kernel and image of L .
Kernel: ___________
Image:____________
Let L be the linear operator in R2 defined by L(x) = (3x1 - 2x2, 9x1 - 6x2)T. The bases of the kernel and image of L are to be determined. To find the bases of the kernel and image of L, we first recall the definitions of kernel and image of a linear operator. Definition of Kernel: Let T be a linear operator on a vector space V. Then the kernel of T, denoted as ke T, is the subspace of V that consists of all vectors that are mapped to the zero vector of the range of T. Definition of Image: Let T be a linear operator on a vector space V. Then the image of T, denoted as im T, is the subspace of the range of T consisting of all vectors that are mapped by T to some vectors in the range of T. The kernel and image of L are given as follows. Kernel of L: For L(x) = (3x1 - 2x2, 9x1 - 6x2)T to be zero vector, we must have 3x1 - 2x2 = 0 and 9x1 - 6x2 = 0, which implies that x1 = (2/3)x2.
Therefore, a typical element of the kernel of L can be expressed as (x1, x2)T = (2/3)x2(1, 3)T, where x2 is a scalar. Hence, a basis for the kernel of L is {(1, 3)T}. Image of L: The image of L is the subspace of R2 consisting of all vectors that can be expressed in the form L(x) = (3x1 - 2x2, 9x1 - 6x2)T, where x is any vector in R2. It follows that any vector in the image of L is of the form (3x1 - 2x2, 9x1 - 6x2)T = x1(3, 9)T + x2(-2, -6)T. Therefore, a basis for the image of L is {(3, 9)T, (-2, -6)T}.Hence, the bases of the kernel and image of L are as follows. Kernel: {(1, 3)T}Image: {(3, 9)T, (-2, -6)T}.
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What is the measure of the other acute angle ?
Romberg integration for approximating L',f(x) dx gives R21 = 6 and R22 = 6.28 then R11 5.16 4.53 2.15 0.35
The Romberg integration method is used to approximate definite integrals. Given the values R21 = 6 and R22 = 6.28, we can determine the value of R11.
To find R11, we can use the formula:
R11 = (4^1 * R21 - R22) / (4^1 - 1)
Substituting the given values, we have:
R11 = (4 * 6 - 6.28) / (4 - 1)
= (24 - 6.28) / 3
= 17.72 / 3
≈ 5.9067
Therefore, the approximate value of R11 is approximately 5.9067.
Romberg integration is an extrapolation technique that refines the accuracy of numerical integration by successively increasing the order of the underlying Newton-Cotes method. The notation Rnm represents the Romberg approximation with m intervals and n steps. The general formula for calculating Rnm is:
Rnm = (4^n * Rn-1,m-1 - Rn-1,m) / (4^n - 1)
In this case, R21 represents the Romberg approximation with 2 intervals and 1 step, while R22 represents the approximation with 2 intervals and 2 steps. By substituting these values into the formula, we can calculate R11. The numerator is obtained by multiplying R21 by 4 and subtracting R22. The denominator is calculated by subtracting 1 from 4^n. Evaluating this expression yields the approximate value of R11 as 5.9067.
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A. 37
B. 53
C. 127
D. 217
Let a, b ∈ C and let Cr be the circle of radius R centered at the origin, traversed once in the positive orientation. If |al < R< b), show that:
∫ 1/ (z-a)(z-b) dz= 2pii/a-b
The integral ∫ 1/ (z-a)(z-b) dz over the circle Cr, where a and b are complex numbers and |a| < R < |b|, evaluates to 2πi/(a-b).
To show this, we can use the Residue theorem. Since the function 1/(z-a)(z-b) has two simple poles at z=a and z=b within the region enclosed by the circle Cr, we can evaluate the integral by summing the residues at these poles.
The residue at z=a is given by Res(a) = 1/(b-a), and the residue at z=b is given by Res(b) = -1/(b-a). By the Residue theorem, the integral is equal to 2πi times the sum of the residues.
Therefore, ∫ 1/ (z-a)(z-b) dz = 2πi * (1/(b-a) - 1/(b-a)) = 2πi/(a-b).
This result shows that the integral over the circle Cr simplifies to a complex constant determined by the difference between a and b.
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Madeline is saving up to buy a new jacket. She already has $40 and can save an
additional $8 per week using money from her after school job. How much total
money would Madeline have after 10 weeks of saving? Also, write an expression that
represents the amount of money Madeline would have saved in w weeks.
Answer:
120
equation: 40+8(10)=120
Step-by-step explanation:
The math for this is $40 initial plus $8x the 10 weeks which equals 80 so
40+80=120
Find the Area of the composite figure below:
Answer:
24
Step-by-step explanation:
added all the sides hope this helps
18 x 1/6 simplify if can thank u
Answer:
3
Step-by-step explanation:
[tex]18*\frac{1}{6} \\\\3[/tex]
Answer:
=3x
Step-by-step explanation:
18x^1 / 6
=3x
Please help.
Is algebra.
Answer to question 1 is D
answer to question 2 is A
Help me please
HELP ME PLEASEE
Answer:
21?i think
Step-by-step explanation:
to find the solution to a system of linear equations, verdita begins by creating equations for the two sets of data points below.data set aa 2-column table with 4 rows. column 1 is labeled x with entries negative 1, 1, 5, 7. column 2 is labeled y with entries negative 6, 2, 18, 26.data set ba 2-column table with 4 rows. column 1 is labeled x with entries negative 5, negative 2, 0, 6. column 2 is labeled y with entries negative 1, 2, 4, 10.which equations could verdita use to represent the data sets?
The equations Verdita could use to represent the data sets include the following:
A. Data Set A: y = 4x-2
Data Set B: y = x +4
How to determine an equation of this line?In Mathematics and Geometry, the point-slope form of a straight line can be calculated by using the following mathematical equation (formula):
y - y₁ = m(x - x₁)
Where:
x and y represent the data points.m represent the slope.First of all, we would determine the slope of data set A;
Slope (m) = (y₂ - y₁)/(x₂ - x₁)
Slope (m) = (2 + 6)/(1 + 1)
Slope (m) = 8/2
Slope (m) = 4
At data point (1, 2) and a slope of 4, a linear equation for data set A can be calculated by using the point-slope form as follows:
y - y₁ = m(x - x₁)
y - 2 = 4(x - 1)
y = 4x - 2
At data point (0, 4) and a slope of 1, a linear equation for data set B can be calculated by using the point-slope form as follows:
y - y₁ = m(x - x₁)
y - 4 = 1(x - 0)
y = x + 4
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Missing information:
The question is incomplete and the complete question is shown in the attached picture.
ok sooooooo
cant you call carrot juice orange juice.
Answer:
yes cs its a orange juice
Step-by-step explanation:
Answer:
taking back the answer spot that is rightfully mine!
Step-by-step explanation:
A researcher is interested in the effect of vaccination (vaccinated vs not vaccinated) and health status (healthy vs with pre-existing condition) on rates of flu. She samples 20 healthy people and 20 people with pre-existing conditions. 10 of the healthy people and 10 of the people with pre-existing conditions are given a flu shot. The other 10 healthy people and people with pre-existing conditions are not given flu shots. All of the subjects are monitored for a year to see if they contract the flu. How many total subjects (N) are there in the study? O 10 20 30 40
In this study, there are a total of 40 subjects. The researcher samples 20 healthy people and 20 people with pre-existing conditions. Out of these, 10 healthy people and 10 people with pre-existing conditions are given a flu shot, while the other 10 from each group are not given flu shots.
To calculate the total number of subjects (N), we add the number of healthy people to the number of people with pre-existing conditions:
N = Number of healthy people + Number of people with pre-existing conditions
N = 20 + 20
N = 40
Therefore, the total number of subjects in the study is 40.
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Travis has $1,500 in a savings account. He deposits $75. How much interest will he earn after 2 years at a simple annual interest rate of 1.3%?
(The links don’t work so please just give the answer)
Answer:
40.95
Step-by-step explanation:
P = 1500 + 75 = 1575
I = Prt
I = 1575(1.3%)(2)
I = 40.95