107 770
Assignments Done
100%
Successfully Done
In June 2024
In June 2024
Your physics assignments can be a real challenge, and the due date can be really close — feel free to use our assistance and get the desired result.
Physics
Be sure that math assignments completed by our experts will be error-free and done according to your instructions specified in the submitted order form.
Math
Our experts will gladly share their knowledge and help you with programming projects. Keep up with the world’s newest programming trends.
Programming
Learn more about our help with Assignments: Complex Analysis
Search & Filtering
Complex Analysis
Decide whether these sequence is convergent or divergent:
Zn= n-root another n -root another n-root of [ Cos n + i sin n ]
, n≥ 2
Note :
Please more than method
the above means
,third times powered to ^1/n
third root of n
Zn= n-root another n -root another n-root of [ Cos n + i sin n ]
, n≥ 2
Note :
Please more than method
the above means
,third times powered to ^1/n
third root of n
Complex Analysis
Decide whether these series is convergent or divergent .
1. Sum (n+i sin n ) ^ {1/n}
2 Sum ( n^{in} ) , where n ^ in is taken in the 3π-branch
Hint : If you wish,You can use the fact
lim Zn=0 <--> lim |Zn| = 0
as n approach to infinity
1. Sum (n+i sin n ) ^ {1/n}
2 Sum ( n^{in} ) , where n ^ in is taken in the 3π-branch
Hint : If you wish,You can use the fact
lim Zn=0 <--> lim |Zn| = 0
as n approach to infinity
Complex Analysis
Show That
This power series
Sum n from 2 to infinity of
[ (-1)^{n} . z ^{2n+3} ] = [ (z^{7} ) / (1+z{^2} ) ] ; |z| <1
Is power series Sum n from 2 to infinity of
[ (-1)^{n} . i ^ {2ni} . i ^(3i) ] Convergent ? If yes ,Compute It's Sum
This power series
Sum n from 2 to infinity of
[ (-1)^{n} . z ^{2n+3} ] = [ (z^{7} ) / (1+z{^2} ) ] ; |z| <1
Is power series Sum n from 2 to infinity of
[ (-1)^{n} . i ^ {2ni} . i ^(3i) ] Convergent ? If yes ,Compute It's Sum
Complex Analysis
f (z) = [(e^z) - 1] / [ z^3 (1+{z^2}) ]
A- Compute the residue of f at z= o by using laurent series
B- Use the previous to classify the singularity z=0
C- Without Computing the laurent series ,Classify the singularity z =i
Please if found more than method i need it
A- Compute the residue of f at z= o by using laurent series
B- Use the previous to classify the singularity z=0
C- Without Computing the laurent series ,Classify the singularity z =i
Please if found more than method i need it
Complex Analysis
Let x(t) be a random process defined as X(t)=A.COS[2 pi.T+Theta],Where A is a Rayleigh distributed random variable with mean and variance E[A]=0.5,Variance A = 1 .The random variable theta is uniform distributed on the interval [-pi ,pi],which is statistically independent from A.
A. Compute E[X(t1) X(t2)],for t1=t2=3 , and t1=0.5, t2=2.5
B.is the process X(t)wide sense stationary ?justify your answer
C. Find fxt (xt).
A. Compute E[X(t1) X(t2)],for t1=t2=3 , and t1=0.5, t2=2.5
B.is the process X(t)wide sense stationary ?justify your answer
C. Find fxt (xt).
Complex Analysis
Let x(t) be a random process defined as
x(t)=A COS [2 PI .T+ Theta],where A is a Gaussian random variable with mean E{A}=0 and variance A = 2, The random variable theta is uniform distributed on the interval [-pi,pi], which is statistically independent from A.
Define random process Z(t) given by
Z(t)=integral from 0 to 1 of X(t) dt
A. Compute the mean of Z(t), E[Z(t)]
b. Determine the variance of Z(t), vaiance z
c. Is the process Z(t) strict sense stationary ,wide sense stationary ? Justify your answer
D. Is the process X(t) Gaussian process ?
x(t)=A COS [2 PI .T+ Theta],where A is a Gaussian random variable with mean E{A}=0 and variance A = 2, The random variable theta is uniform distributed on the interval [-pi,pi], which is statistically independent from A.
Define random process Z(t) given by
Z(t)=integral from 0 to 1 of X(t) dt
A. Compute the mean of Z(t), E[Z(t)]
b. Determine the variance of Z(t), vaiance z
c. Is the process Z(t) strict sense stationary ,wide sense stationary ? Justify your answer
D. Is the process X(t) Gaussian process ?
Complex Analysis
Find Sum of power series ,then answer the questions
series from 2 to infinity of [ 3 ^(n+1) . {z^n+2)} ] / [ n!]
indicate the convergence nhd (neighborhood).
Is series from 2 to infinity of [ 3 ^ {(3n+4)/2} /n!) convergent if yes compute its sum.
series from 2 to infinity of [ 3 ^(n+1) . {z^n+2)} ] / [ n!]
indicate the convergence nhd (neighborhood).
Is series from 2 to infinity of [ 3 ^ {(3n+4)/2} /n!) convergent if yes compute its sum.
Complex Analysis
Find the limit ( value or zero or infinity )
[ (n+1). { 1+ ( n+1)^2 } ^ {1/2} . (n+3) ] / [ n . (n+2). { 1+ ( n)^2 } ^ {1/2} ]
as n : infinity
[ (n+1). { 1+ ( n+1)^2 } ^ {1/2} . (n+3) ] / [ n . (n+2). { 1+ ( n)^2 } ^ {1/2} ]
as n : infinity
Complex Analysis
Find the Limit ( value or infinity or zero )
[ (n+1 )^ square root of {n+1} ] / [n ^ square root of {n} ]
or i can say
Limit
[ (n+1 )^ ( {n+1}^ {1/2} ) ] / [ n ^ ({n}^ {1/2} ) ]
as n: infinity
[ (n+1 )^ square root of {n+1} ] / [n ^ square root of {n} ]
or i can say
Limit
[ (n+1 )^ ( {n+1}^ {1/2} ) ] / [ n ^ ({n}^ {1/2} ) ]
as n: infinity
Complex Analysis
Determine whether infinity is a singularity of the given function or not. if it is a singularity, find the laurent expansion at infinity
1- f(z) = [ z^3 + z + 1 ] / [1+z^2]
2- g(z) = z. sin (1/z)
1- f(z) = [ z^3 + z + 1 ] / [1+z^2]
2- g(z) = z. sin (1/z)
-
![Help me with my assignment!]()
Who Can Help Me with My Assignment
There are three certainties in this world: Death, Taxes and Homework Assignments. No matter where you study, and no matter…
-
![How to finish assignment]()
How to Finish Assignments When You Can’t
Crunch time is coming, deadlines need to be met, essays need to be submitted, and tests should be studied for.…
-
![Math Exams Study]()
How to Effectively Study for a Math Test
Numbers and figures are an essential part of our world, necessary for almost everything we do every day. As important…
"assignmentexpert.com" is professional group of people in Math subjects! They did assignments in very high level of mathematical modelling in the best quality. Thanks a lot
#339914 on Dec 2023
#339914 on Dec 2023