how do i find poles of the equation given using laplace transform

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NAGA LAKSHMI KALYANI MOVVA
NAGA LAKSHMI KALYANI MOVVA el 26 de Ag. de 2021
Comentada: Walter Roberson el 26 de Ag. de 2021
(∂(1+W(s)))/∂s=-1/((m+3) ) E_(1/(m+3)) (s)+1/((m+3) ) ᴦ ((m+2))/((m+3) ) s^(1/((m+3) )) >0
where m=-1/〖log〗_2 (cos⁡(ᴪ_(1/2)))
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NAGA LAKSHMI KALYANI MOVVA
NAGA LAKSHMI KALYANI MOVVA el 26 de Ag. de 2021
based on ᴪ_(1/2) semi-angle the value of pole 's' varies
Walter Roberson
Walter Roberson el 26 de Ag. de 2021
I am not clear whether that is or if it is where the first one indicates a division by 2, and the second one indicates an unusual variable name that includes "1/2" as part of the name?

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Respuestas (3)

Walter Roberson
Walter Roberson el 26 de Ag. de 2021
Poles of an equation occur at the denominator of the laplace transform become 0.
The first part of your expression ending in looks to be constants times s -- no denominator. Not unless m == -3
The second part of the equation has two constants times s to a negative power. The constants are not denominator... unless m == -3 .
So you have which is and you are looking for a denomininator of 0. Assuming s is non-zero that would require... well, it can't happen for non-zero s. It does exist as a left-limit for m == -3 but only as a limit. If you are relying on a pole at the limit of m = -3 with the multiple m+3 in the expression, you have a lot of close examination to do to figure out the overall limits of the expression. And for the case where m is not -3, then there is no pole.
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Walter Roberson
Walter Roberson el 26 de Ag. de 2021
I still do not know what represents. When it appears in the second line, it appears to have a mark over it that I cannot read, maybe a Δ and I do not know what that would represent either.
I calculated with your definition for m and it appears to me that m+3 could possibly be 0, if is 2*arccos(2^(2/3)/2) or oddly-named is arccos(2^(2/3)/2) . Passing through that point would be a mathematical mess.
Walter Roberson
Walter Roberson el 26 de Ag. de 2021
Ran in:
Depending on what means, there just might be a solution, shown here as sol.s
syms m s Em4m3s real
denom = 1/(m+3) * Em4m3s + gamma((m+2)/(m+3)) * s^(1/(m+3))
denom = 
sol = solve(denom == 0, s, 'returnconditions', true)
sol = struct with fields:
s: [1×1 sym] parameters: [1×1 sym] conditions: [1×1 sym]
sol.s
ans = 
K = sol.parameters;
simplify(sol.conditions)
ans = 
sk = subs(sol.s, K, 0);
limit(sk, m, -3, 'left')
ans = 
limit(sk, m, -3, 'right')
ans = 
ck = simplify(subs(sol.conditions, K, 0))
ck = 

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NAGA LAKSHMI KALYANI MOVVA
NAGA LAKSHMI KALYANI MOVVA el 26 de Ag. de 2021
NAGA LAKSHMI KALYANI MOVVA
NAGA LAKSHMI KALYANI MOVVA el 26 de Ag. de 2021
sir can you help me to solve this to find poles using laplace transform. actually denominator i have menctioned previously.

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