Consider a double pendulum consists of two-point masses m which are connected by strings of length / as shown in the figure below. Determine canonical momenta associated with the coordinates and ₂. Answer Choices: a. b. C. d. m 0₂ Pa = 2ml¹è + ml¹è, cos (Q-0₂) P =mle + ml¹è, cos(0₁-0₂) Pa = 2ml¹ė, + ml¹è cos (a − ₂) Pa = ml¹b + ml¹è, cos(0₁-0₂) P₁ = ml¹ė + m² è cos(-₂) Pa = ml¹è, + ml¹è cos(-₂) P₁ = ml è + ml¹è, cos (8 - 0₂) P = 2ml¹8, +mle, cos(8 - 0₂)
Consider a double pendulum consists of two-point masses m which are connected by strings of length / as shown in the figure below. Determine canonical momenta associated with the coordinates and ₂. Answer Choices: a. b. C. d. m 0₂ Pa = 2ml¹è + ml¹è, cos (Q-0₂) P =mle + ml¹è, cos(0₁-0₂) Pa = 2ml¹ė, + ml¹è cos (a − ₂) Pa = ml¹b + ml¹è, cos(0₁-0₂) P₁ = ml¹ė + m² è cos(-₂) Pa = ml¹è, + ml¹è cos(-₂) P₁ = ml è + ml¹è, cos (8 - 0₂) P = 2ml¹8, +mle, cos(8 - 0₂)
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Question
![Consider a double pendulum consists of two-point masses m which are connected by
strings of length / as shown in the figure below. Determine canonical momenta associated
with the coordinates and ₂.
Answer Choices:
a.
b.
C.
d.
m
0₂
Pa = 2ml¹è + ml¹è, cos (Q-0₂)
P =mle + ml¹è, cos(0₁-0₂)
Pa = 2ml¹ė, + ml¹è cos (a − ₂)
Pa = ml¹b + ml¹è, cos(0₁-0₂)
P₁ = ml¹ė + m² è cos(-₂)
Pa = ml¹è, + ml¹è cos(-₂)
P₁ = ml è + ml¹è, cos (8 - 0₂)
P = 2ml¹8, +mle, cos(8 - 0₂)](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F485753a6-a968-448b-bb83-bbb3ae8e77b5%2F200faae7-82ae-4035-9819-b5c8d52fb931%2F4zwin4c_processed.png&w=3840&q=75)
Transcribed Image Text:Consider a double pendulum consists of two-point masses m which are connected by
strings of length / as shown in the figure below. Determine canonical momenta associated
with the coordinates and ₂.
Answer Choices:
a.
b.
C.
d.
m
0₂
Pa = 2ml¹è + ml¹è, cos (Q-0₂)
P =mle + ml¹è, cos(0₁-0₂)
Pa = 2ml¹ė, + ml¹è cos (a − ₂)
Pa = ml¹b + ml¹è, cos(0₁-0₂)
P₁ = ml¹ė + m² è cos(-₂)
Pa = ml¹è, + ml¹è cos(-₂)
P₁ = ml è + ml¹è, cos (8 - 0₂)
P = 2ml¹8, +mle, cos(8 - 0₂)
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