Answer to Question #253453 in Classical Mechanics for Alwande

Question #253453

Let r= r(q1 ... qn, t). The generalized coordinates qi are not necessarily independent. Show that

a) ar/(agi)=ai/(aqi)

b)ai/(aqi) =d/(dt) ar/(aqr)

Expert's answer

Given that,

"r= r(q_1,q_2,q_3,q_4 ....... q_n, t)"

The terms "q_i" is not necessarily independent.

a) Now, a system of the degree of freedom with Lagrangian "L(q,q,t)"

"\\frac{\\partial}{\\partial t}(\\frac{\\partial L}{\\partial s})-\\frac{\\partial L}{\\partial s_i}=0"

Now, as per the chain rule,

"\\frac{\\partial L}{\\partial S_i}=\\Sigma_k \\frac{\\partial L}{\\partial q_k}\\frac{\\partial q_n}{\\partial_i}+\\frac{\\partial L \\partial q_k}{\\partial q_k \\partial Si}"

Now, we can say that the first function will be vanishes because "q_k" is depending on the "S_k" co-ordinates.

"q_i= \\Sigma_i \\frac{\\partial q_i}{\\partial S_i} S_i +\\frac{\\partial q_i}{\\partial t}"

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Answer to Question #253453 in Classical Mechanics for Alwande

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