Win_odd Dhamnekar
Junior Member
- Joined
- Aug 14, 2018
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- 207
Let \(P=(a,\theta,\phi)\) be a point in spherical co-ordinates,with a>0, and \(0 <\phi <\pi\). Then P lies on the sphere \(\rho=a\). Since \(0 <\phi <\pi\), the line segment drawn from the origin to P can be extended to intersect the cylinder given by r=a.(in cylindrical co-ordinates).
Now, how to find the cylindrical co-ordinates of that point of intersection?
I don't have any hint to answer this question till now. Answer provided to me is \((a, \theta, a\cot{\phi})\). I am working on this question to find out step by step solution.
Meanwhile, if any member of free math help forum, knows the correct answer may reply with correct answer.
Now, how to find the cylindrical co-ordinates of that point of intersection?
I don't have any hint to answer this question till now. Answer provided to me is \((a, \theta, a\cot{\phi})\). I am working on this question to find out step by step solution.
Meanwhile, if any member of free math help forum, knows the correct answer may reply with correct answer.