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+4.31. Let a(s) be a unit speed curve with kt = 0. Prove there is a curve B(s) (s not arc length on B) so that a and B are Bertrand curves if and only if there are constants 2 #0 and u with 1/2 = K + ut.
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+4.31. Let a(s) be a unit speed curve with kt = 0. Prove there is a curve

B(s) (s not arc length on B) so that a and B are Bertrand curves if and
only if there are constants 2 #0 and u with 1/2 = K + ut.
T
itan Dhan aviat​

User Bombastic
by
4.7k points

1 Answer

6 votes

Answer:

It is proved

Explanation:

A curve immersed in the three-dimensional sphere is said to be a Bertrand curve if there exists another curve and a one-to-one correspondence between and such that both curves have common principal normal geodesics at corresponding points.

See attachment for the step by step solution of the given problem.

+4.31. Let a(s) be a unit speed curve with kt = 0. Prove there is a curve B(s) (s-example-1
+4.31. Let a(s) be a unit speed curve with kt = 0. Prove there is a curve B(s) (s-example-2
User Androsfat
by
4.9k points
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