2. Partial velocities x, and x, are defined for an arbitrary mapping x: D → R', so we can consider the real-valued functions E = x, • X, F = X, • X,. G= x, • x, on D. Prove N, x x. - EG – F².

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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4.2-2 continuation of the problem

Deduce that x is a regular mapping if and only if EG - F2 is never zero. (This
is often the easiest way to check regularity. We will see, beginning in the next
chapter, that the functions E, F, G are fundamental to the geometry of
surfaces.)

2. Partial velocities x, and x, are defined for an arbitrary mapping x: D →
R', so we can consider the real-valued functions
E = x, • X, F = X, • X,. G= x, • x,
on D. Prove
N, x x. - EG – F².
Transcribed Image Text:2. Partial velocities x, and x, are defined for an arbitrary mapping x: D → R', so we can consider the real-valued functions E = x, • X, F = X, • X,. G= x, • x, on D. Prove N, x x. - EG – F².
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