Check whether the following statements are true or false. Do not include the detail calculation along with your answer. (A) Given the vector function r(t)=(v2t, e', e) , the unit normal vector N(t) is of theform: N(t)=(1- e²", e' V2, e' V2).(B) The point of maximal curvature on the curve y=ln x isIn

(A) Given the vector function r(t)=( V21,e', e-), the unit normal vector N(t) is of the %3D form: N(1)=(1- e",eV2,eV2). %3D (B) The point of maximal curvature on the curve y=ln x is (V2, – In -). (В

(A) Given the vector function r(t)=( V21,e', e-), the unit normal vector N(t) is of the %3D form: N(1)=(1- e",eV2,eV2). %3D (B) The point of maximal curvature on the curve y=ln x is (V2, – In -). (В

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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Question

Check whether the following statements are true or false.
Do not include the detail calculation along with your answer.

(A) Given the vector function r(t)=(v2t, e', e) , the unit normal vector N(t) is of the
form: N(t)=(1- e²", e' V2, e' V2).
(B) The point of maximal curvature on the curve y=ln x is
In

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