i+e³ j. shows the direction of the winds2in the sky on a windy day, viewing above. If you decide to fly a kite with the coordinates of [0.5, 0.5] inthis vector field, what would be the path that your kite travel?Imagine the vector field generated by the function: F=The kite would fly towards the point with [2,-1] coordinate.The kite would fly towards the y = -0.5 line.The kite would fly towards the point with [1,1] coordinate.The kite would fly towards the point with [-2,-1] coordinate.

Ans-To determine the path that the kite would take in the vector field generated by the function F =…

Answered: i+ej. shows the direction of the winds…

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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Define the problems below whether a scalar quantity or vector quantity and state the magnitude and the direction of the problems. A class ending in 40 minutes, which is 10 minutes earlier than 50 minutes’ lasts.
I need to rotate the shape in the third quadrant 90° counterclockwise. Where would my triple prime figure be in the fourth quadrant?
Find the velocity vector v(t), given the acceleration vector a(t) (Use symbolic notation and fractions where needed. Give your answer in the vector form.) v(t) : Incorrect = 2 8r k.t+2i+4j = 8t²k and the initial velocity v(0) = 2i + 4j.
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You are on a rollercoaster, and the path of your body is modeled by a vector function r(t), where t is in seconds, the units of distance are in feet, and t = 0 represents the start of the ride. Assume the axes represent the standard cardinal directions and elevation (x is E/W, y is N/S, z is height). Explain what the following would represent physically, being as specific as possible. These are all common roller coaster shapes/behaviors and can be explained in specific language with regard to units: a. r(0)=r(120) b. For 0 ≤ t ≤ 30, N(t) = 0 c. r'(30) = 120 d. For 60 ≤ t ≤ 64, k(t) = 40 and z is constant. e. For 100 ≤ t ≤ 102, your B begins by pointing toward positive z, and does one full rotation in the normal (NB) plane while your T remains constant.
explain steps please

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