| The wave functions for two waves traveling on a string are described by: y (x, t) = A sin (2mx – 40nt) and y (x, t) = A sin (2x + 40nt) where, y and x are in meters, and t is in seconds. An element of the string oscillating vertically with amplitude A would be located at O x = (1/18) m O x = (1/15) m O x = (1/6) m O x = (1/12) m O x = (1/8) m

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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| The wave functions for two waves traveling on a string are described by:
yı (x, t) = A sin (2x – 40nt)
y, (x. t)-Α sin (2πx + 40πt)
and
where, y and x are in meters, and t is in seconds. An element of the string oscillating vertically
with amplitude A would be located at
x = (1/18) m
O x = (1/15) m
O x = (1/6) m
O x = (1/12) m
X =
x = (1/8) m
Transcribed Image Text:| The wave functions for two waves traveling on a string are described by: yı (x, t) = A sin (2x – 40nt) y, (x. t)-Α sin (2πx + 40πt) and where, y and x are in meters, and t is in seconds. An element of the string oscillating vertically with amplitude A would be located at x = (1/18) m O x = (1/15) m O x = (1/6) m O x = (1/12) m X = x = (1/8) m
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