Part
(a):- Put the value of given x & t in y1 and y2 and then add
them to know superposition of wave.
Part(b):- We have to find superposition of wave when both moves towards left.y2 is already in left,but y1 is in right side .so when it move towards left y1 magnitude will be in -ve which showed direction is towards left.Then add two waves to find superposition.
NOTE:- On calculating sine part remember that angle is in radian NOT in degree.
ASK YOUR TEACHER (a) ty, - (2.50 сmain (3.40 cm lyx - (1.855-13] and y- (3.25...
(a) If y1 = (2.50 cm)sin[(3.40 cm−1)x − (1.85 s−1)t and y2 = (3.25 cm)sin[(2.35 cm−1)x + (1.25 s−1)t ] represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.30 cm and t = 2.15 s. (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x = 1.30...
(a) If y, - (2.50 cm)sin((3.45 1.45 cm)x - (1.85 53-1) and yz - (3.25 cm)sIn|(2.30 cm".>x+(1.25 she represent two waves moving toward each other on a string, find the superposition of the two waves at x - 1.45 cm and t - 2.35 s. 0.38 X The superposition of the two waves is given by the sum of the two wave functions. Evaluate y, and y, at the given location and time. cm (b) Now consider the same two...
(a) If y2 = (2.50 cm)sin[(3.50 cm–2)x = (1.855-1)] and y2 = (3.25 cm)sin((2.20 cm }x + (1.25 8-1)] represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.55 cm and t = 2.50 s. cm (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x = 1.55...
(a) If y1 = (2.50 cm)sin [(3.35 cm -2x (1.855-18 and y2 = (3.25 cm)sin((2.35 cm –2)x + (1.25 s 5-1)] represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.25 cm and t = 2.10 s. cm (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x...
(a) If y1 = (2.50 cm)sin [(3.35 cm -2x (1.855-18 and y2 = (3.25 cm)sin((2.35 cm –2)x + (1.25 s 5-1)] represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.25 cm and t = 2.10 s. cm (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x...
(a) If y1 = (2.50 cm)sin (3.30 cm−1)x − (1.85 s−1)t and y2 = (3.25 cm)sin (2.25 cm−1)x + (1.25 s−1)t represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.30 cm and t = 2.50 s. cm (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x...
(a) If y1 = (2.50 cm)sin((3.20 cm−1)x − (1.85 s−1)t ) and y2 = (3.25 cm)sin((2.15 cm−1)x + (1.25 s−1)t) represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.35 cm and t = 2.05 s. (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x = 1.35...
(a) If y1 = (2.50 cm)sin((3.20 cm−1)x − (1.85 s−1)t ) and y2 = (3.25 cm)sin((2.15 cm−1)x + (1.25 s−1)t) represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.35 cm and t = 2.05 s. (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x = 1.35...
(a) If y1 = (2.50 cm)sin[(3.25 cm–2)x - (1.85 s-2)t] and y2 = (3.25 cm)sin((2.40 cm-?)X + (1.25 s=1)t] represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.45 cm and t = 2.45 s. cm (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the superposition of the waves at x = 1.45...
1. (a) If y1 = (2.50 cm)sin [(3.25 cm−1)x − (1.85 s−1)t] and y2 = (3.25 cm)sin [(2.15 cm−1)x + (1.25 s−1)t] cm represent two waves moving toward each other on a string, find the superposition of the two waves at x = 1.45 cm and t = 2.35 s.(2.15 cm−1)x + (1.25 s−1)t -cm (b) Now consider the same two waves on the same string. If they are both moving to the left instead of opposing directions, find the...