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Many interesting wave phenomenon in natu...

Many interesting wave phenomenon in nature cannot just be described by a single wave, instead one must analyze complex wave forms in terms of a combinations of many travelling waves. To analyze such wave combinations, we make use of the principle of superposition which states that if two or more travelling waves are moving through a medium and combine at a given point, the resultant displacement of the medium at that point is sum of the displacement of individual waves. Two pulses travelling on the same string are described by
`y_(1)=(5)/((3x-4t)^(2)+2)` and `y_(2)=(-5)/((3x+4t-6)^(2)+2)`
The time when the two waves cancel everywhere

A

`1 sec`

B

`0.5 sec`

C

`0.25 sec`

D

`0.75 sec`

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Many interesting wave phenomenon in nature cannot just be described by a single wave, instead one must analyze complex wave forms in terms of a combinations of many travelling waves. To analyze such wave combinations, we make use of the principle of superposition which states that if two or more travelling waves are moving through a medium and combine at a given point, the resultant displacement of the medium at that point is sum of the displacement of individual waves. Two pulses travelling on the same string are described by y_(1)=(5)/((3x-4t)^(2)+2) and y_(2)=(-5)/((3x+4t-6)^(2)+2) The point where the two waves always cancel

Many interesting wave phenomenon in nature cannot just be described by a single wave, instead one must analyze complex wave forms in terms of a combinations of many travelling waves. To analyze such wave combinations, we make use of the principle of superposition which states that if two or more travelling waves are moving through a medium and combine at a given point, the resultant displacement of the medium at that point is sum of the displacement of individual waves. Two pulses travelling on the same string are described by y_(1)=(5)/((3x-4t)^(2)+2) and y_(2)=(-5)/((3x+4t-6)^(2)+2) The direction in which each pulse is travelling

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