Physics: Principles and ProblemsChapter 14:
Vibrations and WavesProblem of the Week (1.0K) | (0.0K) | (0.0K) | To
find speed, use the equation (0.0K).
The wavelength is 200 mi, which equals 320 km.
The frequency is the reciprocal of the period.
From the text, the period is 24 min or 1400 s.
The frequency is then 5.6 x 10-4 Hz.
| | (0.0K) v
= (320 000m)(7 x 10-4 Hz)
v = 220 m/s = 500 mph | | (0.0K) | A
diagram of wave motion for example Figure 14-3 in Glencoe
Physics:Principles and Problems can be used to answer
this problem. In most waves, the water within the crest is actually
moving in a circular path. When a wave is 100 miles long, the
water in the crest moves in a long, flattened ellipse. Near
the front and bottom of the wave, the water is moving backward,
that is, out to sea. If you have ever floated in front of a
wave, you've probably felt the pull of the wave as water rushes
back toward the crest. For a tsunami, the backward rush reaches
over tens of miles. | | (0.0K) | (0.0K) | (0.0K) | (0.0K) | (0.0K) |
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