Movie:Globe Wave Power: Difference between revisions

From CSDMS
m (WikiSysop moved page Temp:Globe Wave Power to Movie:Globe Wave Power without leaving a redirect)
No edit summary
 
Line 5: Line 5:
}}
}}
{{Attribute movie1
{{Attribute movie1
|Movie domain = marine
|Movie domain=marine
}}
}}
{{Attribute movie2
{{Attribute movie2
|Movie keywords = Waves
|Movie keywords=Waves
}}
}}
{{Attribute movie2
{{Attribute movie2
|Movie keywords = wave energy
|Movie keywords=wave energy
}}
}}
{{Attribute movie3
{{Attribute movie3
|Animation model name = WAVEWATCH III ^TM
|Animation model name=WAVEWATCH III ^TM
|First name contributor=Albert
|First name contributor=Albert
|Last name contributor =Kettner
|Last name contributor=Kettner
|Location movie=Global
|Location movie=Global
|Timespan movie=2 Months
|Timespan movie=2 Months
Line 22: Line 22:
{{Movie description
{{Movie description
|Grade level=Middle (6-8), High (9-12), Under graduate (13-16)
|Grade level=Middle (6-8), High (9-12), Under graduate (13-16)
|One-line movie description = Global Wave Power
|One-line movie description=Global Wave Power
|Extended movie description=This animation follows global wave power as a function of waves for the months of January and February of the year 2000.
|Extended movie description=This animation follows global wave power as a function of waves for the months of January and February of the year 2000.
}}
}}

Latest revision as of 15:24, 21 June 2017

Information Page: Globe Wave Power

Play Animation




Key Attributes

Domain: marine
Keywords: Waves
Keywords: wave energy
Model name: WAVEWATCH III ^TM
Name: Albert, Kettner
Where: Global
When: 2 Months


Short Description

Grade level: Middle (6-8), High (9-12), Under graduate (13-16)

Statement: Global Wave Power

Abstract: This animation follows global wave power as a function of waves for the months of January and February of the year 2000.

Theory

Gravity driven waves (swell) conserve energy as they move through the worlds oceans. Thus it is possible to track ocean energy as it moves through the worlds oceans and interacts with land forms.

Wave power is approximately calculated as E=.125(pgH^2). Where E is energy, p is the density of water, g is acceleration due to gravity and H is wave height.

Links

References



The part "]]" of the query was not understood.</br>Results might not be as expected.