Large wind turbines with a power capacity of 8 MW and blade span diameters of over 160 m are available for electric power generation. Consider a wind turbine with a blade span diameter of 100 m installed at a site subjected to steady winds at 8 m/s. Taking the overall efficiency of the wind turbine to be 44 percent and the air density to be 1.25 kg/m3, determine the electric power generated by this wind turbine. Also, assuming steady winds of 8 m/s during a 24 hour period, determine the amount of electric energy and the revenue generated per day for a unit price of $0.09/kWh for electricity.

The density of air is given to be rho-1.25 kg/m3

The electric power generated by the wind turbine is kWh.

The amount of electric energy generated is `` kWh

The revenue generated per day is $ .

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akindelemf akindelemf · Answer 1 · 2020-03-18T13:27:08+01:00

Answer:

The electric power generated by the wind turbine is 1105.84 kWh

The amount of electric energy generated is 26540.17 kWh

The revenue generated per day is $2388.62

Explanation:

Consider a wind turbine with a blade

Span diameter of 100 m installed at a site

subjected to steady winds at 8 m/s

l.e wind speed v = 8 m/s

Span diameter d = 100 m

A, sweap area = πd² / 4

= π x 100² / 4

= 7853.98 m²

Lets solve for wind speed v = 8 m/s

Density of Area ρ = 1.25 kg/m³

η = 44%

P = 1/2 ρAv³η

= 1/2 x 1.25 x 785.98 x 8³ x 44/100

= 1/2 x 1.25 x 7853.98 x 512 x 0.44

= 1105840.38

= 1.10584038 mw

= 1105.84038 kWh

= 1105.84 kWh

Energy generated by wind turbine per day

⇒ P x H

= 1105.84038 x 24

= 26540.16912 kwh

= 26540.17 kwh

Revenue generated per day = Energy x 0.09 kwh

= 26540.16912 x 0.09

= $2388.615

= $2388.62