kilowatt-hour | |
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General information | |
Unit system | Non-SI metric |
Unit of | Energy |
Symbol | kW⋅h, kW h |
Conversions | |
1 kW⋅h in ... | ... is equal to ... |
SI units | 3.6 MJ |
CGS units | 3.6×10^{13} erg |
English Engineering units | ≈ 2,655,224 ft⋅lbf |
British Gravitational units | ≈ 85,429,300 ft⋅pdl |
A kilowatt-hour (unit symbol: kW⋅h or kW h; commonly written as kWh) is a non-SI unit of energy equal to 3.6 megajoules (MJ) in SI units which is the energy delivered by one kilowatt of power for one hour. Kilowatt-hours are a common billing unit for electrical energy supplied by electric utilities. Metric prefixes are used for multiples and submultiples of the basic unit, the watt-hour (3.6 kJ).
The kilowatt-hour is a composite unit of energy equal to one kilowatt (kW) sustained for (multiplied by) one hour. The International System of Units (SI) unit of energy meanwhile is the joule (symbol J). Because a watt is by definition one joule per second, and because there are 3,600 seconds in an hour, one kWh equals 3,600 kilojoules or 3.6 MJ.^{[1]}^{[2]}
A widely used representation of the kilowatt-hour is "kWh", derived from its component units, kilowatt and hour. It is commonly used in billing for delivered energy to consumers by electric utility companies, and in commercial, educational, and scientific publications, and in the media.^{[3]}^{[4]} It is also the usual unit representation in electrical power engineering.^{[5]} This common representation, however, does not comply with the style guide of the International System of Units (SI).^{[6]}
Other representations of the unit may be encountered:
The hour is a unit of time listed among the non-SI units accepted by the International Bureau of Weights and Measures for use with the SI.^{[6]} Its combination with the kilowatt, a standard SI unit, is therefore permitted within the standard.^{[dubious – discuss]}
An electric heater consuming 1,000 watts (1 kilowatt) operating for one hour uses one kilowatt-hour of energy. A television consuming 100 watts operating continuously for 10 hours uses one kilowatt-hour. A 40-watt electric appliance operating continuously for 25 hours uses one kilowatt-hour.
Electrical energy is typically sold to consumers in kilowatt-hours. The cost of running an electrical device is calculated by multiplying the device's power consumption in kilowatts by the operating time in hours, and by the price per kilowatt-hour. The unit price of electricity charged by utility companies may depend on the customer's consumption profile over time. Prices vary considerably by locality. In the United States prices in different states can vary by a factor of three.^{[11]}
While smaller customer loads are usually billed only for energy, transmission services, and the rated capacity, larger consumers also pay for peak power consumption, the greatest power recorded in a fairly short time, such as 15 minutes. This compensates the power company for maintaining the infrastructure needed to provide peak power. These charges are billed as demand changes.^{[12]} Industrial users may also have extra charges according to the power factor of their load.
Major energy production or consumption is often expressed as terawatt-hours (TWh) for a given period that is often a calendar year or financial year. A 365-day year equals 8,760 hours, so over a period of one year, power of one gigawatt equates to 8.76 terawatt-hours of energy. Conversely, one terawatt-hour is equal to a sustained power of about 114 megawatts for a period of one year.
In 2020, the average household in the United States consumed 893 kWh per month.^{[13]}
In terms of human power, a healthy adult male manual laborer performs work equal to about half a kilowatt-hour over an eight-hour day.^{[14]}
Further information: Conversion of units § Energy |
To convert a quantity measured in a unit in the left column to the units in the top row, multiply by the factor in the cell where the row and column intersect.
Joule | Watt-hour | Kilowatt-hour | Electronvolt | Calorie | |
---|---|---|---|---|---|
1 J = 1 kg⋅m^{2}⋅s^{−2} = | 1 | 2.77778 × 10^{−4} | 2.77778 × 10^{−7} | 6.241 × 10^{18} | 0.239 |
1 Wh = | 3.6 × 10^{3} | 1 | 0.001 | 2.247 × 10^{22} | 859.8 |
1 kWh = | 3.6 × 10^{6} | 1,000 | 1 | 2.247 × 10^{25} | 8.598 × 10^{5} |
1 eV = | 1.602 × 10^{−19} | 4.45 × 10^{−23} | 4.45 × 10^{−26} | 1 | 3.827 × 10^{−20} |
1 cal = | 4.184 | 1.162 × 10^{−3} | 1.162 × 10^{−6} | 2.612 × 10^{19} | 1 |
Further information: Metric prefix |
Value | Symbol | Name |
---|---|---|
10^{−6} | μW⋅h | microwatt-hour |
10^{−3} | mW⋅h | milliwatt-hour |
10^{0} | W⋅h | watt-hour |
10^{3} | kW⋅h | kilowatt-hour |
10^{6} | MW⋅h | megawatt-hour |
10^{9} | GW⋅h | gigawatt-hour |
10^{12} | TW⋅h | terawatt-hour |
10^{15} | PW⋅h | petawatt-hour |
All the SI prefixes are commonly applied to the watt-hour: a kilowatt-hour is 1,000 Wh (kWh); a megawatt-hour is 1 million Wh (MWh); a milliwatt-hour is 1/1,000 Wh (mWh) and so on. The kilowatt-hour is commonly used by electrical energy providers for purposes of billing, since the monthly energy consumption of a typical residential customer ranges from a few hundred to a few thousand kilowatt-hours. Megawatt-hours (MWh), gigawatt-hours (GWh), and terawatt-hours (TWh) are often used for metering larger amounts of electrical energy to industrial customers and in power generation. The terawatt-hour and petawatt-hour (PWh) units are large enough to conveniently express the annual electricity generation for whole countries and the world energy consumption.
A kilowatt is a unit of power (rate of flow of energy per unit of time). A kilowatt hour is a unit of energy. Kilowatt per hour would be a rate of change of power flow with time.
Work is the amount of energy transferred to a system; power is the rate of delivery of energy. Energy is measured in joules, or watt-seconds. Power is measured in watts, or joules per second.
For example, a battery stores energy. When the battery delivers its energy, it does so at a certain power, that is, the rate of delivery of the energy. The higher the power, the quicker the battery's stored energy is delivered. A higher power output will cause the battery's stored energy to be depleted in a shorter time period.
Electric energy production and consumption are sometimes reported on a yearly basis, in units such as megawatt-hours per year (MWh/yr) gigawatt-hours/year (GWh/yr) or terawatt-hours per year (TWh/yr). These units have dimensions of energy divided by time and thus are units of power. They can be converted to SI power units by dividing by the number of hours in a year, about 8760 h/yr.
Thus, 1 GWh/yr = 1 GWh/8760 h ≈ 114.12 kW.
Many compound units for various kinds of rates explicitly mention units of time to indicate a change over time. For example: miles per hour, kilometres per hour, dollars per hour. Power units, such as kW, already measure the rate of energy per unit time (kW=kJ/s). Kilowatt-hours are a product of power and time, not a rate of change of power with time.
Watts per hour (W/h) is a unit of a change of power per hour, i.e. an acceleration in the delivery of energy. It is used to measure the daily variation of demand (e.g. the slope of the duck curve), or ramp-up behavior of power plants. For example, a power plant that reaches a power output of 1 MW from 0 MW in 15 minutes has a ramp-up rate of 4 MW/h.
Other uses of terms such as watts per hour are likely to be errors.^{[15]}^{[16]}