This document discusses the assessment and evaluation of solar resources. It covers topics like solar geometry, interaction of solar radiation with the atmosphere, measurement of solar radiation, and databases of solar radiation. Key points include how solar position varies daily and yearly due to Earth's orbit and rotation, atmospheric effects on solar irradiance like scattering, absorption and reflection, and parameters used to characterize solar resources like extraterrestrial and global irradiance. The goal is to provide tools to help evaluate solar power projects.
This document presents equations to compute the efficiency of a parabolic-trough solar collector using solar position coordinates. The equations account for factors like universal time, day, month, year, longitude, latitude, and heliocentric and geocentric coordinates to determine the sun's position. The collector efficiency considers the direct and reflected solar energy incident on its glass cover as well as thermal losses. The developed equations can predict collector performance using meteorological and radiative data for any location.
This document discusses orbital elements and parameters related to satellites and orbits. It defines key orbital characteristics like eccentricity, inclination, ascending node, and true anomaly. It also summarizes Kepler's laws of planetary motion and explains how Newton's laws of motion and universal gravitation describe orbits. Perturbations from various sources that affect satellite orbits over time are outlined as well.
Solar limb darkening_function_from_baily_beads_observationsSérgio Sacani
This document presents a new method for measuring the solar limb darkening function using observations of Baily's beads during solar eclipses. The method involves analyzing the light curve profiles of emerging and disappearing Baily's beads to determine the surface brightness profile of the outer solar atmosphere with high resolution. The method is applied to eclipse videos from 2010, yielding constraints on the position of the limb darkening function inflection point between -0.190 and +0.050 arcseconds. The results suggest reconsidering evaluations of historical eclipses that assumed a step function profile for the limb darkening.
This document discusses gravimetry, which is the measurement of gravity. It defines key terms like gravity, gravitational force, acceleration due to gravity, gravimeter, absolute and relative gravity, gravity anomaly, and theoretical gravity. It explains how gravity is measured using absolute and relative gravimeters. It also describes Clairut's formula for calculating theoretical gravity based on latitude or longitude. Finally, it outlines some uses and applications of gravimetry like determining Earth's shape and size, studying crustal structures, and aiding mineral exploration and navigation.
The document is a presentation on the equation of time. It begins by defining key terms like apparent sun, mean sun, apparent solar time, and mean solar time. It then defines the equation of time as the difference between apparent and mean solar time, which can range from -14 to +16 minutes. The chief causes of this difference are the unequal speed of the earth in its orbit and the fact that the apparent sun is on the ecliptic while the mean sun is on the equator. Graphs and tables are shown to represent the equation of time. Finally, some applications are discussed, such as correcting sundial times and accounting for the equation of time in solar energy systems.
This document provides an overview of the theoretical basis and methodology used in the METEONORM software. It discusses how hourly radiation values are referenced, and how meteorological data like radiation, temperature, wind, and rain are interpolated worldwide using inverse distance weighting models. Correction factors are also applied for different terrain features and locations near lakes, cities, valleys, and coastal areas. The interpolation process achieves a root mean square error of around 15 W/m2 for monthly global radiation averages and 1.9°C for monthly temperature averages.
This document provides an overview of cooling and heating load calculations and solar radiation modeling. It defines key terms related to solar geometry like latitude, declination, hour angles, and derived angles. It also describes the ASHRAE solar radiation model for calculating direct, diffuse and reflected radiation on surfaces. The objectives are to introduce cooling/heating load calculations, explain the importance of solar radiation, define relevant solar angles, and describe estimating radiation using ASHRAE models.
This document presents equations to compute the efficiency of a parabolic-trough solar collector using solar position coordinates. The equations account for factors like universal time, day, month, year, longitude, latitude, and heliocentric and geocentric coordinates to determine the sun's position. The collector efficiency considers the direct and reflected solar energy incident on its glass cover as well as thermal losses. The developed equations can predict collector performance using meteorological and radiative data for any location.
This document discusses orbital elements and parameters related to satellites and orbits. It defines key orbital characteristics like eccentricity, inclination, ascending node, and true anomaly. It also summarizes Kepler's laws of planetary motion and explains how Newton's laws of motion and universal gravitation describe orbits. Perturbations from various sources that affect satellite orbits over time are outlined as well.
Solar limb darkening_function_from_baily_beads_observationsSérgio Sacani
This document presents a new method for measuring the solar limb darkening function using observations of Baily's beads during solar eclipses. The method involves analyzing the light curve profiles of emerging and disappearing Baily's beads to determine the surface brightness profile of the outer solar atmosphere with high resolution. The method is applied to eclipse videos from 2010, yielding constraints on the position of the limb darkening function inflection point between -0.190 and +0.050 arcseconds. The results suggest reconsidering evaluations of historical eclipses that assumed a step function profile for the limb darkening.
This document discusses gravimetry, which is the measurement of gravity. It defines key terms like gravity, gravitational force, acceleration due to gravity, gravimeter, absolute and relative gravity, gravity anomaly, and theoretical gravity. It explains how gravity is measured using absolute and relative gravimeters. It also describes Clairut's formula for calculating theoretical gravity based on latitude or longitude. Finally, it outlines some uses and applications of gravimetry like determining Earth's shape and size, studying crustal structures, and aiding mineral exploration and navigation.
The document is a presentation on the equation of time. It begins by defining key terms like apparent sun, mean sun, apparent solar time, and mean solar time. It then defines the equation of time as the difference between apparent and mean solar time, which can range from -14 to +16 minutes. The chief causes of this difference are the unequal speed of the earth in its orbit and the fact that the apparent sun is on the ecliptic while the mean sun is on the equator. Graphs and tables are shown to represent the equation of time. Finally, some applications are discussed, such as correcting sundial times and accounting for the equation of time in solar energy systems.
This document provides an overview of the theoretical basis and methodology used in the METEONORM software. It discusses how hourly radiation values are referenced, and how meteorological data like radiation, temperature, wind, and rain are interpolated worldwide using inverse distance weighting models. Correction factors are also applied for different terrain features and locations near lakes, cities, valleys, and coastal areas. The interpolation process achieves a root mean square error of around 15 W/m2 for monthly global radiation averages and 1.9°C for monthly temperature averages.
This document provides an overview of cooling and heating load calculations and solar radiation modeling. It defines key terms related to solar geometry like latitude, declination, hour angles, and derived angles. It also describes the ASHRAE solar radiation model for calculating direct, diffuse and reflected radiation on surfaces. The objectives are to introduce cooling/heating load calculations, explain the importance of solar radiation, define relevant solar angles, and describe estimating radiation using ASHRAE models.
The document defines several key terms used in horizon systems of coordinates in astronomy:
- The horizon is a plane perpendicular to gravity through the observer's position, intercepting the celestial sphere.
- The visible horizon is the apparent horizon projected outward to intersect the celestial sphere.
- The astronomical horizon is the great circle formed by the intersection of the celestial sphere and a plane perpendicular to the line from the observer to the zenith.
- The zenith is the direction pointing directly above the observer, and the nadir is the direction pointing directly below.
This document defines various angles used to describe the position of the sun relative to Earth and vertical surfaces. It outlines three angles that describe the Earth's position: latitude, declination, and hour angle. It then defines three sun angles: inclination angle, zenith angle, and solar azimuth angle. Finally, it lists three surface angles: surface azimuth angle, tilt angle or slope, and angle of incidence.
This document discusses the origins and definitions of various units of time measurement. It provides the following key points:
- Years, days, and months are based on the motions of the Earth, sun, and moon. A day is one rotation of the Earth, a year is one revolution around the sun, and a month was originally one revolution of the moon.
- Solar days vary slightly in length due to the elliptical orbits of planets and Earth's axial tilt. Local mean time uses longitude to account for time differences between locations.
- Astronomy uses precise time measurements like Greenwich Hour Angle and Local Hour Angle to determine positions of celestial bodies based on their movement relative to meridians. The Local Hour Angle
The document discusses different systems used to describe the positions of celestial bodies. It defines proper motion as the actual motion of stars and apparent motion as how the motion appears from Earth due to its rotation and revolution around the sun. It also describes the daily rotation and annual elliptical revolution of Earth and defines celestial coordinates including right ascension, declination, altitude, and azimuth.
The document discusses Earth-Sun relationships and how the position of the subsolar point changes throughout the year due to the tilt of Earth's axis and its elliptical orbit. It also discusses equinoxes, solstices, and how an analemma can be used to determine the subsolar point and solar noon for any date. Topographic maps and how to measure distances and road lengths using map scales are described. The use of compasses to determine direction of travel and current position via landmarks is explained.
The document discusses concepts related to observing the night sky, including:
- The celestial sphere represents the sky as a hollow dome centered on Earth. Key points are the zenith overhead and horizon.
- The altitude is a star's height above the horizon, and azimuth is its direction from true north.
- The celestial sphere model orients observations using the north and south celestial poles and celestial equator analogously to Earth's geographic coordinates.
A description of solar radiation and how it is measured using pyranometers and other instruments, with a challenge for future makers. These measurements are needed for solar energy applications from electricity to solar cooking for refugees. A new ISO standard now provides a way to make fair comparisons of solar cookers. This method uses solar irradiance measurements to standardize the data for use anywhere in the world.
The pearled solar eclipse of 1912.04.17 occurred 60 hours after the TITANIC disaster had cast its shadow upon this exciting event. The data collected during this most elusive eclipse are compared to those generated by Xavier JUBIER's 5MCSE, the most up-to date ergonomical solar eclipse simulation freeware, which allows the choice of the DeltaT parameter, as well as the exact GPS Coordinates of the observation site such as the balloon Globule at 900 meter over Rethondes.
This lab activity document provides instructions for students to locate the epicenters of three earthquakes using seismic data from three stations for each earthquake. Students will analyze seismograms to determine the arrival times of P-waves and S-waves and then use the difference in arrival times to calculate the distance from each station to the epicenter. Students will then draw circles with radii equal to these distances on maps to locate where the circles intersect, identifying the epicenter's location. Tables are included for recording data, and maps show the station locations to draw epicenter circles. Discussion questions at the end address earthquake prediction, minimum stations needed, and properties of P and S waves.
Uniformitarianism. Eratosthenes. Earth's size and shape. Centrifugal force. Earth's rotation and revolution. Navigation: great circles and small circles. The geographic grid. Time zones. Review
1) High-dispersion spectroscopy was used to observe the young exoplanet Beta Pictoris b, detecting a blueshifted radial velocity of -15±1.7 km/s and rotational broadening of 25±3 km/s, indicating it spins faster than any planet in the solar system.
2) Beta Pictoris b's high spin velocity is consistent with an extrapolation of the trend of increasing spin velocity with planet mass seen in the solar system.
3) At an estimated age of 11±5 Myr, Beta Pictoris b is expected to cool and shrink over time, which would cause it to spin up further to a rotation velocity of around 40 km/s.
This document provides an overview of simple astronomical principles for determining position, including:
- The relationship between altitude, zenith distance, and the position circle on a sphere or Mercator chart
- How to calculate true zenith distance from a sextant altitude measurement
- Plotting intercepts on a chart to determine position by running position lines from a geographical position fix
- Taking simultaneous star sights to fix a position over a short time period to minimize dead reckoning errors
- Why sun-run-sun sights become less accurate over longer time periods due to increased dead reckoning uncertainty
This research project aimed to determine the relationship between earthquakes detected by seismometers at the LIGO-Hanford Observatory and the sensitivity of the LIGO interferometers to gravitational waves. The student collected data on earthquakes and interferometer sensitivity in 2007. By comparing earthquake data to seismometer readings and sensitivity measurements, some earthquakes were confirmed to affect interferometer sensitivity. However, the relationships between sensitivity and individual earthquake attributes like distance, magnitude, and depth were inconclusive. Further data and analysis are needed to fully model how earthquakes impact LIGO interferometer measurements.
The document discusses concepts of time, the solar system, Earth's movements, and how these relate to measuring and standardizing time. It covers three key points:
1) Earth's rotation on its axis and revolution around the sun cause day/night cycles and seasons. Kepler's laws describe planetary motion.
2) Time is measured using solar time, mean solar time, time zones, and Coordinated Universal Time (UTC). Conversion methods allow determining time in different locations.
3) Daylight saving time, international date line, and sunrise/sunset variations depend on factors like latitude and solar declination. Twilight durations are longest at high latitudes and when the sun's declination is highest
This document defines and summarizes various units of measurement used in astronomy, including the astronomical unit (AU), light-year, and parsec. It describes coordinate systems like right ascension and declination that are used to specify positions of celestial objects. It also discusses magnitude scales used to measure the brightness of stars and other astronomical objects.
This document provides an introduction to seismology and seismic design of buildings. It discusses the causes of earthquakes, including plate tectonics, and describes how seismic waves propagate from the hypocenter. It examines different methods of measuring earthquake size, such as magnitude scales based on amplitude (Richter), seismic moment (Mw), and observed effects (Mercalli). The document also explores earthquake ground motion and highlights the importance of understanding strong ground shaking for structural design.
This document provides information about constants and laws related to gravitational fields that commonly appear on exams for the PAU (University Access Test) in Castilla y León, Spain. It includes the values of gravitational acceleration on Earth (g0), Earth's radius (RT), Earth's mass (MT), and the gravitational constant (G). It then provides example problems applying Kepler's laws and Newton's law of universal gravitation to calculate orbital properties of planets, moons, and satellites. Sample problems calculate orbital periods, velocities, distances, and gravitational accelerations for bodies in the solar system like Jupiter, Mars, Mercury, the Moon, and artificial satellites.
The Earth is not a perfect sphere, but is slightly flattened at the poles. The Earth rotates daily on its tilted axis, causing seasons and influencing climate. Parallels of latitude and meridians of longitude form a grid system to locate positions on the Earth's surface. The Earth revolves around the Sun annually in an elliptical orbit, with the seasons resulting from the tilt of its axis of rotation. Precise geodetic coordinates define locations on the reference ellipsoid used to model the oblate spheroid shape of the Earth.
This document discusses solar energy and its applications. It covers topics like solar radiation components, applications of solar energy in areas like solar heating and cooling and power generation, and factors that affect solar radiation intensity like geographical location and weather conditions. It also provides information on concepts like extraterrestrial solar radiation, solar collectors, and how solar geometry and angles help determine the amount of direct radiation received on Earth's surface.
Lecture Slides - Solar Energy Basics and Utilization (1).pdfGian Jyoti Group
This document discusses solar energy basics including solar radiation, solar resource assessment, and solar geometry. Some key points:
- Solar radiation received on Earth consists of direct beam and diffuse radiation after passing through the atmosphere. The amount of each component depends on factors like air mass and atmospheric conditions.
- Solar geometry concepts like zenith angle, declination, and hour angle are used to determine the direction of incoming solar radiation and calculate quantities like duration of sunshine.
- Equations are provided to calculate the angle of incidence of direct radiation on tilted surfaces, as well as the total solar radiation received, accounting for direct beam, diffuse sky, and ground-reflected components.
The document defines several key terms used in horizon systems of coordinates in astronomy:
- The horizon is a plane perpendicular to gravity through the observer's position, intercepting the celestial sphere.
- The visible horizon is the apparent horizon projected outward to intersect the celestial sphere.
- The astronomical horizon is the great circle formed by the intersection of the celestial sphere and a plane perpendicular to the line from the observer to the zenith.
- The zenith is the direction pointing directly above the observer, and the nadir is the direction pointing directly below.
This document defines various angles used to describe the position of the sun relative to Earth and vertical surfaces. It outlines three angles that describe the Earth's position: latitude, declination, and hour angle. It then defines three sun angles: inclination angle, zenith angle, and solar azimuth angle. Finally, it lists three surface angles: surface azimuth angle, tilt angle or slope, and angle of incidence.
This document discusses the origins and definitions of various units of time measurement. It provides the following key points:
- Years, days, and months are based on the motions of the Earth, sun, and moon. A day is one rotation of the Earth, a year is one revolution around the sun, and a month was originally one revolution of the moon.
- Solar days vary slightly in length due to the elliptical orbits of planets and Earth's axial tilt. Local mean time uses longitude to account for time differences between locations.
- Astronomy uses precise time measurements like Greenwich Hour Angle and Local Hour Angle to determine positions of celestial bodies based on their movement relative to meridians. The Local Hour Angle
The document discusses different systems used to describe the positions of celestial bodies. It defines proper motion as the actual motion of stars and apparent motion as how the motion appears from Earth due to its rotation and revolution around the sun. It also describes the daily rotation and annual elliptical revolution of Earth and defines celestial coordinates including right ascension, declination, altitude, and azimuth.
The document discusses Earth-Sun relationships and how the position of the subsolar point changes throughout the year due to the tilt of Earth's axis and its elliptical orbit. It also discusses equinoxes, solstices, and how an analemma can be used to determine the subsolar point and solar noon for any date. Topographic maps and how to measure distances and road lengths using map scales are described. The use of compasses to determine direction of travel and current position via landmarks is explained.
The document discusses concepts related to observing the night sky, including:
- The celestial sphere represents the sky as a hollow dome centered on Earth. Key points are the zenith overhead and horizon.
- The altitude is a star's height above the horizon, and azimuth is its direction from true north.
- The celestial sphere model orients observations using the north and south celestial poles and celestial equator analogously to Earth's geographic coordinates.
A description of solar radiation and how it is measured using pyranometers and other instruments, with a challenge for future makers. These measurements are needed for solar energy applications from electricity to solar cooking for refugees. A new ISO standard now provides a way to make fair comparisons of solar cookers. This method uses solar irradiance measurements to standardize the data for use anywhere in the world.
The pearled solar eclipse of 1912.04.17 occurred 60 hours after the TITANIC disaster had cast its shadow upon this exciting event. The data collected during this most elusive eclipse are compared to those generated by Xavier JUBIER's 5MCSE, the most up-to date ergonomical solar eclipse simulation freeware, which allows the choice of the DeltaT parameter, as well as the exact GPS Coordinates of the observation site such as the balloon Globule at 900 meter over Rethondes.
This lab activity document provides instructions for students to locate the epicenters of three earthquakes using seismic data from three stations for each earthquake. Students will analyze seismograms to determine the arrival times of P-waves and S-waves and then use the difference in arrival times to calculate the distance from each station to the epicenter. Students will then draw circles with radii equal to these distances on maps to locate where the circles intersect, identifying the epicenter's location. Tables are included for recording data, and maps show the station locations to draw epicenter circles. Discussion questions at the end address earthquake prediction, minimum stations needed, and properties of P and S waves.
Uniformitarianism. Eratosthenes. Earth's size and shape. Centrifugal force. Earth's rotation and revolution. Navigation: great circles and small circles. The geographic grid. Time zones. Review
1) High-dispersion spectroscopy was used to observe the young exoplanet Beta Pictoris b, detecting a blueshifted radial velocity of -15±1.7 km/s and rotational broadening of 25±3 km/s, indicating it spins faster than any planet in the solar system.
2) Beta Pictoris b's high spin velocity is consistent with an extrapolation of the trend of increasing spin velocity with planet mass seen in the solar system.
3) At an estimated age of 11±5 Myr, Beta Pictoris b is expected to cool and shrink over time, which would cause it to spin up further to a rotation velocity of around 40 km/s.
This document provides an overview of simple astronomical principles for determining position, including:
- The relationship between altitude, zenith distance, and the position circle on a sphere or Mercator chart
- How to calculate true zenith distance from a sextant altitude measurement
- Plotting intercepts on a chart to determine position by running position lines from a geographical position fix
- Taking simultaneous star sights to fix a position over a short time period to minimize dead reckoning errors
- Why sun-run-sun sights become less accurate over longer time periods due to increased dead reckoning uncertainty
This research project aimed to determine the relationship between earthquakes detected by seismometers at the LIGO-Hanford Observatory and the sensitivity of the LIGO interferometers to gravitational waves. The student collected data on earthquakes and interferometer sensitivity in 2007. By comparing earthquake data to seismometer readings and sensitivity measurements, some earthquakes were confirmed to affect interferometer sensitivity. However, the relationships between sensitivity and individual earthquake attributes like distance, magnitude, and depth were inconclusive. Further data and analysis are needed to fully model how earthquakes impact LIGO interferometer measurements.
The document discusses concepts of time, the solar system, Earth's movements, and how these relate to measuring and standardizing time. It covers three key points:
1) Earth's rotation on its axis and revolution around the sun cause day/night cycles and seasons. Kepler's laws describe planetary motion.
2) Time is measured using solar time, mean solar time, time zones, and Coordinated Universal Time (UTC). Conversion methods allow determining time in different locations.
3) Daylight saving time, international date line, and sunrise/sunset variations depend on factors like latitude and solar declination. Twilight durations are longest at high latitudes and when the sun's declination is highest
This document defines and summarizes various units of measurement used in astronomy, including the astronomical unit (AU), light-year, and parsec. It describes coordinate systems like right ascension and declination that are used to specify positions of celestial objects. It also discusses magnitude scales used to measure the brightness of stars and other astronomical objects.
This document provides an introduction to seismology and seismic design of buildings. It discusses the causes of earthquakes, including plate tectonics, and describes how seismic waves propagate from the hypocenter. It examines different methods of measuring earthquake size, such as magnitude scales based on amplitude (Richter), seismic moment (Mw), and observed effects (Mercalli). The document also explores earthquake ground motion and highlights the importance of understanding strong ground shaking for structural design.
This document provides information about constants and laws related to gravitational fields that commonly appear on exams for the PAU (University Access Test) in Castilla y León, Spain. It includes the values of gravitational acceleration on Earth (g0), Earth's radius (RT), Earth's mass (MT), and the gravitational constant (G). It then provides example problems applying Kepler's laws and Newton's law of universal gravitation to calculate orbital properties of planets, moons, and satellites. Sample problems calculate orbital periods, velocities, distances, and gravitational accelerations for bodies in the solar system like Jupiter, Mars, Mercury, the Moon, and artificial satellites.
The Earth is not a perfect sphere, but is slightly flattened at the poles. The Earth rotates daily on its tilted axis, causing seasons and influencing climate. Parallels of latitude and meridians of longitude form a grid system to locate positions on the Earth's surface. The Earth revolves around the Sun annually in an elliptical orbit, with the seasons resulting from the tilt of its axis of rotation. Precise geodetic coordinates define locations on the reference ellipsoid used to model the oblate spheroid shape of the Earth.
This document discusses solar energy and its applications. It covers topics like solar radiation components, applications of solar energy in areas like solar heating and cooling and power generation, and factors that affect solar radiation intensity like geographical location and weather conditions. It also provides information on concepts like extraterrestrial solar radiation, solar collectors, and how solar geometry and angles help determine the amount of direct radiation received on Earth's surface.
Lecture Slides - Solar Energy Basics and Utilization (1).pdfGian Jyoti Group
This document discusses solar energy basics including solar radiation, solar resource assessment, and solar geometry. Some key points:
- Solar radiation received on Earth consists of direct beam and diffuse radiation after passing through the atmosphere. The amount of each component depends on factors like air mass and atmospheric conditions.
- Solar geometry concepts like zenith angle, declination, and hour angle are used to determine the direction of incoming solar radiation and calculate quantities like duration of sunshine.
- Equations are provided to calculate the angle of incidence of direct radiation on tilted surfaces, as well as the total solar radiation received, accounting for direct beam, diffuse sky, and ground-reflected components.
1) Jupiter's moon Europa orbits Jupiter with a period of 3.55 days at an average radius of 6.71 x 10^8 m. Using Kepler's third law, the mass of Jupiter is calculated to be 1.902 x 10^27 kg, consistent with its accepted value.
2) Jupiter's moon Callisto orbits at an average radius of 18.8 x 10^8 m with a period of 16.7 days. The ratio of the centripetal accelerations of Europa and Callisto is consistent with an inverse-square law for gravity.
3) Kepler determined relative distances in the solar system by considering the maximum elongation angle between Venus and the sun, which was found to be 47
General Relativity is Einstein's theory of gravitation that describes gravity as a result of the curvature of spacetime caused by the uneven distribution of mass/energy. It has been extensively tested and confirmed through observations of orbital precession, gravitational lensing, and gravitational redshift/time dilation. Black holes are a extreme prediction of GR where spacetime is so strongly curved that nothing, not even light, can escape once within the event horizon.
Lab #2Sun Angles, Daylength, Insolation, and Temperature Patter.docxjesseniasaddler
Lab #2:
Sun Angles, Daylength, Insolation, and Temperature Patterns
Insolation
The sun is the single most important source of energy on the surface of the Earth as well as the atmosphere.
The distribution of the Earth’s atmospheric phenomena and climate patterns, as well as the distribution of its ecosystems, are significantly influenced by the distribution of incoming solar radiation.
In heating the Earth’s atmosphere, visible light is the most important part of the sun’s electromagnetic spectrum.
This exercise examines sun angle and intensity of insolation, daylength and temperature patterns on the earth’s surface.
These variables are examined as they interrelate on the Earth’s surface over the course of a year.
Sun Angle
Because solar energy received by the earth follows essentially parallel pathways, and because the earth is spherical, at only one place on the earth’s surface can the sun’s rays strike vertically (this is known as the
subsolar point
).
In other words, at only one place at any one time can the sun appear directly overhead.
This occurs at
solar noon
when the sun reaches the highest position in the sky for that day.
Because of the earth's limited axial tilt, the sun can appear directly overhead at the
subsolar point
at a relatively narrow range of latitudes over the course of a year (between 23.5° N and 23.5° S).
An important relationship exists between latitude and the angle of the
noon
sun.
On the equinoxes (on March 21 or 22 and September 21 or 22) the sun’s rays are perpendicular to the earth at the equator.
Those same rays would also be tangent at both of the poles, so that the sun would appear only on the horizon at those locations.
On the same dates an observer at 30° N would record a sun angle of 60° above the southern horizon.
Remember, the sun is 90° to the observer at the equator, minus the latitude of 30° (30° of arc) which equals 60°.
This is called the
angle of incidence
, or sun angle.
The angle of incidence decreases by 1° for every degree of arc of latitude between the observer's position and the location where the sun’s rays are vertical.
This rule is the same for the other times of the year but is complicated by the earth's
declination
–the shift in angle when the sun's rays are not perpendicular to the equator.
If the declination is 10° S, this means that the sun's rays are vertical at 10° S and an observer at 30° N would see the sun at 50° above the horizon 90-40 or 90-(30+10).
Use the formula:
angle of incidence = 90° - (latitude in degrees + declination in degrees*)
* If the declination is in the same hemisphere as the observer, subtract this from latitude.
Example:
Seattle (47° N) on December 21 (23.5° S) would be:
90° - (47 + 23.5)
90° - (70.5) = 19.5°
Thus the angle of incidence for Seattle on December 21 is 19.5°
Note:
Keep in mind that solar noon is not the same as noon on our clock or watch because we are on standard time and typically, daylight s.
This document provides an overview of solar energy and solar radiation concepts. It discusses topics like solar radiation geometry, measurement of solar radiation, extraterrestrial and terrestrial radiation, scattering and absorption in the atmosphere, air mass, and formulas for calculating the angle of incidence and solar day length. It also includes examples of calculating the angle of incidence and sunshine hours at different locations and dates. The document is intended to outline the syllabus and learning outcomes for a course on renewable energy systems with a focus on solar energy.
This document discusses solar energy and the structure and composition of the sun. It provides details on:
1) The core, radiation zone, convection zone, photosphere, chromosphere, transition layer, and corona of the sun and their respective temperatures and densities.
2) The concept of solar constant and how the amount of solar radiation reaching Earth varies with location and seasons.
3) Different types of solar collectors like flat plate and concentrating collectors and their uses for low to high temperature applications.
4) Key angles used in solar energy like the altitude, azimuth, and zenith angles and how they are calculated based on factors like latitude and day of the year.
This document discusses angles related to the sun's position from an observer's perspective on Earth. It defines the solar altitude as the angle between the sun's central ray and a horizontal plane containing the observer. The zenith angle is the geometric complement of the solar altitude angle. The solar azimuth measures the angle on the horizontal plane between the meridian of the 0 degrees axis (South) and the projected direction of the sun's central beam. Calculations are provided for determining the solar altitude and zenith angle based on variables like latitude, date, and time.
Learning Geometric Algebra by Modeling Motions of the Earth and Shadows of Gn...James Smith
Because the shortage of worked-out examples at introductory levels is an obstacle to widespread adoption of Geometric Algebra (GA), we use GA to calculate Solar azimuths and altitudes as a function of time via the heliocentric model. We begin by representing the Earth's motions in GA terms. Our representation incorporates an estimate of the time at which the Earth would have reached perihelion in 2017 if not affected by the Moon's gravity. Using the geometry of the December 2016 solstice as a starting point, we then employ GA's capacities for handling rotations to determine the orientation of a gnomon at any given latitude and longitude during the period between the December solstices of 2016 and 2017. Subsequently, we derive equations for two angles: that between the Sun's rays and the gnomon's shaft, and that between the gnomon's shadow and the direction ``north" as traced on the ground at the gnomon's location. To validate our equations, we convert those angles to Solar azimuths and altitudes for comparison with simulations made by the program Stellarium. As further validation, we analyze our equations algebraically to predict (for example) the precise timings and locations of sunrises, sunsets, and Solar zeniths on the solstices and equinoxes. We emphasize that the accuracy of the results is only to be expected, given the high accuracy of the heliocentric model itself, and that the relevance of this work is the efficiency with which that model can be implemented via GA for teaching at the introductory level. On that point, comments and debate are encouraged and welcome.
Hello, I am Subhajit Pramanick. I and my classmate, Shivani Gupta, both presented this ppt in seminar of our university, Banaras Hindu University. Here it is the experiment how to determine Synodic and Sidereal time period of rotation of the Sun by tracing Sun spots. This presentation consists both the theory as well as experiment part. We hope you will all enjoy by reading this presentation. Thank you.
Estimation of the Earth's "Unperturbed" Perihelion from Times of Solstices an...James Smith
Published times of the Earth's perihelions do not refer to the perihelions of the orbit that the Earth would follow if unaffected by other bodies such as the Moon. To estimate the timing of that ``unperturbed" perihelion, we fit an unperturbed Kepler orbit to the timings of the year 2017's equinoxes and solstices. We find that the unperturbed 2017 perihelion, defined in that way, would occur 12.93 days after the December 2016 solstice. Using that result, calculated times of the year 2017's solstices and equinoxes differ from published values by less than five minutes. That degree of accuracy is sufficient for the intended use of the result.
The document discusses solar energy and the sun-earth relationship. It provides details on:
- The structure and composition of the sun, including how nuclear fusion reactions generate its energy.
- The geometry of the sun-earth relationship, including their relative sizes and average distance.
- How solar radiation is emitted from the sun as a black body and its spectral distribution outside the earth's atmosphere.
- How solar radiation is affected by passing through the earth's atmosphere, undergoing absorption and scattering.
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2. Contents
Assessment and Evaluation of Solar Resources ............................................................................ 1
1. Introduction .......................................................................................................................... 3
2. Solar Geometry ..................................................................................................................... 3
3. Interaction of solar radiation with the atmosphere ............................................................. 9
4. Solar radiation estimated from satellite ............................................................................. 12
5. Measurement of solar radiation ......................................................................................... 14
6. Data quality assessment...................................................................................................... 14
7. Databases of solar radiation ............................................................................................... 18
8. Using of solar radiation data for CSP technologies ............................................................. 27
9. References ........................................................................................................................... 27
3. 1. Introduction
The solar radiation is a meteorological variable measured only in few measurement stations
and during short and, on most occasions, discontinuous periods of times. The lack of reliable
information on solar radiation, together with the spatial variability that it presents, leads to the
fact that developers do not find appropriate historical databases with information available on
solar resource for concrete sites. This lack provokes in turn serious difficulties at the moment
of projecting or evaluating solar power systems. The next paragraphs are a summary of
concepts and tools which can help to the solar community to evaluate their projects.
2. Solar Geometry
The trajectory which describes the sun in the vault of heavenvaries for each day of the year.
This way, the modeling and the solar irradiance measurements need to know with precision
the position of this heavenly body in each instant of the day and each day of the year.
The Sun can be considered as a sphere of 1.39 106 km of diameter and 1.99 1032 kg of mass
where thermonuclear reactions are produced which transform the hydrogen nucleus in helium
nucleus. Due to these nuclear reactions, the temperature in the surface varies between 4700
and 7500 K, and its emissions belong to the spectrum of a black body.Supposing that the
temperature and the Sun’s radiation spectrum are constant, the quantity of the energy which
reaches the surface of the earth atmosphere can be established analytically from the relative
positions of the Sun and the Earth. Due to the fact that the Earth has also a movement of
rotation in its own axis and another of translation around the Sun, it is necessary to define
previously a spatial and temporal reference system which places the Sun and the Earth, due to
the fact that they are two bodies in motion.
Temporal reference system
The solar day can be defined as the temporal interval in which the Sun cross two times the
same local meridian. The longitude of the solar day is not constant, due to the fact that it
changes along the year because the following reasons:
ThedistanceSun-Earth.
The distance Sun-Earth, due to the elliptic orbit, which the Earth describes around the
Sun, and which varies along the year.
The inclination of the Earth rotating axis (~23.5º) in relation to the translation plane
around the Sun known also as the elliptical plane.
True solar time (TSV) is defined as the time counted from the solar meridian. In another way,
local official hour or mean local time (TLM) corresponds with the hour which we frequently use
4. in our clocks and it is established by each count. The conversion from official time to local solar
time needs two corrections:
The difference in terms of geographic longitude between the meridian of the observer
and the reference meridian for which the official hour was defined (4 minutes for each
geographic degree).
The effects which are expressed in the equation of time and are due to the eccentricity
of the Earth, the constant in areolar speed (2º Law of Kepler) and the movements of
the axis of the Earth.
The calculation of the time equation in minutes can be done using the following expression:
ET 229.18 0.000075 0.001868cos 0.032077sin 0.014615cos2 0.040849sin 2 (1)
whereΓrepresents the daily angle; it is depenant of the Julian day ( J d ) and can be calcualted,
in radians, as:
2 J d 1 / 365.24 (2)
In certain occasions, it can be necessary a third temporal correction ( C h ) due to the hourly
changes to save energyas a policy of the country (in Spain C h =1 in winter and in summer C h
=2). Thisway, para transformar el tiempo solar verdadero en hora decimal, se puede utilizar la
siguiente expresión (ESRA 2000) :
TSV TLM of loc /15 ET / 60 Ch
(3)
being of = The meridian longitude of the official hourly reference. loc = Local meridian
longitude.
Spatial reference system.Solar geometry.
The dynamic of the Earth around the Sun needs the evaluation of certain geometric
parameters which describes the position of the Sun respect to a certain location of the Earth to
been able to do any calculation for that location.
5. Figure 1 Equation of time in minutes
The main parameters to determine the geometric relations of the Sun respect to an observer
over a horizontal surface on the Earth are the following:
Latitude ( ). It is the angular position, North or South, respect to the equator, positive
in the North; 90 0 90 0 .
Julian Day (Jd). It is defined as the day of the year (Jd=1~366). Being Jd=1 forthefirst of
January.
Declination ( ). It is defined as the angle between the equatorial plane and the
translation plane of the Earth, positive in the North; 23.450 23.450 . The
declination ( ) can be obtained using the following approximation (in radians):
23.45sin 360 284 J d / 365
180 (4)
Hourly angle ( ). It is defined as the angular displacement of the Sun, East or West,
respect to the local meridian. It is due to the rotation of the Earth around its own axis.
It changes 15º per hour. In the morning it is positive, and after the Sun crosses the
local meridian, it is negative.
Solar Azimut (ψ). It is angle in the solar cenit between the meridian plane of the
observer and the plane of a big circle which goes through the cenit and the Sun. It is
measured positive in the East, negative in the West (near the South) and this way it
varies from 0º to ±180º
6. Solar cenit angle ( z ). It can be defined as the incoming angle of the beam solar rays
over a horizontal ground surface where the observer is located. The cenital solar angle
is expressed using the following equation:
cos z sin sin cos cos cos sin
(5)
Solar elevation (α). It is defined as the angle between the point of the ground observer
and the position of the Sun, with the horizontal plane tangent to the ground surface.
This angle is complementary to the solar cenit angle (θz+α=π/2).
Figure 2 Solar angles
The cenital and azimutal angles can be calculated using the following equation:
1
cos sin sin cos cos cos /2
z
(6)
1 1
cos cos z sin sin / sin z cos sin cos sin / sin z
(7)
7. Variation of extraterrestrial irradiance
The outgoing solar radiation and its spatial relation show and intensity approximately fixed out
of the earth’s atmosphere. The value of the solar irradiance on a flat surface normal to the
vector of the position of the Sun, is located in the upper limit of the earth’s atmosphere and it
is known as the solar constant (ISC). The value accepted for this constant has changed on
several measurements done during the last years. However, the value currently more accepted
is 1367Wm-2. This value is accepted but the World Meteorological Organization (WMO 1981)
and it has been estimated by the World Radiologic Center (WRC), from 25000 measurements
done with several absolute cavity radiometers (ACR) (Fröhlich, C. & Brusa, R. W. 1981).
Due to the eccentricity which is described by the earth’s orbit in its translation movement, the
distance Sun-Earth varies approximately 1.7% each year. This way, solar irradiance which is
received in the upper limit of the earth’s atmosphere is not constant, and it is affected by the
Law of the Square of the distance, obtaining a seasonal variation of ±3.3%.The eccentricity of
the earth’s orbit ( ) can be obtained using the following expression:
1.000110 0.034221 cos 0.001280 sin
0.000719 cos 2 0.000077 sin 2 (8)
whereΓ represents daily angle defined previously.
The energy which is received in a surface normal to the direction of the vector of the position
of the Sun can be obtained in function of the eccentricity. This values is known as the
extraterrestrial solar irradiance( I 0n ) and it represents the seasonal variation of the solar
constant, due to the variation of the variation of the distance Sun-Earth with respect with the
mean value (AU).
I 0n I CS
(9)
Using the last expression, we can calculate the irradiance received in a flat surface tangent to
the ground surface in the upper limit of the atmosphere ( I 0 ). The value I 0 can be obtained
using the following expression:
I0 I CS cos z
(10)
8. The last relation establishes the upper limit of the irradiance, which can be received in a
horizontal plane in the ground surface.
Figure 3 Variation of extraterrestrial solar irradiance along the whole year
Solar radiation in the ground surface
Once solar radiation has gone through the atmosphere, beam solar irradiance (B) can be
defined as the incoming power on a surface by unit of area corresponding to the angle limited
by the solar disk, with taking into account the atmospheric diffusion. In a similar way, diffuse
solar irradiance (D) corresponding to the power per area unit received by a surface from the
atmospheric diffusion of solar irradiance and circumsolar zone (bright zone around the solar
disk). Global irradiance (G) corresponds to the total power per unit area received by a surface
and as a source of beam, diffuse and outgoing irradiance reflected by the environment (R). We
can relate these magnitudes using the following expressions:
G B D R (11)
Clearsky index (kt)
The clear sky index (kt) is defined as the quotient between the values of solar irradiance
registered in the surface and the corresponding values of extraterrestrial solar irradiance, both
for the same temporal period. The values of kt are obtained from solar irradiance, applying the
following expression:
G
kt (12)
I0
9. whereG is the global irradiance which reaches the earth’s surface in a horizontal plane and I0 is
the extraterrestrial irradiance over a horizontal surface, both for the same temporal period.
3. Interaction of solar radiation with the atmosphere
The solar irradiance is composed of different wavelengths. Commonly it is considered that the
Sun emits as a black body, which temperature is 5760 K. The spectrum of the solar radiation
which reaches the upper limit of the atmosphere is composed by the wavelengths ( ) from
0.28 to 5 m and it is divided commonly in three regions, ultraviolet ( < 0.33 m), visible (0.33
< < 0.76 m) and infrared ( > 0.76 m).
In the outer space there is no loss of radiation due to interaction with any material, only
attenuation due to the Law of the Square of the distance. Nevertheless, after going through
the atmosphere, the solar radiation suffers different processes of reflection, attenuation and
dispersion as a result of the interaction with the different atmospheric components: aerosols,
clouds, ozone molecules, carbon dioxide, oxygen, water vapor, etc. The main atmospheric
effects on solar irradiance are the following:
Diminution of the energy which is received on the ground level due to the interaction
with the atmospheric components.
Modification of the spectral characteristics of the solar irradiance.
Modification of the special distribution of the solar irradiance which is received in the
ground surface.
The reflection of the solar irradiance is due mainly to the interaction with cloud and floating
particles. The absorption of solar irradiance, due to atmospheric components, is responsible of
decrease of approximately 20% of the coming solar energy. The main components which
produce the attenuation are the ozone, the water vapor and carbon dioxide.
Scattering produces the attenuation of solar irradiance which reaches the upper limit of the
earth’s atmosphere, making it to be distributed in all directions. The atmospheric components
which produce this effect are water vapor, aerosols and molecular components. The scattering
effect is related directly with the size of the constituent and its concentration. The mediums
size of the particle is defined using the non-dimensional coefficient Θ:
1
2 q
(13)
beingq the size of the particle and λthe incoming wavelength. It is possible to distinguish three
types of diffusion:
Rayleigh diffusion. It is produced when the wavelength of solar irradiance is higher
than the dimension of theresponsible particles ( ). This process is produced by
nitrogen and oxygen molecules. Rayleigh scattering is proportional to λ-4, this way, it
affects to short-wavelengths and it is responsible of the color blue of the sky. This
phenomenon is produced mainly the higher layers of the atmosphere.
10. Mie diffusion. It is produced when the wavelength of the solar irradiance has the same
order of magnitude as molecules which originate the effect ( 50 ). The main cause
is due water vapor, the dust and aerosols. It has effect on all wavelengths of the visible
channel and it is produced in the lower layers of the atmosphere.
Non-selective diffusion. It is produced when the wavelength is lower than the
dimension of the particles ( ). This effect is caused mainly by the water drops
which make up the clouds and fogs.
Integrating along all the radiative spectrum of the intensity or power of solar irradiance, solar
energy which reaches the earth’s surface will depend on the thickness of earth’s layer which
has to transpose the rays before reaching the earth’s surface, and on the concentration of the
suspending particles and molecules which are on its way. The physical description of the
interaction of solar energy with the atmosphere is not a trivial problem and it is broadly
treated in current texts(Iqbal, M. 1983). An approximation, suitable for the resolution of the
problem, is based on the parameterization of the main atmospheric characteristics depending
on certain magnitudes which are described next.
Solar irradiance in its way through the atmospheric layer goes through a variable thickness.
The relative optical mass of the air (m) quantifies the length of the optical way which solar
radiation travels. This value can be estimated ignoring the earth’s curvature and supposing a
uniform atmosphere with a refraction index equal to the unit, using the following expression
(Kasten, F. & Young, A. T. 1989):
1.6364 1
* *
m p / p0 sin 0.50572 57.29578 6.07995
(A.14)
*
being the true solar altitude, that is, the solar altitude corrected by the atmospheric
refraction effects, obtained using the following equation:
2
* 0.1594 1.1230 0.065656
0.061359
1 28.9344 277.3971 2 (A.15)
The non-dimensional coefficient (p/p0) is an atmospheric pressure correction due to the
altitude above the level sea (z) of the site under study. The value of (p/p0) is calculated in a
rough way using the following equation:
p / p0 exp z / 8400
(A.16)
11. wherezis the vertical coordinatereferred to the sea level.
The influence of the different atmospheric components can be estimated using the
comparison between the optical thickness, registered in a particular instant, and the
theoretical thickness, for a totally cloudless and dry sky. This value is known as .From the
relative optical air mass of the air (m), can be defined.
The influence of the different atmospheric constituents can be estimated using the following
comparison between the optical thickness, registered in a certain instant, and the theoretical
depth, for a certain clear and dry sky. This value is known as the Rayleigh optical thickness ( r
). Using the relative optical mass of the air, the Rayleigh optical thickness can be obtained
(Kasten, F. 1996;Louche, A., Notton, G., Poggi, P., & Simonnot, G. 1991):
1
6.6296 1.7513m 0.1202m2 0.0065m3 0.00013m4 para m 20
r (m) =
1 (A.17)
10.4 0.718 m para m 20
Bourguer-Lambert-Beer law
The equation which defines the attenuation of electromagnetic radiation when going through
a certain medium is defined by the Bourguer-Lambert- Beer. This, applied to spectral solar
irradiance going through the atmosphere can be expressed using the following equation:
In I0 exp k m I0
(18)
WhereIn( ) : normal irradiance in the surface of the Earth. I0( ):extraterrestrial irradiance in
the limit of the atmosphere. k( ): total optical thickness in cenital direction. m: relative optical
mass of the air. ( ): total espectraltransmitance
Clear sky model European solar radiation atlas (ESRA)
Clear sky models are of great usefulness in many solar energy applications. A clear sky model is
basically a parameterization to estimate solar irradiance integrated in all spectrum for a
cloudless sky day. For overcast or partly cloudy skies the estimation of solar radiation using
physical models is very complex, because it is needed the knowledge of the morphology of the
cloud cover.
ESRA model is a parameterization which only requires the Linke Turbidity to estimate beam
radiation. There are Linke Turbidity tables for the whole World which allows the application of
this clear sky model with certain precision.
12. Linke turbidity coefficient
The Linke turbidity coefficient (TL) is a simple parameter which expresses the attenuation of
solar radiation due to the effect of aerosols and water vapor. It represents the level of
transparency of the atmosphere and quantifies the effects of absorption and spreading
produced by the atmosphere on solar radiation. It was created by Linke in 1922. It proposes to
express optical thickness of the cloudless atmosphere, as the product of two terms, the optical
thickness of an atmosphere free of aerosols and water vapor and Linke Turbidity. Linke defined
the optical thickness integrated for an ideal atmosphere
The next table shows common values of the index for different atmospheric conditions.
Tabla1.Frequent values of Linke turbidity(ESRA 2000)
Types of atmospheres TL
Very clear (Cloudless, low level of humidity) ~2
Clear and dry ~3
Wet and warm 4~6
Withpollution >6
This value can be obtained using experimental measurements, although due to the lack of
them, it can be obtained from empirical fittings. Although currently the definition of Linke
turbidity has not been change, its values have been modified due to the improvement of the
instrumentation and the accuracy of the measurements.
4. Solar radiation estimated from satellite
Among the possible different approaches to characterize the solar resource of a given specific
site they can be pointed out the following:
Data from nearby stations. This option can be useful for relatively flat terrains and
when distances are less than 10 km far from the site. In the case of complex terrain or
longer distances the use of radiation data from other geographical points is absolutely
inappropriate.
Interpolation of surrounding measurements. This approach can be only used for areas
with a high density of stations and for average distances between stations of about 20-
50 km.
Solar radiation estimation from satellite images is currently the most suitable approach. It
supplies the best information on the spatial distribution of the solar radiation and it is a
methodology clearly accepted by the scientific community and with a high degree of maturity.
13. In this regard, it is worth to mention that BSRN (Baseline Surface Radiation Network) has
among its objectives the improvement of methods for deriving solar radiation from satellite
images, and also the Experts Working Group of Task 36 of the Solar Heating and Cooling
Implement Agreement of IEA (International Energy Agency) focuses on solar radiation
knowledge from satellite images.
Solar radiation derived from satellite images is based upon the establishment of a functional
relationship between the solar irradiance at the Earth’s surface and the cloud index estimated
from the satellite images. This relationship has been previously fitted by using high quality
ground data, in such a manner that the solar irradiance-cloud index correlation can be
extrapolated to any location of interest and solar radiation components can be calculated from
the satellite observations for that point.
The method Heliosat-2
Various methods for deriving solar radiation from satellite images were developed during ’80.
One of them was the method Heliosat-1(Cano, D., Monget, J. M., Albussion, M., Guillard, H.,
Regas, N., & Wald, L. 1986) which could be one of the most accurate. The method Heliosat-2
(Rigollier, C., Lef+¿vre, M., & Wald, L. 2004) integrates the knowledge gained by these various
exploitations of the original method and its varieties in a coherent and thorough way.
Both versions are based in the computation of a cloud index (n) from the comparison between
the reflectance, or apparent albedo, observed by the spaceborne sensor (ρ), the apparent
albedo of the brightest clouds (ρc) and the apparent albedo of the ground under clear skies
(ρg):
1
n g c g
For the estimation of radiation at ground level the method Heliosat-1 uses an empirical
adjusted relation between the cloud index and the clearness index (KT). The new Heliosat-2
method uses a relation between the cloud index and the clear sky index (KC) defined as the
ratio of the global irradiance (G) to the global irradiance under clear sky (Gclear).
G
KC
Gclear
The Heliosat-2 method deals with atmospheric and cloud extinction separately. As a first step
the irradiance under clear skies is calculated by using the ESRA clear sky model(Rigollier, C.,
Bauer, O., & Wald, L. 2000), where the Linke turbidity factor is the only parameter required for
14. the atmosphere composition. The following relationship between the cloud index and the
clear sky index is then used for the global solar radiation determination(Rigollier, C. & Wald, L.
1998):
n 0.2 , KC 1.2
0.2 n 0.8 , KC 1 n
0.8 n 1.1 , KC 2.0667 3.6667 n 1.6667 n 2
1.1 n , KC 0.05
5. Measurement of solar radiation
Generally, meteorological instrumentation used to measure solar radiation are known as sola
radiometers. All of them have a sensor which transforms the received radiant energy in a
electrical signal easily recordable. As a function of the conversion process of the energy
received it is possible to distinguish the following types of sensors:
Bimetallic. They are based on thermo mechanics properties of a bimetallic material
which is modified depending on the incoming solar radiation.
Calorimeters. Solar energy is transformed in calorific energy and it induces a variation
in the temperature of the sensor which allows the evaluation of the calorific flux and
the quantity of incoming energy which produces it.
Thermoelectric. Based on the Seebeck effect, they respond to a high range of spectral
radiation and its response is stable against variations of the temperature.
Photoelectric. They are based on the photovoltaic effect. They are cheap and have a
high temporal response. Nevertheless, they are very sensible to variations of
temperature and its spectral response is limited.
The World Meteorological Organization (WMO) propose a classification of the instrument,
described in the next table, depending on the variable which they measure, it spectral
response and field of vision, etc,…
6. Data quality assessment
The most reliable and comprehensive recommendations to make the measurement of solar
radiation are established by the BSRN (Baseline surface Radiation Network)(McArthur, L. J. B.
1998). This institution recommends that the measurements of the three components have to
be done with a configuration based on the use of a pyranometer to measure global horizontal
15. solar irradiance, and one with a shading device for the diffuse irradiance. Finally, the direct
normal irradiance must be measured with a pyrheliometer mounted on a solar tracker with
two axes. Thus, by measuring the three components independently allows using procedures
for quality assessment of the measurements based on the interrelationship between the three
components.The main errors in the measurement of solar radiation can be grouped into the
following categories: systematic errors of the measurement (such as a poor calibration of the
equipment), errors by poorly maintenance (dirty sensor domes, or presence of obstacles), and
or malfunctioning of the solar tracker.This report presents an analysis of the quality of the
measurements of the three components of solar radiation based on the recommendations of
the BSRN.
Tabla2 Meteorological instruments to measure solar radiation
Name Variable measured Main use Angle of vision
(sr)
-3
Absolutepirheliometer o Direct solar irradiance o Primarystandard 5·10
-3 -2
Pirhelioemter o Direct solar irradiance o Secondarystandard 5·10 a 2.5·10
o Measure
-3 -2
Spectralpirheliometer o Direct solar irradiance (high o Measure 5·10 a 2.5·10
spectral wavelength)
-3 -2
Solar fotometer o Radiación solar directa o Standard 1·10 a 1·10
(banda espectral estrecha) o Measure
Piranometer o Global radiation o Secondarystandard 2π
o Outgoing solar radiation o Measure
Espectral piranometer o Radiación global o Measure 2π
(banda espectral ancha)
Piranometer (RSR) o Global radiation o Secondarystandard 4π
o Measure
Pirgeometer o Longwaveradiation o Measure 2π
Pirradiometer o Total radiation o Scondary Standard 2π
o Measure
Pirradiometer (RSR) o Total radiation o Measure 4π
Before proceeding to the quality analysis of the measurements, we must change temporal
reference of the data to true solar time. This change is performed by two corrections; the first
one takes into account the difference in longitude between the meridian of the observer and
the meridian of the temporal reference. The second includes various effects through the
equation of time.
The verification of the temporal reference of the records is checked to have certain that solar
irradiance is measured correctly between sunrise and sunset. This check is done visually and it
uses a model of clear sky. Graphics are plotted each day for the following components: direct
normal and global horizontal irradiance of clear sky, global horizontal and direct normal
irradiance and diffuse measurements. To estimate the values of clear sky, the model used is
the ESRA (European Solar Radiation Atlas) and the aerosol values used are the Linke Turbidity
index provided by SODA (Beyer et al., 1996, Dumortier, 1999, ESRA 2000a, ESRA 2000b). The
graphs of the solar irradiance components of ESRA clear sky model provide information of
16. great interest. In addition, it allows the visualization of the moments of sunset and sunrise,
besides we can compare the measurements with the values of the model in clear sky days.
Accordingly, it is worth mentioning that the values of clear sky model have an uncertainty
associated with the uncertainty of the Linke turbidity index fundamentally. However, the
comparison is useful in terms of the profile shape of solar irradiance during the day as well as
the relationship between direct and global irradiance for each day. Thus, both the shape and
the relationship between the components are comparable in the days of clear sky conditions.
Once the temporal reference has been transformed to true solar time, measured data can be
assessed using the following categories of filters levels:
1. Checking the time reference of the records;
2. Calculation of hourly values, daily and monthly averages;
3. Quality analysis with physical filters;
4. Quality analysis with cross component filters.
5. Quality analysis when the solar tracker is off under clear sky conditions.
The quality analysis with physical filters refers to the verification of the recorded values of the
different components of the solar radiation, taking into account physical sense and not
exceeding its value, therefore, limits physically possible. The next table presents the physical
limits imposed on each component of solar radiation according to the recommendation of the
BSRN.
Table 3: Physical limits of the solar radiation component
Parameter Minimum Flag for Maximum
Minimum
Global Irradiance (GHI) -4 2 I SC 1.5(cos z)
1.2
100 W / m2
2
Diffuse Irradiance (DIF) - - 700 W/m
Diffuse Irradiance (DIF) -4 2 I SC 0.95(cos z)
1.2
50 W / m2
Direct Normal Irradiance -4 2 I SC
(DNI)
Direct Normal Irradiance - - DNI Clear Sky
(DNI)
ISC: Solar constant (1367 Wm ), ɛ : eccentricity of the orbit, ϴ z: zenith angle
-2
The quality analysis of component cross filters is used to check that the measured data meets
the interrelationship between the three components (GHI, DIF and DNI). Failure to pass these
filters establishes a supposition that any of the components were poorly measured or that the
17. solar tracker doesn’t points to the sun properly. The next table shows the conditions imposed
on the cross components analysis.
Table 4: Conditions for the cross component
Parameter Conditions Limits
G z 75º , D B cos z 50 W / m2 1 ± 8%
D B cos z
G 75º z 93º , D B cos z 50 W / m2 1 ± 15%
D B cos z
D z 75º , G 50 W / m2 < 1.05
G
D 75º z 93º , G 50 W / m2 < 1.10
G
The next procedure relates the three components but using a more tight procedure. This test
is based on the comparison of instruments which measure the same variables. The next table
defines the limits for this procedure:
Table 5: Conditions for the second group of cross component filters
Parameter Lower Limit Upper Limit
-2 -2
B·cos z (G-D)-50 W/m (G-D)+50 W/m
-2 -2
G-D B cos z- 50 W/m B cos z + 50 W/m
The next procedure relates the diffuse component (DIF or D) and global extraterrestrial
irradiance (Gext) using the diffuse index defined as:
Kd=
A higher limit of 0.6 is given to this filter and in case it is not fulfilled the filter is activated. The
next procedure makes use of clearness index (Kt) which is defined as the quotient between
grounds measured global solar irradiance (GHI or G) and extraterrestrial solar irradiance
(Gext). In this procedure we establish the next condition for the activation of the filter:
If Kt is lower than 0.2 and D/G is lower than 0.9 then filter is activated
The next procedure uses the same variables as the last filter but with the following conditions:
18. If Kt is higher than 0.5 and D/G is higher than 0.8 then filter is activated
The last filter is named as the tracker off filter and it is used to detect when the solar tracker is
not working correctly. First, the global solar irradiance (Sum SW) is estimated from measured
diffuse solar irradiance and measured direct normal irradiance using the expression which
relates the three components. Then the following condition is established using clear sky
global irradiance (Gcclear) estimated with the model of ESRA and monthly climatological Linke
Turbidity values from SODA:
For D > 50W/m2,
If (Sum SW)/Gcclear>0.85 and if D/(Sum SW) the tracker is not properly
following the sun.
This last filter only works under clear sky conditions.
Besides this filters, we have estimated direct normal irradiance (Ibest) from measured GHI and
DIF using the following expression:
Where Kd0 is defined as:
Kd0=
And is the angle of solar altitude.
7. Databases of solar radiation
The lack of measured radiometric data, the low spatial coverage and the temporal variability of
the registered solar radiation data makes it difficult to characterize certain areas. This way, it is
of great usefulness the availability of other radiometric data sources in different project phases
like site selection in the prefeasibility phase or the beginning of a measurement campaign
(installation of measurement instruments in certain locations). As a conclusion, the databases
available on the internet (free or payment) are tool very useful in decision making. In the next
19. paragraph we define the different radiometric data sources and present the worldwide
databases available of sola irradiance.
SOURCES OF DATA
GROUND MEASURED DATA: There are several instruments to measure the components of
solar radiation at different wavelengths. If instruments are correctly operated, calibrated and
maintained this is the best source of information for site specific radiometric data. Due to
uncertainties in the instruments, errors expected may be around 8% in terms of RMSE for
instantaneous values.
SYNTETHIC GENERATED DATA: This data is generated to meet specific needs or certain
conditions that may not be found in the original, real data. In the case that there is no
measured data we can generate data artificially following general statistical properties of solar
radiation, like monthly mean and auto-correlation function. There is no way to compare this
data with real measured data because this data is artificially generated and doesn't take into
account what happens in reality.
DATA ESTIMATED FROM SATELLITE: This is the best source of information to know accurately
the value of long-term solar radiation in case there are no local measurements available. The
errors for hourly, daily and monthly means are 12%, 10% and less than 5% respectively as
stated before.
REANALYSIS: The reanalysisdata set is a continually updating gridded data set representing the
state of the Earth's atmosphere, incorporating observations and numerical weather prediction
(NWP) model output. A meteorological reanalysis is a meteorological data assimilation project
which aims to assimilate historical observational data spanning an extended period, using a
single consistent assimilation (or "analysis") scheme throughout implemented in the NWP
model. The reanalysis data errors in terms of relative RMSE are higher than 30%.
WORLDWIDE DATABASES
1. Baseline Surface Radiation Network (BSRN)
BSRN is a project of the Radiation Panel from the Global Energy and Water Cycle Experiment
GEWEX under the umbrella of the World Climate Research Programme (WCRP) and as such is
aimed at detecting important changes in the Earth's radiation field at the Earth's surface which
may be related to climate changes.
The data are of primary importance in supporting the validation and confirmation of satellite
and computer model estimates of these quantities. At a small number of stations (currently
about 40) in contrasting climatic zones, covering a latitude range from 80°N to 90°S (see
20. station maps ), solar and atmospheric radiation is measured with instruments of the highest
available accuracy and with high time resolution (1 to 3 minutes).
The BSRN was recently (early 2004) designated as the global baseline network for surface
radiation for the Global Climate Observing System (GCOS). The BSRN stations also contribute
to the Global Atmospheric Watch (GAW).
Web address: http://www.bsrn.awi.de
Source of the data: 63 stations with worldwide coverage.
Comments: High quality data measured in single points. Access to data is free.
Figure 4Running and planned BSRN stations up to September 2012
2. World radiation data centre (WRDC)
The WRDC, located at the Main Geophysical Observatory in St. Petersburg, Russia, serves as a
central depository for solar radiation data collected at over 1000 measurement sites
throughout the world.
The WRDC was established in accordance with Resolution 31 of WMO Executive Committee
XVIII in 1964. The WRDC centrally collects, archives and published radiometric data from the
world to ensure the availability of these data for research by the international scientific
community.
The WRDC archive contains the following measurements (not all observations are made at all
sites):
Global solar radiation
Diffuse solar radiation
21. Downward atmospheric radiation
Sunshine duration
Direct solar radiation (hourly and instantaneous)
Net total radiation
Net terrestrial surface radiation (upward)
Terrestrial surface radiation
Reflected solar radiation
Spectral radiation components (instantaneous fluxes)
At present, this online archive contains a subset of the data stored at the WRDC. As new
measurements are received and processed, they are added to the archive. The archive
currently contains all available data from 1964-1993.
Web address: http://wrdc-mgo.nrel.gov
Source of the data: World radiometric data.
Comments: provides data from 1964. Access to data is free.
3. Meteonorm
Meteonorm is a comprehensive meteorological reference. It gives access to meteorological
data for solar applications, system design and a wide range of other applications for any
location in the world. meteonorm addresses engineers, architects, teachers, planners and
anyone interested in solar energy and climatology.
Meteonorm includes 8300 meteorological stations worldwide. Numerous global and regional
databases have been examined for their reliability and combined in meteonorm. The most
important data sources are the GEBA (Global Ener-gy Balance Archive), the World
Meteorological Organization (WMO/OMM) Cli-mato-logical Normals 1961—1990 and the
Swiss database compiled by MeteoSwiss.
In meteonorm, the climatological periods 1961—1990 and 2000—2009 are available for
temperature, humidity, wind speed and precipitation. The climatological periods 1981—1990
and 1986—2005 are available for solar radiation.
Monthly climatological (long term) means are included for the following eight parameters:
global radiation
ambient air temperature
humidity
precipitation, days with precipitation
wind speed and direction
sunshine duration
22. Web address: http://www.meteonorm.com
Source of measured data: Data from 8300 climatological stations. The data belongs to
GEBA (Global Energy Balance Archive), WMO (World Meteorological Organization) and
Swiss data base from MeteoSwiss.
Satellite data: Yes. Where ground measured data is unavailable data estimated from
satellite with a resolution of 250 km is used.
Comments: Software of payment.
Figure 5Ground radiometric stations used in Meteonorm in Europe and India
4. SSE-NASA (Surface Meteorology and Solar Energy)
NASA, through its' Science Mission Directorate, has long supported satellite systems and
research providing data important to the study of climate and climate processes. These data
include long-term estimates of meteorological quantities and surface solar energy fluxes.
These satellite and modeled based products have been shown to be accurate enough to
provide reliable solar and meteorological resource data over regions where surface
measurements are sparse or nonexistent, and offer two unique features - the data is global
and, in general, contiguous in time. These two important characteristics, however, tend to
generate very large data archives which can be intimidating for commercial users, particularly
new users with little experience or resources to explore these large data sets. Moreover the
data products contained in the various NASA archives are often in formats that present
challenges to new users. To foster the commercial use of the global solar and meteorological
data, NASA supported, and continues to support, the development of the Surface meteorology
and Solar Energy (SSE) dataset that has been formulated specifically for photovoltaic and
renewable energy system design needs. Of equal importance is the access to these data; to
this end the SSE parameters are available via user-friendly web-based applications founded on
user needs.
23. The original SSE data-delivery web site, intended to provide easy access to parameters needed
in the renewable energy industry (e.g. solar and wind energy), was released to the public in
1997. The solar and meteorological data contained in this first release was based on the 1993
NASA/World Climate Research Program Version 1.1 Surface Radiation Budget (SRB) science
data and TOVS data from the International Satellite Cloud Climatology Project (ISCCP). This
initial design approach proved to be of limited value because of the use of "traditional"
scientific terminology that was not compatible with terminology/parameters used in the
energy industry to design renewable energy power systems. After consultation with industry,
SSE Release 2 was made public in 1999 with parameters specifically tailored to the needs of
the renewable energy community. Subsequent releases of SSE have continued to build upon
an interactive dialog with potential customers resulting in updated parameters using revised
NASA data as well as inclusion of new parameters as requested by the user community.
The Prediction of Worldwide Energy Resource (POWER) project was initiated in 2003 both to
improve subsequent releases of SSE, and to create new datasets applicable to other industries
from new satellite observations and the accompanying results from forecast modeling. POWER
currently encompasses the SSE data set, tailored for the renewable energy industry, as well as
parameters tailored for the sustainable buildings community, and the bio-energy/agricultural
industries. In general, the underlying data behind the parameters used by each of these
industries is the same - solar radiation and meteorology, including surface and air
temperatures, moisture, and winds.
Web address: http://eosweb.larc.nasa.gov/sse
Source of the data: Estimations from satellite with a resolution of 100km.Worldwide
coverage.
Comments: Free access.
5. IrSOLaV (www.solarexplorer.info)
The methodology of IrSOLaV uses two main inputs to compute hourly solar irradiance: the
geostationary satellite images and the information about the attenuating properties of the
atmosphere. The former consists of one image per hour offering information related with the
cloud cover characteristics. The latter is basically information on the daily Linke turbidity which
is a very representative parameter to model the attenuating processes which affects solar
radiation on its path through the atmosphere, mainly daily values of aerosol optical depth and
water vapor column from Moderate Resolution Imaging Spectroradiometer satellite (MODIS).
Solar radiation estimation from satellite images offered is made from a modified version of the
renowned model Heliosat-3, developed and validated by CIEMAT with more than thirty
radiometric stations in the Iberian Peninsula. Over this first development, IrSOLaV has
generated a tool fully operational which is applied on a database of satellite images available
with IrSOLaV (temporal and spatial resolution of the data depends on the satellite covering the
region under study). It is worthwhile to point out that tuning-up and fitting of the original
24. methodology in different locations of the World have been performed and validated with local
data from radiometric stations installed in the region of interest. This way, it may be
considered that the treatment of the information from satellite images offered by IrSOLaV is
an exclusive service.
Even though the different research groups working in this field are making use of the same
core methodologies, there are several characteristics that differ depending on the specific
objectives pursued. Therefore, the main differences between the IrSOLaV/CIEMAT and others,
like the ones applied by PVGis or Helioclim are:
Selection of the working window. The correlations developed by IrSOLaV/CIEMAT are
focused on the Iberian Peninsula, and in particular in Spain, making use of 30
equidistant meteo-stations in this territory. However the other groups use stations
distributed among all Europe and the resulting relations are applied to all the territory.
Filtering of images and terrestrial data. Images and data used for the fitting and
relations are thoroughly filtered with procedures developed specifically for this
purpose.
Selection of albedo for clear sky. The algorithm used for selection of clear sky albedos
provides a daily sequence that is different for every year, however the other
methodologies use a unique monthly value.
Introduction of characteristic variables. The relation developed by IrSOLaV/CIEMAT
includes new variables characterizing the climatology of the site and the geographical
location, with a significant improvement of the results obtained for global and direct
solar radiation.
The uncertainty of the estimation comparing with hourly ground pyranometric measurements
is expressed in terms of the relative root mean squared error (RMSE). Different assessments
and benchmarking tests can been found at the available literature concerning the use of
satellite images (Meteosat and GOES) on different geographic sites and using different models
[Pinker y Ewing, 1985; Zelenka et al., 1999; Pereira et al., 2003; Rigollier et al., 2004; Lefevre et
al., 2007]. The uncertainty for hourly values is estimated around 20-25% RMSE and in a daily
basis the uncertainty of the models used to be about 13-17%. It is important to mention here
the contribution given by Zelenka in terms of distributing the origin of this error, concluding
that 12-13% is produced by the methodology itself converting satellite information into
radiation data and a relevant fraction of 7-10% because of the uncertainty of the ground
measurements used for the comparison. In addition Zelenka estimates that the error of using
nearby ground stations beyond 5 km reaches 15%. Because of that his conclusion is that the
use of hourly data from satellite images is more accurate than using information from nearby
stations located more than 5 km far from the site.
The IrSOLaV methodology is based on the work developed in CIEMAT by the group of Solar
Radiation Studies. The model has been assessed for about 30 Spanish sites with the following
uncertainty data for global horizontal irradiance:
About 12% RMSE for hourly values
Less than 10% for daily values
25. Less than 5% for annual and monthly means
The model has been modified for a better estimation of solar radiation with clear sky, leading
to an important improvement in the accuracy of the model [Polo, 2009; Polo et al., 2009b].
Web address: http://www.irsolav.com and http://www.solarexplorer.info
Source of the data: Satellite data.
Comments: Payment data.
6. 3TIER
Satellite-based time series of reflected sunlight are used to determine a cloud index time series
for every land surface worldwide. A satellite based daily snow cover dataset is use to aid in
distinguishing snow from clouds. In addition, the global horizontal clearsky radiation is
modeled based on the surface elevation of each location, the local time, and the measure of
turbidity in the atmosphere. 3Tier opted to use a satellite based, monthly time series of aersol
optical depth and water vapor derived from the MODIS satellite. This dataset was combined
with another turbidity dataset that includes both surface and satellite observations to provide
turbidity measure that spans the period of our satellite dataset and is complete for all land
surfaces. The cloud index n and the clear sky irradiance are then combined to model the global
horizontal irradiance. This component of the process is calibrated for each satellite based on a
set of high-quality surface observations. The global horizontal irradiance estimates are then
combined with other inputs to evaluate the other irradiance components (diffuse and direct).
Web address: http://www.3tier.com
Source of the data: Satellite data.
Comments: Payment data.
7. SOLEMI
Solar Energy Mining (SOLEMI) is a service set up by DLR providing high-quality irradiance data
for the solar energy community. The service is mainly based on METEOSAT-data with a
nominal resolution of 2.5 km in the visible channel and 5 km in the infrared channel and half-
hourly temporal resolution. Solar radiation maps and hourly time series will be available for
almost half of the Earth's surface: the field of view of METEOSAT-7 placed at 0 longitude and
additionally the field of view of METEOSAT-5 placed at 63E over the Indian Ocean will be
provided. The METEOSAT-5 data cover such promising solar energy regions as India, Pakistan
or China. Other very promising countries at the Saudi Arabian Peninsula may also be analyzed
by METEOSAT-7 but METEOSAT-5 provides better viewing conditions. Fast access to the full
METEOSAT-7 disc at full resolution is also a novelty. SOLEMI will provide fast access to quality-
controlled homogenized long-term time series of large regions within the view of both
satellites. The operational high performance computing environment DIMS (Data and
Information Management System) at DLR-DFD (German Remote Sensing Data Center) allows
for rapid processing and distribution of the products to the customers.
26. Web address: http://www.solemi.de
Source of the data: Satellite data.
Comments: Payment data.
8. Geomodel
The irradiance components are the results of a five steps process: a multi-spectral analysis
classifies the pixels, the lower boundary (LB) evaluation is done for each time slot, a spatial
variability is introduced for the upper boundary (UP) and the cloud index definition, the Solis
clears sky model is used as normalization, and a terrain disaggregation is finally applied.
Four MSG spectral channels are used in a classification scheme to distinguish clouds from snow
and no-snow cloud-free situations. Prior to the classification, calibrated pixel values were
transformed to three indices: normalized difference snow index(Ruyter de Wildt M., G.Siez, &
A.Gruen 2007), cloud index (Derrien M. & H.Gleau 2005), and temporal variability index.
Exploiting the potential of MSG spectral data for snow classification removed the need of
additional ancillary snow data and allowed using spectral cloud index information in cases of
complex conditions such as clouds over high albedo snow areas.
In the original approach by Perez (Perez, R., Ineichen, P., Moore, K., Kmiecik, M., Chain, C.,
George, R. et al. 2002), the identification of surface pseudo-albedo is based on the use of a
lower bound (LB), representing cloudless situations. This approach neglects diurnal variability
of LB that is later corrected by a statistical approach. Instead of identifying one value per day,
LB is represented by smooth 2-dimensional surface (in day and time slot dimensions) that
reflects diurnal and seasonal changes in LB and reduces probability of in cloudless situation.
Overcast conditions represented in the original Perez model by a fixed Upper Bound (UB) value
were updated to account for spatial variability which is important especially in the higher
latitudes. Calculation of cloud index was extended by incorporation of snow classification
results.
The broadband simplified version of Solis model (Ineichen 2008a) was implemented. As input
of this model, the climatology values from the NAVAP water vapor database (Remund 2008)
and Atmospheric Optical Depth data by (Remund 2008) assimilated with Aeronet and Aerocom
datasets are used.
Simplified Solis model was also implemented into the global to beam Dirindex algorithms to
calculate Direct Normal irradiance component (Perez 1992, Ineichen 2008c). Diffuse irradiance
for inclined surfaces is calculated by updated Perez model (1987).
Processing chain of the model includes post-processing terrain disaggregation algorithm based
on the approach by (Ruiz-Arias, J. A., T.Cebecauer, J.Tovar-Pescador, & M.Súri 2010). The
disaggregation is limited to shadowing effect only, as it represents most significant local effect
of terrain. The algorithm uses local terrain horizon information with spatial resolution of 100
m. Direct and circumsolar diffuse components of global irradiance were corrected for terrain
shadowing.
27. Web address: http://www.geomodel.eu and http://www.solargis.info
Source of the data: Satellite data.
Comments: Payment data.
8. Using of solar radiation data for CSP technologies
The most important parameter that affects performance of CSP plants is DNI. We have to pay
attention on the yearly value of DNI, the dynamic of the cloud transient and the DNI frequency
distribution. CSP plants need 10-minute and hourly values to estimate their energy yield.
Besides, these plants are designed to operate within a specific range of DNI values. If
instantaneous DNI values are outside this range, the plant could not utilize such DNI values and
hence energy is lost. The design range of DNI values for which a plant could operate are
generally determined from long-term frequency distribution of DNI. Frequency distribution of
DNI describes the number of occurrences of DNI values which are expected to be received for
a specific location. Usually, DNI frequency distribution follows properties of normal
distribution. It has been demonstrated that for years with the same DNI annual averages
differences in DNI frequency distribution could make the annual energy yield to be different,
with differences from -8% to +9%.
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