Shaded Relief function

A color 3D representation of the terrain, created by merging the images from the Elevation-coded and Hillshade methods. This function uses the altitude and azimuth properties to specify the sun's position.

Example shaded relief image
Example shaded relief image

The inputs for this function are the following:

Color Ramp or Colormap

Choose whether to use a color ramp, or a colormap. If you choose the color ramp option, then you can choose an appropriate color ramp to display your shaded relief. If you choose colormap, then you need to specify the colormap file to use.

Azimuth and Altitude

The properties altitude and azimuth together indicate the sun's relative position that will be used for creating any 3D model (hillshade or shaded relief). Altitude is the sun's angle of elevation above the horizon and ranges from 0 to 90 degrees. A value of 0 degrees indicates that the sun is on the horizon, that is, on the same horizontal plane as the frame of reference. A value of 90 degrees indicates that the sun is directly overhead.

Altitude diagram

Azimuth is the sun's relative position along the horizon (in degrees). This position is indicated by the angle of the sun measured clockwise from due north. An azimuth of 0 degrees indicates north, east is 90 degrees, south is 180 degrees, and west is 270 degrees.

Scaling, Pixel Size Power, and Pixel Size Factor

The hillshade result is scaled dynamically by adjusting the z factor using one of two options:

Z Factor

The scaling factor used to convert the elevation values. The scaling factor is used for two purposes: first, to convert the elevation units (such as meters or feet) to the horizontal coordinate units of the dataset, which may be feet, meters, or degrees, and second, to add vertical exaggeration for visual effect.

To convert from feet to meters or vice versa, see the table below. For example, if your DEM's elevation units are feet and your mosaic dataset's units are meters, you would use a value of 0.3048 to convert your elevation units from feet to meters (1 foot = 0.3048 meters).

This is also useful when you have geographic data (such as DTED in GCS_WGS 84 using latitude and longitude coordinates) where the elevation units are in meters. In this case, you need to convert from meters to degrees. The value for degree conversions are approximations, and depend on the latitude of your area of interest.

Conversion factor between feet and meters

From

To

Feet

Meters

Feet

1

0.3048

Meters

3.28084

1

Conversion factor between feet and meters

To apply vertical exaggeration, you must multiply the conversion factor by the exaggeration factor. For example, if both elevation and dataset coordinates are meters and you want to exaggerate by a multiple of 10, the scaling factor would be unit conversion factor (1.0 from the table) multiplied by the vertical exaggeration factor (10.0), or 10. As another example, if the elevations are meters and the dataset is geographic (degrees), you would multiply the units conversion factor (0.00001) by 10 to get 0.0001.

Remove Edge Effect

Using this option will avoid any resampling artifacts that may occur along the edges of a raster. The output pixels along the edge of a raster or beside pixels without a value will be populated with NoData; therefore, it is recommended that this option be used only when there are other rasters with overlapping pixels available. When overlapping pixels are available, these areas of NoData will display the overlapping pixel values, instead of being blank.

Related Topics

9/10/2014