ee.Geometry.MultiPolygon.intersection
Returns the intersection of the two geometries.
| Usage | Returns |
|---|
MultiPolygon.intersection(right, maxError, proj) | Geometry |
| Argument | Type | Details |
|---|
this: left | Geometry | The geometry used as the left operand of the operation. |
right | Geometry | The geometry used as the right operand of the operation. |
maxError | ErrorMargin, default: null | The maximum amount of error tolerated when performing any necessary reprojection. |
proj | Projection, default: null | The projection in which to perform the operation. If not specified, the operation will be performed in a spherical coordinate system, and linear distances will be in meters on the sphere. |
Examples
// Define a MultiPolygon object.
var multiPolygon = ee.Geometry.MultiPolygon(
[[[[-122.092, 37.424],
[-122.086, 37.418],
[-122.079, 37.425],
[-122.085, 37.423]]],
[[[-122.081, 37.417],
[-122.086, 37.421],
[-122.089, 37.416]]]]);
// Define other inputs.
var inputGeom = ee.Geometry.BBox(-122.085, 37.415, -122.075, 37.425);
// Apply the intersection method to the MultiPolygon object.
var multiPolygonIntersection = multiPolygon.intersection({'right': inputGeom, 'maxError': 1});
// Print the result to the console.
print('multiPolygon.intersection(...) =', multiPolygonIntersection);
// Display relevant geometries on the map.
Map.setCenter(-122.085, 37.422, 15);
Map.addLayer(multiPolygon,
{'color': 'black'},
'Geometry [black]: multiPolygon');
Map.addLayer(inputGeom,
{'color': 'blue'},
'Parameter [blue]: inputGeom');
Map.addLayer(multiPolygonIntersection,
{'color': 'red'},
'Result [red]: multiPolygon.intersection');
Python setup
See the
Python Environment page for information on the Python API and using
geemap for interactive development.
import ee
import geemap.core as geemap
# Define a MultiPolygon object.
multipolygon = ee.Geometry.MultiPolygon([
[[
[-122.092, 37.424],
[-122.086, 37.418],
[-122.079, 37.425],
[-122.085, 37.423],
]],
[[[-122.081, 37.417], [-122.086, 37.421], [-122.089, 37.416]]],
])
# Define other inputs.
input_geom = ee.Geometry.BBox(-122.085, 37.415, -122.075, 37.425)
# Apply the intersection method to the MultiPolygon object.
multipolygon_intersection = multipolygon.intersection(
right=input_geom, maxError=1
)
# Print the result.
display('multipolygon.intersection(...) =', multipolygon_intersection)
# Display relevant geometries on the map.
m = geemap.Map()
m.set_center(-122.085, 37.422, 15)
m.add_layer(
multipolygon, {'color': 'black'}, 'Geometry [black]: multipolygon'
)
m.add_layer(input_geom, {'color': 'blue'}, 'Parameter [blue]: input_geom')
m.add_layer(
multipolygon_intersection,
{'color': 'red'},
'Result [red]: multipolygon.intersection',
)
m
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Last updated 2023-10-06 UTC.
[null,null,["Last updated 2023-10-06 UTC."],[[["`intersection` returns a Geometry representing the shared area between a MultiPolygon and another Geometry."],["It takes the `right` Geometry, optional `maxError`, and optional `proj` as arguments."],["The `maxError` parameter controls the tolerance for reprojection errors."],["The `proj` parameter specifies the projection for the operation, defaulting to spherical coordinates if unspecified."]]],["The `intersection` method computes the overlapping area between two geometries, returning a new geometry representing their intersection. It takes a `right` geometry as the second operand, and optionally `maxError` and `proj` parameters for error tolerance and projection. The operation can be performed in a spherical coordinate system or using a specified projection. Examples in Javascript and python are provided showing how to define geometries, call the `intersection` method, and display the results.\n"]]