There are 3 ways to represent an Arc in FME.
Arc features of this type possess an x/y coordinate that represents their center point, plus a mathematical definition of the arc radius and sweep angles. Arcs may be elliptical, in that they may have differing primary and secondary radius values. They may also have a rotation.
The Cartesian equation for the ellipse defines the curve by a simple parametric form, with the x and y coordinates having different scalings:
x = a cos(t)
y = b sin(t)
where
a = primary radius
b = secondary radius
Note that t
is a parameter that does not have a direct interpretation in terms of an angle. However, the relationship between the polar angle (theta) from the ellipse center and the parameter t
follows from:
theta = arctan((b/a)*tan(t))
or
t = arctan((a/b)*tan(theta))
Example: To specify the red arc in the above diagram in the counterclockwise direction, the following values would need to be set on the feature:
Primary Radius = a = 2.0
Secondary Radius = b = 1.5
Rotation = thetaR = 10 (degrees)
Start Angle = tS = arctan((a/b)*tan(thetaS)) = arctan((2.0/1.5)*tan(45)) = 53.130102354155978703144387440907
Sweep Angle = tE - tS = arctan((a/b)*tan(thetaE)) - tS = arctan((2.0/1.5)*tan(180)) - tS = 180.0 - tS = 180.0 - 53.130102354155978703144387440907 = 126.86989764584402129685561255909
Optionally, the arc may have explicit end points assigned to it.
If the arc has z values or measures, the location of the z or measure values is defined as follows:
An alternate arc definition is a bulge value, plus the two unique end point coordinates. This definition can only represent circular, unclosed arcs.
The bulge value must be between -1.0 and 1.0, and specifies the curvature of the arc between the two points.
If the arc has z values or measures, the endpoints may have unique z and/or measure values. The endpoints must both be 2D or both be 3D, and must have the same number and named measures, but the values of any of these between them may differ.
A further arc definition is the two end points, plus the mid-point of the arc 'line'. (The mid-point does not need to be exactly halfway, but at least somewhere along the arc.) All three points must be unique. This definition can only represent circular, unclosed arcs.
If the arc has z values or measures, all three points may have unique z and/or measure values. The points must all be 2D or all be 3D, and must have the same number and named measures, but the values of any of these between them may differ.
See Also