Examples of 'tangency' in a sentence
Meaning of "tangency"
Tangency (noun): In mathematics, tangency refers to the point or line where a curve, circle, or surface touches another at one point, without crossing over. It is also used in a figurative sense to indicate close proximity or interaction
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- The state of being tangent; an instance of (something) being tangent.
How to use "tangency" in a sentence
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tangency
The point of tangency of two pitch circles.
That point is called the tangency point.
The point of tangency is the point of equal slopes.
The chain selection has been extended to include tangency.
The two points of tangency are also double points.
Such a point of contact must be a tangency.
This tangency result has several remarkable consequences.
Lines joining vertices and mixtilinear tangency points.
The position and tangency of surfaces is the same.
Sets the layer of the curve tangency lines.
The appearance of tangency is affected by the current level of smoothness.
Sets the color of the curve tangency lines.
The two tangency chords.
Tangency can be maintained with the surrounding surfaces if required.
Constraint example may be a tangency constraint.
See also
Sets the tangency and curvature of the last cross section.
And we include the points of tangency in this cross section.
At that tangency is where you get to the highest possible indifference curve.
Sets whether the curve tangency lines are displayed.
Dimension of the arc string and the dispersion of its points of tangency.
Sets whether the change in tangency or point location is constrained to a specific axis.
Forced outcomes require tangency.
This point of tangency determines the steady state capital stock denoted by kss.
The two diagonals and the two tangency chords are concurrent.
Defines the tangency for the first and last points of the spline curve.
The second object maintains a point of tangency with the first object.
The tangency between the conic wheels and the rail surface is made by points.
Constrains two curves to maintain a point of tangency to each other or their extensions.
The tangency portfolio is the same for all investors whatever their risk aversion.
The two line segments connecting opposite points of tangency have equal length.
Changes to the tangency are constrained to the VW plane.
The two line segments connecting opposite points of tangency have equal lengths.
Changes to the tangency are constrained to the UW plane.
So you are gonna need to use those two circles of tangency points in some way.
The tangency points are projected onto the current UCS.
So reasonable guess might be that these two tangency points are the focus points.
Thus, the tangency portfolio is the market portfolio.
This means that two branches of the curve have ordinary tangency at the double point.
Thus, the tangency between these two curves is located at RhoM.
When you create the surface you can specify the tangency and bulge magnitude.
The set of all such tangency points is called the firm 's expansion path.
This function allows curve creation to link two existing curves with tangency at connection points.
A particularly preferred point of tangency is at either end of the apex perpendicular line 78.
When we connect these centers, we go through the point of tangency.
Specifies two points that represent the tangency of the arrayed items relative to the path.
Represents the radius of curvature of said horizontal tangency point ; and.
C is the point of tangency of the trunk belt on the hip near the tunnel ;.
The slope increases until the line reaches a point of tangency with the total product curve.
E is the point of tangency of the hip belt on the hip near the tunnel ;.
Moves the edit bar to the V axis to constrain the tangency edit to that direction.
