Examples of 'are collinear' in a sentence
Meaning of "are collinear"
are collinear: A mathematical term used to describe points that lie on the same straight line. In geometry, collinear points are important for determining the shape and dimensions of various figures
How to use "are collinear" in a sentence
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are collinear
Test whether three given points are collinear.
Points are collinear if the area of a triangle is equal to zero.
Show that the following points are collinear.
Both pointers are collinear on the vertical through the first pointer.
Show that the vector are collinear.
Three or more points are collinear if they all lie on the same line.
Indicate that the vectors are collinear.
The vectors are collinear and so, the vectors are in the same direction.
Program to check if three points are collinear.
For the geometry where adatoms are collinear to carbon atoms, we report absence of bics.
Show that the points represented by are collinear.
The beams are collinear energy-wise in order to maximise the length of the acousto-optic interaction.
These two things are collinear.
Centuries before, Pappus of Alexandria had solved a special case, when the three points are collinear.
These points are collinear.
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Under sinusoidal conditions the respective voltages at their terminals are collinear.
Three points are collinear.
Let us now prove that equality holds if and only if are collinear.
Axial loading - The applied forces are collinear with the longitudinal axis of the member.
No three points of a hypercycle are collinear.
Three are collinear with the masses ( in the rotating frame ) and are unstable.
These two vectors are collinear.
Equations 16-18 give fuller specifi cations, analysing the extent to which different determinants are collinear.
Find whether AB and CD are collinear or not.
The curve is a straight line if and only if all the control points are collinear.
Therefore XYZ are collinear.
The latter two were not adjusted for each other since they are collinear.
If the rank is 1, then and are collinear and do not span the plane.
Prove that the midpoints of the tangents are collinear.
All of these members have longitudinal central axes which are collinear with longitudinal central axis 3.
Here 's the thing about multicollinearity, it 's only a problem for the variables that are collinear.
In the example of FIG . 1, these nine ducts are collinear to the longitudinal direction X 5.
Prove that the centers of the three circles and are collinear.
If two non-zero vectors are collinear then.
Given points in the plane such that no three are collinear.
In a tangential trapezoid, the midpoints of the legs are collinear with the incenter.
A complete quadrangle consists of four points, no three of which are collinear.
This is a Java Program to check whether three points are collinear or not.
In some embodiments, the plurality of mirrors and replay plane are collinear.
So we can say that XY and Z are collinear.
The led axis and the axis of each corresponding lens are collinear.
Only if and / or, or if and are collinear.
Euler showed in 1765 that in any triangle, the orthocenter, circumcenter and centroid are collinear.
So those three points are co - that they are collinear.
Thus in a cyclic quadrilateral, the circumcenter, the " vertex centroid ", and the anticenter are collinear.
The extreme case where essentially, x and y are collinear.
Therefore, the three external homothetic centers are collinear.
According to an embodiment of the invention, the hanging legs are collinear.
Thus, the search direction and the selected scan line are collinear.
When two circles touch, their centers and their point of contact are collinear.
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And they are all collinear so that means
Collinear emission whatever the wavelength generated
The polars of three collinear points are concurrent
