If you have one straight line, there are an infinite number of planes in which it lies.
Yes because a line can lie in many planes so one we add one point not on that line, we define a unique plane.
It is a Geometry Theorem. "A line and a point not on the line lie in exactly one place" means what it says.
Two lines that coincide look and act exactly like a single line. If you have one straight line, there are an infinite number of planes in which it lies.
The fact is that if you have one straight line, there are an infinite number of planes in which it lies. One can see this by simply rotating the plane around the line. Thus, "a line lies in at least one plane" is a true statement.
If you have one straight line, there are an infinite number of planes in which it lies.
Yes because a line can lie in many planes so one we add one point not on that line, we define a unique plane.
It is a Geometry Theorem. "A line and a point not on the line lie in exactly one place" means what it says.
True.
Two lines that coincide look and act exactly like a single line. If you have one straight line, there are an infinite number of planes in which it lies.
Always; although that line can lie in infinitely many planes.
The fact is that if you have one straight line, there are an infinite number of planes in which it lies. One can see this by simply rotating the plane around the line. Thus, "a line lies in at least one plane" is a true statement.
>> Burger vector and dislocation line both not lie in single active slip plane in sessile dislocation.
There are one or infinitely many points.
A line that does not lie within a plane and intersects the plane does so at one point.A line that lies within a plane intersects the plane at all points.
No. A line can lie in many planes. A plane can be defined by three non-linear points. Since a line is defined by only two points, we need another point. (Note that point C alone, or line AB alone belong to an infinite number of planes.)
if there are three or more points not all of which lie on the same line then they are known as non linear pointsif there are specifically three points not all of which lie on the same line then they are known as coplanar points as they will always lie on one plane