NeroGoh said:Referred to the orgin O,the positon vectors of the point A and B are (i+j+3k) and ( 4i-2j+5k) respectively.The equation of the plane π is x+2y-z=10.
Show that the point A and B do not lie on the plane.
NeroGoh said:my solution don't know whether correct or wrong help me if wrong... ty ^^
i take the plane,
x+2y-z=10 => x+2y-z-10=0.
and then i take the point A and B put in the plane equation...
A(1,1,3): x+2y-z-10=0
1+2(1)-3-10=0
-10≠0
*point A do not lie on the plane
B(4,-2,5): x+2y-z-10=0
4+2(-2)-5-10=0
-15≠0
*pont B do not lie on the plane
izzit correct? /.\
To determine if a line lies in a plane, you can use the slope-intercept form of the line and the equation of the plane. Substitute the values for the line's slope and y-intercept into the equation of the plane. If the resulting equation is true, then the line lies in the plane.
The formula for determining if a line is parallel to a plane is to find the dot product between the line's direction vector and the plane's normal vector. If the dot product is equal to 0, then the line is parallel to the plane.
A line intersects a plane if it has at least one point in common with the plane. To determine this, you can solve the system of equations formed by the line's equation and the equation of the plane. If the system has a solution, then the line intersects the plane.
Yes, a line can lie in an infinite number of planes. This is because a line has infinite points and each point can be used to define a different plane.
No, it is not possible for a line to be both parallel and intersect a plane. If a line is parallel to a plane, it means that it never intersects the plane. If a line intersects a plane, it means that it is not parallel to the plane.