Finding the intersection of a line and a plane
Steps for finding the intersection of the line and plane
If a line and a plane intersect one another, the intersection will be a single point, or a line (if the line lies in the plane).
To find the point of intersection, we’ll
substitute the values of ???x???, ???y??? and ???z??? from the equation of the line into the equation of the plane and solve for the parameter ???t???
take the value of ???t??? and plug it back into the equation of the line
This will give us the coordinates of the point of intersection.
The intersection of a line and a plane will either be a single point or a line
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Intersection of a plane and a line given by parametric equations
Example
Find the point where the line intersects the plane.
The line is given by ???x=-1+2t???, ???y=4-5t???, and ???z=1+t???
The plane is given by ???2x-3y+z=3???
Our first step is to plug the values for ???x???, ???y??? and ???z??? given by the equation of the line into the equation of the plane.
???2(-1+2t)-3(4-5t)+(1+t)=3???
???-2+4t-12+15t+1+t=3???
???20t=16???
???t=\frac{16}{20}???
???t=\frac45???
Now we’ll plug the value we found for ???t??? back into the equation of the line.
???x=-1+2\left(\frac45\right)???
???x=\frac35???
and
???y=4-5\left(\frac45\right)???
???y=0???
and
???z=1+\left(\frac45\right)???
???z=\frac95???
Putting these values together, we can say the point of intersection of the line and the plane is the coordinate point
???\left(\frac35,0,\frac95\right)???
If we want to double-check ourselves, we can plug this coordinate point back into the equation of the plane.
???2\left(\frac35\right)-3(0)+\left(\frac95\right)=3???
???\frac65+\frac95=3???
???\frac{15}{5}=3???
???3=3???
Since ???3=3??? is true, we know that the point we found is a true intersection point with the plane.