Find the equation of a plane which bisects perpendicularly the line joining the points A(2,3,4) and B(4,5,8) at right angles.
Answers
Given : The equation of a plane is bisecting perpendicularly the line joining the points A(2,3,4) and B(4,5,8) at right angles.
Find : We have to find the equation.
Solution :
Let's first find the mid points of A
Mid points of A = , , ,
=> , ,
=> , ,
=> 3, 4, 6
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=> = (x - 3) + (y - 4) + (z - 6)
Now..
Normal to plane is
=> = (4 - 2) + (5 - 3) + (8 - 4)
=> 2 + 2 + 4
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Now..
=> . = 0
=> (x - 3) + (y - 4) + (z - 6) . 2 + 2 + 4
=> 2x - 6 + 2y - 8 + 4z - 24 = 0
=> 2x + 2y + 4z - 38 = 0
=> 2(x + y + 2z - 19) = 0
=> x + y + 2z - 19 = 0
=> x + y + 2z = 19
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Answer:
The given points are A(2,3,4)andB(4,5,8)
The line segement AB is given by (x2−x1),(y2−y1),(z2−z1)
(ie)(4−2),(5−3),(8−4)
=(2,2,4)=(1,1,2)
Since the plane bisects AB at rightangles, AB−→− is the normal to the plane. which is n→
Therefore n→=i^+j^+2k^
Let C be the midpoint of AB.
(x1+x22,y1+y22,z1+z22)
=C(2+42,3+52,4+82)
=C(62,82,122)=(3,4,6)
Let this be a→=3i^+4j^+6k^
Hence the vector equation of the plane passing through C and ⊥ AB is
(r→−(3i^+4j^+6k^)).(i^+j^+2k^)=0
We know r→=xi^+yj^+zk^
=>[(xi^+yj^+zk^).(3i^+4j^+6k^)].(i^+j^+2k^)=0
On simplifying we get,
(x−3)i^+(y−4)j^+(z−6)k^).(i^+j^+2k^)=0
Applying the product rule we get,
(x−3)+(y−4)+2(z−6)=0
On simplifying we get,
x+y+2z=19
This is the required equation of the plane