JEE Advanced Level Test: Three Dimensional 3D Geometry- 2 - JEE MCQ

Distance of pt P from plane = 5

Gen. pt. on line is (λ + 1, 2λ - 2, -2λ + 1)
This pt line on plane
(λ + 1 + 2 2λ - 2) - 2 (-2λ + 1) = 10

Let Q be the image of point P(3, -2, 1) PQ is normal to the plane 

The equation of plane passing through (0, 7, -7) is a(x – 0) + b(y – 7) + c(z + 7) = 0
Plane contains line and passes through (-1, 3, -2)
∴ a(-1) + b(3 – 7) + c(-2 + 7) = 0
-3a + 2b + c = 0
∴ a : b : c = 1 : 1 : 1
x + y + z = 0 

Line is perpendicular to the normal of plane
3 × 1 + (-5) × 3 + 2 (-α) = 0
– 12 – 2α = 0
α = – 6
Point (2, 1, -2) lie on plane
∴ b = 7

D. R’s of line are 2 : 1 : 2
D.R’s of Normal to plane is :3 : -2 : 6 Angle between line and plane

Equation of plane in intercept form is 
Centroid of ΔABC(a/3, b/3, c/3)
It satisfies the relation
∴ 9/a² + 9/b² + 9/c² = k
Perpendicular distance is 1 unit

Eq. of x-axis is

Equation of plane passing through (1, 1, 1) and containing

Plane is parallel to line i.e., normal of plane is perpendicular to the line
2 × 1 + (-1) × (-2) + 1 × a = 0
2 + 2 + a = 0
a = - 4

Let the direction cosines of line be
l, m, n then
2l + 3m + n = 0
And l + 3m + 2n = 0
On solving, l : m : n = 1 : - 1 : 1
l² + m² + n² = 1

Line L make an angle ‘α’ with +ve x-axis

Let A(2, 4, 5) and B(3, 5, -4) and C be the point in which line AB meets the yz-plane. Let C divide AB in the ratio k : 1, then

But C lies on yz-plane, therefore,

P(-1,2,0) = -i + 2j
L1 = x/3 = (y+1)/0 = (z-2)/(-1)
a = 3i + 0j - k
L2 = (x-1)/1 = 2(y+½)/2 = 2(z+½)/(-1)
b = i + j - k/2
Plane is parallel to a  ⇒ n is perpendicular to a
Plane is parallel to b  ⇒ n is perpendicular to b
n = a * b = {(3, 0, -1) (1,1, -½)}
= i(0+1) -j(-3/2+1) +k(3-0)
= i + 1/2j + 3k
PR = R - P = (x+1)i + (y-z)j + zk 
PR. n = 0
(x+1)*1 + (y-z)*½ + z*3 = 0
x+1 + y/2 - 1 + 3z = 0
x + y/2 + 3z = 0
2x + y + 6z = 0

DR’s of the normal to the given plane are < 2, 3, -1 >.
Hence, the required line is 

A (1,1,1), B (2,3,5), C(-1,0,2) direction ratios of AB are < 1,2,4>
Therefore, direction ratios of normal to plane ABC are <2, -3,1>
As a result, equation of the required plane is 2x – 3y +z = k then 

Hence, equation of the required plane is

Required distance 

Distance from origin = 3p 

Correct Answer :- b

Explanation:-  (x-1)/2=(y+3)/(-1)=(z-5)/2

4x - 2y - 5z = 9

cosθ=(2*4 - 1*2 + 2*(-5))/(3)√45)=0

= (8 - 2 -10)/3√45

= -4/(9√5)

Hence, angle between normal to plane and given line is 90°

Therefore, the line and the plane are parallel. A point on the line is (2, -2, 3). Required distance = distance of (2, -2, 3) from the given plane x + 5y + z - 5 = 0

The Dr’s to normal of the plane containing

Let required plane is 



From Eqs. (i) and (iv), required equation of plane, is x - 2 y + z =0

Equation of plane containing the given lines is 
⇒ (x -1)(-1) - (y - 2)(-2) + (z - 3)(-1) = 0
⇒ -x +1+ 2y - 4 - z + 3 = 0
⇒ -x + 2 y - z = 0......(i)
Given plane is
x - 2 y + z = d .......(ii)
Eqs. (i) and (ii) are parallel

Point of the first line (2t + 1, 3t - 1, 4t + 1)
Point of the second line (s + 3, 2s+ k, s) by comparing the points 

∴ Any point on the line is

Correct Answer :- A

Explanation:- Given, DR's of  

AB =(6,−2,9)

cosα=(AB.i^)/|AB||i^|

= [6^2+2^2+9^2]^1/2

 = 6/11

cosβ=−2/11

cosγ= 9/11

sin^2α−sin^2β=(1−cos^2α)−(1−cos^2β)

=cos^2β−cos^2α

=(4)/121 − (36)/121

​= (−32)/121

Direction cosines of the line are

⇒ (A) is correct

As the two lines intersect, we must have
a + a 'λ = a '+ μa,b + b 'λ = b '+μb and c + c 'λ = c'+ cμ
Solving a 'λ -μa = a'- a and b 'λ -μb = b'- b
We get, μ = 1 and λ = 1
⇒ x = a + a', y = b +b' and z = c+ c'
∴ Point of intersection is ( a + a ', b + b ', c + c ')
⇒ (B) is correct    

Any plane through (1,0,0) is 
A (x -1) + B (y - 0) + C (z - 0) = 0 ..(1) 
It contains (0,1,0) if -A + B = 0.... (2)
Also (1) makes an angle of with the plane x + y= 3

Direction ratio of line joining (1, 2, 3) and (3, 4, 5) are (2, 2, 2).
⇒ Normal to the plane has DR’s (2, 2, 2)
Now plane passes through 
⇒ Equation of plane is
2(x – 2) + 2(y – 3) + 2(z – 4) = 0
x + y + z = 9
⇒ (A) is correct