Three Dimensional Geometry PDF

Summary

This document is a chapter on three-dimensional geometry from a textbook. It covers topics like direction cosines, direction ratios, and lines and planes in three-dimensional space. The chapter is from a textbook, it's a general maths text.

Full Transcript

THREE DIMENSIONAL GEOMETRY 377

Chapter 11
THREE DIMENSIONAL GEOMETRY

v The moving power of mathematical invention is not
reasoning but imagination. – A. DEMORGAN v

11.1 Introduction
In Class XI, while studying Analytical Geometry in two
dimensions, and the introduction to three dimensional
geometry, we confined to the Cartesian methods only. In
the previous chapter of this book, we have studied some
basic concepts of vectors. We will now use vector algebra
to three dimensional geometry. The purpose of this
approach to 3-dimensional geometry is that it makes the
study simple and elegant*.
In this chapter, we shall study the direction cosines
and direction ratios of a line joining two points and also
discuss about the equations of lines and planes in space
under different conditions, angle between two lines, two
Leonhard Euler
planes, a line and a plane, shortest distance between two (1707-1783)
skew lines and distance of a point from a plane. Most of
the above results are obtained in vector form. Nevertheless, we shall also translate
these results in the Cartesian form which, at times, presents a more clear geometric
and analytic picture of the situation.
11.2 Direction Cosines and Direction Ratios of a Line
From Chapter 10, recall that if a directed line L passing through the origin makes
angles α, β and γ with x, y and z-axes, respectively, called direction angles, then cosine
of these angles, namely, cos α, cos β and cos γ are called direction cosines of the
directed line L.
If we reverse the direction of L, then the direction angles are replaced by their supplements,
i.e., , and. Thus, the signs of the direction cosines are reversed.
* For various activities in three dimensional geometry, one may refer to the Book
“A Hand Book for designing Mathematics Laboratory in Schools”, NCERT, 2005

Rationalised 2023-24
378 MATHEMATICS

Fig 11.1
Note that a given line in space can be extended in two opposite directions and so it
has two sets of direction cosines. In order to have a unique set of direction cosines for
a given line in space, we must take the given line as a directed line. These unique
direction cosines are denoted by l, m and n.
Remark If the given line in space does not pass through the origin, then, in order to find
its direction cosines, we draw a line through the origin and parallel to the given line.
Now take one of the directed lines from the origin and find its direction cosines as two
parallel line have same set of direction cosines.
Any three numbers which are proportional to the direction cosines of a line are
called the direction ratios of the line. If l, m, n are direction cosines and a, b, c are
direction ratios of a line, then a = λl, b=λm and c = λn, for any nonzero λ ∈ R.

ANote Some authors also call direction ratios as direction numbers.
Let a, b, c be direction ratios of a line and let l, m and n be the direction cosines
(d.c’s) of the line. Then
l m n
= = = k (say), k being a constant.
a b c
Therefore l = ak, m = bk, n = ck... (1)
But l + m2 + n2 =
2
1
Therefore k (a2 + b2 + c2) =
2
1
1
or k= ±
a 2 + b2 + c 2

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 379

Hence, from (1), the d.c.’s of the line are
a b c
l =± ,m= ± ,n = ±
2 2 2 2 2 2
a +b +c a +b +c a + b2 + c 2
2

where, depending on the desired sign of k, either a positive or a negative sign is to be
taken for l, m and n.
For any line, if a, b, c are direction ratios of a line, then ka, kb, kc; k ≠ 0 is also a
set of direction ratios. So, any two sets of direction ratios of a line are also proportional.
Also, for any line there are infinitely many sets of direction ratios.
11.2.1 Direction cosines of a line passing through two points
Since one and only one line passes through two given points, we can determine the
direction cosines of a line passing through the given points P(x1, y1, z1) and Q(x2, y2, z2)
as follows (Fig 11.2 (a)).

Fig 11.2
Let l, m, n be the direction cosines of the line PQ and let it makes angles α, β and γ
with the x, y and z-axis, respectively.
Draw perpendiculars from P and Q to XY-plane to meet at R and S. Draw a
perpendicular from P to QS to meet at N. Now, in right angle triangle PNQ, ∠PQN= γ
(Fig 11.2 (b).
NQ z −z
Therefore, cos γ = = 2 1
PQ PQ
x2 − x1 y −y
Similarly cos α = and cos β = 2 1
PQ PQ
Hence, the direction cosines of the line segment joining the points P(x1, y1, z1) and
Q(x2, y2, z2) are

Rationalised 2023-24
380 MATHEMATICS

x2 − x1 y2 − y1 z2 − z1
, ,
PQ PQ PQ
2
where PQ = ( x2 − x1 ) 2 + ( y2 − y1 ) 2 + ( z2 − z1 )

ANote The direction ratios of the line segment joining P(x1, y1, z1) and Q(x2, y2, z2)
may be taken as
x2 – x1, y2 – y1, z2 – z1 or x1 – x2, y1 – y2, z1 – z2
Example 1 If a line makes angle 90°, 60° and 30° with the positive direction of x, y and
z-axis respectively, find its direction cosines.
1
Solution Let the d. c.'s of the lines be l , m, n. Then l = cos 900 = 0, m = cos 600 = ,
2
3
n = cos 300 =.
2
Example 2 If a line has direction ratios 2, – 1, – 2, determine its direction cosines.
Solution Direction cosines are
2 −1 −2
, ,
2 + (− 1) + (−2) 2
2 2 2 2 2 2 2 2
2 + ( −1) + (−2) 2 + ( −1) + (−2)
2 −1 −2
or , ,
3 3 3
Example 3 Find the direction cosines of the line passing through the two points
(– 2, 4, – 5) and (1, 2, 3).
Solution We know the direction cosines of the line passing through two points
P(x1, y1, z1) and Q(x2, y2, z2) are given by
x2 − x1 y2 − y1 z2 − z1
, ,
PQ PQ PQ

( x2 − x1 ) 2 + ( y 2 − y1 ) 2 + (z 2 − z1 )
2
where PQ =
Here P is (– 2, 4, – 5) and Q is (1, 2, 3).
So PQ = (1 − (−2)) 2 + (2 − 4)2 + (3 − (−5)) 2 = 77
Thus, the direction cosines of the line joining two points is
3 −2 8
, ,
77 77 77

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 381

Example 4 Find the direction cosines of x, y and z-axis.
Solution The x-axis makes angles 0°, 90° and 90° respectively with x, y and z-axis.
Therefore, the direction cosines of x-axis are cos 0°, cos 90°, cos 90° i.e., 1,0,0.
Similarly, direction cosines of y-axis and z-axis are 0, 1, 0 and 0, 0, 1 respectively.
Example 5 Show that the points A (2, 3, – 4), B (1, – 2, 3) and C (3, 8, – 11) are
collinear.
Solution Direction ratios of line joining A and B are
1 – 2, – 2 – 3, 3 + 4 i.e., – 1, – 5, 7.
The direction ratios of line joining B and C are
3 –1, 8 + 2, – 11 – 3, i.e., 2, 10, – 14.
It is clear that direction ratios of AB and BC are proportional, hence, AB is parallel
to BC. But point B is common to both AB and BC. Therefore, A, B, C are
collinear points.

EXERCISE 11.1
1. If a line makes angles 90°, 135°, 45° with the x, y and z-axes respectively, find its
direction cosines.
2. Find the direction cosines of a line which makes equal angles with the coordinate
axes.
3. If a line has the direction ratios –18, 12, – 4, then what are its direction cosines ?
4. Show that the points (2, 3, 4), (– 1, – 2, 1), (5, 8, 7) are collinear.
5. Find the direction cosines of the sides of the triangle whose vertices are
(3, 5, – 4), (– 1, 1, 2) and (– 5, – 5, – 2).
11.3 Equation of a Line in Space
We have studied equation of lines in two dimensions in Class XI, we shall now study
the vector and cartesian equations of a line in space.
A line is uniquely determined if
(i) it passes through a given point and has given direction, or
(ii) it passes through two given points.
11.3.1 Equation of a line through a given point and parallel to given vector
Let be the position vector of the given point A with respect to the origin O of the
rectangular coordinate system. Let l be the line which passes through the point A and
is parallel to a given vector. Let be the position vector of an arbitrary point P on the
line (Fig 11.3).

Rationalised 2023-24
382 MATHEMATICS

uuur
Then AP is parallel to the vector , i.e.,
uuur
AP = λ , where λ is some real number.
uuur uuur uuur
But AP = OP – OA
r r
i.e. λ = r −a
Conversely, for each value of the
parameter λ, this equation gives the position
vector of a point P on the line. Hence, the
vector equation of the line is given by Fig 11.3
r r
= a+»b... (1)
r
Remark If b = aiˆ + bjˆ + ckˆ , then a, b, c are direction ratios of the line and conversely,
r
if a, b, c are direction ratios of a line, then b = aiˆ + bjˆ + ckˆ will be the parallel to
the line. Here, b should not be confused with | |.
Derivation of cartesian form from vector form
Let the coordinates of the given point A be (x1, y1, z1) and the direction ratios of
the line be a, b, c. Consider the coordinates of any point P be (x, y, z). Then
r r
r = xiˆ + yjˆ + zkˆ ; a = x1 ˆi + y1 ˆj + z1 kˆ
r
and b = a iˆ + b ˆj + c kˆ
Substituting these values in (1) and equating the coefficients of iˆ, ˆj and k̂ , we get
x = x1 + λ a; y = y1 + λ b; z = z1+ λ c... (2)
These are parametric equations of the line. Eliminating the parameter λ from (2),
we get
x – x1 y – y1 z – z1
= =... (3)
a b c
This is the Cartesian equation of the line.

ANote If l, m, n are the direction cosines of the line, the equation of the line is
x – x1 y – y1 z – z1
= =
l m n
Example 6 Find the vector and the Cartesian equations of the line through the point
(5, 2, – 4) and which is parallel to the vector 3 iˆ + 2 ˆj − 8 kˆ.
Solution We have
r
= 5 iˆ + 2 ˆj − 4 kˆ and b = 3 iˆ + 2 ˆj − 8 kˆ

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 383

Therefore, the vector equation of the line is
= 5 iˆ + 2 ˆj − 4 kˆ + λ ( 3 iˆ + 2 ˆj − 8 kˆ )
Now, is the position vector of any point P(x, y, z) on the line.
Therefore, x iˆ + y ˆj + z kˆ = 5 iˆ + 2 ˆj − 4 kˆ + λ ( 3 iˆ + 2 ˆj − 8 kˆ)
= (5 + 3λ ) iˆ + (2 + 2λ ) ˆj + ( − 4 − 8λ ) kˆ
Eliminating λ , we get
x −5 y−2 z+4
= =
3 2 −8
which is the equation of the line in Cartesian form.
11.4 Angle between Two Lines
Let L1 and L2 be two lines passing through the origin
and with direction ratios a1, b1, c1 and a2, b2, c2,
respectively. Let P be a point on L1 and Q be a point
on L2. Consider the directed lines OP and OQ as
given in Fig 11.6. Let θ be the acute angle between
OP and OQ. Now recall that the directed line
segments OP and OQ are vectors with components
a1, b1, c1 and a2, b2, c2, respectively. Therefore, the
angle θ between them is given by Fig 11.4
a1a2 + b1b2 + c1c2
cos θ =... (1)
a12 + b12 + c12 a22 + b22 + c22

The angle between the lines in terms of sin θ is given by

sin θ = 1 − cos2 θ

( a1a2 + b1b2 + c1c2 )2
= 1−
( a12 + b12 + c12 )( a22 + b22 + c22 )
( a12 + b12 + c12 )( a22 + b22 + c22 ) − ( a1a2 + b1b2 + c1c2 )2
=
( a12 + b12 + c12 ) ( a22 + b22 + c22 )
( a1 b2 − a2 b1 ) 2 + (b1 c2 − b2 c1 ) 2 + (c1 a2 − c2 a1 ) 2
=... (2)
a12 + b12 + c12 a22 + b22 + c22

Rationalised 2023-24
384 MATHEMATICS

ANote In case the lines L1 and L2 do not pass through the origin, we may take
lines L′1 and L′2 which are parallel to L1 and L2 respectively and pass through
the origin.
If instead of direction ratios for the lines L1 and L2, direction cosines, namely,
l1, m1, n1 for L1 and l2, m2, n2 for L2 are given, then (1) and (2) takes the following form:
cos θ = | l1 l2 + m1m2 + n1n2 | (as l12 + m12 + n12 =1 = l22 + m22 + n22 )... (3)
2
and sin θ = ( l1 m2 − l2 m1 ) − (m1 n2 − m2 n1 ) 2 + ( n1 l2 − n2 l1 ) 2... (4)
Two lines with direction ratios a1, b1, c1 and a2, b2, c2 are
(i) perpendicular i.e. if θ = 90° by (1)
a1a2 + b1b2 + c1c2 = 0
(ii) parallel i.e. if θ = 0 by (2)
a1 b1 c1
= =
a2 b2 c2
Now, we find the angle between two lines when their equations are given. If θ is
acute the angle between the lines
r r
= a1 + λ b1 and = a2 + µ b2
r r
b1 ⋅ b 2
then cos θ = r r
b1 b 2
In Cartesian form, if θ is the angle between the lines
x − x1 y − y1 z − z1
= =... (1)
a1 b1 c1
x − x2 y − y2 z − z 2
and = =... (2)
a2 b2 c2
where, a1, b1, c1 and a2, b2, c2 are the direction ratios of the lines (1) and (2), respectively,
then
a1a2 + b1b2 + c1c2
cos θ =
a12 + b12 + c12 a22 + b22 + c22
Example 7 Find the angle between the pair of lines given by
= 3 iˆ + 2 ˆj − 4 kˆ + λ(iˆ + 2 ˆj + 2 kˆ)

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 385

and = 5 iˆ − 2 ˆj + µ (3 iˆ + 2 ˆj + 6 kˆ )
r r
Solution Here b1 = iˆ + 2 ˆj + 2 kˆ and b2 = 3 iˆ + 2 ˆj + 6 kˆ
The angle θ between the two lines is given by
r r
b1 ⋅ b2 (iˆ + 2 ˆj + 2kˆ) ⋅ (3 iˆ + 2 ˆj + 6 kˆ)
cos θ = r r =
b1 b2 1 + 4 + 4 9 + 4 + 36
3 + 4 + 12 19
= =
3× 7 21
 19 
Hence θ = cos–1  
 21 
Example 8 Find the angle between the pair of lines
x+3 y −1 z + 3
= =
3 5 4
x +1 y−4 z −5
and = =
1 1 2
Solution The direction ratios of the first line are 3, 5, 4 and the direction ratios of the
second line are 1, 1, 2. If θ is the angle between them, then
3.1 + 5.1 + 4.2 16 16 8 3
cos θ = = = =
2
3 +5 +42 2 2 2
1 +1 + 2 2 50 6 5 2 6 15
8 3 
Hence, the required angle is cos–1  .
 15 
11.5 Shortest Distance between Two Lines
If two lines in space intersect at a point,
then the shortest distance between them is
zero. Also, if two lines in space are parallel,
then the shortest distance between them
will be the perpendicular distance, i.e. the
length of the perpendicular drawn from a
point on one line onto the other line.
Further, in a space, there are lines which
are neither intersecting nor parallel. In fact,
such pair of lines are non coplanar and
are called skew lines. For example, let us
consider a room of size 1, 3, 2 units along Fig 11.5
x, y and z-axes respectively Fig 11.5.

Rationalised 2023-24
386 MATHEMATICS

The line GE that goes diagonally across the ceiling and the line DB passes through
one corner of the ceiling directly above A and goes diagonally down the wall. These
lines are skew because they are not parallel and also never meet.
By the shortest distance between two lines we mean the join of a point in one line
with one point on the other line so that the length of the segment so obtained is the
smallest.
For skew lines, the line of the shortest distance will be perpendicular to both
the lines.
11.5.1 Distance between two skew lines
We now determine the shortest distance between two skew lines in the following way:
Let l1 and l2 be two skew lines with equations (Fig. 11.6)
r r
= a1 + λ b1... (1)
r r
and = a2 + µ b2... (2)
r
Take any point S on l1 with position vector ar1 and T on l2, with position vector a 2.
Then the magnitude of the shortest distance vector T
will be equal to that of the projection of ST along the Q
l2
direction of the line of shortest distance (See 10.6.2).
uuur
If PQ is the shortest distance vector between l1
r r
and l2 , then it being perpendicular to both b1 and b2 ,
uuur S P
l1
the unit vector n̂ along PQ would therefore be
Fig 11.6
r r
b1 × b2
n̂ = r r... (3)
| b1 × b2 |
uuur
Then PQ = d n̂
where, d is the magnitude of the shortest distance vector. Let θ be the angle between
uur uuur
ST and PQ. Then
PQ = ST | cos θ |
uuur uur
PQ ⋅ ST
But cos θ = uuuur uur
| PQ | | ST |
r r uur
d nˆ ⋅ (a2 − a1 ) r r
= (since ST = a2 − a1 )
d ST
r r r r
(b1 × b2 ) ⋅ (a2 − a1)
= r r [From (3)]
ST b1 × b2

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 387

Hence, the required shortest distance is
d = PQ = ST | cos θ |
r r r r
( b1 × b2 ). (a2 × a1 )
or d= r r
| b1 × b2 |
Cartesian form
The shortest distance between the lines
x − x1 y − y1 z − z1
l1 : = =
a1 b1 c1
x − x2 y − y2 z − z2
and l2 : = =
a2 b2 c2

x2 − x1 y2 − y1 z2 − z1
a1 b1 c1
a2 b2 c2

is ( b1c2 − b2c1 )2 + ( c1a2 − c2 a1 )2 + ( a1b2 − a2 b1 )2

11.5.2 Distance between parallel lines
If two lines l1 and l2 are parallel, then they are coplanar. Let the lines be given by... (1)
and … (2)
r
where, ar1 is the position vector of a point S on l1 and a 2
is the position vector of a point T on l2 Fig 11.7.
As l1, l2 are coplanar, if the foot of the perpendicular
from T on the line l1 is P, then the distance between the
lines l1 and l2 = | TP |.
uur
Let θ be the angle between the vectors ST and.
Fig 11.7
Then
r uur
b × ST = ˆ... (3)
where n̂ is the unit vector perpendicular to the plane of the lines l1 and l2.
uur r r
But ST = a2 − a1

Rationalised 2023-24
388 MATHEMATICS

Therefore, from (3), we get
r r r r
b × (a2 − a1 ) = b | PT nˆ (since PT = ST sin θ)
r r r r
i.e., | b × ( a2 − a1 )| = | b | PT ⋅ 1 (as | n̂ | = 1)
Hence, the distance between the given parallel lines is

d=

Example 9 Find the shortest distance between the lines l1 and l2 whose vector
equations are
= iˆ + ˆj + λ (2 iˆ − ˆj + kˆ )... (1)
and = 2 iˆ + ˆj − kˆ + µ (3 iˆ − 5 ˆj + 2 kˆ )... (2)
r r r r
Solution Comparing (1) and (2) with = ar1 + λ b1 and r = a 2 + µ b 2 respectively,
r r
we get a1 = iˆ + ˆj , b1 = 2 iˆ − ˆj + kˆ
r r
a 2 = 2 iˆ + ĵ – k̂ and b2 = 3 iˆ – 5 ĵ + 2 k̂
r r
Therefore a2 − a1 = iˆ − kˆ
r r
and b1 × b2 = ( 2 iˆ − ˆj + kˆ ) × ( 3 iˆ − 5 ˆj + 2 kˆ )

iˆ ˆj kˆ
= 2 −1 1 = 3 iˆ − ˆj − 7 kˆ
3 −5 2
r r
So |b1 × b2 | = 9 + 1 + 49 = 59
Hence, the shortest distance between the given lines is given by
r r r r
( b1 × b 2 ). ( a 2 − a1 ) | 3− 0 + 7 | 10
d = r r = =
| b1 × b 2 | 59 59
Example 10 Find the distance between the lines l1 and l2 given by
= iˆ + 2 ˆj − 4 kˆ + λ ( 2 iˆ + 3 ˆj + 6 kˆ )

and = 3 iˆ + 3 ˆj − 5 kˆ + µ ( 2 iˆ + 3 ˆj + 6 kˆ )

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 389

Solution The two lines are parallel (Why? ) We have
r r
a1 = iˆ + 2 ˆj − 4 kˆ , a 2 = 3 iˆ + 3 ˆj − 5 kˆ and = 2 iˆ + 3 ˆj + 6 kˆ
Therefore, the distance between the lines is given by

iˆ ˆj kˆ
r r r
b × (a2 − a1 ) 2 3 6
d= r =
|b | 2 1 −1
4 + 9 + 36

| − 9 iˆ + 14 ˆj − 4 kˆ | 293 293
or = = =
49 49 7

EXERCISE 11.2
1. Show that the three lines with direction cosines
12 −3 −4 4 12 3 3 −4 12
, , ; , , ; , , are mutually perpendicular.
13 13 13 13 13 13 13 13 13
2. Show that the line through the points (1, – 1, 2), (3, 4, – 2) is perpendicular to the
line through the points (0, 3, 2) and (3, 5, 6).
3. Show that the line through the points (4, 7, 8), (2, 3, 4) is parallel to the line
through the points (– 1, – 2, 1), (1, 2, 5).
4. Find the equation of the line which passes through the point (1, 2, 3) and is
parallel to the vector 3 iˆ + 2 ˆj − 2 kˆ.
5. Find the equation of the line in vector and in cartesian form that passes through
the point with position vector 2 iˆ − j + 4 kˆ and is in the direction iˆ + 2 ˆj − kˆ.
6. Find the cartesian equation of the line which passes through the point (– 2, 4, – 5)
x +3 y −4 z +8
and parallel to the line given by = =.
3 5 6
x −5 y +4 z−6
7. The cartesian equation of a line is = =. Write its vector form.
3 7 2
8. Find the angle between the following pairs of lines:
(i) rr = 2 iˆ − 5 ˆj + kˆ + λ (3 iˆ + 2 ˆj + 6 kˆ) and
r
r = 7 iˆ − 6 kˆ + µ ( iˆ + 2 ˆj + 2 kˆ)

Rationalised 2023-24
390 MATHEMATICS

(ii) rr = 3 iˆ + ˆj − 2 kˆ + λ ( iˆ − ˆj − 2 kˆ) and
r
r = 2 iˆ − ˆj − 56 kˆ + µ (3 iˆ − 5 ˆj − 4 kˆ)
9. Find the angle between the following pair of lines:
x − 2 y −1 z + 3 x+ 2 y − 4 z −5
(i) = = and = =
2 5 −3 −1 8 4
x y z x−5 y−2 z −3
(ii) = = and = =
2 2 1 4 1 8
1 − x 7 y − 14 z − 3
10. Find the values of p so that the lines = =
3 2p 2
7 − 7x y − 5 6 − z
and = = are at right angles.
3p 1 5
x−5 y + 2 z x y z
11. Show that the lines = = and = = are perpendicular to
7 −5 1 1 2 3
each other.
12. Find the shortest distance between the lines
r
r = ( iˆ + 2 ˆj + kˆ) + λ (iˆ − ˆj + kˆ ) and
r
r = 2 iˆ − ˆj − kˆ + µ (2 iˆ + ˆj + 2 kˆ)
13. Find the shortest distance between the lines
x +1 y +1 z +1 x −3 y−5 z −7
= = and = =
7 −6 1 1 −2 1
14. Find the shortest distance between the lines whose vector equations are
r
r = (iˆ + 2 ˆj + 3 kˆ) + λ (iˆ − 3 ˆj + 2 kˆ)
r
and r = 4 iˆ + 5 ˆj + 6 kˆ + µ (2 iˆ + 3 ˆj + kˆ)
15. Find the shortest distance between the lines whose vector equations are
r
r = (1 − t ) iˆ + (t − 2) ˆj + (3 − 2 t ) kˆ and
r
r = ( s + 1) iˆ + (2 s − 1) ˆj − (2 s + 1) kˆ

Miscellaneous Exercise on Chapter 11
1. Find the angle between the lines whose direction ratios are a, b, c and
b – c, c – a, a – b.
2. Find the equation of a line parallel to x-axis and passing through the origin.

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 391

x −1 y − 2 z −3 x −1 y − 1 z − 6
3. If the lines = = and = = are perpendicular,
−3 2k 2 3k 1 −5
find the value of k.
r
4. Find the shortest distance between lines r = 6 iˆ + 2 ˆj + 2 kˆ + λ (iˆ − 2 ˆj + 2 kˆ)
and rr = − 4 iˆ − kˆ + µ (3 iˆ − 2 ˆj − 2 kˆ).
5. Find the vector equation of the line passing through the point (1, 2, – 4) and
perpendicular to the two lines:
x − 8 y + 19 z −10 x − 15 y − 29 z − 5.
= = and = =
3 − 16 7 3 8 −5

Summary
® Direction cosines of a line are the cosines of the angles made by the line
with the positive directions of the coordinate axes.
® If l, m, n are the direction cosines of a line, then l2 + m2 + n2 = 1.
® Direction cosines of a line joining two points P(x1, y1, z1) and Q(x2, y2, z2) are
x2 − x1 y2 − y1 z2 − z1
, ,
PQ PQ PQ

( x2 − x1 ) 2 + ( y 2 − y1 ) 2 + (z 2 − z1 )
2
where PQ =
® Direction ratios of a line are the numbers which are proportional to the
direction cosines of a line.
® If l, m, n are the direction cosines and a, b, c are the direction ratios of a line
then
a b c
l= 2 2 2
;m= 2 2 2
;n=
a +b +c a +b +c a 2 + b2 + c2
® Skew lines are lines in space which are neither parallel nor intersecting.
They lie in different planes.
® Angle between skew lines is the angle between two intersecting lines
drawn from any point (preferably through the origin) parallel to each of the
skew lines.
® If l1, m1, n1 and l2, m2, n2 are the direction cosines of two lines; and θ is the
acute angle between the two lines; then
cosθ = | l1l2 + m1m2 + n1n2 |

Rationalised 2023-24
392 MATHEMATICS

® If a1, b1, c1 and a2, b2, c2 are the direction ratios of two lines and θ is the
acute angle between the two lines; then
a1 a2 + b1 b2 + c1 c2
cosθ =
a12 + b12 + c12 a22 + b22 + c22

® Vector equation of a line that passes through the given point whose position
r
vector is and parallel to a given vector is rr = ar + λ b.
® Equation of a line through a point (x1, y1, z1) and having direction cosines l, m, n is
x − x1 y − y1 z − z1
= =
l m n
® The vector equation of a line which passes through two points whose position
r r
r r
vectors are and is r = a + λ (b − a ).
r r r r
® If θ is the acute angle between rr = ar1 + λ b1 and r = a2 + λ b2 , then
r r
b1 ⋅ b2
cos θ = r r
| b1 | | b2 |

x − x1 y − y1 z − z1 x − x2 y − y2 z − z2
® If = = and = =
l1 m1 n1 l2 m2 n2
are the equations of two lines, then the acute angle between the two lines is
given by cos θ = |l1 l2 + m1 m2 + n1 n2 |.
® Shortest distance between two skew lines is the line segment perpendicular
to both the lines.
r r r r
® Shortest distance between rr = ar1 + λ b1 and r = a2 + µ b2 is
r r r r
(b1 × b2 ) ⋅ (a2 – a1 )
r r
| b1 × b2 |

x − x1 y − y1 z − z1
® Shortest distance between the lines: = = and
a1 b1 c1

x − x2 y − y2 z − z2
= = is
a2 b2 c2

Rationalised 2023-24
 THREE DIMENSIONAL GEOMETRY 393

x2 − x1 y2 − y1 z2 − z1
a1 b1 c1
a2 b2 c2
(b1c2 − b2c1 ) 2 + (c1a2 − c2 a1 ) 2 + (a1b2 − a2b1 ) 2
r r r r r r
® Distance between parallel lines r = a1 + λ b and r = a2 + µ b is
r r r
b × (a2 − a1 )
r
|b |

—v —

Rationalised 2023-24