CBSE Class 12 Maths 2010 Solved Paper

Question : 29 of 29

Marks: +1, -0

Write the vector equations of the following lines and hence determine the distance between them:

{x-1}/2

{y-2}/3

{z-4}/6

;

{x-3}/4

{y-3}/6

{z+5}/{12}

Solution:

Given equation of line is

{x-1}/2

{y-2}/3

{z-4}/6

This can also be written in the standard form as

{x-1}/2

{y-2}/3

{z-(-4)}/6

The vector form of the above equation is,

r↖{→}

(i↖{\^}+2j↖{\^}-4k)

λ(2i↖{\^}+3j↖{\^}+6k↖{\^})

⇒

r↖{→}

a↖{→}_1+λb↖{→}

... (i)
where,

a↖{→}

i↖{\^}+2j↖{\^}-4k↖{\^}

and

b↖{→}

2i↖{\^}+3j↖{\^}+6k↖{\^}

The second equation of line is

{x-3}/4

{y-3}/6

{z+5}/{12}

The above equation can also be written as

{x-3}/4

{y-3}/6

{z - (-5)}/{12}

The vector form of this equation is

r↖{→}

(3i↖{\^}+3j↖{\^}-5k)

µ(4i↖{\^}+6j↖{\^}+12k↖{\^})

⇒

r↖{→}

(3i↖{\^}+3j↖{\^}-5k)

2µ(2i↖{\^}+3j↖{\^}+6k↖{\^})

⇒

r↖{→}

a↖{→}_2 + 2µb↖{→}

... (ii)
where

a↖{→}_2

(3i↖{\^}+3j↖{\^}-5k)

and

b↖{→}

2i↖{\^}+3j↖{\^}+6k↖{\^}

Since

b↖{→}

is same in equations (1) and (2), the two lines are parallel. Distance d, between the two parallel lines is given by the formula,
d =

|{b↖{→}×(a_2↖{→}-a_1↖{→}}/{|b|}|

Here,

b↖{→}

2i↖{\^}+3j↖{\^}+6k↖{\^}

a↖{→}_2

(3i↖{\^}+3j↖{\^}-5k)

and

a↖{→}_1

i↖{\^}+2j↖{\^}-4k↖{\^}

On substitution, we get
d =

|{(2i↖{\^}+3j↖{\^}+6k↖{\^})×(3i↖{\^}+3j↖{\^}-5k↖{\^}-(i↖{\^}+2j↖{\^}-4k↖{\^})}/√{4+9+36}|

1/√{49}

(2i↖{\^}+3j↖{\^}+6k↖{\^}) × (2i↖{\^}+j↖{\^}-k↖{\^})

1/7 |\table i↖{\^},j↖{\^},k↖{\^};2,3,6;2,1,-1|

1/7

i↖{\^}

(- 3 - 6) -

j↖{\^}

(- 2 - 12) +

k↖{\^}

(2 - 6)|
=

1/7 |-9i↖{\^}+14j↖{\^}-4k↖{\^}|

1/7|√{81+196+16}|

√{293}/7

Thus, the distance between the two given lines is

√{293}/7

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