Home
Class 12
MATHS
The number of integral values of p for w...

The number of integral values of p for which `(p+1) hati-3hatj+phatk, phati + (p+1)hatj-3hatk` and `-3hati+phatj+(p+1)hatk` are linearly dependent vectors is q

A

0

B

1

C

2

D

3

Text Solution

Verified by Experts

The correct Answer is:
B
The vectors are linearly dependent
`rArr |{:(p+1,-3,p),(p,p+1,-3),(-3,p,p+1):}|=0`
`rArr (2p-2)|{:(1,-3,p),(1,p+1,-3),(1,p,p+1):}|=0`
`rArr 2(p-1)|{:(1,-3,p),(0,p+4,-3-p),(0,p+3,1):}|=0`
`rArr 2(p-1)(p+4)+(p+3)^(2)=0`
`rArr (p-1)(p^(2)+7p+13)=0`
Roots of `p^(2)+7p+13=0` are (imaginary)
`therefore p=1`
Only integral value of p is 1.
Doubtnut Promotions Banner Mobile Dark
|

Topper's Solved these Questions

  • LIMITS

    CENGAGE|Exercise Question Bank|17 Videos

  • LOGARITHM AND ITS APPLICATIONS

    CENGAGE|Exercise Subjective Type|9 Videos

Similar Questions

Explore conceptually related problems

If veca=hati+hatj+hatk, vecb=4hati+3hatj+4hatk and vecc=hati+alphahatj+betahatk are linearly dependent vectors and |vecc|=sqrt(3) then

Show that the vectors hati+2hatj-3hatk , 2hati-hatj+2hatk and 3hati+hatj-hatk are coplanar.

Show that the points vectors are 2hati+3hatj-5hatk,3hati+hatj-2hatk and 6hati-5hatj+7hatk are collinear.

Determine whether the three vectors 2hati+3hatj+hatk, hati-2hatj+2hatk and 3hati+hatj+3hatk are coplanar.

Show that the points whose position vectors are 2hati + 3hatj - 5hatk , 3hati +hatj - 2hatk and 6hati - 5hatj + 7hatk are collinear.

Find the value of lamda for which the vectors veca = 3hati + 2hatj + 9hatk and vecb = hati + lamdahatj + 3hatk are parallel.

If 2hati-hatj+3hatk,3hati+2hatj+hatk,hati+mhatj+4hatk are coplanar, find the value of m.

If veca=2hati+3hatj+hatk, vecb=hati-2hatj+hatk and vecc=-3hati+hatj+2hatk , then [veca vecb vecc]=

Show that the vectors 2 hati-3hatj+4hatk are -4 hati+6hatj-8hatk are collinear.

Prove that points hati+2hatj-3hatk, 2hati-hatj+hatk and 2hati+5hatj-hatk form a triangle in space.

Home
Profile