Home
Class 12
MATHS
A non vector veca is parallel to the lin...

A non vector `veca` is parallel to the line of intersection of the plane determined by the vectors `veci,veci+vecj` and thepane determined by the vectors `veci-vecj,veci+veck` then angle between `veca and veci-2vecj+2veck` is = (A) `pi/2` (B) `pi/3` (C) `pi/6` (D) `pi/4`

Text Solution

Verified by Experts

The correct Answer is:
`pi//4 or 3pi//4`
A vector normal to the plane containing vectors ` hati and hati + hatz` is
`vecp=|{:(hati,hatj,hatk),(1,0,0),(1,1,0):}|=hatk`
A vector normal to the plane containing vectors ` hati- hatj, hati + hatk` is
`vecq=|{:(hati,hatj,hatk),(1,-1,0),(1,0,1):}|=-hati-hatj+hatk`
vector `veca` is parllel to vector `vecp xx vecq`
`vecp xx vecq=|{:(hati,hatj,hatk),(0,0,1),(-1,-1,1):}|=hati-hatj`
Therefore, a vector in direction of `veca` is `hati - hatj`
Now `theta` is the angle between `hata and hati - 2hatj + 2hatk` then
`cos theta=+-(1.1+(-1).(-2))/(sqrt(1+1)sqrt(1+4+4))=+-3/(sqrt(2).3)`
`Rightarrow +-1/sqrt2 Rightarrow theta=pi/4or (3pi)/4`
Promotional Banner

Topper's Solved these Questions

  • DIFFERENT PRODUCTS OF VECTORS AND THEIR GEOMETRICAL APPLICATIONS

    CENGAGE ENGLISH|Exercise True and false|3 Videos

  • DIFFERENT PRODUCTS OF VECTORS AND THEIR GEOMETRICAL APPLICATIONS

    CENGAGE ENGLISH|Exercise single correct answer type|28 Videos

  • DIFFERENT PRODUCTS OF VECTORS AND THEIR GEOMETRICAL APPLICATIONS

    CENGAGE ENGLISH|Exercise Subjective type|19 Videos

  • DETERMINANTS

    CENGAGE ENGLISH|Exercise All Questions|264 Videos

  • DIFFERENTIAL EQUATIONS

    CENGAGE ENGLISH|Exercise Matrix Match Type|5 Videos

Similar Questions

Explore conceptually related problems

A non zero vector veca is parallel to the line of intersection of the plane determined by the vectors hati,hati+hatj and the plane determined by the vectors hati-hatj , hati + hatk . The angle between veca and hati-2hatj + 2hatk can be

If |veca.vecb|=sqrt(3)|vecaxxvecb| then the angle between veca and vecb is (A) pi/6 (B) pi/4 (C) pi/3 (D) pi/2

If veca,vecb,vecc are three coplanar unit vector such that vecaxx(vecbxxvecc)=-vecb/2 then the angle betweeen vecb and vecc can be (A) pi/2 (B) pi/6 (C) pi (D) (2pi)/3

Find the equation of the plane through the point 2veci+3vecj-veck and perpendicular to the vector 3veci-4vecj+7veck .

If veca,vecb and vecc are non coplanar and unit vectors such that vecaxx(vecbxxvecc)=(vecb+vecc)/sqrt2 then the angle between veca and vecb is (A) (3pi)/4 (B) pi/4 (C) pi/2 (D) pi

The non zero vectors veca,vecb, and vecc are related byi veca=8vecb nd vecc=-7vecb. Then the angle between veca and vecc is (A) pi (B) 0 (C) pi/4 (D) pi/2

If veca,vecb and vecc are non coplanar and unit vectors such that vecaxx(vecbxxvecc)=(vecb+vecc)/sqrt2) then the angle between vea and vecb is (A) (3pi)/4 (B) pi/4 (C) pi/2 (D) pi

If veca,vecb,vecc are unit vectors such that veca is perpendicular to vecb and vecc and |veca+vecb+vecc|=1 then the angle between vecb and vecc is (A) pi/2 (B) pi (C) 0 (D) (2pi)/3

If |vecc|=2 , |veca|=|vecb|=1 and vecaxx(vecaxxvecc)+vecb=vec0 then the acute angle between veca and vecc is (A) pi/6 (B) pi/4 (C) pi/3 (D) (2pi)/3

If veca=2veci+3vecj+4veck and vecb =4veci+3vecj+2veck , find the angle between veca and vecb .