If the line `vecr =( hat i-2 hatj + hatk)+t(2 i+ hatj +2 hatk)` is parallel to the plane `vecr .( 3hat i-2 hatj + mhatk)=14`, Find the value of m.

If the line vecr=(2hati-hatj+3hatk)+lambda(2hati+hatj+2hatk) is parallel to the plane vecr*(3hati-2hatj+p hatk)=4 then the value of p is -

State the condition for which the line vecr=veca+lambda vecb is parallel to the plane vecr. vecn=d . Prove that the line vecr=(hati+ hatj)+ lambda (2 hati+ hat j+4 hatk) is parallel to the plane vec r.(-2 hati+ hatk)=5 . Also , find the distance between the line and the plane.

The angle between the line vecr=( hati+2 hatj- hatk)+ lambda( hati- hatj+ hatk) and the plane vecr. (2 hati- hatj+ hatk)=4 is __

Find the vector equation of a plane through the point hati+ hat j+hat k and parallel to the plane vecr.(2 hat i-hatj +2 hatk)=5 .

Show that the line whose vector equation is vecr=(2 hati-2 hatj+3 hatk)+lambda (hati- hatj+4 hatk) is parallel to the plane whose vector equation is vecr.(hati+5 hatj+ hatk)=5 .Also, find the distance between them

Consider the line l : vecr= hati- hatj+ hatk+ t(2 hati+3 hatj-6 hatk) and the plane p:vecr.(2 hati+3 hatj-6 hatk)=7 . Statement -I : Then line l and the plane 'p' meet in a unique point . Statement -II: The line l is at right angoles to the plane 'p'

Find the distance of the point (-1,-5,-10) from the point of intersection of the line vec r =(2 hati- hatj+ 2 hatk)+ lambda(3 hati+ 4 hatj+ 2 hatk) and the plane vec r .( hati- hatj+ hat k)=5 .

Find the equation of the plane which constant the line of intesection of the planes vecr.( hati+2 hatj+3 hatk)-4=0 and vecr.( 2 hati+ hatj-hatk)=0 and which is prependicular to the plane vecr.(5 hati+3 hatj-6 hatk)+8=0.

If the angle between the plane vecr .( hati-3 hatj+ 2 hatk)=15 and the line vec r = ( hat I + hat j+ hat k ) + S (2 hati+ hat j-3 hatk) is theta , then the value of cosec theta is

Find the distance of the point with position vector 2 hati+ hatj- hatk from the plane vecr .( hati- 2 hatj+ 4 hatk)=9 .