The distance of the plane `vecr.(2/7hati+3/7hatj-6/7hatk)=1` from the origin is (A) 1 (B) 7 (C) `1/7` (D) none of these

Find the distance of the point (3, 3, 3) from the plane vecr.(5hati+2hatj-7hatk)+9=0 .

The planes vecr.(2hati+3hatj-6hatk)=7 and vecr.((-2)/7hati-3/7hatj+6/7hatk)=0 are (A) parallel (B) at righat angles (C) equidistant from origin (D) none of these

The vector veca=1/4(2hati-2hatj+hatk) (A) is a unit vector (B) makes an angle of pi/3 with the vector (hati+1/2 hatj-hatk) (C) is parallel to the vector 7/4hati-7/4hatj+7/8hatk (D) none of these

If (1,2,4) and (2,-lamda,-3) are the initial and terminal points of the vector hati+5hatj-7hatk then the value lamda is equal to (A) 7 (B) -7 (C) -5 (D) 5

The length of perpendicular from the origin to the line vecr=(4hati=2hatj+4hatk)+lamda(3hati+4hatj-5hatk) is (A) 2 (B) 2sqrt(3) (C) 6 (D) 7

find the projection of the vector hati+3hatj+7hatk on the vector 7hati-hatj+8 hatk

A point on the line (x-1)/1=(y-2)/2=(z+1)/3 at a distance sqrt(6) from the origin is (A) ((-5)/7, (-10)/7,13/7) (B) (5/7,10/7,(-13)/7) (C) (1,2,-1) (D) (-1,-2,1)

Find the equation of a plane passing through the intersection of the planes vecr.(2hati-7hatj+4hatk)=3 and vecr.(3hati-5hatj+4hatk) + 11 - 0 and passes through the point (-2hati+hatj+3hatk) .

The line of intersection of the planes vecr.(3hati-hatj+hatk)=1 and vecr.(hati+4hatj-2hatk)=2, is (A) (x-6/13)/2=(y-5/13)/-7=z/-13 (B) (x-6/13)/2=(y-5/13)/7=z/-13 (C) (x-4/7)/-2=y/7=(z-5/7)/13 (D) (x-4/7)/-2=y/-7=(z+5/7)/13