`A , B , Ca n dD` are any four points in the space, then prove that `| vec A Bxx vec C D+ vec B Cxx vec A D+ vec C Axx vec B D|=4` (area of ` A B C` .

Correct Answer - b `1=|(vecb-veca).(vecpxxvecq)/(|vecpxxq|)|` or `|vecb-veca|cos60^(@)=1impliesAB=2`

Correct Answer - d `P_(1)=P_(2)=0 ,P_(2)=P_(3)=0andP_(3)=P_(1)=0` are lines of intersection of the three plane `P_(1)=P_(2)andP_(3)`. As `vecn_(1),vecn_(2)andvecn_(3)` are non-coplanar, plane `P_(1),P_(2)andP_(3)` will intersect at unique point. So the given lines will...

Correct Answer - b `vec(PA)*vec(PB)= 9 gt 0`. Therefore, P is exterior to the sphere. Statement 2 is also true (standard result).

Correct Answer - A `|vec(OX)xxvec(OY)|=|vec(OX)||vec(OY)|sin (pi-R)` `=sin R=sin (P+Q)`

Correct Answer - 6 `r=vec(B)-vec(A)=4(2hati+hatj+hatk)` `r cos theta =(vecr.vec(A))/(|A|)=(4(4+1+1))/(sqrt(6))=4sqrt(6)` `x=6`

Correct Answer - B::C::D `{:(vec(a)+vec(b)+vec(c)+vec(d)=0,,),(vec(a)+vec(c)=-(vec(b)+vec(d)),,),(|vec(a)+vec(c)|=|vec(b)+vec(d)|,,"B is correct"),(|vec(a)|=|vec(b)+vec(c)+vec(d)|,,"C is correct"):}` Resultant of three non collinear vector is zero only when they are co-planar and if `vec(a)` and `vec(d)` are collinear then `vec(b)+vec(c...

Given equation of hyperbola is `xy=c^(2)` Let four conyclic point on the hyperbola be `(x_(i),y_(i)),i=1,2,3,4`. Let the equation of the circle through point A, B, C and D be `x^(2)+y^(2)+2gx+2fy+d=0"...

Correct Answer - A The point are such that one of the points is the orthocenter of the triangle formed by other three points. When the vertices of a triangle lie...

Given \(\vec A\) = \(\hat i+2\hat j-\hat k\) \(\vec B\) = \(-\hat i-2\hat j+\hat k\) Angle b/w \(\vec A\) and \(\vec B\) cos θ = \(\frac{\vec A.\vec B}{|\vec A|.|\vec B|}\) \(=\frac{(\hat i+2\hat j-\hat k).(-\hat i-2\hat j+\hat k)}{\sqrt{1^2+(2)^2+(1)^2}\sqrt{(-1)^2+(-2)^2+(1)^2}}\) cos θ = \(\frac{-1-4-1}{\sqrt6\times\sqrt6}\) cos θ = -6/6 cos θ = -1 θ = 180° option...

Correct Answer - (i) False (ii) True (iii) True (iv) True (v) False (vi) True