Let `(x_(1), y_(1)), (x_(2),y_(2)), (x_(3),y_(3))` and `(x_(4), y_(4))` are four points which are at unit distance from the lines `3x-4y+1=0` and `8x+6y+1=0,` then the value of `(Sigma_(i=1)^(4)x_(i))/(Sigma_(i=1)^(4)y_(i))` is equal to

Let A(x_(1), y_(1)), B(x_(2), y_(2)), C(x_(3), y_(3)) and D(x_(4), y_(4)) are four points which are at equal distance from the lines 3x-4y+1=0 and 8x+6y+1=0 , The mean of the coordinates of the centroids of DeltaABC, DeltaBCD, DeltaCDA and DeltaDAB are

If four points (x_(1),y_(1)),(x_(2),y_(2)),(x_(3),y_(3)) and (x_(4),y_(4)) taken in order in a parallelogram, then:

Find the coordinates of the point at unit distance from the lines 3x-4y + 1 = 0, 8x +6y +1 = 0

Find the perpendicular distance between the lines. 3x+4y-5=0 ...(1) and 6x+8y-45=0 ...(2)

A tetrahedron is three dimensional figure bounded by four non coplanar triangular plane. So a tetrahedron has points A,B,C,D as its vertices, which have coordinates (x_(1),y_(1),z_(1)) (x_(2), y_(2), z_(2)) , (x _(3), y_(3) , z_(3)) and (x _(4), y _(4), z _(4)) respectively in a rectangular three –dimensional space. Then the coordinates of its centroid are ((x_(1)+ x_(2) + x _(3) + x_(4))/(4) , (y _(1) + y _(2) + y_(3) + y _(4))/(4), (z_(1) + z_(2) + z_(3)+ z_(4))/(4)). The circumcentre of the tetrahedron is the centre of a sphere passing through its vertices. So, the circumcentre is a point equidistant from each of the vertices of tetrahedron. Let tetrahedron has three of its vertices represented by the points (0,0,0) ,(6,-5,-1) and (-4,1,3) and its centroid lies at the point (1,-2,5). Now answer the following questions The distance between the planes x + 2y- 3z -4 =0 and 2x + 4y - 6z=1 along the line x/1= (y)/(-3) = z/2 is :

If the hyperbola xy=c^(2) intersects the circle x^(2)+y^(2)=a^(2)" is four points "P(x_(1),y_(1)), Q(x_(2),y_(2)), R(x_(3),y_(3)) and S(x_(4),y_(4)) then show that (i) x_(1)+x_(2)+x_(3)+x_(4)=0 (ii) y_(1)+y_(2)+y_(3)+y_(4)=0 (iii) x_(1)x_(2)x_(3)x_(4)=c^(4) (iv) y_(1)y_(2)y_(3)y_(4)=c^(4)

The distance of the point (1,2) from the line 2x-3y-4=0 in the direction of the line x+y=1 , is

Two lines (x-1)/(2)=(y-2)/(3)=(z-3)/(4) and (x-4)/(5)=(y-1)/(2)=(z)/(1) intersect at a point P. If the distance of P from the plane 2x-3y+6z=7 is lambda units, then the value of 49lambda is equal to

If the normals at the four points (x_1,y_1),(x_2,y_2),(x_3,y_3) and (x_4,y_4) on the ellipse x^(2)/a^(2)+y^(2)/b^(2)=1 are concurrent, then the value of (sum_(i=1)^4x_i)(sum_(i=1)^(4)1/x_i)

Find the distance of the point of intersection of the lines 2x+3y=21 and 3x-4y+11=0 from the line 8x+6y+5=0