Question 1 :
The ratio in which $xy-$plane divides the line joining the points $(1, 0, -3)$ and $(1, -5, 7)$ is given by
Question 2 :
Plane $ax + by + cz = 1$ intersect axes in $A, B, C$ respectively. If $G\left (\dfrac {1}{6}, -\dfrac {1}{3}, 1\right )$ is a centroid of $\triangle ABC$ then $a + b + 3c =$ _________.
Question 3 :
In three dimensions, the coordinate axes of a rectangular cartesian coordinate system are
Question 4 :
If $z = \cos \dfrac{\pi }{6} + i\sin \dfrac{\pi }{6}$, then
Question 6 :
The points (2, 5) and (5, 1) are the two opposite vertices of a rectangle. If the other two vertices are points on the straight line $y = 2x + k$, then the value of k is
Question 7 :
If the $zx$-plane divides the line segment joining $(1,-1,5)$ and $(2,3,4)$ in the ratio $p:1$, then $p+1=$
Question 8 :
The ratio in which the plane $2x+3y-2z+7=0$ divides the line segment joining the points $(-1, 1, 3)$, $(2, 3, 5)$ is
Question 9 :
A point on XOZ-plane divides the join of $(5, -3, -2)$ and $(1, 2, -2)$ at
Question 10 :
$A(3, 2, 0), B(5, 3, 2), C(-9, 6, -3)$ are three points forming a triangle. If $AD$, the bisector of $\angle BAC$ meets $BC$ in $D$ then coordinates of $D$ are
Question 13 :
If $A= (1, 2, 3), B = (2, 3, 4)$ and $AB$ is produced upto $C$ such that $2AB = BC$, then $C =$<br/>
Question 16 : <div>State the following statement is True or False<br/></div>If two distinct lines are intersecting each other in a plane then they cannot have more than one point in common.<br/>
Question 17 :
The coordinate of any point, which lies in $xy$ plane , is
Question 18 :
$A=\left(2,4,5\right)$ and $B=\left(3,5,-4\right)$ are two points. If the $xy$-plane, $yz$-plane divide $AB$ in the ratios $a:b,p:q$ respectively then $\dfrac{a}{b}+\dfrac{p}{q}$=
Question 19 :
If two vertices of a triangle $ABC$ are $A(-1,2,4)$and $B(2,-3,0)$,and the centroid is $(2,0,2)$ then the vertex $C$ has the coordinates<br>
Question 20 :
$\mathrm{If} \mathrm{A}=(1, 2, 3)$ , $\mathrm{B}=(2,3, 4)$ and $\mathrm{C}$ is a point of trisection of$\mathrm{A}\mathrm{B}$ such that $\displaystyle \mathrm{C}_{\mathrm{x}}+\mathrm{C}_{\mathrm{y}}=\frac{13}{3}$ then $\mathrm{C}_{\mathrm{z}}=$<br/>
Question 21 :
If $A = (2, -3, 1), B = (3, -4, 6)$ and $C$ is a point of trisection of $AB$, then ${C}_{{y}}=$<br/>
Question 22 :
The xy-plane divides the line joining the points <b>(-1, 3, 4) </b>and <b>(2,-5,6)</b>.
Question 23 :
The plane $ax+by + cz + d = 0$ divides the line joining $(x_1, y_1, z_1)$ and $(x_2, y_2, z_2)$ in the ratio
Question 24 : If $A(\cos\alpha,\sin\alpha, 0),B(\cos\beta,\sin\beta, 0)$, $C(\cos\gamma,\sin\gamma,0)$ are vertices of $\Delta ABC$ and let <div>$\cos \alpha+\cos\beta+\cos\gamma=3{a}$, $\sin\alpha+\sin\beta+\sin\gamma =3b$, then correct matching of the following is:<br/><table class="wysiwyg-table"><tbody><tr><td>List : I<br/></td><td>List : II<br/></td></tr><tr><td>A. Circumcentre<br/></td><td>$1. (3a,3b,0)$<br/></td></tr><tr><td>B. Centroid<br/></td><td>$2. (0,0,0)$<br/></td></tr><tr><td>C. Ortho centre<br/></td><td>$3. (a,b,0)$</td></tr></tbody></table></div>
Question 25 :
The coordinates of any point, which lies in $yz$ plane, are
Question 26 :
If the centroid of the tetrahedron $OABC$, where $A, B ,C$ are given by $\displaystyle (\alpha, 5, 6), (1, \beta, 4), (3, 2, \gamma)$ respectively be $1, -1, 2$, then value of $\displaystyle \alpha^2 + \beta^2 + \gamma^2$ equals<br/>
Question 27 :
If $(1,-1,0),(-2,1,8)$ and $(-1,2,7)$ are three consecutive vertices of a parallelogram then the fourth vertex is<br/>
Question 28 :
Locus of a point $P$ which such that $PA = PB$ where $A = (0, 3, 2)$ and $B = (2, 4, 1)$ is
Question 29 :
Points $A(3,2,4),B\left( \cfrac { 33 }{ 5 } ,\cfrac { 28 }{ 5 } ,\cfrac { 38 }{ 5 } \right) $, and $C(9,8,10)$ are given. The ratio in which $B$ divides $\overline { AC } $ is
Question 30 :
If R divides the line segment joining P(2, 3, 4) and Q (4, 5, 6) in the ratio -3 : 2, then the value of the parameter which represents R is
Question 31 :
The position vectors of the four angular point of a tetrahedron $OABC$ are $(0, 0, 0)$; $(0, 0, 2)$; $(0, 4, 0)$ and $(6, 0, 0)$ respectively. Find the coordinates of cenroid
Question 32 :
If $P= (0, 0, 0), Q = (3, 6, 9)$ and $R$ is a point of trisection of $PQ$, then $R_y=$<br>
Question 33 :
If $P\left( x,y,z \right) $ is a point on the line segment joining $Q\left( 2,2,4 \right) $ and $R\left( 3,5,6 \right) $ such that the projection of $\overline { OP } $ on the axes are $\displaystyle\frac { 13 }{ 5 } ,\frac { 19 }{ 5 } ,\frac { 26 }{ 5 } ,$ respectively, then $P$ divides $QR$ in the ratio
Question 34 :
$G(1, 1, -2)$ is the centroid of the triangle $ABC$ and $D$ is the mid point of $BC$. If $A = (-1, 1, -4)$, then $D =$<br/>
Question 35 :
An equation of sphere with centre at origin and radius $r$ can be represented as
Question 36 :
If the orthocentre, circumcentre of a triangle are $(-3, 5, 2), (6, 2, 5)$ respectively then the centroid of the triangle is<br>
Question 37 :
The equation of plane passing through $(-1,0,-1)$ parallel to $xz$ plane is
Question 38 :
A $= (1, 1, 4)$ and B $= (5,-3, 4)$ are two points. If the points $P$, $Q$ are on the line AB such that AP $=$ PQ $=$ QB then PQ $=$<br/>
Question 39 :
<br/>$A=(2, 4, 5)$ and $B=(3,5, -4)$ are two points. lf the $XY$-plane, $YZ$-plane divide $AB$ in the ratio $a:b$ and $ p:q$ respectively, then $\dfrac {a}{b}+\dfrac {p}{q}=$
Question 40 :
Arrange the points: $\mathrm{A}(1,2-3), \mathrm{B}(-1,2,-3), \mathrm{C}(-1,-2-3)$ and $\mathrm{D}(1,-2, -3)$ in the increasing order of their octant numbers:<br/>
Question 41 : Find the distance between the points whose position vectors are given as follows<div>$4\hat i+3\hat j-6\hat k, -2\hat i+\hat j-\hat k$</div>
Question 42 :
The ratio in which the join of $(1, -2, 4)$ and $(4, 2, -1)$ divided by the $X-Y$ plane is
Question 43 :
If xy -plane and yz-plane divides the line segment joining A(2,4,5) and B(3,5,-4) in the ratio a:b and p:q respectively then value of $\left( {{a \over b},{p \over q}} \right)$ may be<br/>
Question 44 :
A plane meets the co-ordinate axes in A,B,C such that the centroid of the triangle ABC is the point $(p,q,r)$. The equation of the plane is
Question 45 :
If $\mathrm{A}= (-1,6, 6)$ , $\mathrm{B}=(-4,9, 6)$ , $\displaystyle \mathrm{G}=\frac{1}{3}(-5,22,22)$ and $\mathrm{G}$ is the centroid of the $\Delta \mathrm{A}\mathrm{B}\mathrm{C}$ then the name of the triangle $\mathrm{A}\mathrm{B}\mathrm{C}$ is<br/>
Question 46 :
A cube of side <b>5</b> has one vertex at the point <b>(1,0,-1)</b>, and the three edges from this vertex are, respectively, parallel to the negative x and y axes and positive z-axis. Find the coordinates of the other vertices of the cube.
Question 47 :
If the plane a $2x-3y+5_{Z}-2=0$ divides the line segment joining $(1, 2, 3)$ and $(2, 1, k)$ in the ratio $9 : 11$, then $k$ is<br/>
Question 48 :
The ordinate of the point which divides the lines joining the origin and the point $(1,2) $ externally in the ratio of $3:2$ is
Question 49 :
Assertion(A): If centroid and circumcentre of a triangle are known its orthocentre can be found.<br/>Reason (R) : Centriod, orthocentre and circumcentre of a triangle are collinear<br/>
Question 50 :
In the tetrahedron $ABCD,\ A= (1, 2, -3)$ and $G(-3,4, 5)$ is the centroid of the tetrahedron. If $P$ is the centroid of the $\Delta BCD$, then $AP=$<br>
Question 51 :
$A$ point $C$ with position vector $\frac{{3a + 4b - 5c}}{3}$ (where a,b and c are non co-planar vectors) divides the line joining $A$ and $B$ in the ratio $2:1$. If the position vector of $A$ is $a-2b+3c$, then the position vector of $B$ is
Question 52 :
If $P(x,y,z)$ is a point on the line segment joining $A (2,2,4)$ and $B(3,5,6)$ such that projection of $\vec{OP}$ on axes are $\displaystyle \frac{13}{5},\frac{19}{5},\frac{26}{5}$ respectively, then P divide AB in the ratio
Question 53 :
The distance from the origin to the centroid of the tetrahedron formed by the points $(0, 0, 0), (3, 0, 0), (0, 4, 0), (0, 0, 5)$ is <br/>
Question 54 :
A plane intersects the co ordinate axes at $A, B, C$. If $O= (0, 0, 0)$ and $(1, 1, 1)$ is the centroid of the tetrahedron $O ABC$, then the sum of the reciprocals of the intercepts of the plane<br/>
Question 55 :
If the $zx$-plane divides the line segment joining $(1, -1, 5)$ and $(2, 3, 4)$ in the ratio $p : 1$, then $p + 1=$<br/>
Question 57 :
The ratio of $yz$-plane divide the line joining the points $A(3, 1,- 5), B(1, 4, -6)$ is
Question 58 :
The coordinates of a point which divides the line joining the points $P(2,3,1)$ and $Q(5,0,4)$ in the ratio $1:2$ are<br/>
Question 59 :
The ratio in which the plane $\displaystyle \bar {r} .(\bar {i} - 2 \bar {j} + 3 \bar {k}) = 17$ divides the line joining the points $\displaystyle -2 \bar {i} + 4 \bar {j} + 7 \bar {k} $ and $\displaystyle 3 \bar {i} - 5 \bar {j} + 8 \bar {k}$ is
Question 60 :
The plane $ax+by+cz+(-3)=0$ meet the co-ordinate axes in A,B,C. Then centroid<br>of the triangle is<br>
Question 61 :
In the $\Delta $ ABC , A $=$ (1, 3, -2) and G (-1, 4, 2) is the centroid of the triangle. If D is the mid point of BC then AD $=$<br>
Question 62 :
$XOZ$ plane divides the join of $(2,3,1)$ and $(6,7,1)$ in the ratio<br/>
Question 63 :
Three vertices of a tetrahedron are $(0,0,0),(6,-5,-1)$and $(-4,1,3)$. If the centroid of the tetrahedron be$(1,-2,5)$ then the fourth vertex is<br>
Question 65 :
The foot of the perpendicular from the point $A(7, 14, 5)$ to the plane $2x+4y-z=2$ is?
Question 66 :
$A = (1, -2, 3)$ , $B =$ (2, 1, 3), $C =$ (4, 2, 1) and $G= (-1,3, 5)$ is the centroid of the tetrahedron $ABCD$. Then the fourth coordinate is <br/>
Question 67 :
If $P(x,y,z)$ is a point on the line segment joining $Q(2,2,4)$ and $R(3,5,6)$ such that the projection of $\overrightarrow { OP } $ on the axes are $\displaystyle \frac { 13 }{ 5 } ,\frac { 19 }{ 5 } ,\frac { 26 }{ 5 } $ respectively, then $P$ divides $QR$ in ratio
Question 68 :
The plane $XOZ$ divides the join of $(1,-1,5)$ and $(2,3,4)$ in the ratio $\lambda :1$, then $\lambda$ is <br/>
Question 69 :
$D(2, 1, 0), E(2, 0, 0), F(0, 1, 0)$ are mid point of the sides $BC, CA, AB$ of $\Delta$ $ABC$ respectively, The the centroid of $\Delta$ABC is
Question 70 :
The chord of contact of tangents from a point $P$ to a circle passes through $q$<i>. </i>If $l_1$ and $l_2$ are the lengths of the tangents from $P$ and $Q$ to the circle, then $PQ$ is equal to
Question 71 :
A tetrahedron is a three dimensional figure bounded by non coplanar triangular planes. So, a tetrahedron has four non-coplanar points as its vertices. Suppose a tetrehedron has points A,B,C,D as its vertices which have coordinates $(x1, y1, z_{1}) (x_{2}, y_{2}, z_{2})$ , $(x_{3}, y_{3}, z_{3})$ and $(x_{4}, y_{4}, z_{4})$, respectively in a rectangular three dimensional space. Then, the coordinates of its centroid are $[\dfrac{x_{1}+x_{2}+x_{3}+x_{4}}{4},\dfrac{y_{1}+y_{2}+y_{3}+y_{4}}{4},\dfrac{z_{1}+z_{2}+z_{3}+z_{4}}{4}]$.<br/>Let a tetrahedron have 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 question. The coordinate of the fourth vertex of the tetrahedron is:<br/>
Question 73 :
In the triangle with vertices $A(1, -1, 2), B(5, -6, 2)$ and $C(1,3,-1)$ find the altitude $n=|BD|$.<br/>
Question 74 :
If the vertices of a triangle are $(-1,6,-4),(2,1,1)$ and $(5,-1,0)$ then the centroid of the triangle is<br>
Question 75 :
There are three points with position vectors $ -2a+3b+5c, a+2b+3c $ and$ 7a-c$. What is the relation between the three points?
Question 76 :
A triangle $ABC$ is placed so that the midpoints of its sides are on the $x, y$ and $z$ axes respectively. Lengths of the intercepts made by the plane containing the triangle on these axes are respectively $\displaystyle \alpha ,\beta ,\gamma$, then the coordinates of the centroid of the triangle $ABC$ are
Question 77 :
If $A(2, 2, -3), B(5, 6, 9), C(2, 7, 9)$ be the vertices of a triangle. The internal bisector of the angle $A$ meets $BC$ at the point $D$, then find the coordinates of $D$.
Question 78 :
Find the ratio in which $2x + 3y + 5z = 1$ divides the line joining the points $(1,\ 0,\ -3)$ and $(1,\ -5,\ 7)$.
Question 79 :
Four vertices of a tetrahedron are $(0,0,0),(4,0,0),(0,-8,0)$ and $(0,0,12)$,Its centroid has the coordinates<br>
Question 80 :
The plane $x = 0$ divides the joinning of $( - 2, 3, 4)$ and $(1, - 2, 3)$ in the ratio :
Question 81 :
If $P(x,y,x)$ is a point on the line segment joining $Q(2,2,4)$ and $R(3,5,6)$ such that the projection of $\overline { OP } $ on the axis are $\displaystyle \frac { 13 }{ 5 } ,\frac { 19 }{ 5 } ,\frac { 26 }{ 5 } ,$ respectively, then $P$ divides $QR$ in the ratio
Question 82 :
The plane $\displaystyle ax + by + cz + (-3) = 0$ meet the co-ordinate axes in $A, B, C$. The centroid of the triangle is
Question 83 :
If $(0, b, 0)$ is the centroid of the triangle formed by the points $(4, 2, -3)$ , $({a}, -5, 1)$ and $(2, -6, 2)$ . If $a ,b$ are the roots of the quadratic equation $ x^2+px+q = 0 $, then $p,q$ are <br/>
Question 85 :
The plane $ax+by+cz+d=0$ divides the line joining the points $\left( { x }_{ 1 },{ y }_{ 1 },{ z }_{ 1 } \right) $ and $\left( { x }_{ 2 },{ y }_{ 2 },{ z }_{ 2 } \right) $ in the ratio
Question 86 :
If the plane $7x + 11y+ 13z= 3003$ meets the axes in $A, B, C$, then the centroid of $\Delta ABC$ is
Question 87 :
Point A is $\displaystyle a+2b,$ and a divides AB in the ratio 2 : 3. The position vector of B is
Question 88 :
The coordinates of the point where the line segment joining $A(5,1,6)$ and $B (3,4,1)$ crosses the yz plane are
