Question 1 :
The coordinates of a point whose abscissa is 5 and which lies on the x-axis is <br/>
Question 5 :
State the following statement is True or False<br/>The coordinates of the origin are $(0, 0)$.
Question 6 :
The triangle formed by the points (3,5), (6,9), and (2,6) is
Question 7 :
$A$ is a point on $X$-axis at a distance $4$ units from $Y$-axis to its left. The co-ordinates of $A$ are:
Question 8 :
The circumcenter of the triangle with vertices (9,3),(7,-1) and (-1,3) is (4,3) Circumradius is
Question 14 :
If $Q(x, y)$ lies in the fourth quadrant which of the following is correct?
Question 17 :
Write whether the following statements are True or False ? Justify your answer.<br>Point $\left(3,0\right)$ lies in the first quadrant.
Question 20 :
Signs of abscissa and ordinate of a point in the $III$ quadrant, respectively are
Question 23 :
If a person moves either $1$ unit in the direction of positive $x$-axis or $1$ unit in the direction of positive $y$-axis per step, then the number of steps he requires to reach $(10,12)$ starting from the origin $(0,0)$ is _____________
Question 24 :
On which quadrant does $P$ lie if its ordinate is $5$ and abscissa is $-3$
Question 25 :
A Cartesian plane consists of two mutually _____ lines intersecting at their zeros.  
Question 26 :
If the point $P$ lies on the line $y = 7$ and has its abscissa equal to $-2$, then its coordinates are ______
Question 28 :
Which of the given points lie on $y$-axis?<br/>$A (1, 1), B (1, 0), C (0, 1), D (0, 0), E (0, 1), F ( 1, 0), G (0, 5), H ( 7, 0), I (3, 3)$<br/>
Question 29 :
Find the image of $(-4, -8)$ with respect to the Y-axis
Question 31 :
If the coordinates of the two points are $P \left(-2,3\right)$ and $Q\left(-3,5\right)$, then $\left(abscissa \, of\, P \right) - \left(abscissa \, of\, Q\right)$ is<br><br>
Question 32 :
Which of the following points lie on the negative side of $x -$ axis ?<br>
Question 34 :
If $P \left(-1,1\right), Q \left(3,-4\right), R \left(1,-1\right), S \left(-2,-3\right)$ and $T \left(-4,4\right)$ are plotted on the graph paper, then the points in the fourth quadrant are
Question 36 :
The locus of a point whose $x$-coordinates is always $5$ is the equation ______
Question 37 :
The coordinates of a point lies on $y$-axis and is at a distance of $6$ units below $x$-axis is ______
Question 39 :
The point which lies on $Y$-axis and at a distance of $2$ units in negative direction of $Y$-axis is _____
Question 42 :
From (1,4) you travel $ 5\sqrt{2}$ units by making $135^0$ angles with positive x-axis (anticlockwise) and then 4 units by making $120^0$ angle with positive x-axis (clockwise) to reach Q. Find co-ordinates of point Q.
Question 43 :
The coordinates of a point, which lies on $x$-axis and is at a distance of $7$ units to the right of the origin is ____
Question 46 :
State whether True or False. A point whose y-coordinate is zero and x-coordinate is 5 will lie on the y-axis.<br/>
Question 51 :
The points (1, -1), $\displaystyle \left ( -\frac{1}{2},\frac{1}{2} \right )$ and (1, 2) are the vertices of an isosceles triangleSay yes or no.
Question 52 :
If the coordinates of vertices of atriangle is always rational then the triangle cannot be
Question 53 :
In which quadrant or on which axis each of the following points lie?<br>$(- 3, 5), (4, -1), (2, 0), (2, 2), ( -3, -6)$<br><br>
Question 54 :
Sate true or falseLine joining them is parallel to Y axis<br/>(i) $(4, 2)$<br/>(ii) $(4, -5)$<br/>(iii) $(4, 0)$<br/>(iv) $(4, -2)$<br/>
Question 55 :
The abscissa of a point on the curve $xy=(a+x)^{2}$, the normal cuts off numerically equal intercepts from the coordinate axes, is
Question 56 :
The points $A(2a ,4a) , B(2a,6a)$ and$C(2a + \sqrt 3 a,5a)$ (when a>0) are vertices of
Question 57 :
Points $(3, - 1)$ and $(6, 1)$ lie on the line represented by the equation $px\, +\, qy\, =\, 9,$ find the values of $p$ and $q$.
Question 58 :
Let $A(1,1,0), B(1,2,1)$ and $C(-2,2,-1)$ be three points then equation of plane is
Question 59 :
A line has the equation $x =-2y +z$. If $(3, 2)$ is a point on the line, what is $z$?
Question 60 :
Which of the following is true for the points $X$ and $Y$ if the co-ordinates of the mid-points $P$ of $\overline {XY}$ are $(-2, 3)$?
Question 62 :
$C$ is a point on the line segment joining the points $A(2,-3,4)$ and $B(8,0,10)$. If the value of $y$-coordinate of $C$ is $-2$, then the $z-$coordinate of $C$ is
Question 63 :
If a point $P$ has coordinates $(3,4)$ in a coordinate system $X'OX\leftrightarrow Y'OY$, and if $O$ has coordinates $(4,3)$ in another system ${X}_{1}'{O}_{1}{X}_{1}\leftrightarrow {Y}_{1}'{O}_{1}{Y}_{1}$ with $X'OX\parallel {X}_{1}'{O}_{1}{X}_{1}$, then the coordinates of $P$ in the new system ${X}_{1}'{O}_{1}{X}_{1}\leftrightarrow {Y}_{1}'{O}_{1}{Y}_{1}$ is ________________
Question 64 :
Points $(6, 8), (3, 7), (-2, -2)$ and $(1, -1)$ are joined to form a quadrilateral. What will be the structure of the quadrilateral?
Question 66 :
If the distance between the points $\left( {a\,\cos {{48}^ \circ },0} \right)$ and $\left( {\,0,a\,\cos {{12}^ \circ }} \right)$ is d,then ${d^2} - {a^2} = $
Question 67 :
Find the number of points of X-axis which are at a distance 'c' units $(c < 3)$ from $(2, 3)$.
Question 68 :
If ${x_1},{x_2},{x_3}$ as well as ${y_1},{y_2},{y_3}$ are in <b>G.P. </b> with same common ratio, then the points <b></b>$P\left( {{x_1},{y_1}} \right)$, $Q\left( {{x_2},{y_2}} \right)$ and $R\left( {{x_3},{y_3}} \right)$ 
Question 70 :
Coordinates of $P$ and $Q$ are $(4, - 3)$ and $(- 1, 7)$. The abscissa of a point $R$ on the line segment $PQ$, such that $\displaystyle \frac { PR }{ PQ } =\frac { 3 }{ 5 } $ is :
Question 71 :
Let a, b, c and d be non-zero numbers. If the point of intersection of the lines $4ax+2ay+c=0$and $5bx+2by+d=0$lies in the fourth quadrant and is equidistant from the two axes then
Question 72 :
If points $( - 7,5 ) \text { and } \left( \alpha , \alpha ^ { 2 } \right)$ lie on the opposite sides of the line $5 x - 6 y - 1 = 0$ then
Question 73 :
If the points $( 2,0 ) , ( 0,1 ) , ( 4,5 ) \text { and } ( 0 , c )$ are concyclic then the value of $c$ is
Question 74 :
If the points $(k, 2 - 2k), (1 - k, 2k)$ and $(-k -4, 6 - 2k)$ be collinear the possible value(s) of $k$ is/are
Question 75 :
If  each of the vertices of a triangle has integral co-ordinates then the triangle may be 
Question 76 :
The lines $x + y = | a |$ and $a x - y = 1$ intersect each other in the first quadrant. Then the set of all possible values of $a$ in the interval are
Question 77 :
State True or False.The point $(-x, -y)$ lies in the first quadrant where x < 0, y < 0.
Question 78 :
State true or falseThe abscissa of two points is $0$.Line joining them is Y axis
Question 79 :
The abscissa of two points A and B are the roots of the equation ${x^2} + 2ax - {b^2}$ and their ordinates are the root of the equation ${x^2} + 2px - {q^2}=0$. the equation of the circle with AB as diameter is 
Question 80 :
If the coordinates of the extermities of diagonal of a square are $(2,-1)$ and $(6,2)$, then the coordinates of extremities of other diagonal are
