Question 1 :
A vertical line $l$ passes through the point $(2,3)$. A horizontal line $m$ passes through the point $(-1,6)$. Where do lines $l$ and $m$ intersect?
Question 2 :
The distance of the point $A(a, b, c)$ from the x-axis is
Question 3 :
$a, b, c$ are in A.P. and the points $A(a, 1), B(b, 2)$ and $C(c, 3)$ are such that $(OA)^{2}, (OB)^{2}$ and $(OC)^{2}$ are also in A.P; $O$ being the origin, then<br/>
Question 4 :
If the vertices of a triangle are $(1,2),(4,-6)$ and $(3,5)$, then its area is
Question 5 :
Area of the triangle formed by the pair of tangents drawn from(-1, 4) to $y^2 = 16x$ and the chord of contact of (-1, 4) is
Question 6 :
The points $(k, 3), (2, -4)$ and $(-k + 1, -2)$ are collinear, find $k$.
Question 7 :
The vertices of a triangle are $A(3,4)$, $B(7,2)$ and $C(-2, -5)$. Find the length of the median through the vertex A.<br/>
Question 8 :
Find the slope of the line that passes through the points $(-1,0)$ and $(3,8)$
Question 9 :
The line which is parallel to x-axis and crossed the curve $\displaystyle y=\sqrt { x } $ at an angle $\displaystyle { 45 }^{ \circ }$, is<br>
Question 10 :
If the line $2x+y=k$ passes through the point which divides the line segment joining the points $(1, 1)$ and $(2, 4)$ in the ratio $3 : 2$ ,then $k$ equals: