Question 1 :
Identify the pattern with which each number in the list of numbers $12,23,34,45,56,...$ is formed.
Question 2 :
<p>Identify which of the sequences below is a not a progression.<br></p>
Question 3 :
If $1^{3} + 2^{3} + .... + 10^{3} = 3025$, then the value of $2^{3} + 4^{3} + ..... + 20^{3}$ is
Question 8 :
Which of the following is perpendicular to the line x/3 + y/4 = 1?
Question 9 :
The slope of the line passing through the points $A(-2, 1)$ and $B(0, 3)$ is:<br/>
Question 10 :
If the slope of the line passing through the points $(2, \sin\theta)$ and $(1,\cos\theta)$ is $0,$ then the general solution of $\theta$, is
Question 11 :
Find the slope of the line passing through the following pairs:(-1, 3) and (3, 5)
Question 12 :
AOBC is a rectangle whose three vertices are A (0, 3) O (O, 0) and B (5, 0). The length of its diagonal is 
Question 13 :
If the vertices of a triangle are $(1,2),(4,-6)$ and $(3,5)$, then its area is
Question 14 :
The number of complex numbers $z$ such that $|z+1|=|z-3|$ equals :-
Question 16 :
If $\cfrac { { \left( p+i \right) }^{ 2 } }{ 2p-i } =\mu +i\lambda $, then $\mu^2+\lambda^2$ is equal to
Question 17 :
The real part of ${ \left( 1-\cos { \theta } +i\sin { \theta } \right) }^{ -1 }$ is
Question 19 :
$a+ib = (1 + i\sqrt{3})^{300}$ then $a = $ _____ and $b=$ ______