×
Detail Form
We will send your result on your email id and phone no. please fill detail
1.
Let 
be the roots of the equation 
be the roots of 
. If 
are in GP, then integral values of 
are respectively
be the roots of the equation be the roots of . If are in GP, then integral values of are respectively
2.
If the complex numbers 
satisfying 
, then triangle is
satisfying , then triangle is
3.
If 
is a complex cube root of unity, then 
is equal to
is a complex cube root of unity, then is equal to
4.
The locus of 
satisying the inequality 
where 
, is
satisying the inequality where , is
5.
If the roots of 
are in A.P., then their common difference is
are in A.P., then their common difference is
6.
The solution set of the inequation 
is
7.
The value of sum 
equals
equals
8.
If 
and 
are imaginary cube roots of unity, then 
is equal to
and are imaginary cube roots of unity, then is equal to
9.
If 
are all positive and in H.P., then the roots of 
are
are all positive and in H.P., then the roots of are
10.
For all complex numbers 
satisfying 
and 
, the minimum value of 
is
satisfying and , the minimum value of is