The locus represented by the equation ab...

The locus represented by the equation `abs(z-1)=abs(z-i)` is

Topper's Solved these Questions

BINOMIAL THEOREM
CENGAGE PUBLICATION|Exercise All Questions|363 Videos
CONIC SECTIONS
CENGAGE PUBLICATION|Exercise All Questions|1167 Videos

Similar Questions

Explore conceptually related problems

The complex numbers z is simultaneously satisfy the equations abs(z-12)/abs(z-8i)=5/3,abs(z-4)/abs(z-8)=1 then the Re(z) is

The system of equations abs(z+1-i)=sqrt2 ,absz=3 has

The solution of the equation absz-z=1+2i is

If |z-1-i|=1 , then the locus of a point represented by the complex number 5(z-i)-6 is

If P represents z=x+iy in the argand plane and abs(z+1-i)=abs(z+i-1) then locus of P is a/an

The number of complex no z such that abs(z-1)=abs(z-3)=abs(z-i) is

If absz=min{abs(z-1), abs(z+1)} , then

z_1 and z_2 are two different complex nos where z_1ne0 z_2ne0 prove that (abs(z_1)+abs(z_2))abs(z_1/abs(z_1)+(z_2)/(abs(z_2))) le 2(abs(z_1)+abs(z_2))

If z_1 and z_2 be two complex numbers such that abs(z_1+z_2)=abs(z_1) +abs(z_2) then the value of argz_1-argz_2 is equal to

Let A,B,C b ethree sets of complex numbers as defined A={z:Im zge 1} B={z:abs(z-2-i)=3} C={z:Re((1-i)z)=sqrt2} Let z be any point in AcapBcapC then abs(z+1-i)^2+abs(z-5-i)^2 lies between

CENGAGE PUBLICATION-COMPLEX NUMBERS AND QUADRATIC EQUATIONS-All Questions

If z + 1/z = 2costheta, prove that |(z^(2n)-1)//(z^(2n)+1)|=|tannthet...
Text Solution
|
If alpha,beta are the roots of the quadratic equation a x^2+b x+c=0 , ...
Text Solution
|
The locus represented by the equation abs(z-1)=abs(z-i) is
Text Solution
|
Prove that the roots of the equation x^4-2x^2+4=0 forms a rectangle.
Text Solution
|
If a ,b ,c are non-zero real numbers, then find the minimum value of t...
Text Solution
|
If z1a n dz2 are two nonzero complex numbers such that =|z1+z2|=|z1|+|...
Text Solution
|
If diagonals of a parallelogram bisect each other, prove that its a rh...
Text Solution
|
If a ,b ,c and u ,v ,w are the complex numbers representing the vertic...
Text Solution
|
If z=costheta+isintheta is a root of the equation a0z^n+a2z^(n-2)++a(n...
Text Solution
|
If omega is an imaginary cube root of unity, then (1+omega-omega^2)^7 ...
Text Solution
|
If z=x+iy is a complex number with x, y in Q and |z| = 1, then show ...
Text Solution
|
Referred to the principal axes as the axes of co ordinates find the eq...
Text Solution
|
Find the area bounded by |arg z|lt=pi//4 and |z-1|<|z-3|dot
Text Solution
|
Find sum(k=1)^6 (sin,(2pik)/7 -icos, (2pik)/7)=?
Text Solution
|
If the equation a x^2+b x+c=0(a >0) has two real roots alphaa n db...
Text Solution
|
If fig shows the graph of f(x)=a x^2+b x+c ,t h e n Fig a. c<...
Text Solution
|
If |[6i,-3i,1],[ 4, 3i,-1],[ 20, 3,i]|=x+i y , then a.x=3,y=1 b. x=1,y...
Text Solution
|
Let z=x+i y be a complex number, where xa n dy are real numbers. Let...
Text Solution
|
If z=((sqrt(3))/2+i/2)^5+((sqrt(3))/2-i/2)^5 , then prove that I m(z)=...
Text Solution
|
The value of sum(n=1)^(13) (i^n+i^(n+1)), where i =sqrt(-1) equals ...
Text Solution
|