The three angular points of a triangle a...

The three angular points of a triangle are given by `Z=alpha, Z=beta,Z=gamma,w h e r ealpha,beta,gamma` are complex numbers, then prove that the perpendicular from the angular point `Z=alpha` to the opposite side is given by the equation `R e((Z-alpha)/(beta-gamma))=0`

Similar Questions

Explore conceptually related problems

If z!=0 is a complex number, then prove that R e(z)=0 rArr Im(z^2)=0.

For any complex number z prove that |R e(z)|+|I m(z)|<=sqrt(2)|z|

Let z_1 and z_2 q, be two complex numbers with alpha and beta as their principal arguments such that alpha+beta then principal arg(z_1z_2) is given by:

The reflection of the point (alpha,beta,gamma) in the xy plane is

alpha, beta, gamma are real number satisfying alpha+beta+gamma=pi . The minimum value of the given expression sin alpha+sin beta+sin gamma is

If alpha, beta, gamma are the cube roots of a negative number p, then for any three real numbers x,y,z the value of (x alpha+y beta+ z gamma)/(x beta +y gamma+z alpha) is

If alpha,beta,gamma, in (0,pi/2) , then prove that (s i(alpha+beta+gamma))/(sinalpha+sinbeta+singamma)<1

Given alpha+beta-gamma=pi, prove that sin^2alpha+sin^2beta-sin^2gamma=2sinalphasinbetacosgammadot

If alpha , beta , gamma are the roots of the equations x^3+px^2+qx+r=0 find the value of sum1/alpha

If the distances of the vertices of a triangle =ABC from the points of contacts of the incercle with sides are alpha,betaa n dgamma then prove that r^2=(alphabetagamma)/(alpha+beta+gamma)

The three angular points of a triangle are given by `Z=alpha, Z=beta,Z=gamma,w h e r ealpha,beta,gamma` are complex numbers, then prove that the perpendicular from the angular point `Z=alpha` to the opposite side is given by the equation `R e((Z-alpha)/(beta-gamma))=0`

Similar Questions

Recommended Questions