[" 46.The roots of the cubic equation "]...

[" 46.The roots of the cubic equation "],[(z+alpha beta)^(3)=alpha^(3),alpha!=0" represent the vertices of "],[" a triangle of sides of length "],[[" 1) "(1)/(sqrt(3))| alpha beta|," 2) "sqrt(3)| alpha|," 3) "sqrt(3)| beta|," 4) "(1)/(sqrt(3))| alpha|]]

Similar Questions

Explore conceptually related problems

The roots of the cubic equation (z + alpha beta)^(3) = alpha^(3) , alpha ne 0 represent the vertices of a triangle of sides of length

The roots of the cubic equation (z+alpha beta)^^3=alpha^(^^)3,alpha is not equal to 0, represent the vertices of a triangle of sides of length

The roots of the cubic equation (z + alpha beta )^3 = alpha ^3 , alpha is not equal to 0, represent the vertices of a triangle of sides of length

The roots of the cubic equation (z+ab)^(3)=a^(3),a!=0 represents the vertices of an equilateral triangle of sides of length

The roots of the cubic equation (z+ab)^3=a^3,a !=0 represents the vertices of an equilateral triangle of sides of length

If alpha,beta are roots of the equation 3x^(2)+4x-5=0 , then (alpha)/(beta) and (beta)/(alpha) are roots of the equation

Find the lengths of the sides of the triangle whose vertices are given by the equation (z+alpha beta)^3=alpha^3

The lengths of the sides of a triangle are alpha-beta, alpha+beta and sqrt(3alpha^2+beta^2), (alpha>beta>0) . Its largest angle is

The lengths of the sides of a triangle are alpha-beta,alpha+beta and sqrt(3 alpha^(2)+beta^(2)),(alpha>beta>0) Its largest angle is