Reflexion of the point `(alpha, beta, gamma)` in XY plane is

Reflection of the point (alpha, beta, gamma) in XY plane is

Distance of the point (alpha, beta, gamma) from the y-axis is

The point (alpha, beta, gamma) lies on the plane x+y+z = 2. Let, vec a = alpha i + beta j +gamma k and k xx (k xx vec a) = vec 0 then gamma =

If alpha+beta+gamma=2 pi, then

If 1 , omega , omega^(2) are cube roots of unity , then for alpha , beta , gamma , delta in R , (alpha+betaomega+gammaomega^(2)+deltaomega^(3))/(beta+alphaomega^(2)+gammaomega+deltaomega^(2)) equals :

The equation of the plane which makes with coordinate axes a triangle with its centroid (alpha, beta, gamma) is

Let alpha,beta,gamma be the roots of (x-a) (x-b) (x-c) = d, d != 0 , then the roots of the equation (x-alpha)(x-beta)(x-gamma) + d =0 are :

Let alpha , beta , gamma parametric angles of 3 points P,Q and R respectively lying on x^(2)+y^(2)=1 . If the length of chords AP, AQ and AR are in GP where A is (-1,0), then [Given , alpha , beta ,gamma in (0,2pi)] .

A plane meets the coordinate axes in A, B, C and (alpha,beta,gamma) is the centroid of the triangle ABC. then the equation of the plane is :

If 1, omega, omega^(2) are the three cube roots of unity and alpha, beta, gamma are the cube roots of p, plt0 , then for any x, y, z the expression (x alpha+y beta+z gamma)/(x beta+y gamma+z alpha)=