The tangents to `x^2+y^2=r^2` having inclinations `theta_1,theta_2` intersect at P. If `tantheta_1 - tantheta_2=1` locus of P is

Answer the following:Tangents to the circle x^2+y^2=a^2 with inclinations, theta_1 and theta_2 intersect in P.Find the locus of point P such that tantheta_1+tantheta_2=0

Tangents are drawn through a point P to the ellipse 4x^2+5y^2=20 having inclinations theta_1 and theta_2 such that tantheta_1+tantheta_2=2 . Find the equation of the locus of P.

Answer the following:Tangents to the circle x^2+y^2=a^2 with inclinations, theta_1 and theta_2 intersect in P.Find the locus of point P such that cottheta_1+cottheta_2=5

Answer the following:Tangents to the circle x^2+y^2=a^2 with inclinations, theta_1 and theta_2 intersect in P.Find the locus of point P such that cottheta_1.cottheta_2=c

sin2 theta tantheta+1= sin 2theta + tantheta

If tantheta+tan2theta+tantheta. tan2theta=1 then theta =

If tantheta+1/(tantheta)=2 , find the value of tan^2theta+1/(tan^2theta)

Tangents to x^(2) //a^(2) -y^(2)//b^(2) =1 make angles theta_1 ,theta _2 with transverse axis . The equation of the locus of their intersection when cot theta _1 +cot theta _2 = k is

Two tangents to the hyperbola x^2/a^2-y^2/b^2=1 make angles theta_1,theta_2 , with the transverse axis. Find the locus of their point of intersection if tantheta_1+tantheta_2=k .

If tantheta_1=kcottheta_2 then (cos(theta_1+theta_2))/(cos(theta_1-theta_2))=