Let p be the product of the sines of the angles of a triangle `ABC and q` is the product of the cosines of the angles In this triangle `tan A +tan B+ tan C` is equal to

in triangle ABC,tan A+tan B+tan C=

The product of the sines of the angles of a triangle is p and the product of their cosines is qdot Show that the tangents of the angles are the roots of the equation q x^3-p x^2+(1+q)x-p=0.

The product of the sines of the angles of a triangle is p and the product of their cosines is qdot Show that the tangents of the angles are the roots of the equation q x^3-p x^2+(1+q)x-p=0.

The product of the sines of the angles of a triangle is p and the product of their cosines is qdot Show that the tangents of the angles are the roots of the equation q x^3-p x^2+(1+q)x-p=0.

The product of the sines of the angles of a triangle is p and the product of their cosines is qdot Show that the tangents of the angles are the roots of the equation q x^3-p x^2+(1+q)x-p=0.

The product of the sines of the angles of a triangle is p and the product of their cosines is q. Show that the tangents of the angles are the roots of the equation qx^(3)-px^(2)+(1+q)x-p=0

Given the product p of sines of the angles of a triangle and the prodcut q of their cosines, find the cubic equation whos coefficients are functions of p and q.

Given the product p of sines of the angles of a triangle and the product q of their cosines, find the cubic equation whose coefficients are functions of p and q and whose roots are tangents of the angles of the triangle .

In Delta ABC , tan A + tan B+ tan C=