How to find equation of right circular cone I Solid Geometry I Cone I Kamaldeep Nijjar скачать в хорошем качестве

How to find equation of right circular cone I Solid Geometry I Cone I Kamaldeep Nijjar

After watching this lecture you will be able to form an equation of right circular cone under the following conditions with different and easy approach :- Vertex Origin Axis of cone x axis and Vertex origin Axis of cone y axis and Vertex origin and axis is along any line whose direction ratios or direction cosines given to us . Analytical solid Geometry Solid Geometry, Equations of Right Circular Cone, Chapter: 0:00 Introduction 0:24 Question 1 Find equation of cone vertex origin, the axis along x axis and semi vertical angle alpha 5:27 Question 2 Find equation of cone vertex origin, the axis along Y axis and semi vertical angle alpha 6:42 Quick Revision of all equations 8:57 Art-9 Show that the equation of the right circular cone whose vertex is origin, axis the line x/l=y/m=z/n and semi vertical angle alpha 14:15 Art-10 the equation of the right circular cone whose vertex is any point , axis has direction cosines l, m, n and semi vertical angle alpha 21:49 Overview of the whole lecture How to find equation of right circular cone I Solid Geometry I Cone I Kamaldeep Nijjar Click on this to get exclusive support from myside.. Always here for my meambers. By being member of my channel you can suggest me for new upcoming videos.    / @kamaldeepnijjar   #solidgeometry #kamaldeepnijjar #cone #equationofcone SECTION–A Cylinder as surface generated by a line moving parallel to a fixed line and through fixed curve. Different kinds of cylinders such as right circular, elliptic, hyperbolic and parabolic in standard forms SECTION–B Cone with a vertex at the origin as the graph of homogeneous equation of second degree in x, y, z. Cone as a surface generated by a line passing through a fixed curve and fixed point outside the plane of the curve, right circular and elliptic cones. SECTION–C Equation of surface of revolution obtained by rotating the curve about the z-axis in the form of . Equation of ellipsoid, hyperboloid and paraboloid in standard forms. SECTION–D Surfaces represented by general equation of 2 nd degree S = 0. Tangent lines, tangent planes and Normal plane.