Find Direction Cosines of Axis and Semi Vertical Angle of Right Circular Cone I Kamaldeep NIjjar скачать в хорошем качестве

Find Direction Cosines of Axis and Semi Vertical Angle of Right Circular Cone I Kamaldeep NIjjar

After Watching this lecture you will be able to find the direction cosines of the axis of the right circular cone and semi vertical angle of the cone with the help of given conditions. Chapters 0:00 Introduction 0:19 Art 11 Find Equation of cone vertex is any point and axis is any line 3:55 Question 1 Related to above Article 9:30 Question 2 find the direction cosines of the axis of the right circular cone and semi vertical angle of the cone 22:09 Question 2 Important than the previous one 27:09 Base for the next part solid geometry bsc 1st year chapter 1 solid geometry bsc 1st year chapter 6 solid geometry engineering mathematics solid geometry bsc 1st year chapter 2 solid geometry bsc 1st year solid geometry for intermediate solid geometry bsc 1st year chapter 13 solid geometry bsc 1st year chapter 9 solid geometry bsc 1st year chapter 1 exercise 1.1 solid geometry drawing solid geometry bsc 1st year important questions solid geometry bsc 1st year chapter 1 exercise 1.2 solid geometry important questions solid geometry bsc 1st year chapter Find Direction Cosines of Axis and Semi Vertical Angle of Right Circular 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   #kamaldeepnijjar #solidgeometry #cone #3dgeometrty #highermathematics #engineeringmathematics #mathsequence 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.