HR
Harish Chandra Rajpoot
PhD Scholar, IIT Bombay (Mathematical sciences; Engineering; Education; Physical sciences)
India
Publications
- https://iitbombay.academia.edu/HarishChandraRajpoot
- https://www.academia.edu/10436842/HCRs_Rank_Formula_1_to_calculate_rank_of_any_linear_permutation_all_the_articles_are_permuted_together_without_any_replacement_
- https://www.academia.edu/9454711/HCRs_Rank_Formula_2_Rank_of_any_linear_permutation_for_repetition_replacement_of_articles_
- https://www.academia.edu/40618510/Mathematical_Analysis_and_Modeling_of_Pyramidal_Flat_Containers_with_Regular_Polygonal_Base_Right_Pyramids_and_Polyhedrons_Application_of_HCRs_Theorem_and_Corollary_
- https://www.academia.edu/11805176/HCRs_formula_for_n_gonal_trapezohedron_deltohedron_with_congruent_right_kite_faces_Mathematical_analysis_of_n_gonal_trapezohedron_having_2n_congruent_right_kite_faces_4n_edges_and_2n_2_vertices_lying_on_a_spherical_surface_
- https://www.academia.edu/32874396/Mathematical_analysis_of_Disphenoid_isosceles_tetrahedron_Derivation_of_volume_surface_area_vertical_height_in_radius_circum_radius_coordinates_of_four_vertices_in_center_circum_center_and_centroid_for_optimal_configuration_of_a_disphenoid_in_3D_space_
- https://www.academia.edu/10798008/Mathematical_Analysis_of_Three_Externally_Touching_Circles_Derivations_of_inscribed_and_circumscribed_radii_for_three_externally_touching_circles_
- HCR's Rank or Series Formula
- HCR's Infinite Series
- HCR's Theory of Polygon
- HCR's Theorem
- "HCR's or H. Rajpoot's Formula for Regular Polyhedron"
- HCR's Formula for Regular Spherical Polygons
- Mathematical analysis of 2D packing of circles on bounded and unbounded planes
- Mathematical Analysis of Circum-inscribed Polygons
- Mathematical analysis of regular pentagonal right antiprism
- Mathematical analysis of regular n-gonal right antiprism
- Numerical modeling to predict threshold fluence for material ejection in Laser-Induced forward transfer of metals
- HCR's Theory of Polygon (Solid angle subtended by any polygonal plane at any point in the space)
- HCR's Theorem (Rotation of two co-planar planes about their intersecting edges)
- Mathematical Analysis and Modeling of Pyramidal Flat Containers with Regular Polygonal Base, Right Pyramids and Polyhedrons (Application of HCR's Theorem and Corollary)
- HCR's formula for n-gonal trapezohedron/deltohedron (Mathematical analysis of trapezohedron/deltohedron having 2n congruent right kite faces)
- HCR's Rank or Series Formula (Rank of Linear Permutations without repetition of elements)
- HCR's Infinite Series (Mathematical analysis of frustum of a right circular cone)