{"id":84,"date":"2021-09-08T05:08:55","date_gmt":"2021-09-08T05:08:55","guid":{"rendered":"https:\/\/stage-wp.10minuteschool.com\/?p=84"},"modified":"2023-07-03T15:09:13","modified_gmt":"2023-07-03T09:09:13","slug":"dimension-and-s-i-unit","status":"publish","type":"post","link":"https:\/\/10minuteschool.com\/content\/dimension-and-s-i-unit\/","title":{"rendered":"\u0995\u09af\u09bc\u09c7\u0995\u099f\u09bf \u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995 \u09b0\u09be\u09b6\u09bf \u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995, \u09ae\u09be\u09a4\u09cd\u09b0\u09be \u0993 \u098f\u09b8.\u0986\u0987. \u098f\u0995\u0995 | A few natural zodiac relationships, dimensions and SI. Units"},"content":{"rendered":"\r\n
\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n
\u0995\u09cd\u09b0\u09ae\u09bf\u0995<\/strong> \u09a8\u09ae\u09cd\u09ac\u09b0<\/strong><\/td>\r\n\u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995<\/strong> \u09b0\u09be\u09b6\u09bf<\/strong><\/td>\r\n\u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995<\/strong><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be<\/strong><\/td>\r\n\u098f\u09b8<\/strong>.<\/strong> \u0986\u0987<\/strong>. <\/strong>\u098f\u0995\u0995<\/strong><\/td>\r\n<\/tr>\r\n
\u09e7\u0964<\/td>\r\n\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af, \u09aa\u09cd\u09b0\u09b8\u09cd\u09a5, \u0989\u099a\u09cd\u099a\u09a4\u09be, \u09ac\u09cd\u09af\u09be\u09b8\u09be\u09b0\u09cd\u09a7,
\u09b8\u09b0\u09a3, \u09a6\u09c2\u09b0\u09a4\u09cd\u09ac \u0987\u09a4\u09cd\u09af\u09be\u09a6\u09bf (Length,
width, height, radius, displacement, distance etc.)<\/td>\r\n		\u00a0<\/td>\r\n\\text { [L] }<\/span><\/td>\r\n\u09ae\u09bf\u099f\u09be\u09b0 (m)<\/td>\r\n<\/tr>\r\n
\u09e8\u0964<\/td>\r\n\u09ad\u09b0 (mass)<\/td>\r\n\u00a0<\/td>\r\n\\text { [M] }<\/span><\/td>\r\n\u0995\u09bf\u09b2\u09cb\u0997\u09cd\u09b0\u09be\u09ae (kg)<\/td>\r\n<\/tr>\r\n
\u09e9\u0964<\/td>\r\n\u09b8\u09ae\u09af\u09bc (time)<\/td>\r\n\u00a0<\/td>\r\n\\text { [T] }<\/span><\/td>\r\n\u09b8\u09c7\u0995\u09c7\u09a8\u09cd\u09a1 (s)<\/td>\r\n<\/tr>\r\n
\u09ea\u0964<\/td>\r\n\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2 (area)<\/td>\r\n\\text { (\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af) }^{2}<\/span><\/td>\r\n\\left[L^{2}\\right]<\/span><\/td>\r\nm^{2}<\/span><\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<\/figure>\r\n\r\n\r\n\r\n
\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n
\u0995\u09cd\u09b0\u09ae\u09bf\u0995<\/strong> \u09a8\u09ae\u09cd\u09ac\u09b0<\/strong><\/td>\r\n\u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995<\/strong> \u09b0\u09be\u09b6\u09bf<\/strong><\/td>\r\n\u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995<\/strong><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be<\/strong><\/td>\r\n\u098f\u09b8<\/strong>.<\/strong> \u0986\u0987<\/strong>. <\/strong>\u098f\u0995\u0995<\/strong><\/td>\r\n<\/tr>\r\n
\u09eb\u0964<\/td>\r\n\u0986\u09af\u09bc\u09a4\u09a8 (volume)<\/td>\r\n(\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af)^\u09e9<\/span><\/td>\r\n[L^3]<\/span><\/td>\r\nm^3<\/span><\/td>\r\n<\/tr>\r\n
\u09ec\u0964<\/td>\r\n\u0998\u09a8\u09a4\u09cd\u09ac (density)<\/td>\r\n\\frac{\u09ad\u09b0}{\u0986\u09af\u09bc\u09a4\u09a8}<\/span><\/td>\r\n\\left[M L^{-3}\\right]<\/span><\/td>\r\nkgm^{-3}<\/span><\/td>\r\n<\/tr>\r\n
\u09ed\u0964<\/td>\r\n\u0997\u09a4\u09bf\u09ac\u09c7\u0997 (velocity)<\/td>\r\n\\frac{\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac}{\u09b8\u09ae\u09af\u09bc}<\/span><\/td>\r\n\\left[L T^{-1}\\right]<\/span><\/td>\r\n(ms)^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ee\u0964<\/td>\r\n\u09a4\u09cd\u09ac\u09b0\u09a3 (acceleration)<\/td>\r\n\\frac{(\u09ac\u09c7\u0997\u09c7\u09b0 \u09aa\u09b0\u09bf\u09ac\u09b0\u09cd\u09a4\u09a8) }{\u09b8\u09ae\u09af\u09bc }<\/span><\/td>\r\n\\left[L T^{-2}\\right]<\/span><\/td>\r\n(ms)^{-2}<\/span><\/td>\r\n<\/tr>\r\n
\u09ef\u0964<\/td>\r\n\u09ac\u09b2 (force)<\/td>\r\n\u09ad\u09b0\u00d7\u09a4\u09cd\u09ac\u09b0\u09a3 \u00a0<\/td>\r\n\u00a0\\left[M L T^{-2}\\right]<\/span><\/td>\r\n\u09a8\u09bf\u0989\u099f\u09a8 (N)<\/td>\r\n<\/tr>\r\n
\u09e7\u09e6\u0964<\/td>\r\n\u099a\u09be\u09aa (pressure)<\/td>\r\n\\frac {\u09ac\u09b2}{\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2}<\/span><\/td>\r\n\\left[M L^{-1} T^{-2}\\right]<\/span><\/td>\r\n\u09aa\u09cd\u09af\u09be\u09b8\u0995\u09c7\u09b2 (Pa)= Nm^{-3}<\/span><\/td>\r\n<\/tr>\r\n
\u09e7\u09e7\u0964<\/td>\r\n\u0995\u09be\u09b0\u09cd\u09af \u09ac\u09be \u09b6\u0995\u09cd\u09a4\u09bf (work or
energy)<\/td>\r\n		\u09ac\u09b2 \u00d7\u09b8\u09b0\u09a3<\/td>\r\n\\left[M L^{2} T^{-2}\\right]<\/span><\/td>\r\n\u099c\u09c1\u09b2 (J)<\/td>\r\n<\/tr>\r\n
\u09e7\u09e8\u0964<\/td>\r\n\u0995\u09cd\u09b7\u09ae\u09a4\u09be (power)<\/td>\r\n\\frac{\u0995\u09be\u099c}{\u09b8\u09ae\u09af\u09bc}<\/span><\/td>\r\n\\left[M L^{2} T^{-3}\\right]<\/span><\/td>\r\n\u0993\u09af\u09bc\u09be\u099f (W)<\/td>\r\n<\/tr>\r\n
\u09e7\u09e9\u0964<\/td>\r\n\u09ad\u09b0\u09ac\u09c7\u0997 (momentum)<\/td>\r\n\u09ad\u09b0 \u00d7\u0997\u09a4\u09bf\u09ac\u09c7\u0997<\/td>\r\n\\left[M L T^{-1}\\right]<\/span><\/td>\r\nkgms^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e7\u09ea\u0964<\/td>\r\n\u09ac\u09b2\u09c7\u09b0 \u0998\u09be\u09a4 (impulse of force)<\/td>\r\n\u09ac\u09b2 \u00d7\u09b8\u09ae\u09af\u09bc<\/td>\r\n\\left[M L T^{-1}\\right]<\/span><\/td>\r\nkgms^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e7\u09eb\u0964<\/td>\r\n\u09ac\u09b2\u09c7\u09b0 \u09ad\u09cd\u09b0\u09be\u09ae\u0995 (moment of force)<\/td>\r\n\u09ac\u09b2\u00d7\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac \u00a0<\/td>\r\n\\left[M L^{2} T^{-2}\\right]<\/span><\/td>\r\nkgm^2 s^{-2}<\/span><\/td>\r\n<\/tr>\r\n
\u09e7\u09ec\u0964<\/td>\r\n\u099c\u09a1\u09bc\u09a4\u09be\u09b0 \u09ad\u09cd\u09b0\u09be\u09ae\u0995 (moment of inertia)<\/td>\r\n\u09ad\u09b0 \\times \u09a6\u09c2\u09b0\u09a4\u09cd\u09ac^2<\/span><\/td>\r\n\\left[M L^{2}\\right]<\/span><\/td>\r\nkgm^2<\/span><\/td>\r\n<\/tr>\r\n
\u09e7\u09ed\u0964<\/td>\r\n\u099a\u0995\u09cd\u09b0\u0997\u09a4\u09bf\u09b0 \u09ac\u09cd\u09af\u09be\u09b8\u09be\u09b0\u09cd\u09a7 (radius of gyration)<\/td>\r\n(\\frac{\u099c\u09a1\u09bc\u09a4\u09be\u09b0 \u09ad\u09cd\u09b0\u09be\u09ae\u0995}{\u09ad\u09b0})^\\frac{1}{2}<\/span><\/td>\r\n[\\mathrm{L}]<\/span><\/td>\r\nm<\/td>\r\n<\/tr>\r\n
\u09e7\u09ee\u0964<\/td>\r\n\u0995\u09cb\u09a3 (angle)<\/td>\r\n\\frac{\u099a\u09be\u09aa}{\u09ac\u09cd\u09af\u09be\u09b8\u09be\u09b0\u09cd\u09a7}<\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b9\u09c0\u09a8 \u09b0\u09be\u09b6\u09bf<\/td>\r\n\u09b0\u09c7\u09a1\u09bf\u09af\u09bc\u09be\u09a8 (rad)<\/td>\r\n<\/tr>\r\n
\u09e7\u09ef\u0964<\/td>\r\n\u0998\u09a8\u0995\u09cb\u09a3 (solid angle)<\/td>\r\n\\frac{\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2}{(\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac)^2}<\/span>\u00a0<\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b9\u09c0\u09a8 \u09b0\u09be\u09b6\u09bf<\/td>\r\n\u09b8\u09cd\u09a4\u09c7\u09b0\u09c7\u09a6\u09bf\u09af\u09bc\u09be\u09a8 (steradian)<\/td>\r\n<\/tr>\r\n
\u09e8\u09e6\u0964<\/td>\r\n\u09ae\u09b9\u09be\u0995\u09b0\u09cd\u09b7\u09c0\u09af\u09bc \u09aa\u09cd\u09b0\u09be\u09ac\u09b2\u09cd\u09af
(gravitational intensity)<\/td>\r\n		\\frac{\u09ac\u09b2}{\u09ad\u09b0}<\/span><\/td>\r\n\\left[L T^{-2}\\right]<\/span><\/td>\r\nNkg^{-1}<\/span><\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<\/figure>\r\n\r\n\r\n\r\n
\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n
\u0995\u09cd\u09b0\u09ae\u09bf\u0995<\/strong> \u09a8\u09ae\u09cd\u09ac\u09b0<\/strong><\/td>\r\n\u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995<\/strong> \u09b0\u09be\u09b6\u09bf<\/strong><\/td>\r\n\u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995<\/strong><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be<\/strong><\/td>\r\n\u098f\u09b8<\/strong>.<\/strong> \u0986\u0987<\/strong>. <\/strong>\u098f\u0995\u0995<\/strong><\/td>\r\n<\/tr>\r\n
\u09e8\u09e7\u0964<\/td>\r\n\u09ae\u09b9\u09be\u0995\u09b0\u09cd\u09b7\u09c0\u09af\u09bc \u09ac\u09bf\u09ad\u09ac
(gravitational potential)<\/td>\r\n		\\frac{\u0995\u09be\u099c}{\u09ad\u09b0}<\/span><\/td>\r\n\\left[L^{2} T^{-2}\\right]<\/span><\/td>\r\nJkg^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e8\u09e8\u0964<\/td>\r\n\u0995\u09cc\u09a3\u09bf\u0995 \u09ad\u09b0\u09ac\u09c7\u0997
(angular momentum)<\/td>\r\n		\u09b0\u09c8\u0996\u09bf\u0995 \u09ad\u09b0\u09ac\u09c7\u0997 \u00d7\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac<\/td>\r\n\\left[M L^{2} T^{-1}\\right]<\/span><\/td>\r\nkgm^2 s^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e8\u09e9\u0964<\/td>\r\n\u09ac\u09c7\u0997\u09c7\u09b0 \u09a8\u09a4\u09bf\u09ae\u09be\u09a4\u09cd\u09b0\u09be
(velocity gradient)<\/td>\r\n		\\frac{(\u09ac\u09c7\u0997\u09c7\u09b0 \u09aa\u09b0\u09bf\u09ac\u09b0\u09cd\u09a4\u09a8)}{\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac}<\/span><\/td>\r\n\\left[T^{-1}\\right]<\/span><\/td>\r\ns^{-1} <\/span>\u00a0\u00a0<\/td>\r\n<\/tr>\r\n
\u09e8\u09ea\u0964<\/td>\r\n\u09aa\u09c0\u09a1\u09bc\u09a8 (stress)<\/td>\r\n\\frac{\u09ac\u09b2}{\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2}<\/span><\/td>\r\n\\left[M L^{-1} T^{-2}\\right]<\/span><\/td>\r\nkgm^{-1} s^{-2} \u09ac\u09be, Nm^{-2}\u00a0 <\/span><\/td>\r\n<\/tr>\r\n
\u09e8\u09eb\u0964<\/td>\r\n\u09ac\u09bf\u0995\u09c3\u09a4\u09bf (strain)<\/td>\r\n\\frac{\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af\u09c7\u09b0 \u09aa\u09b0\u09bf\u09ac\u09b0\u09cd\u09a4\u09a8}{(\u09aa\u09cd\u09b0\u09be\u09a5\u09ae\u09bf\u0995 \u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af}<\/span><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b9\u09c0\u09a8<\/td>\r\n\u00a0<\/td>\r\n<\/tr>\r\n
\u09e8\u09ec\u0964<\/td>\r\n\u09b8\u09cd\u09a5\u09bf\u09a4\u09bf\u09b8\u09cd\u09a5\u09be\u09aa\u0995 \u0997\u09c1\u09a3\u09be\u0999\u09cd\u0995 (modulus of elasticity)<\/td>\r\n\\frac{\u09aa\u09c0\u09a1\u09bc\u09a8}{\u09ac\u09bf\u0995\u09c3\u09a4\u09bf}<\/span>\u00a0 \u00a0<\/td>\r\n\\left[M L^{-1} T^{-2}\\right]<\/span><\/td>\r\nNm^{-2}<\/span><\/td>\r\n<\/tr>\r\n
\u09e8\u09ed\u0964<\/td>\r\n\u09aa\u09af\u09bc\u09b8\u09a8 \u0985\u09a8\u09c1\u09aa\u09be\u09a4 (Poisson’s ratio)<\/td>\r\n\\frac{\u09aa\u09be\u09b0\u09cd\u09b6\u09cd\u09ac\u09c0\u09af\u09bc \u09ac\u09bf\u0995\u09c3\u09a4\u09bf}{\u0985\u09a8\u09c1\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af \u09ac\u09bf\u0995\u09c3\u09a4\u09bf}<\/span><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b9\u09c0\u09a8<\/td>\r\n\u00a0<\/td>\r\n<\/tr>\r\n
\u09e8\u09ee\u0964<\/td>\r\n\u0985\u09ad\u09bf\u0995\u09b0\u09cd\u09b7\u099c \u09a4\u09cd\u09ac\u09b0\u09a3
(acceleration due to gravity)<\/td>\r\n		\\frac{\u09ae\u09b9\u09be\u0995\u09b0\u09cd\u09b7\u09c0\u09af\u09bc \u09a7\u09cd\u09b0\u09c1\u09ac\u0995 \u00d7\u09aa\u09c3\u09a5\u09bf\u09ac\u09c0\u09b0 \u09ad\u09b0}{(\u09aa\u09c3\u09a5\u09bf\u09ac\u09c0\u09b0 \u09ac\u09cd\u09af\u09be\u09b8\u09be\u09b0\u09cd\u09a7)^2 }<\/span><\/td>\r\n\\left[L T^{-2}\\right]<\/span><\/td>\r\nms^{-2}\u00a0 <\/span>\u00a0<\/td>\r\n<\/tr>\r\n
\u09e8\u09ef\u0964<\/td>\r\n\u09aa\u09c3\u09b7\u09cd\u09a0\u099f\u09be\u09a8 (surface tension)<\/td>\r\n\\frac{\u09ac\u09b2}{\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af}<\/span><\/td>\r\n\\left[M T^{-2}\\right]<\/span><\/td>\r\nNm^{-1}<\/span> \u09ac\u09be,kgs^{-2}<\/span><\/td>\r\n<\/tr>\r\n
\u09e9\u09e6\u0964<\/td>\r\n\u09b8\u09be\u09a8\u09cd\u09a6\u09cd\u09b0\u09a4\u09be\u0999\u09cd\u0995 (co-efficient of viscosity)<\/td>\r\n\\frac{\u09ac\u09b2\/\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2}{\u09ac\u09c7\u0997\u09c7\u09b0 \u09aa\u09b0\u09bf\u09ac\u09b0\u09cd\u09a4\u09a8\/\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac }<\/span><\/td>\r\n\\left[M L^{-1} T^{-1}\\right]<\/span><\/td>\r\nNsm^{-2} \u09ac\u09be, Pas^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e9\u09e7\u0964<\/td>\r\n\u0986\u09aa\u09c7\u0995\u09cd\u09b7\u09bf\u0995 \u0997\u09c1\u09b0\u09c1\u09a4\u09cd\u09ac (specific gravity)<\/td>\r\n\\frac{\u09ac\u09b8\u09cd\u09a4\u09c1\u09b0 \u09ad\u09b0}{\u09b8\u09ae\u0986\u09af\u09bc\u09a4\u09a8 \u09aa\u09be\u09a8\u09bf\u09b0 \u09ad\u09b0}<\/span><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b9\u09c0\u09a8 \u09b0\u09be\u09b6\u09bf<\/td>\r\n\u00a0<\/td>\r\n<\/tr>\r\n
\u09e9\u09e8\u0964<\/td>\r\n\u0995\u09ae\u09cd\u09aa\u09be\u0999\u09cd\u0995 (frequency)<\/td>\r\n\\frac{\u0998\u099f\u09a8\u09be \u09b8\u0982\u0996\u09cd\u09af\u09be }{\u09b8\u09ae\u09af\u09bc}<\/span><\/td>\r\n[T^(-1)]<\/span><\/td>\r\nHertz (Hz)<\/td>\r\n<\/tr>\r\n
\u09e9\u09e9\u0964<\/td>\r\n\u09aa\u09b0\u09cd\u09af\u09be\u09af\u09bc\u0995\u09be\u09b2 (time period)<\/td>\r\n\u09b8\u09ae\u09af\u09bc<\/td>\r\n[T]<\/span><\/td>\r\n=s^{-1}<\/span><\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<\/figure>\r\n\r\n\r\n\r\n
\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n
\u0995\u09cd\u09b0\u09ae\u09bf\u0995<\/strong> \u09a8\u09ae\u09cd\u09ac\u09b0<\/strong><\/td>\r\n\u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995<\/strong> \u09b0\u09be\u09b6\u09bf<\/strong><\/td>\r\n\u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995<\/strong><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be<\/strong><\/td>\r\n\u098f\u09b8<\/strong>.<\/strong> \u0986\u0987<\/strong>. <\/strong>\u098f\u0995\u0995<\/strong><\/td>\r\n<\/tr>\r\n
\u09e9\u09ea\u0964<\/td>\r\n\u09a4\u09be\u09aa (heat)<\/td>\r\n\u00a0<\/td>\r\n\u00a0<\/td>\r\nJ<\/td>\r\n<\/tr>\r\n
\u09e9\u09eb\u0964<\/td>\r\n\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be (temperature)<\/td>\r\n\u00a0<\/td>\r\n[\\theta]<\/span><\/td>\r\n\u0995\u09c7\u09b2\u09ad\u09bf\u09a8 (K)<\/td>\r\n<\/tr>\r\n
\u09e9\u09ec\u0964<\/td>\r\n\u0986\u09aa\u09c7\u0995\u09cd\u09b7\u09bf\u0995 \u09a4\u09be\u09aa (specific heat)<\/td>\r\n\\frac{\u09a4\u09be\u09aa\u09b6\u0995\u09cd\u09a4\u09bf}{\u09ad\u09b0 \u00d7\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b0 \u09aa\u09be\u09b0\u09cd\u09a5\u0995\u09cd\u09af}<\/span><\/td>\r\n\\left[L^{2} T^{2} \\theta^{-1}\\right]<\/span><\/td>\r\nJkg^{-1} k^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e9\u09ed\u0964<\/td>\r\n\u09b2\u09c0\u09a8 \u09a4\u09be\u09aa (latent heat)<\/td>\r\n\\frac{\u09a4\u09be\u09aa\u09b6\u0995\u09cd\u09a4\u09bf}{\u09ad\u09b0}<\/span><\/td>\r\n\\left[L^{2} T^{2}\\right]<\/span><\/td>\r\nJkg^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e9\u09ee\u0964<\/td>\r\n\u09a4\u09be\u09aa \u09a7\u09be\u09b0\u0995\u09a4\u09cd\u09ac (thermal capacity)<\/td>\r\n\\frac{\u09b6\u09cb\u09b7\u09bf\u09a4 \u09a4\u09be\u09aa\u09b6\u0995\u09cd\u09a4\u09bf}{\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be \u09ac\u09c3\u09a6\u09cd\u09a7\u09bf}<\/span><\/td>\r\n[MKL^{2} T^{-2} \\theta^{-1}]<\/span><\/td>\r\nJK^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09e9\u09ef\u0964<\/td>\r\n\u09a4\u09be\u09aa \u09aa\u09b0\u09bf\u09ac\u09be\u09b9\u09bf\u09a4\u09be\u0999\u09cd\u0995 (thermal conductivity)<\/td>\r\n{\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u00d7\u09ac\u09c7\u09a7}{\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2\u00d7\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b0 \u09aa\u09be\u09b0\u09cd\u09a5\u0995\u09cd\u09af\u00d7\u09b8\u09ae\u09af\u09bc }<\/span><\/td>\r\n\\left[\\mathrm{MLT}^{-3} \\theta^{-1}\\right]<\/span><\/td>\r\n\\text { Jmole }^{-1} k^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ea\u09e6\u0964<\/td>\r\n\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b0 \u09a8\u09a4\u09bf\u09ae\u09be\u09a4\u09cd\u09b0\u09be
(temperature gradient)<\/td>\r\n		\\frac{\u09a4\u09be\u09aa\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u09b0 \u09aa\u09b0\u09bf\u09ac\u09b0\u09cd\u09a4\u09a8}{\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac}<\/span><\/td>\r\n\\left[\\theta L^{-1}\\right]<\/span><\/td>\r\nm^{-1} k<\/span><\/td>\r\n<\/tr>\r\n
\u09ea\u09e7\u0964<\/td>\r\n\u098f\u09a8\u099f\u09cd\u09b0\u09aa\u09bf (entropy)<\/td>\r\n\\frac{\u09a4\u09be\u09aa}{\u0989\u09b7\u09cd\u09a3\u09a4\u09be}<\/span><\/td>\r\n\\left[M L^{2} T^{-2} \\theta^{-1}\\right]<\/span><\/td>\r\nJ K^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ea\u09e8\u0964<\/td>\r\n\u09ae\u09ae\u09be\u09b2\u09be\u09b0 \u0997\u09cd\u09af\u09be\u09b8 \u09a7\u09c1\u09ac\u0995 (molar gas constant)<\/td>\r\n\\frac{\u0995\u09be\u099c \u09ac\u09be \u09b6\u0995\u09cd\u09a4\u09bf}{\u09ae\u09cb\u09b2 \u09b8\u0982\u0996\u09cd\u09af\u09be \u00d7\u0989\u09b7\u09cd\u09a3\u09a4\u09be}<\/span><\/td>\r\n\\left[M L^{2} T^{2}\\right]<\/span><\/td>\r\n\\text { Jmole }^{-1} k^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ea\u09e9\u0964<\/td>\r\n\u099f\u09b0\u09cd\u0995 (torque)<\/td>\r\n\u09ac\u09b2\u00d7\u09ac\u09be\u09b9\u09c1\u09b0 \u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af<\/td>\r\n\\left[M L^{2} T^{-2}\\right]<\/span><\/td>\r\nNm\u00a0<\/td>\r\n<\/tr>\r\n
\u09ea\u09ea\u0964<\/td>\r\n\u09ac\u09be\u09c7\u09b2\u099f\u099c\u09ae\u09cd\u09af\u09be\u09a8 \u09a7\u09c1\u09ac\u0995 (Boltzmann’s constant)<\/td>\r\n\\frac{\u09b6\u0995\u09cd\u09a4\u09bf}{\u0989\u09b7\u09cd\u09a3\u09a4\u09be}<\/span><\/td>\r\n\\left[M L^{2} T^{-2} \\theta^{-1}\\right]<\/span><\/td>\r\nJ K^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ea\u09eb\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u0986\u09a7\u09be\u09a8 (electric charge)<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u09aa\u09cd\u09b0\u09ac\u09be\u09b9\u09ae\u09be\u09a4\u09cd\u09b0\u09be\u00d7\u09b8\u09ae\u09af\u09bc<\/td>\r\n[IT]<\/span><\/td>\r\n\u0995\u09c1\u09b2\u09ae\u09cd\u09ac 9 (c)<\/td>\r\n<\/tr>\r\n
\u09ea\u09ec\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u09aa\u09cd\u09b0\u09ac\u09be\u09b9\u09ae\u09be\u09a4\u09cd\u09b0\u09be (electric
current)<\/td>\r\n		\u00a0<\/td>\r\n[I]<\/span><\/td>\r\n\u0985\u09cd\u09af\u09be\u09be\u09ae\u09cd\u09aa\u09be\u09af\u09bc\u09be\u09b0 (A)<\/td>\r\n<\/tr>\r\n
\u09ea\u09ed\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u09ac\u09bf\u09ad\u09ac (electric
potential)<\/td>\r\n		\\frac{\u0995\u09be\u099c}{\u0986\u09a7\u09be\u09a8}<\/span><\/td>\r\n\\left[M L^{2} T^{-3} I^{-1}\\right]<\/span><\/td>\r\nJ C^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ea\u09ee\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09c7\u09b0 \u09aa\u09cd\u09b0\u09be\u09ac\u09b2\u09cd\u09af (electric field intensity)<\/td>\r\n\\frac{\u09ac\u09b2}{\u0986\u09a7\u09be\u09a8}<\/span><\/td>\r\n\\left[M L T^{-3} I^{1}\\right]<\/span><\/td>\r\nN C^{-1}<\/span> \u09ac\u09be, V m^{-1}<\/span>\u00a0\u00a0<\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<\/figure>\r\n\r\n\r\n\r\n
\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n\r\n
\u0995\u09cd\u09b0\u09ae\u09bf\u0995<\/strong> \u09a8\u09ae\u09cd\u09ac\u09b0<\/strong><\/td>\r\n\u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995<\/strong> \u09b0\u09be\u09b6\u09bf<\/strong><\/td>\r\n\u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995<\/strong><\/td>\r\n\u09ae\u09be\u09a4\u09cd\u09b0\u09be<\/strong><\/td>\r\n\u098f\u09b8<\/strong>.<\/strong> \u0986\u0987<\/strong>. <\/strong>\u098f\u0995\u0995<\/strong><\/td>\r\n<\/tr>\r\n
\u09eb\u09e6\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u09b0\u09cb\u09a7 (electric
resistance)<\/td>\r\n		\\frac{\u0995\u09cd\u09b7\u09ae\u09a4\u09be}{(\u09aa\u09cd\u09b0\u09ac\u09be\u09b9\u09ae\u09be\u09a4\u09cd\u09b0\u09be)^2}<\/span>\u00a0\u00a0<\/td>\r\nM L^{2} T^{-3} I^{-2}<\/span><\/td>\r\nOhm(\u00a0<\/strong>\u03a9)<\/td>\r\n<\/tr>\r\n
\u09eb\u09e7\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u09b0\u09cb\u09a7\u09be\u0999\u09cd\u0995 (electrical
resistivity)<\/td>\r\n		\\frac {\u09a4\u09a1\u09bc\u09bf\u09ce \u09b0\u09cb\u09a7 \u00d7\u09aa\u09cd\u09b0\u09b8\u09cd\u09a5\u099a\u09cd\u099b\u09c7\u09a6}{\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af}<\/span><\/td>\r\n\\left[M L^{3} T^{-3} I^{-2}\\right]<\/span><\/td>\r\nOhm-m<\/td>\r\n<\/tr>\r\n
\u09eb\u09e8\u0964<\/td>\r\n\u09a4\u09a1\u09bc\u09bf\u09ce \u09a6\u09cd\u09ac\u09bf\u09ae\u09c7\u09b0\u09c1 \u09ad\u09cd\u09b0\u09be\u09ae\u0995 (electric dipole moment)<\/td>\r\n\u0986\u09a7\u09be\u09a8 \u00d7\u09a6\u09c2\u09b0\u09a4\u09cd\u09ac<\/td>\r\n[ITL]<\/span><\/td>\r\nC-m<\/td>\r\n<\/tr>\r\n
\u09eb\u09e9\u0964<\/td>\r\n\u09a7\u09be\u09b0\u0995\u09a4\u09cd\u09ac (capacitance)<\/td>\r\n\\frac{\u0986\u09a7\u09be\u09a8}{\u09ac\u09bf\u09ad\u09ac \u09aa\u09be\u09b0\u09cd\u09a5\u0995\u09cd\u09af}<\/span><\/td>\r\n\\left[M^{-1} L^{-2} T^{4} I^{2}\\right]<\/span><\/td>\r\nFarad (F)<\/td>\r\n<\/tr>\r\n
\u09eb\u09ea\u0964<\/td>\r\n\u09b8\u09cd\u099f\u09bf\u09ab\u09be\u09a8 \u09a7\u09cd\u09b0\u09c1\u09ac\u0995 (Stefan’s constant)<\/td>\r\n\\frac{\u09ac\u09bf\u0995\u09c0\u09b0\u09cd\u09a3 \u09a4\u09be\u09aa}{\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2 \u00d7\u09b8\u09ae\u09af\u09bc \u00d7(\u0989\u09b7\u09cd\u09a3\u09a4\u09be)^4 }<\/span><\/td>\r\nM L T^{-3} \\theta^{-4}<\/span><\/td>\r\nW m^{-2} K^{-4}<\/span><\/td>\r\n<\/tr>\r\n
\u09eb\u09eb\u0964<\/td>\r\n\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09ae\u09c7\u09b0\u09c1\u09b6\u0995\u09cd\u09a4\u09bf (magnetic pole strength)<\/td>\r\n\\frac{\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09ad\u09cd\u09b0\u09be\u09ae\u0995}{\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af}<\/span><\/td>\r\n\\left[I L^{-1}\\right]<\/span><\/td>\r\nA-m<\/td>\r\n<\/tr>\r\n
\u09eb\u09ec\u0964<\/td>\r\n\u09b8\u09cd\u09ac\u09be\u09ac\u09c7\u09b6\u09be\u0999\u09cd\u0995 (self inductance)<\/td>\r\n\\frac{\u09ac\u09bf\u09ad\u09ac \u09aa\u09be\u09b0\u09cd\u09a5\u0995\u09cd\u09af}{\u09aa\u09cd\u09b0\u09ac\u09be\u09b9\u09ae\u09be\u09a4\u09cd\u09b0\u09be \u09aa\u09b0\u09bf\u09ac\u09b0\u09cd\u09a4\u09a8\u09c7\u09b0 \u09b9\u09be\u09b0\u00a0 }<\/span><\/td>\r\n\\left[M L^{2} T^{-2} I^{-2}\\right]<\/span><\/td>\r\nHenry (H)<\/td>\r\n<\/tr>\r\n
\u09eb\u09ed\u0964<\/td>\r\n\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09a6\u09cd\u09ac\u09bf\u09ae\u09c7\u09b0\u09c1 \u09ad\u09cd\u09b0\u09be\u09ae\u0995 (magnetic dipole moment)<\/td>\r\n\\frac{\u09aa\u09cd\u09b0\u09ac\u09be\u09b9\u09ae\u09be\u09a4\u09cd\u09b0\u09be \u00d7\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2}{\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af \u00d7\u09ae\u09c7\u09b0\u09c1 \u09b6\u0995\u09cd\u09a4\u09bf}<\/span><\/td>\r\n\\left[I L^{2}\\right]<\/span><\/td>\r\nA-m^{2}<\/span><\/td>\r\n<\/tr>\r\n
\u09eb\u09ee\u0964<\/td>\r\n\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09aa\u09cd\u09b0\u09ac\u09be\u09b9 \u0998\u09a8\u09a4\u09cd\u09ac
(magnetic flux density)<\/td>\r\n		\\frac{\u09ac\u09b2}{\u09aa\u09cd\u09b0\u09ac\u09be\u09b9\u09ae\u09be\u09a4\u09cd\u09b0\u09be \u00d7\u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af}<\/span><\/td>\r\n\\left[M T^{2} I^{-1}\\right]<\/span><\/td>\r\nmathrm{Wbm}^{-2}<\/span><\/td>\r\n<\/tr>\r\n
\u09eb\u09ef\u0964<\/td>\r\n\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09ab\u09cd\u09b2\u09be\u0995\u09cd\u09b8 (magnetic flux)<\/td>\r\n\u099a\u09cc\u09ae\u09cd\u09ac\u0995 \u09aa\u09cd\u09b0\u09ac\u09be\u09b9 \u0998\u09a8\u09a4\u09cd\u09ac\u00d7\u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2<\/td>\r\n\\left[M L^{2} T^{-2} I^{-1}\\right]<\/span><\/td>\r\nWb<\/td>\r\n<\/tr>\r\n
\u09ec\u09e6\u0964<\/td>\r\n\u0995\u09cc\u09a3\u09bf\u0995 \u09ac\u09c7\u0997 (angular velocity)<\/td>\r\n(i)<\/td>\r\n\\left[T^{-1}\\right]<\/span><\/td>\r\n\\operatorname{Rad} s^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ec\u09e7\u0964<\/td>\r\n\u0995\u09cc\u09a3\u09bf\u0995 \u09a4\u09cd\u09ac\u09b0\u09a3 (angular
acceleration)<\/td>\r\n		\u03b1<\/td>\r\n\\left[T^{-2}\\right]<\/span><\/td>\r\n\\mathrm{rads}^{-2}<\/span><\/td>\r\n<\/tr>\r\n
\u09ec\u09e8\u0964<\/td>\r\n\u09aa\u09c3\u09b7\u09cd\u09a0 \u09b6\u0995\u09cd\u09a4\u09bf (surface energy)<\/td>\r\nE<\/td>\r\n\\left[M T^{-2}\\right]<\/span><\/td>\r\nJ m^{-2}<\/span> \u09ac\u09be, N m^{-1}<\/span><\/td>\r\n<\/tr>\r\n
\u09ec\u09e9\u0964<\/td>\r\n\u09a4\u09b0\u0999\u09cd\u0997\u09c7\u09b0 \u09a4\u09c0\u09ac\u09cd\u09b0\u09a4\u09be (intensity of wave)<\/td>\r\n\u09b6\u0995\u09cd\u09a4\u09bf \u0998\u09a8\u09a4\u09cd\u09ac \u00d7\u09a4\u09b0\u0999\u09cd\u0997 \u09ac\u09c7\u0997<\/td>\r\n\\left[M L T^{-3}\\right]<\/span><\/td>\r\nJ m^{-2} s^{-1}<\/span>\u09ac\u09be,\\mathrm{Wm}^{-2}<\/span><\/td>\r\n<\/tr>\r\n<\/tbody>\r\n<\/table>\r\n<\/figure>\r\n\r\n\r\n\r\n

\u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u09c7\u09b0 \u09ae\u09c2\u09b2\u09a8\u09c0\u09a4\u09bf (Basic principle of measurements) :<\/h3>\r\n\r\n\r\n\r\n

\u0986\u09ae\u09b0\u09be \u099c\u09be\u09a8\u09bf \u0995\u09cb\u09a8\u09cb \u0995\u09bf\u099b\u09c1\u09b0 \u09ae\u09be\u09aa-\u099c\u09cb\u0996\u09c7\u09b0 \u09a8\u09be\u09ae \u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u0964 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa \u099b\u09be\u09a1\u09bc\u09be \u0995\u09cb\u09a8\u09cb \u09b0\u09be\u09b6\u09bf \u09b8\u09ae\u09cd\u09ac\u09a8\u09cd\u09a7\u09c7 \u09b8\u09ae\u09cd\u09af\u0995 \u099c\u09cd\u099e\u09be\u09a8 \u09b2\u09be\u09ad \u0995\u09b0\u09be \u09b8\u09ae\u09cd\u09ad\u09ac \u09a8\u09af\u09bc\u0964 \u09aa\u09cd\u09b0\u0995\u09c3\u09a4 \u09aa\u09cd\u09b0\u09b8\u09cd\u09a4\u09be\u09ac\u09c7 \u09aa\u09a6\u09be\u09b0\u09cd\u09a5\u09ac\u09bf\u099c\u09cd\u099e\u09be\u09a8\u09c7\u09b0 \u09ae\u09c2\u09b2 \u09ad\u09bf\u09a4\u09cd\u09a4\u09bf \u09b9\u09b2\u09cb \u09ac\u09bf\u09ad\u09bf\u09a8\u09cd\u09a8 \u09b0\u09be\u09b6\u09bf\u09b0 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa \u0997\u09cd\u09b0\u09b9\u09a3\u0964 \u098f\u099c\u09a8\u09cd\u09af \u09aa\u09a6\u09be\u09b0\u09cd\u09a5\u09ac\u09bf\u099c\u09cd\u099e\u09be\u09a8\u0995\u09c7 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u09ac\u09bf\u099c\u09cd\u099e\u09be\u09a8 \u09ac\u09b2\u09c7\u0964<\/p>\r\n\r\n\r\n\r\n

\u0995\u09cb\u09a8\u09cb \u09b0\u09be\u09b6\u09bf \u09b8\u09ae\u09cd\u09ac\u09a8\u09cd\u09a7\u09c7 \u0986\u09ae\u09b0\u09be \u09a6\u09c1’\u09ad\u09be\u09ac\u09c7 \u099c\u09cd\u099e\u09be\u09a8 \u09b2\u09be\u09ad \u0995\u09b0\u09a4\u09c7 \u09aa\u09be\u09b0\u09bf\u2014\u098f\u0995\u099f\u09bf \u0997\u09c1\u09a3\u0997\u09a4 \u0993 \u0985\u09a8\u09cd\u09af\u099f\u09bf \u09aa\u09b0\u09bf\u09ae\u09be\u09a3\u0997\u09a4\u0964 \u09ac\u09b8\u09cd\u09a4\u09c1 \u0993 \u09b6\u0995\u09cd\u09a4\u09bf\u09b0 \u09ac\u09c8\u09b6\u09bf\u09b7\u09cd\u099f\u09cd\u09af\u0995\u09c7 \u0986\u09ae\u09b0\u09be \u0987\u09a8\u09cd\u09a6\u09cd\u09b0\u09bf\u09af\u09bc\u09be\u09a6\u09bf\u09b0 \u09b8\u09be\u09b9\u09be\u09af\u09cd\u09af\u09c7 \u0985\u09a8\u09c1\u09ad\u09ac \u0995\u09b0\u09a4\u09c7 \u09aa\u09be\u09b0\u09bf \u0993 \u09ad\u09be\u09b7\u09be\u09af\u09bc \u09aa\u09cd\u09b0\u0995\u09be\u09b6 \u0995\u09b0\u09a4\u09c7 \u09aa\u09be\u09b0\u09bf\u0964 \u09ac\u09b8\u09cd\u09a4\u09c1 \u0993 \u09b6\u0995\u09cd\u09a4\u09bf \u09b8\u09ae\u09cd\u09ac\u09a8\u09cd\u09a7\u09c7 \u098f\u099f\u09be\u0987 \u0986\u09ae\u09be\u09a6\u09c7\u09b0 \u0997\u09c1\u09a3\u0997\u09a4 \u099c\u09cd\u099e\u09be\u09a8\u0964 \u0995\u09bf\u09a8\u09cd\u09a4\u09c1 \u098f\u09a6\u09c7\u09b0 \u09b8\u09ae\u09cd\u09ac\u09a8\u09cd\u09a7\u09c7 \u09aa\u09b0\u09bf\u09ae\u09be\u09a3\u0997\u09a4 \u099c\u09cd\u099e\u09be\u09a8 \u09b2\u09be\u09ad \u0995\u09b0\u09a4\u09c7 \u09b9\u09b2\u09c7\u0987 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u09c7\u09b0 \u098f\u0995\u09be\u09a8\u09cd\u09a4 \u09aa\u09cd\u09b0\u09af\u09bc\u09cb\u099c\u09a8 \u098f\u09ac\u0982 \u098f\u0987 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u09c7\u09b0 \u099c\u09a8\u09cd\u09af \u09ae\u09be\u09aa\u0995\u09be\u09a0\u09bf\u09b0 \u0986\u09ac\u09b6\u09cd\u09af\u0995\u0964<\/p>\r\n\r\n\r\n\r\n

\u0995\u09cb\u09a8\u09cb \u098f\u0995\u099f\u09bf \u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995 \u09b0\u09be\u09b6\u09bf \u09aa\u09b0\u09bf\u09ae\u09be\u09aa \u0995\u09b0\u09a4\u09c7 \u09b9\u09b2\u09c7 \u09a4\u09be\u09b0 \u098f\u0995\u099f\u09bf \u09a8\u09bf\u09b0\u09cd\u09a6\u09bf\u09b7\u09cd\u099f \u0993 \u09b8\u09c1\u09ac\u09bf\u09a7\u09be\u099c\u09a8\u0995 \u0985\u0982\u09b6 \u09ac\u09be \u0996\u09a3\u09cd\u09a1\u0995\u09c7 \u0986\u09a6\u09b0\u09cd\u09b6 (Standard) \u09b9\u09bf\u09b8\u09c7\u09ac\u09c7 \u09a7\u09b0\u09c7 \u09a8\u09bf\u09af\u09bc\u09c7 \u09b8\u09c7\u0987 \u09b0\u09be\u09b6\u09bf\u09b0 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa \u0995\u09b0\u09be \u09b9\u09af\u09bc \u098f\u09ac\u0982 \u09b8\u09b0\u09cd\u09ac\u09a4\u09cd\u09b0 \u0993\u0987 \u09a8\u09bf\u09b0\u09cd\u09a6\u09bf\u09b7\u09cd\u099f \u0985\u0982\u09b6\u09c7\u09b0\u0987 \u09aa\u09cd\u09b0\u099a\u09b2\u09a8 \u0995\u09b0\u09be \u09b9\u09af\u09bc\u0964 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u09c7\u09b0 \u098f\u0987 \u0986\u09a6\u09b0\u09cd\u09b6\u0995\u09c7 \u0993\u0987 \u09b0\u09be\u09b6\u09bf\u09b0 \u098f\u0995\u0995 \u09ac\u09be \u09ae\u09be\u09aa\u0995\u09be\u09a0\u09bf \u09ac\u09b2\u09c7\u0964<\/p>\r\n\r\n\r\n\r\n

\u09af\u09a6\u09bf \u09ac\u09b2\u09be \u09b9\u09af\u09bc \u098f\u0995\u099f\u09bf \u0995\u09be\u09ae\u09b0\u09be 20 \u09ae\u09bf\u099f\u09be\u09b0 \u09b2\u09ae\u09cd\u09ac\u09be, \u09a4\u09ac\u09c7 \u0986\u09ae\u09b0\u09be \u09ac\u09c1\u099d\u09bf \u09af\u09c7 \u09ae\u09bf\u099f\u09be\u09b0 \u09a8\u09be\u09ae\u0995 \u098f\u0995\u099f\u09bf \u09a8\u09bf\u09b0\u09cd\u09a6\u09bf\u09b7\u09cd\u099f \u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af\u0995\u09c7 \u0986\u09a6\u09b0\u09cd\u09b6 \u09b9\u09bf\u09b8\u09c7\u09ac\u09c7 \u09a7\u09b0\u09c7 \u09a8\u09c7\u09af\u09bc\u09be \u09b9\u09af\u09bc\u09c7\u099b\u09c7, \u09af\u09be\u09b0 \u09a4\u09c1\u09b2\u09a8\u09be\u09af\u09bc \u0995\u09be\u09ae\u09b0\u09be\u099f\u09bf 20 \u0997\u09c1\u09a3 \u09b2\u09ae\u09cd\u09ac\u09be\u0964 \u0986\u09ac\u09be\u09b0 \u09af\u09a6\u09bf \u09ac\u09b2\u09be \u09b9\u09af\u09bc \u098f\u0995\u099f\u09bf \u09ac\u09b8\u09cd\u09a4\u09c1\u09b0 \u09ad\u09b0 10 \u0995\u09bf\u09b2\u09cb\u0997\u09cd\u09b0\u09be\u09ae, \u09a4\u09ac\u09c7 \u09ac\u09c1\u099d\u09a4\u09c7 \u09b9\u09ac\u09c7 \u09af\u09c7, \u0995\u09bf\u09b2\u09cb\u0997\u09cd\u09b0\u09be\u09ae \u09a8\u09be\u09ae\u0995 \u098f\u0995\u099f\u09bf \u09a8\u09bf\u09b0\u09cd\u09a6\u09bf\u09b7\u09cd\u099f \u09ad\u09b0\u0995\u09c7 \u0986\u09a6\u09b0\u09cd\u09b6 \u09b9\u09bf\u09b8\u09c7\u09ac\u09c7 \u09a7\u09b0\u09c7 \u09a8\u09c7\u09af\u09bc\u09be \u09b9\u09af\u09bc\u09c7\u099b\u09c7 \u09af\u09be\u09b0 \u09a4\u09c1\u09b2\u09a8\u09be\u09af\u09bc \u09ac\u09b8\u09cd\u09a4\u09c1\u09b0 \u09ae\u09be\u09c7\u099f \u09ad\u09b0 10 \u0997\u09c1\u09a3\u0964<\/p>\r\n\r\n\r\n\r\n

\u09b8\u09c1\u09a4\u09b0\u09be\u0982 \u098f\u0995\u099f\u09bf \u09b0\u09be\u09b6\u09bf\u09b0 \u09ae\u09a7\u09cd\u09af\u09c7 \u09a4\u09be\u09b0 \u098f\u0995\u0995 \u09af\u09a4\u09ac\u09be\u09b0 \u09a5\u09be\u0995\u09ac\u09c7 \u09b8\u09c7\u0987 \u09b8\u0982\u0996\u09cd\u09af\u09be\u0987 \u09b9\u09ac\u09c7 \u0993\u0987 \u09b0\u09be\u09b6\u09bf\u09b0 \u09ae\u09be\u09aa \u09a8\u09bf\u09b0\u09cd\u09a6\u09c7\u09b6\u0995 \u098f\u09ac\u0982 \u09af\u09c7 \u0995\u09cb\u09a8\u09cb \u09b0\u09be\u09b6\u09bf\u09b0 \u09aa\u09b0\u09bf\u09ae\u09be\u09aa \u09a8\u09bf\u09a4\u09c7 \u09b9\u09b2\u09c7 \u09a6\u09c1\u099f\u09bf \u099c\u09bf\u09a8\u09bf\u09b8\u09c7\u09b0 \u09aa\u09cd\u09b0\u09af\u09bc\u09cb\u099c\u09a8\u0964 \u098f\u0995\u099f\u09bf \u09b9\u09b2\u09cb \u09b8\u0982\u0996\u09cd\u09af\u09be, \u0985\u09aa\u09b0\u099f\u09bf \u09b9\u09b2\u09cb \u098f\u0995\u0995\u0964 \u098f\u0995\u099f\u09bf \u099b\u09be\u09a1\u09bc\u09be \u0985\u09aa\u09b0\u099f\u09bf \u0985\u09b0\u09cd\u09a5\u09b9\u09c0\u09a8\u0964 \u09af\u09c7\u09ae\u09a8 \u09b0\u09c7\u09b6\u09a8 \u09ac\u09cd\u09af\u09be\u0997\u09c7 10 \u0995\u09bf\u09b2\u09cb\u0997\u09cd\u09b0\u09be\u09ae \u099a\u09be\u0989\u09b2 \u0986\u099b\u09c7\u0964 \u098f\u0996\u09be\u09a8\u09c7 \u09ad\u09b0 \u098f\u0995\u099f\u09bf \u09b0\u09be\u09b6\u09bf, ’10\u2019 \u098f\u0995\u099f\u09bf \u09b8\u0982\u0996\u09cd\u09af\u09be \u098f\u09ac\u0982 \u2018\u0995\u09bf\u09b2\u09be\u09c7\u0997\u09cd\u09b0\u09be\u09ae\u2019 \u098f\u0995\u0995\u0964 \u0995\u09bf\u09a8\u09cd\u09a4\u09c1 \u09af\u09a6\u09bf \u09ac\u09b2\u09be \u09af\u09be\u09af\u09bc \u09b0\u09c7\u09b6\u09a8 \u09ac\u09cd\u09af\u09be\u0997\u09c7 \u099a\u09be\u0989\u09b2\u09c7\u09b0 \u09ad\u09b0 10, \u09a4\u09ac\u09c7 \u09a4\u09be\u09b0 \u0995\u09cb\u09a8\u09cb \u0985\u09b0\u09cd\u09a5 \u09b9\u09af\u09bc \u09a8\u09be\u0964 \u09b6\u09c1\u09a7\u09c1 \u09b8\u0982\u0996\u09cd\u09af\u09be \u09a6\u09cd\u09ac\u09be\u09b0\u09be \u09b0\u09be\u09b6\u09bf \u09aa\u09cd\u09b0\u0995\u09be\u09b6 \u0995\u09b0\u09be \u09af\u09be\u09af\u09bc \u09a8\u09be, \u098f\u0995\u0995\u0993 \u09ac\u09b2\u09a4\u09c7 \u09b9\u09af\u09bc\u0964<\/p>\r\n\r\n\r\n\r\n

\u09b8\u09c1\u09a4\u09b0\u09be\u0982 \u09b0\u09be\u09b6\u09bf\u09b0 \u09ae\u09be\u09aa = \u09b8\u0982\u0996\u09cd\u09af\u09be x \u098f\u0995\u0995\u0964 \u098f\u099f\u09bf\u0987 \u09b9\u09b2\u09cb \u09aa\u09b0\u09bf\u09ae\u09be\u09aa\u09c7\u09b0 \u09ae\u09c2\u09b2\u09a8\u09c0\u09a4\u09bf\u0964<\/strong><\/p>\r\n","protected":false},"excerpt":{"rendered":"

\u0995\u09cd\u09b0\u09ae\u09bf\u0995 \u09a8\u09ae\u09cd\u09ac\u09b0 \u09aa\u09cd\u09b0\u09be\u0995\u09c3\u09a4\u09bf\u0995 \u09b0\u09be\u09b6\u09bf \u09b8\u09ae\u09cd\u09aa\u09b0\u09cd\u0995 \u09ae\u09be\u09a4\u09cd\u09b0\u09be \u098f\u09b8. \u0986\u0987. \u098f\u0995\u0995 \u09e7\u0964 \u09a6\u09c8\u09b0\u09cd\u0998\u09cd\u09af, \u09aa\u09cd\u09b0\u09b8\u09cd\u09a5, \u0989\u099a\u09cd\u099a\u09a4\u09be, \u09ac\u09cd\u09af\u09be\u09b8\u09be\u09b0\u09cd\u09a7,\u09b8\u09b0\u09a3, \u09a6\u09c2\u09b0\u09a4\u09cd\u09ac \u0987\u09a4\u09cd\u09af\u09be\u09a6\u09bf (Length,width, height, radius, displacement, distance etc.) \u00a0 \u09ae\u09bf\u099f\u09be\u09b0 (m) \u09e8\u0964 \u09ad\u09b0 (mass) \u00a0 \u0995\u09bf\u09b2\u09cb\u0997\u09cd\u09b0\u09be\u09ae (kg) \u09e9\u0964 \u09b8\u09ae\u09af\u09bc (time) \u00a0 \u09b8\u09c7\u0995\u09c7\u09a8\u09cd\u09a1 (s) \u09ea\u0964 \u0995\u09cd\u09b7\u09c7\u09a4\u09cd\u09b0\u09ab\u09b2 (area)<\/p>\n

Read More<\/a><\/p>\n","protected":false},"author":2,"featured_media":0,"comment_status":"open","ping_status":"open","sticky":false,"template":"","format":"standard","meta":[],"categories":[51,4235,3028],"tags":[3220,3221,3219],"_links":{"self":[{"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/posts\/84"}],"collection":[{"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/posts"}],"about":[{"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/types\/post"}],"author":[{"embeddable":true,"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/users\/2"}],"replies":[{"embeddable":true,"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/comments?post=84"}],"version-history":[{"count":13,"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/posts\/84\/revisions"}],"predecessor-version":[{"id":12532,"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/posts\/84\/revisions\/12532"}],"wp:attachment":[{"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/media?parent=84"}],"wp:term":[{"taxonomy":"category","embeddable":true,"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/categories?post=84"},{"taxonomy":"post_tag","embeddable":true,"href":"https:\/\/10minuteschool.com\/content\/wp-json\/wp\/v2\/tags?post=84"}],"curies":[{"name":"wp","href":"https:\/\/api.w.org\/{rel}","templated":true}]}}