Vector Analysis: An Introduction to Vector-methods and Their Various Applications to Physics and Mathematics |
Contents
| 170 | |
| 178 | |
| 182 | |
| 191 | |
| 199 | |
| 205 | |
| 211 | |
| 217 | |
| 77 | |
| 94 | |
| 96 | |
| 100 | |
| 106 | |
| 112 | |
| 116 | |
| 129 | |
| 133 | |
| 140 | |
| 146 | |
| 152 | |
| 163 | |
| 221 | |
| 229 | |
| 233 | |
| 234 | |
| 237 | |
| 244 | |
| 249 | |
| 251 | |
| 256 | |
| 257 | |
| 258 | |
Other editions - View all
Common terms and phrases
acceleration angular velocity axis called Cartesian circuit closed surface components considered const constant vector coördinates curl F curvature curve defined definition density derivative differential direction div F Divergence Theorem dr dt dt dt electrical ellipsoid equal equation of motion expression F₁ F₂ fluid flux formula Gauss's Theorem grad Green's Theorem hence hodograph inertia Laplace's Equation line integral magnetic magnitude mass moving space multiplied normal notation obtain operator origin osculating plane parallel particle path perpendicular plane Poisson's Equation potential principal axes quantity r₁ radius vector represented result rigid body rotation S S S scalar function scalar point-function scalar product solid angle sphere surface integral tangent Taylor's Theorem tion unit vector vanishes variable vector function vector product volume w₁ w₂ write written zero Απ φω дх მა მე მი მყ