Vectors and Rotors: With ApplicationsE. Arnold, 1903 - 204 sider |
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Resultat 1-5 av 18
Side xi
... Product 93 111. Right system of three vectors 93 112. Equality of two vector products 94 113. The scalar product 94 114. Definition of scalar product 95 116 . 117 . 118 . Commutative Law . 115. Equality of scalar products Dimensions ...
... Product 93 111. Right system of three vectors 93 112. Equality of two vector products 94 113. The scalar product 94 114. Definition of scalar product 95 116 . 117 . 118 . Commutative Law . 115. Equality of scalar products Dimensions ...
Side xii
... scalar product . 115 • 147. Application of Scalar product to components of forces 115 148. Application to work done EXERCISES VIII . 115 · · 116 CHAPTER IV . SECTION ( 1 ) . 149. Definition of a Rotor 150. Definition of a Rotor ...
... scalar product . 115 • 147. Application of Scalar product to components of forces 115 148. Application to work done EXERCISES VIII . 115 · · 116 CHAPTER IV . SECTION ( 1 ) . 149. Definition of a Rotor 150. Definition of a Rotor ...
Side 58
... products together and their sum is equal to the product of the resultant mass and its distance from the line . Also ... scalar equations for determining the mass - centre . If the orts are mutually perpendicular , then x , 58 VECTORS AND ...
... products together and their sum is equal to the product of the resultant mass and its distance from the line . Also ... scalar equations for determining the mass - centre . If the orts are mutually perpendicular , then x , 58 VECTORS AND ...
Side 90
... products of vectors , called the Vector - Product and the Scalar - Product respectively , the one being a Vector and the other a Scalar . As these products are essentially different , it is necessary to distinguish them by a difference ...
... products of vectors , called the Vector - Product and the Scalar - Product respectively , the one being a Vector and the other a Scalar . As these products are essentially different , it is necessary to distinguish them by a difference ...
Side 94
... Scalar Product . The last way of looking at the vector product leads us naturally to consider a rectangle formed by a and the projection of ẞ on a . * Projection means orthogonal projection unless otherwise ... products The scalar product.
... Scalar Product . The last way of looking at the vector product leads us naturally to consider a rectangle formed by a and the projection of ẞ on a . * Projection means orthogonal projection unless otherwise ... products The scalar product.
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Vectors and Rotors: With Applications Olaus Henrici,George Charles Turner Uten tilgangsbegrensning - 1903 |
Vanlige uttrykk og setninger
a₁ Algebra angle applied axis B₁ B₂ bars base beam bending bending moment bisect C₁ called centre collinear Commutative Law components compression coordinates coplanar corresponding definite denote determined diagonals direction and sense distance divide draw drawn equal equation equilibrium figure find the mass-centre forces acting frame friction geometrical girder give given points given rotors Hence the mass-centre horizontal length line joining line parallel link-polygon load m₁ magnitude mass mass-points mid-point momental area move negative number of vectors orts parallel rotors parallelogram parallelopiped perpendicular plane pole polygon position vector projection quantity reaction rectangle represent rigid body scalar product shearing force shew shewn sides straight line stress diagram string Suppose system of rotors tension tetrahedron theorem tons triangle vanishes vector product vector-polygon vertex vertices weight
Populære avsnitt
Side 21 - If two triangles have one angle of the one equal to one angle of the other and the sides about these equal angles proportional, the triangles are similar.
Side 29 - ... line and the extremities of the base have the same ratio which the other sides of the triangle have to one...
Side 8 - If a straight line be divided into any two parts, the square on the whole line is equal to the squares on the two parts, together with twice the rectangle contained by the two parts.
Side 112 - ... is equal to the rectangle contained by the segments of the other.
Side 17 - ... from the beginning of the first to the end of the last...