To describe a vector quantity, you need both magnitude (size) and direction. This information can be represented using components along different axes or as a magnitude and an angle relative to a reference direction.
To describe a vector, you need both magnitude (size or length) and direction. In a 2D plane, this could be represented as an arrow with a certain length and direction. In a 3D space, it would require three coordinates to pinpoint its position and orientation.
Wind is a vector quantity because it has both magnitude (speed) and direction. These two attributes are needed to fully describe wind as it moves in a specific direction at a specific speed.
No, the magnitude of a vector is the length of the vector, while the angle formed by a vector is the direction in which the vector points relative to a reference axis. These are separate properties of a vector that describe different aspects of its characteristics.
No, the Laplacian is not a vector. It is a scalar operator used in mathematics and physics to describe the divergence of a gradient.
To describe a vector quantity, you need both magnitude (size or length of the vector) and direction (the orientation or angle of the vector relative to a reference axis). This information can be represented using coordinates, components, or angles depending on the context. A vector is typically denoted by an arrow above the symbol, such as "→A".
can't you find it on your own??
To describe a vector, you need both magnitude (size or length) and direction. In a 2D plane, this could be represented as an arrow with a certain length and direction. In a 3D space, it would require three coordinates to pinpoint its position and orientation.
A vector is a qunatity having a magnitude and direction.
The number.
It is a vector that describes a force.A force has both a magnitude and a direction, so it's appropriate to describe it with a vector.
Wind is a vector quantity because it has both magnitude (speed) and direction. These two attributes are needed to fully describe wind as it moves in a specific direction at a specific speed.
No, the magnitude of a vector is the length of the vector, while the angle formed by a vector is the direction in which the vector points relative to a reference axis. These are separate properties of a vector that describe different aspects of its characteristics.
No, the Laplacian is not a vector. It is a scalar operator used in mathematics and physics to describe the divergence of a gradient.
To describe a vector quantity, you need both magnitude (size or length of the vector) and direction (the orientation or angle of the vector relative to a reference axis). This information can be represented using coordinates, components, or angles depending on the context. A vector is typically denoted by an arrow above the symbol, such as "→A".
speed and direction
Mass is a scalar quantity, as it only requires a magnitude to describe it. Acceleration is a vector quantity, as it involves both magnitude and direction to fully describe it.
Its directiondirection