Resultant

Resultant

In vector mathematics, the resultant is a single vector that has the same effect as the combined effect of two or more vectors. It is the vector sum of all the vectors being considered. The concept of the resultant is fundamental in physics and engineering, where it is used to determine the net effect of multiple forces acting on a body.

Definition[edit | edit source]

The resultant of a set of vectors is the vector obtained by adding all the vectors together. Mathematically, if we have vectors \(\mathbf{A}\), \(\mathbf{B}\), and \(\mathbf{C}\), the resultant \(\mathbf{R}\) is given by: \[ \mathbf{R} = \mathbf{A} + \mathbf{B} + \mathbf{C} \]

Properties[edit | edit source]

The resultant vector has both magnitude and direction.
The magnitude of the resultant vector can be found using the Pythagorean theorem if the vectors are perpendicular.
The direction of the resultant vector can be determined using trigonometry.

Calculation[edit | edit source]

To calculate the resultant of two vectors, \(\mathbf{A}\) and \(\mathbf{B}\), we can use the parallelogram law or the triangle law of vector addition.

Parallelogram Law[edit | edit source]

If two vectors are represented as adjacent sides of a parallelogram, the diagonal of the parallelogram represents the resultant vector.

Triangle Law[edit | edit source]

If two vectors are represented as two sides of a triangle taken in order, the third side of the triangle represents the resultant vector.

Applications[edit | edit source]

The concept of the resultant is widely used in various fields:

In mechanics, to find the net force acting on a body.
In electromagnetism, to determine the net electric or magnetic field.
In engineering, to analyze the combined effect of multiple forces on structures.

Related Concepts[edit | edit source]

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