Resultant
The term given to the net figure that results from a vector addition is the resultant vector.
The term given to the net figure that results from vector addition is the resultant vector. It represents the combination of all individual vectors' magnitudes and directions.
The term given to the net figure that results from vector addition is the resultant vector. It represents the combined effect of two or more individual vectors in terms of both magnitude and direction.
To determine the error between a vector addition and the real results, you would subtract the calculated vector addition from the real vector addition. This difference will provide you with the error value. The error value can then be analyzed to understand the accuracy of the vector addition calculation.
reverse process of vector addition is vector resolution.
The term given to the net figure that results from a vector addition is the resultant vector.
The term given to the net figure that results from vector addition is the resultant vector. It represents the combination of all individual vectors' magnitudes and directions.
The term given to the net figure that results from vector addition is the resultant vector. It represents the combined effect of two or more individual vectors in terms of both magnitude and direction.
To determine the error between a vector addition and the real results, you would subtract the calculated vector addition from the real vector addition. This difference will provide you with the error value. The error value can then be analyzed to understand the accuracy of the vector addition calculation.
resultant
It is a translation on the Cartesian plane
the opposite to vector addition is vector subtraction.
reverse process of vector addition is vector resolution.
False
The opposite of vector addition is vector subtraction, while the opposite of vector subtraction is vector addition. In vector addition, two vectors combine to form a resultant vector, whereas in vector subtraction, one vector is removed from another, resulting in a different vector. These operations are fundamental in vector mathematics and physics, illustrating how vectors can be combined or separated in different contexts.
the difference between resultant vector and resolution of vector is that the addition of two or more vectors can be represented by a single vector which is termed as a resultant vector. And the decomposition of a vector into its components is called resolution of vectors.
Consider two vectors A and B Represented by directionel lines OM and ON respectivelynow add the two vectors by head to tail tail of vector addition now resolve it into rectangular components as shown in figure