Answer :
The magnitude of the resultant vector R is approximately 41.1 units, and the direction of the resultant relative to vector A is 90 degrees (perpendicular).
Vectors A and B are at right angles, which means they are perpendicular to each other. When two vectors are at right angles, the magnitude of the resultant vector can be found using the Pythagorean theorem:
[tex]\[R = \sqrt{A^2 + B^2}\][/tex]
Given A = 38.2 and B = 18.5, we can calculate the magnitude of the resultant vector R:
[tex]\[R = \sqrt{38.2^2 + 18.5^2} \approx 41.1\][/tex]
So, the magnitude of the resultant vector R is approximately 41.1 units.
Since vectors A and B are at right angles, the direction of the resultant vector R relative to vector A is 90 degrees (perpendicular). This means that R forms a right angle with vector A.
The magnitude of the resultant vector R is approximately 41.1 units, and the direction of the resultant relative to vector A is perpendicular (90 degrees). This indicates that the vectors A and B are arranged in a right angle configuration.
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Vectors A and B are at right angles. Determine the magnitude and the direction of the resultant relative to vector A
A=39.4,B=19.6
The resultant magnitude, R, is__