Three forces act concurrently on a point P as shown below. Which vector represents the direction of the resultant force on point P?data:image/png;base64,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

Question

Three forces act concurrently on a point P as shown below. Which vector represents the direction of the resultant force on point P?data:image/png;base64,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

Answer 1

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Answer 2

To determine the direction of the resultant force on point P, you need to add the vectors representing the three forces and find the resulting vector.

Here are the steps to find the resultant vector:

1. Draw a coordinate system with a reference point at the origin (Point P).
2. Draw arrows representing each force in the direction and magnitude given.
3. Place the tail of each arrow at the origin (Point P).
4. Add the x-components of the forces together to find the resultant x-component.
5. Add the y-components of the forces together to find the resultant y-component.
6. Draw the resultant vector by placing its tail at the origin and extending the arrow to the point where the x and y-components intersect.

Based on the given information (the image representation is not visible), follow the steps described above to find the resultant force vector at point P.