add the x forces = Fx
add the y forces = Fy
Resultant force = sqrt(Fx^2 + Fy^2)
tan of angle to x axis = Fy/Fx
Find the net external force in the x direction
find the net external force in the y directin
find the magnitude and direction of the net external force of the crate
add the y forces = Fy
Resultant force = sqrt(Fx^2 + Fy^2)
tan of angle to x axis = Fy/Fx
Positive forces:
- Force to the right: +82.0 N
Negative forces:
- Force to the left: -115 N
Now, we can calculate the net external force in the x direction:
Net external force in the x direction = Sum of positive forces - Sum of negative forces
= 82.0 N - 115 N
= -33.0 N
Therefore, the net external force in the x direction is -33.0 N.
To find the net external force in the y direction, we follow the same process.
Positive forces:
- Force upward: +565 N
Negative forces:
- Force downward: -236 N
Net external force in the y direction = Sum of positive forces - Sum of negative forces
= 565 N - 236 N
= 329 N
Therefore, the net external force in the y direction is 329 N.
To find the magnitude of the net external force, we can use the Pythagorean theorem:
Magnitude of the net external force = √[(Net external force in the x direction)² + (Net external force in the y direction)²]
= √[(-33.0 N)² + (329 N)²]
≈ 331.1 N
To find the direction of the net external force, we can use trigonometry:
Angle = tan^(-1) (Net external force in the y direction / Net external force in the x direction)
= tan^(-1) (329 N / -33.0 N)
≈ -83.3°
Therefore, the magnitude and direction of the net external force of the crate are approximately 331.1 N in the direction of -83.3°.
To find the net external force in the y direction, we need to consider the forces acting in that direction. In this case, there are two forces acting in the y direction: 115 N upward and 565 N downward. The net external force in the y direction is the vector sum of these two forces. Since the force upward is smaller than the force downward, we subtract the magnitude of the force upward from the magnitude of the force downward:
Net force in y direction = 565 N - 115 N = 450 N downward.
To find the magnitude of the net external force, we need to calculate the magnitude of the resultant vector formed by the net forces in the x and y directions. We can use the Pythagorean theorem to calculate the magnitude:
Magnitude of net force = √((Net force in x direction)^2 + (Net force in y direction)^2)
Plugging in the values we found earlier:
Magnitude of net force = √((82.0 N)^2 + (450 N)^2) = √(6724 N^2 + 202,500 N^2) = √209,224 N^2 = 457.4 N.
Finally, to find the direction of the net external force, we can use trigonometry. We can calculate the angle of the resultant vector using the inverse tangent function:
Angle = tan^(-1)((Net force in y direction) / (Net force in x direction))
Plugging in the values we found earlier:
Angle = tan^(-1)(450 N / 82.0 N) = 79.2 degrees downward from the x-axis.
Therefore, the magnitude and direction of the net external force on the crate are approximately 457.4 N and 79.2 degrees downward from the x-axis, respectively.