To find the tension in the supporting wire, we need to analyze the forces acting on the sign. There are two main forces: the weight of the sign and the weight of the support beam.
1. Weight of the sign:
The weight of the sign is the force acting on it due to gravity. In this case, the weight of the sign is given as 120N.
2. Weight of the support beam:
The support beam also exerts a downward force due to its weight. In this case, the weight of the support beam is given as 10N.
3. Tension in the supporting wire:
The tension in the supporting wire is the force exerted by the wire to hold the sign in place. This force acts in the upward direction.
We can break down the weight of the sign into two components: one along the support beam and one perpendicular to it.
The component along the support beam is given by:
Weight along support beam = Weight of the sign * cos(angle)
The component perpendicular to the support beam is given by:
Weight perpendicular to support beam = Weight of the sign * sin(angle)
Now, let's calculate the forces:
Weight along support beam = 120N * cos(20°) = 113.77N (rounded to two decimal places)
Weight perpendicular to support beam = 120N * sin(20°) = 41.06N (rounded to two decimal places)
Since the sign is in equilibrium, the sum of the vertical forces equals zero. Therefore, the tension in the supporting wire should be equal to the weight perpendicular to the support beam:
Tension in supporting wire = Weight perpendicular to support beam = 41.06N
Thus, the tension in the supporting wire is approximately 41.06N.