Answer:
[tex]T = 7.64 kN[/tex]
[tex]F_y = 0.52 kN [/tex](Downwards)
[tex]F_x = 3.23 kN[/tex] (Towards Left)
Explanation:
As we know that beam is in equilibrium
So here we can use torque balance as well as force balance for the beam
Now by torque balance equation at the pivot we can say
[tex]F(4.50 cos\theta) + mg(2cos\theta) = T \times 3[/tex]
As we know that
mg = 1.40 kN
F = 5 kN
so we will have
[tex]5 kN(4.50 cos25) + 1.40 kN(2 cos25) = 3 T[/tex]
[tex]T = 7.64 kN[/tex]
Now force balance in vertical direction
[tex]F + mg = Tsin65 + F_y[/tex]
[tex]5 + 1.40 = 7.64 sin65 + F_y[/tex]
[tex]F_y = 0.52 kN [/tex](Downwards)
Force balance in horizontal direction
[tex]F_x = T cos65[/tex]
[tex]F_x = 7.64 cos65[/tex]
[tex]F_x = 3.23 kN[/tex] (Towards Left)
This is defined as a pulling force transmitted axially by the means of a string, a cable etc.
Torque balance equation
F(4.50cosθ) + mg(2cosθ) = T × 3
where mg = 1.40 kN and F = 5 kN
5kN(4.50cos25) + 1.40kN(2cos25) = 3T
T = 7.64kN.
Vertical Force
F+mg = Tsin65 + fy
5+1.40= 7.64sin65 +fy
fy = 0.52kN
Horizontal force
fx = Tcos65
= 7.64cos65
= 3.23kN
Read more about Tension here https://brainly.com/question/24994188
