Answer:
42.69 N and 18.07 N
Explanation:
We are given that
Mass of ladder=6.2 kg
Length of ladder=1.97 m
Distance of Sawhorse A from one end=0.64 m
Distance of sawhorse B from other end=0.17 m
Let center of Ladder=[tex]\frac{1.97}{2}=0.985 m[/tex]
Now, the distance of sawhorse A from center=r=0.985-0.64=0.345 m
Distance of sawhorse B from center of ladder=0.985-0.17=0.815 m
Force one ladder due to gravity=mg=[tex]6.2\times 9.8=60.76N[/tex]
Where [tex]g=9.8 m/s^2[/tex]
Torque applied on Sawhorse A=[tex]0.345F_a[/tex]
Torque applied on Sawhorse B=[tex]0.815F_b[/tex]
In equilibrium
[tex]0.345F_a=0.815F_b[/tex]
[tex]F_b=\frac{0.345}{0.815}F_a[/tex]
Total force=[tex]F_a+F_b[/tex]
[tex]F_a+\frac{0.345}{0.815}F_a=60.76[/tex]
[tex]\frac{0.815F_a+0.345F_a}{0.815}=60.76[/tex]
[tex]\frac{1.16}{0.815}F_a=60.76[/tex]
[tex]F_a=\frac{60.76\times 0.815}{1.16}=42.69 N[/tex]
[tex]F_b=\frac{0.345}{0.815}\times 42.69=18.07 N[/tex]
