Answer:
y_c = 130 mm
stress = 10 MPa
Step-by-step explanation:
Given:
y_c = sum (A_i*y_i) / sum (A_i)
A_i : Unit Surface Area
y_i: Distance between the axis of unit surface and x-axis.
Find:
a) y_c y-coordinate of centroid.
b) Average normal stress
Solution:
- Compute 3 unit surface Areas:
A_1 = 800*80*0.5 = 12,000 m^2
A_2 = 300*120 = 36,000 m^2
A_3 = 800*80*0.5 = 12,000 m^2
- Compute 3 distance between the axes, A_i and x-axis:
y_1 = 300 / 3 = 100 mm
y_2 = 300 / 2 = 150 mm
y_3 = 300 / 3 = 100 mm
- Compute y_c:
y_c = (2*12,000*100 + 36,000*150) / (2*12,000+36,000)
y_c = 130 mm
- For normal stress
stress = F / A
stress = 600KN / (0.5*(0.4)*0.3)
stress = 600 KN / 0.06
stress = 10 MPa
