Respuesta :
Answer:
The amount of stretch in the performer's leg is 0.019 mm.
Explanation:
Given:
- Mass of the performer m = 60 kg
- The radius of each leg r = 1.8 cm
- The length of each leg L= 35.0 cm
- The modulus of elasticity of bones E = 16 GPa
- Upward Force P = 3 times the weight.
Find:
how much do the bones (the femurs) in her upper legs stretch?
Solution:
- We will model the legs of the person hanging upside down grabbed from legs as two rods under tension with a force P. Where,
P = 3*W = 3*m*g
- The tensile force F in each leg (rod) is half the total force applied b/c its distributed equally between two legs:
F = P / 2 = 1.5*m*g
- Next we express the cross-sectional area of each leg(rod), assumed to be circular.
A = pi*r^2
- The elongation of bones assumed to be rods can be approximated by Euler's formula as follows:
x = F*L / A*E
Where, x: Elongation ( extension )
x = 1.5*m*g*L / E*pi*r^2
- Plug in the given values and compute x:
x = 1.5*60*9.81*0.35*10^3 / (10^916*pi*0.018^2)
x = 0.019 mm
Answer: The amount of stretch in the performer's leg is 0.019 mm.
