The strain S on a solid object depends on the external tension force F (in Newtons) acting on the solid and on the cross-sectional area A (in m2) according to the model S = 5 × 10 − 6 · F A Find the strain for a rod with a cross-sectional area of 8.75 × 10 − 3 m 2 and a tension force of 2.45 × 10 5 N .
The strain S on a solid object depends on the external tension force F (in Newtons) acting on the solid and on the cross-sectional area A (in m2) according to the model S = 5 × 10 − 6 · F A Find the strain for a rod with a cross-sectional area of 8.75 × 10 − 3 m 2 and a tension force of 2.45 × 10 5 N .
Solution Summary: The author explains the strain for a rod with cross sectional area of 8.75times 10-3m
The strain
S
on a solid object depends on the external tension force
F
(in Newtons) acting on the solid and on the cross-sectional area
A
(in m2) according to the model
S
=
5
×
10
−
6
·
F
A
Find the strain for a rod with a cross-sectional area of
8.75
×
10
−
3
m
2
and a tension force of
2.45
×
10
5
N
.
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Area Between The Curve Problem No 1 - Applications Of Definite Integration - Diploma Maths II; Author: Ekeeda;https://www.youtube.com/watch?v=q3ZU0GnGaxA;License: Standard YouTube License, CC-BY