a 3.0 m long rigid beam with a mass of 100 kg is supported at each end. an 80 kg student stands 2.0 m from support 1. how much upward force does each support exert on the beam? - QAmmunity.org

a 3.0 m long rigid beam with a mass of 100 kg is supported at each end. an 80 kg student stands 2.0 m from support 1. how much upward force does each support exert on the beam?

asked Feb 22, 2024 59.6k views

1 Answer

Answer:

$752.1\; {\rm N}$ from support
$\texttt{1}$ (
$2.0\; {\rm m}$ from the student.)

$1013.7\; {\rm N}$ from support
$\texttt{2}$ (
$1.0\; {\rm m}$ from the student.)

(Assuming that
$g = 9.81\; {\rm N\cdot kg^(-1)}$ , the beam is level with negligible height, and that the density of the beam is uniform.)

Step-by-step explanation:

Weight of the beam:
$(100\; {\rm kg})\, (9.81\; {\rm N\cdot kg^(-1)}) = 981\; {\rm N}$ .

Weight of the student:
$(80\; {\rm kg})\, (9.81\; {\rm N\cdot kg^(-1)}) = 784.8\; {\rm N}$ .

Assuming that the beam is uniform. The center of mass of the beam will be
$(1/2)\, (3.0\; {\rm m}) = 1.5\; {\rm m}$ away from each support.

Consider support
$\texttt{1}$ as the fulcrum:

For support
$\texttt{2}$ (with an upward force of
$N_{\texttt{2}}$ ), the lever arm is
$3.0\; {\rm m}$ .
For the center of mass of the beam (
$981\; {\rm N}$ ), the lever arm is
$1.5\; {\rm m}$ .
For the weight of the student (
$784.8\; {\rm N}$ ), the lever arm is
$2.0\; {\rm m}$ .

Hence:

$\begin{aligned}N_{\texttt{2}}\, (3.0) = (981)\, (1.5) + (784.8) \, (2.0) \end{aligned}$ .

$\begin{aligned}N_{\texttt{2}} &= ((981)\, (1.5) + (784.8) \, (2.0))/(3.0) \; {\rm N} = 1013.7\; {\rm N}\end{aligned}$ .

In other words, support
$\texttt{2}$ would exert an upward force of
$1013.7\; {\rm N}$ on the beam.

Similarly, consider support
$\texttt{2}$ as the fulcrum:

For support
$\texttt{1}$ (with an upward force of
$N_{\texttt{1}}$ ), the lever arm is
$3.0\; {\rm m}$ .
For the center of mass of the beam (
$981\; {\rm N}$ ), the lever arm is
$1.5\; {\rm m}$ .
For the weight of the student (
$784.8\; {\rm N}$ ), the lever arm is
$(3.0 - 2.0)\; {\rm m} = 1.0\; {\rm m}$ .

Hence:

$\begin{aligned}N_{\texttt{1}}\, (3.0) = (981)\, (1.5) + (784.8) \, (1.0) \end{aligned}$ .

$\begin{aligned}N_{\texttt{1}} &= ((981)\, (1.5) + (784.8) \, (1.0))/(3.0) \; {\rm N} =752.1\; {\rm N}\end{aligned}$ .

In other words, support
$\texttt{1}$ would exert an upward force of
$752.1\; {\rm N}$ on the beam.

Vadiraja K answered Feb 26, 2024

8.3k points

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