Part ELearning Goal:To calculate the moment of inertia for areasWhere is the centroid of the section, y shown in (Figure 2), located?composed of simpler shapes.Express your answer in cm to three significant figures.The beam section shown in (Figure 1) is composedof two horizontal flanges and a vertical web withdimensions H = 24 cm , W1 = 33 cm , and W2 =23 cm , and the plates all have thickness 2 cm .View Available Hint(s)%3DCalculate the moment of inertia of the section aboutΑΣφ?vecthe centroid axis parallel to the x-axis.cmSubmitPart FWhat is the moment of inertia of the section about its centroidal axis parallel to the x-axis?Express your answer in cmto three significant figures.Figure2 of 2• View Available Hint(s)vec?I :cm4Submit

Find the centroid and moment of inertia about centroidal axes.

Learning Goal: To calculate the moment of inertia for areas composed of simpler shapes. The beam section shown in (Figure 1) is composed of two horizontal flanges and a vertical web with dimensions H = 24 cm, W₁ = 33 cm, and W₂ = 23 cm, and the plates all have thickness 2 cm. Calculate the moment of inertia of the section about the centroid axis parallel to the x-axis. Figure 2 of 2 I Part E Where is the centroid of the section, y shown in (Figure 2), located? Express your answer in cm to three significant figures. ► View Available Hint(s) 17| ΑΣΦ ↓↑ vec ? cm Part F What is the moment of inertia of the section about its centroidal axis parallel to the x-axis? Express your answer in cm¹ to three significant figures. ► View Available Hint(s) ΠΫΠΙ ΑΣΦ vec ? Ir = Submit y = Submit cm4

Learning Goal: To calculate the moment of inertia for areas composed of simpler shapes. The beam section shown in (Figure 1) is composed of two horizontal flanges and a vertical web with dimensions H = 24 cm, W₁ = 33 cm, and W₂ = 23 cm, and the plates all have thickness 2 cm. Calculate the moment of inertia of the section about the centroid axis parallel to the x-axis. Figure 2 of 2 I Part E Where is the centroid of the section, y shown in (Figure 2), located? Express your answer in cm to three significant figures. ► View Available Hint(s) 17| ΑΣΦ ↓↑ vec ? cm Part F What is the moment of inertia of the section about its centroidal axis parallel to the x-axis? Express your answer in cm¹ to three significant figures. ► View Available Hint(s) ΠΫΠΙ ΑΣΦ vec ? Ir = Submit y = Submit cm4

Elements Of Electromagnetics

7th Edition

ISBN:9780190698614

Author:Sadiku, Matthew N. O.

Publisher:Sadiku, Matthew N. O.

ChapterMA: Math Assessment

Section: Chapter Questions

Problem 1.1MA

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Concept explainers

Moment of Inertia

Inertia can be termed as a resistance offered by a body to change its state. A rigid body initially at rest will apply resistance when acted by an external force that tends to change its state of rest or velocity, or a body initially at motion will provide resistance in changing its state of velocity or motion for coming to a state of rest. In other words, Newton's first law of motion describes the law of inertia of a rigid body.

Question

100%

Part E
Learning Goal:
To calculate the moment of inertia for areas
Where is the centroid of the section, y shown in (Figure 2), located?
composed of simpler shapes.
Express your answer in cm to three significant figures.
The beam section shown in (Figure 1) is composed
of two horizontal flanges and a vertical web with
dimensions H = 24 cm , W1 = 33 cm , and W2 =
23 cm , and the plates all have thickness 2 cm .
View Available Hint(s)
%3D
Calculate the moment of inertia of the section about
ΑΣφ
?
vec
the centroid axis parallel to the x-axis.
cm
Submit
Part F
What is the moment of inertia of the section about its centroidal axis parallel to the x-axis?
Express your answer in cm
to three significant figures.
Figure
2 of 2
• View Available Hint(s)
vec
?
I :
cm4
Submit

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