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Mechanical Engineering - Engineering Mechanics - Discussion

Discussion Forum : Engineering Mechanics - Section 5 (Q.No. 37)
Engineering Mechanics
37.
Moment of inertia of a triangular section of base (b) and height (h) about an axis passing through its vertex and parallel to the base, is __________ than that passing through its C.G. and parallel to the base.
nine times
six times
four times
two times
Answer: Option
Explanation:
No answer description is available. Let's discuss.
Discussion:
11 comments Page 1 of 2.
Dharani said:   4 years ago
Yes, it's 9 times.
Abhishek said:   5 years ago
9 times is correct.
Abhishek singh said:   6 years ago
Ip = IG+Ak^2
= bh^3/36+(bh/2) x (2h/3)^3
= 9bh^3/36
= bh^3/4.

Then Iv:IG
Bh^3/4:bh^3/36
1:9
Lakhan Bhavnani said:   7 years ago
Thanks @Sohan.
(1)
Sohan said:   7 years ago
You are correct @Bina Mistry.

MI about vertex= bh^3/4.
MI about centroid=bh^3/36.
Mi about base=bh^3/12.
(1)
Hari said:   8 years ago
Well said @Daka.
Daka said:   9 years ago
@Harsha Kalluri.

When I about an axis passing through its vertex and parallel to the base then 9 times.

And I about an axis passing through its base then 3 times.
Rajesh Khutdar said:   9 years ago
It's (bh^3) / 4.
BENNY said:   9 years ago
Moment of Inertia of a Triangular area.

(a) Moment of Inertia of a Triangular area of an axis XX parallel to the base and passes through C. G.

I = BH^3/36.

Moment of inertia of a triangle about;

Axis passes through base I = BH^3/12.
Harsha Kalluri said:   9 years ago
When I refer this to some other websites its answer is 3 times. Which one is correct?

And, I want to know what is the formula for the MI of the section about an axis through vertex and parallel to the base.

Thank you.
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