The moment of inertia of a hollow circular section whose external diameter is 8 cm and internal diameter is 6 cm, about centroidal axis, is A. 437.5 cm4 B. 337.5 cm4 C. 237.5 cm4 D. 137.5 cm4

437.5 cm4
337.5 cm4
237.5 cm4
137.5 cm4

The correct answer is A. 437.5 cm4.

The moment of inertia of a hollow circular section about its centroidal axis is given by the following formula:

$I = \frac{\pi}{4}(d^4 – d_o^4)$

where $d$ is the outer diameter of the section, $d_o$ is the inner diameter of the section, and $\pi$ is the mathematical constant pi.

In this case, $d = 8$ cm and $d_o = 6$ cm. Substituting these values into the formula, we get:

$I = \frac{\pi}{4}(8^4 – 6^4) = \frac{\pi}{4}(256 – 144) = \frac{\pi}{4}(112) = 437.5$ cm4

Therefore, the moment of inertia of the hollow circular section is 437.5 cm4.

Option B is incorrect because it is the moment of inertia of a solid circular section. Option C is incorrect because it is the moment of inertia of a hollow circular section with an outer diameter of 6 cm and an inner diameter of 4 cm. Option D is incorrect because it is the moment of inertia of a hollow circular section with an outer diameter of 4 cm and an inner diameter of 2 cm.