The area moment of inertia calculation formulas are readily available for regular cross sections. But, occasionally you may come across many mechanical design problems where you need to find out the area moment of inertia for irregular cross sections.

Say, you need to find the area moment of inertia of the following irregular section (**ABCDEF)** with respect to axis **X-X.**In the following five steps you will see how to proceed with such problems:

**Step-1**

Take a small area (**pqrs**) of depth **dy** at a distance **y **from the **XX **axis. Shown in pink color hatched area in the figure above.

**Step-2**

The small area **pqrs** can be expressed as:

**Area = Width x Depth**

**dA**** = [y*{(b-a)/ (d/2)} + a]*dy……….eqn1.1**

**Step-3**

The general equation for calculating area moment of inertia about **XX** axis is:

**Ixx**** =2*[0d/2 ∫ y²dA]……………………eqn1.2**

**Step-4**

Using **eqn1.1 & eqn1.2** we can write:

**Ixx**** =2*[0d/2 ∫ y² [y*{(b-a)/ (d/2)} + a] dy]**

**= (d^3/48)*(3b-7a)**

**Step-5**

You just derived the formula for calculating area moment of inertia for the section **ABCDEF. **You can obtain the area moment of inertia value by putting the value of **a, b **and **d.**

### Conclusion

The area moment of inertia is used in beam theory and its application. Area moment of inertia calculation formulas for the regular cross section are readily available in design data handbooks. The procedure described in this article will be useful for deriving the area moment of inertia formula for any irregular sections. Similarly, you can calculate the area moment of inertia about the axis **YY. **In case you need to calculate the area moment of inertia about the axis other than the **XX **or **YY **then you have to use the parallel axis theorem and perpendicular axis theorem.

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