# Area of a Parallelogram Calculator

If we **say** a parallelogram is **one** of the **simplest** figures in **geometry**, it will be **right**. But it can **still** make the **process** of area calculation **difficult** for some students. It may be because the **students** are **not** proficient in this **calculation**. To make the **task** simple and **fast**, you should use this **area of a parallelogram calculator**.

This online tool has been **designed** for making this calculation **easier** for everyone. Doesn’t matter whether you are a **proficient** student or **struggling** with **calculations**, this maths calculator can help you in getting the area of a **parallelogram**. Excited to **learn** about it in detail? Read on!

**Table of Contents**

## What is the area of a parallelogram?

A **parallelogram** is a **4-sided** two-dimensional **figure** with a little **similarity** to a **rectangle**. This **specific** figure has **opposite** sides of **equal** measures that is a **similarity** to a rectangle. But it **doesn’t** have all angles of **90** degrees that is the **only** difference.

As **mentioned**, it is a **2D** figure which **means** it will **absolutely** cover an **area**. The area of a **parallelogram** is the **region** that comes under its **boundaries** or side. Keep in **mind**, the area is the region that is **covered** by its **internal sides**, not external **ones**.

### What is the formula for the area of a parallelogram?

As a **parallelogram ** seems to be a **rectangle**, so, the **formula** for the area calculation for this **figure** is similar to a **rectangle** Here is the **formula** that you can **use** for area calculation:

Area of a parallelogram = Base x Height square units

Here,

- “Base” represents the horizontal sides of the parallelogram.
- “Height” shows the vertical sides of the parallelogram.

### How to find the area of a parallelogram?

It is **not** a difficult **task** to find the area of a **parallelogram** if you know the **formula** and basic **measures**. You only have to **multiply** the measure of the **base** by the measure of **height**. Here is the solved **example** to let you **understand** the method **properly**.

**Example 1:**

Find the area of a parallelogram if its base length is 5 m and height length is 11 m.

**Solution:**

As we know,

Area of a parallelogram = Base x Height square units

Area of a parallelogram = 5 x 11 m^{2}

= 55 m^{2}

### How to use the area of a parallelogram calculator?

If you don’t **want **to perform this calculation **manually**, you can use this tool by Calculator’s Bag. Here are the steps that you have to **follow** in this regard:

- Put the base length in the first input box
- Put the height length in the second input box
- This calculator will automatically show you the measure of the area of a Parallelogram

### FAQ | Area of a Parallelogram

**What is a parallelogram?**

A parallelogram is a 4-sided figure with equal measures of its opposite sides.

**How do you find the base of a parallelogram? **

If you know the area and height of the parallelogram, you have to divide the area by its height to find the length of its base of it.

**What is the rule for the area of a parallelogram? **

To find the area of a parallelogram, you only have to multiply the base by the height.

**Is it possible to find the area of a parallelogram without height? **

No, it is not possible to find the area of a parallelogram without height.

**Why is the area of a parallelogram base times height? **

It is because the lengths of the base and height are the same. So, its area is calculated by multiplying the base by the height.