Cone Surface Area Calculator

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Introduction to Cone Surface Area Calculator

A cone calculator is an online tool that calculates a cone-shaped object's surface area. It uses the surface area formula to calculate the total space occupied by the three-dimensional shape of a cone. It takes the base radius and the height of the cone to calculate the total surface area.

Many shapes and their geometrical properties are discussed in geometry using different formulas. The surface area formula is one of those formulas that help to find the space or area occupied by the 3D shape. So we introduce a tool that can calculate the surface area of a cone with just one click.

The Formula used by Total Surface Area of a Cone Calculator

A cone is a three-dimensional shape having a circular base and a curved surface. The surface area of a cone is the total space occupied by its base and curved surface. The surface area of the cone can be calculated by using the following formulas;

  1. To calculate area of the base surface,
  2. $$ Base \;Surface \;Area \;=\; π×r^2 $$
  3. Lateral surface area can be calculated as,
  4. $$ Lateral \;Surface \;Area \;=\; π×r^2 \sqrt {r^2 \;×\; h^2}$$
  5. Total surface area of the cone is,
  6. $$ A \;=\; Base \;Surface \;Area \;+\; \;Lateral \;Surface \;Area $$ $$ A \;=\; π×r^2 \;+\; π×r^2 \;×\; \sqrt {r^2 \;×\; h^2} $$

Where r is the radius of the base surface of the cone and h is the height of the curved surface.

How to use a Cone Calculator with Steps?

It is a straightforward way to calculate the surface area of the cone using this tool. Follow the given steps to use it;

  1. Enter the radius of the base face of the cone.
  2. Enter the height of the cone.
  3. Click on the calculate button.
  4. You can also use the load example button to select a random example.

As you click on the calculate button, the surface area of the cone by given radius and height will be calculated quickly.

Why use a Cone Area Calculator with Steps?

The cone refers to a three-dimensional shape having a circular base and a lateral surface. The surface area of a cone is calculated to measure how much space it occupies within some specific region. Due to its three-dimensional structure, it is difficult to identify the formula used to find the surface area. But it would become easy for you with a cone surface area calculator.

Another reason to use this tool is that it evaluates cone surface area with any radius and height. This means that it can handle any Value of radius and size of the curved surface of the cone. That's why you need to use this tool.

Benefits of using Surface Area Calculator Cone

Like other tools offered by calculatores, a cone area calculator is also efficient. It also has some amazing properties given below;

  • Surface area of a cone calculator is easy to use because it has a simple, user-friendly interface, so you don't need to take any tutorials.
  • It has a fantastic feature of the load example option, where you can select already fed examples.
  • It provides you with an easy and step-by-step solution and clarification of formulas.
  • It is a free tool that does not demand any processing fee.
  • Cone surface area calculator makes the solution easier for you by calculating the surface area for both the base and lateral surface separately.

FAQ’s

How to find the surface area of a cone?

You can easily find the surface area of a cone by adding the surface area of base and the curved surface. You can also use the following formula;

$$ A \;=\; Base \;Surface \;Area \;+\; \;Lateral \;Surface \;Area $$ $$ A \;=\; π×r^2 \;+\; π×r^2 \;×\; \sqrt {r^2 \;×\; h^2} $$

Where r is the radius and h is the height of the curved surface.

How to find the surface area of a cone calculator?

You can find it from your search engine by using the following link, https://calculatores.com/cone-surface-area-calculator

Alan Walker

Alan Walker

Last Updated June 02, 2022

Studies mathematics sciences, and Technology. Tech geek and a content writer. Wikipedia addict who wants to know everything. Loves traveling, nature, reading. Math and Technology have done their part, and now it's the time for us to get benefits.