Question**: A cone has a base radius of 4 meters and a slant height of 5 meters. What is the lateral surface area of the cone?

Question**: A cone has a base radius of 4 meters and a slant height of 5 meters. What is the lateral surface area of the cone? - Minimundus.se

Understanding the Lateral Surface Area of a Cone: A Beginnerâs Guide

📅 February 23, 2026 👤 scraface

Feb 23, 2026

Understanding the Lateral Surface Area of a Cone: A Beginnerâs Guide

When studying geometry, one of the most common and practical questions involves calculating the lateral surface area of a cone. Whether you're designing a cone-shaped poster, planning a cone-shaped garden structure, or solving textbook problems, knowing how to find this measurement is essential.

In this article, weâll explore how to calculate the lateral surface area of a cone using real-world values: a cone with a base radius of 4 meters and a slant height of 5 meters.

Understanding the Context

What Is Lateral Surface Area?

The lateral surface area refers to the area of the coneâs side surface only â not including the top or bottom base. Mathematically, the formula to calculate the lateral surface area ( A ) of a cone is:

[
A = \pi r l
]

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[ANSWERED] A cone with a slant height of 25 meters has a radius 15 - Kunduz

Key Insights

where:
- ( r ) = radius of the base
- ( l ) = slant height (the distance from the base edge to the apex along the coneâs surface)

Step-by-Step Example: Cone with r = 4 m, l = 5 m

Given:
- Base radius ( r = 4 ) meters
- Slant height ( l = 5 ) meters

Plug these values into the formula:

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Final Thoughts

[
A = \pi \cdot 4 \cdot 5 = 20\pi \ \ ext{square meters}
]

Final Calculation

[
A pprox 20 \ imes 3.1416 pprox 62.83 \ \ ext{m}^2
]

So, the lateral surface area of the cone is approximately 62.83 square meters.

Why This Matters

Calculating the lateral surface area is crucial in many real-life applications, including:

Estimating material requirements for cone-shaped cones (like party hats, traffic cones, or cone-shaped planters)
- Designing architectural elements
- Solving problems in calculus and advanced geometry