---
title: Elastic Deformation
slug: elastic-deformation-e5f59
url: /detay/elastic-deformation-e5f59
type: article
language: English
entity:
  primary: Elastic Deformation
  type: article
  disambiguation: Understand elastic deformation:  Objects returning to their original shape after force removal. Learn about stress, strain & the elastic region.
  categories:
    - name: Aviation And Space
      slug: havacilik-ve-uzay
      url: /kategori/havacilik-ve-uzay
    - name: Materials Science, Metallurgy And Ores
      slug: malzeme-bilimi-metalurji-ve-maden
      url: /kategori/malzeme-bilimi-metalurji-ve-maden
    - name: Defense Industry Technologies
      slug: savunma-sanayi-teknolojileri
      url: /kategori/savunma-sanayi-teknolojileri
  tags:
    - Elastic Deformation
author: Elyesa Köseoğlu
created_at: 2025-05-29T22:46:02.033542+03:00
updated_at: 2025-06-12T20:14:50.274942+03:00
---

# Elastic Deformation 

<!-- CONTEXT: Article Content for "Elastic Deformation " -->

## Article Content

The ability of an object to return to its original form upon the removal of the applied force is called [elastic deformation](/en/detay/elastik-deformasyon/llms.txt).

![Image](https://cdn.kureansiklopedi.com/media/uploads/2025/06/12/LoCb63tqTY9bN7FGwuGcic5kbgYQWhQk.png)
*Graphic of Elastic Deformation (Generated by AI)*

### **Derivation**

In a [stress-strain graph](/en/detay/stress-strain-curve-a3412/llms.txt), the area under the linear region is referred to as the [elastic region](/en/detay/elastic-deformation-b0a94/llms.txt). Whether an object has exceeded its elastic deformation region is determined by the stress value the material reaches under load. Accordingly, if the stress value in the part under load does not exceed the [yield point](/en/detay/akma-noktasi-yield-point/llms.txt) of the material, the structure remains within the boundaries of the elastic region, and only temporary deformation is involved (elastic deformation).

<!-- CONTEXT: Academic Sources and References for "Elastic Deformation " -->

## Academic Sources and References

1. Beer, F. P., E. R. Johnston, J. T. Dewolf ve D. F. Mazurek. Mechanics of Materials. 4. baskı. Çev. A. Soyucok ve Ö. Soyucok. 6. basım. New York: McGraw-Hill, 2006.