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Integration Calculus Lecture 03 Notes || Chapter 01 Module 03 For polytechnic

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Adarsh Academy S - YouTube ( Subscribe )   Applied Mathematics - ll : Integration Calculus Lecture 03 Notes| Chapter 01 Module 03 For polytechnic Topics :- - Properties Of Integration - Important Formulas Of Integration - Some Important Questions For Notes Pdf ;- Click For Download 

Integration Calculus Lecture 02 Notes || Chapter 01 Module 03 For polytechnic

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 Adarsh Academy S - YouTube ( Subscribe )   Applied Mathematics - ll : Integration Calculus Lecture 02 Notes| Chapter 01 Module 03 For polytechnic Topics :- - Basic Introduction   Of Integration - Meaning Of Integration  - About Constant For Notes Pdf ;- Click For Download 

Previous Year Semester Exam Questions Paper ; Delhi Polytechnic

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 Adarsh Academy S - ( YouTube )  Previous Year Semester Exam Questions Paper ; Delhi Polytechnic  Subject List ;-  - Environment Studies  - Construction Material Previous Year Question Paper Pdf  Click for download 

Previous Year Semester Exam Questions Paper ; Delhi Polytechnic

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Adarsh Academy S - ( YouTube )  Previous Year Semester Exam Questions Paper ; Delhi Polytechnic  Subject   List  ;-  - Applied Mathematics 02  - Applied Mechanics  - Engineering Drawing - English & Communication Skill 1  Previous Year Question Paper Click for download 

Maxima & Minima - Second Derivative Test| Ch 05 | Application Of Differentiation 08 Notes ; Polytechnic

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Adarsh Academy S - YouTube ( Subscribe ) Maxima & Minima - Second Derivative Test| Ch 05 | Application Of Differentiation 07 Notes ; Polytechnic Hey Everyone, How are you ... Today I will show you How to Solve Words Problem related to Maxima & Minima , which is chapter 06 , Application Of Differentiation ( Derivatives ), Which Is Module 02 Of Applied mathematics 02  - Lecture 08 ( Topics ) : 1 ) Maxima & Minima - Words Problem.  2 ) Some Important Questions  3 ) Lecture Related Questions. 1 ) Maxima & Minima - Words Problem - Step Required To Find Maxima & Minima ; Step 01 ) F' ( x ) = 0  Step 02 ) Determine extreme Points . Step 03 ) Then Differentiate F'(x ) again And find second order derivatives. Step 04 ) Then Put the extreme point On f''(x )  Case l ) F''(x) |x=C1 <0 C1 Point of Maxima Case ll ) F'' (x ) | x = C2 > 0  Case lll ) F''(x) |x=C2 = 0 - Go to first Derivative test Check the sign of F'(x )  Step ...

Maxima & Minima - Second Derivative Test| Ch 05 | AOD 07 Notes.

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Adarsh Academy S - YouTube ( Subscribe ) Maxima & Minima - Second Derivative Test| Ch 05 | Application Of Differentiation 07 Notes ; Polytechnic Hey Everyone, How are you ... Today I will show you How to Find Maxima & Minima Of A Given Function by using Second derivative test , which is chapter 06 , Application Of Differentiation ( Derivatives ), Which Is Module 02 Of Applied mathematics 02  - Lecture 07 ( Topics ) : 1 ) Maxima & Minima - Second Derivative Test  2 ) Some Important Questions  3 ) Lecture Related Questions. 1 ) Maxima & Minima - Second Derivative Test . - Step Required To Find Maxima & Minima ; Step 01 ) F' ( x ) = 0  Step 02 ) Determine extreme Points . Step 03 )  Then Differentiate F'(x ) again And find second order derivatives. Step 04 )  Then Put the extreme point On f''(x )  Case l ) F''(x) |x=C1 <0 C1 Point of Maxima Case ll ) F'' (x ) | x = C2 > 0  Case lll ) F''(x) |x=C2 = 0 - Go to first Der...

Maxima & Minima - First Derivative Test| Ch 05 | Application Of Differentiation 06 Notes ; Polytechnic

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Adarsh Academy S - YouTube ( Subscribe ) Maxima & Minima - First Derivative Test| Ch 05 | Application Of Differentiation 06 Notes ; Polytechnic  Hey Everyone, How are you ... Today I will show you How to Find Maxima & Minima Of A Given Function by using first derivative test , which is chapter 06 , Application Of Differentiation ( Derivatives ), Which Is Module 02 Of Applied mathematics 02 . - Lecture 06 ( Topics ) : 1 ) Maxima & Minima - First Derivative Test  2 ) Some Important Questions . 3 ) Lecture Related Questions. 1 ) Maxima & Minima - First Derivative Test . - Step Required To Find Maxima & Minima ; Step 01 ) F' ( x ) = 0  Step 02 ) Allocate extreme Points on the number link  Step 03 ) Check the sign of F' ( x ) in each interval  Step 04 ) If Sign change positive to negative then value of x called point of Maxima  Step 05 ) If Sign change negative to positive then value of x called point of Minima Step 06 ) Then find maximum ...

Maxima & Minima - Basic Introduction| Ch 05 | Application Of Differentiation 05 Notes ; Polytechnic

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Adarsh Academy S - YouTube ( Subscribe ) Maxima & Minima - Basic Introduction| Ch 05 | Application Of Differentiation 05 Notes ; Polytechnic  Hey Everyone, How are you ... Today I will show you How to Find Maxima & Minima Of A Given Function, which is chapter 05 , Application Of Differentiation ( Derivatives ), Which Is Module 02 Of Applied mathematics 02 . - Lecture 05 ( Topics ) : 1 ) Maxima & Minima - Basic Concept . 2 ) Some Important Questions . 3 ) Lecture Related Questions. ( Overview ) 1 ) Maxima & Minima - Basic Concept . - Maxima . ( Maxima ) - In this graph , y = f( x )  Value of function F ( C ) is called Maxima Of Graph & Maximum value of function & Pont C is called Point of Maxima Of Given function. - Minima  , ( Minima ) -  In this graph , y = f( x )  Value of function F ( C ) is called Minima Of Graph & Minima value of function & Pont C is called Point of Minima Of Given function. - Local Maxima & Local Minima...

Tangents & Normals| Ch 05 | Application Of Differentiation 03 Notes ; Polytechnic.

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  Adarsh Academy S - YouTube (  Subscribe  ) Tangents & Normals| Ch 05 | Application Of Differentiation 03 Notes ; Polytechnic Hey Everyone, How are you ... Today I will show you How To Find Out Equation Of Tangent & Equation Of Normals| chapter 05 | Application Of Differentiation , Which Is Module 02 Of Applied mathematics 02 . - Lecture 04 ( Topics ) : 1 ) Tangents & Normals - Basic Concept . 2 ) Some Important Questions . 3 ) Lecture Related Questions. 1 ) Equation Of Tangent - Basic Concept . - Equation Of Curve ( y ) = F (x )  - Tangent passing through point A ( X' , y' )  Then,          Equation Of Tangent                            ( y - y' ) = m' ( x - x' )  Where, m = F'( x ) | (x' , y' )   * Equation Of Normal ; - Slope Of Normal ( m2 )                            ...