# Fourier Series in Hindi Part 14

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Fourier Series,Fourier Series Example,Half Range Fourier Sine Series,Half Range,Half Range Fourier Sine Series Example,engineering classes,example of half range sine fourier series,half range fourier cosine series,Half range fourier series,examples on half range cosine fourier series,half range cosine fourier series,half range sine fourier series,half range fourier series in hindi,fourier series in hindi,fourier series lecture in hindi JK ENGINEERING CLASSES(JK SMART CLASSES)introduced full course of most difficult subject name is ENGINEERING MATHEMATICS 3(M-3)in engineering field for all B.TECH TRADE(EE,CE,AE,ME,ECE and CSE,IT) in this video ,we discuss the HOW TO COMPUTE EVEN & ODD FUNCTION OF FOURIER SERIES IN HINDI

14.Fourier Series Example -Half Range Fourier Sine Series Example By Engineering Classes |GTU|PTU|

https://youtu.be/HjnU-luoZVs

https://youtu.be/HjnU-luoZVs

Fourier Series,Fourier Series Example,Half Range Fourier Sine Series,Half Range,Half Range Fourier Sine Series Example,engineering classes,example of half range sine fourier series,half range fourier cosine series,Half range fourier series,examples on half range cosine fourier series,half range cosine fourier series,half range sine fourier series,half range fourier series in hindi,fourier series in hindi,fourier series lecture in hindi JK ENGINEERING CLASSES(JK SMART CLASSES)introduced full course of most difficult subject name is ENGINEERING MATHEMATICS 3(M-3)in engineering field for all B.TECH TRADE(EE,CE,AE,ME,ECE and CSE,IT) in this video ,we discuss the HOW TO COMPUTE EVEN & ODD FUNCTION OF FOURIER SERIES IN HINDI

EVEN FUNCTION

A function y = f(x) is said to be even, if f(-x) = f(x). The graph of the even function is always symmetrical about the y-axis.

ODD FUNCTION

A function y=f(x) is said to be odd, if f(-x) = – f(x). The graph of the odd function is always symmetrical about the origin. For example, the function f(x) = in [-1,1] is even as f(-x) = = f(x) and the function f(x) = x in [-1,1] is odd as f(-x) = -x = -f(x). The graphs of these functions are shown below : 1. If f(x) is even and g(x) is odd, then

• h(x) = f(x) x g(x) is odd

• h(x) = f(x) x f(x) is even

• h(x) = g(x) x g(x) is even

A function y = f(x) is said to be even, if f(-x) = f(x). The graph of the even function is always symmetrical about the y-axis.

ODD FUNCTION

A function y=f(x) is said to be odd, if f(-x) = – f(x). The graph of the odd function is always symmetrical about the origin. For example, the function f(x) = in [-1,1] is even as f(-x) = = f(x) and the function f(x) = x in [-1,1] is odd as f(-x) = -x = -f(x). The graphs of these functions are shown below : 1. If f(x) is even and g(x) is odd, then

• h(x) = f(x) x g(x) is odd

• h(x) = f(x) x f(x) is even

• h(x) = g(x) x g(x) is even