Measure and Integration 8 - Non Measurable Set

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In this lecture, we show that there exists a non-measurable subset of [0,1).
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I've my exams but still I can't stop to take a while to praise such a brilliant teacher for whom the word brilliant is also lesser...
Such an amazing teacher i found uptill my student life, very pure explanation honest Teaching...I fell in love with measure theory just because of you ❤❤
Speciality I love that more when sir says: Are u following me? If not I'm going to explain it again 😍😍😍😍😍😍

Kashish
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Your lectures are very much useful for me sir ji.... 🙏... It is my luck to studing under your guidence in SRTM university ....

shrinivaskumawat
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Sir I love your lecture. Your explanation is extraordinary. You are my inspiration, I want to become like you. Please bless me sir 🙏 Thank you sir

veersingh-mlbb
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0:00 : Recall
2:15 : E is translation invariant under modulo 1.
17:45 : Existence of non measurable set
41:36 : Corollary : if E is non measurable set then.

Thanks .

mathematicia
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Professor, When is the new course going to start? Can't wait any longer 😢

mathematicia