Bitsat Minimum aggregate in PCM
Posted by admin in Uncategorized on February 28, 2010
No. of questions:
There will be 150 questions in all. The number of questions in each part is as follows:
| Subject | No of questions | |
| Part I | Physics | 40 |
| Part II | Chemistry | 40 |
| Part III | (a) English Proficiency | 15 |
| (b) Logical Reasoning | 10 | |
| Part IV | Mathematics | 45 |
| Total:150 |
BITSAT is a three hour exam and there is no time limit for individual parts of the test.
Additional Questions:
Unique question paper for each candidate:
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Answers to Frequently asked questions
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I am unable to access the Online application. Can you send the application form by email or post?
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The application cannot be sent by email. If you get any specific error while applying, please send an email to admnoc@bits-pilani.ac.in for help with details. If you are unable to apply online in spite of all efforts, please obtain the form by post as explained in the advertisement.
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I have taken Physics, Chemistry and Biology in 10+2.Am I Eligible to Apply for BITSAT.
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For BITSAT 2010 Candidates should have taken Physics, Chemistry and Mathematics in 10+2. |
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I have completed the online application. But, I have not taken a print out. How can I get a print out now?
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You can go to the applying online page again and enter the personal details AND the application number. You will be taken to the printout page again. If you have forgotten your application number, and If you have not posted the form, apply afresh with another application number.
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I have made a mistake while entering some data in my application form. How can I edit/correct it?
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If you have not posted the form, apply afresh with another application number. If you have already sent the form by post to admissions office, You cannot edit it Online. If the mistake is minor, you can send a written signed request for the correction. However, if you want to change the center preferences, you will have to apply afresh with a new application fees.
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My 12th exam results are not expected before 30th June. Should I apply for BITSAT-2010?
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For admissions to I semester staring in August, you should have your result before 30th June. Otherwise, we make a few admissions to II semester starting in January for which you can apply. Keeping that in mind, you may appear in BITSAT-2010.
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I passed 12th in 2009. I didn’t get 80% aggregate in PCM .Am I eligible if I repeat some of the subjects to get the required 80% marks?
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If you are repeating 12th exam, you should do it for the all the subjects required to pass 12th again. If you take improvement exams in PCM . only, you are not eligible.
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What are the tuition and other fees and expenses?
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The fee details for 2010-11 are yet to be finalised. The details will be available at BITS website by March.
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I passed 12th exam in 2009. Am I eligible to appear for BITSAT-2010?
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As advertised, are eligible to Apply for BITSAT -2010.
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I had appeared in BITSAT-2009 but my marks were below the cut-off marks. Can I appear in BITSAT-2010?
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Yes. as advertised subject to eligibility conditions you can apply again for BITSAT-2010.
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What is the application procedure for NRIs?
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There is no separate procedure for NRIs.
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What is the application procedure for candidates with foreign qualifications?
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There is no separate procedure. They have to apply similar to Indian students.
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How am I Eligible for admission to M.Sc.(Hons.) and M.Sc.(Tech.) programmes after 12th?
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The M.Sc.(Hons.) and M.Sc.(Tech.) programmes are integrated 4-year masters programme after 12th. There is no intermediate BSc. degrees awarded.
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I have passed 12th in the year 2008 (or earlier). I am now doing my higher studies (B.Sc./B.E./Diploma) in another college. Can I apply for BITSAT-2010?
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You are NOT eligible to appear in BITSAT-2010.
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Ebooks for IIT-JEE
Posted by admin in Uncategorized on January 26, 2010
Ebooks for IIT-JEE
Some ebooks for you preparation …….
Problems in Calculus of One Variable: With Elements of Theory
by I. A. Maron
Introduction to Electrodynamics by David J. Griffiths
password : twilightzone
Problems in general physics
by: I. E Irodov
download
Solutions
download
Fundamentals of Physics Halliday-Resnick-Walker
download
Solutions
download
Organic Chemistry Study Guide by Robert Thornton Morrison
Fundamentals of
download
Thomas’ Calculus, 11th Edition (Thomas Series) by: George B. Thomas, Maurice D. Weir
download
solutions
download
Plane Trigonometry by: S.L. Loney
download
password
twilightzone
The Elements Of Coordinate Geometry, by S. L. Loney
Solutions Manual to Accompany
Physical Chemistry by Peter Atkins
download
password
twilightzone
Physical Chemistry Solution Manual by: Julio de Paula, Peter Atkins
University Physics with Modern Physics by: Hugh D. Young, Roger A. Freedman
Feynman Lectures On Physics (3 Volume Set) by: Richard P. Feynman
Exercise booklets for Feynman’s Lectures On Physics by: Richard Feynman
Modern Physics by Paul A. Tipler
download
password
twilightzone
An Introduction to Probability Theory and Its Applications, Volume 2 by William Feller
An Introduction to Probability Theory and Its Applications, Volume 1 by: William Feller
download
A Guidebook to Mechanism in
Need more books? comment here we will try to upload them
2010 Bitsat forms – Bitsat application – Bitsat 2010 notification
2010 Bitsat forms – Bitsat application – Bitsat 2010 notification
Birla Institute of Technology and Science (BITS) Pilani is all India Institution that decided the admissions to all the Integrated First Degree programmes of BITS, at Pilani campus, Goa campus, and Hyderabad Campus for the academic year 2010-11 to be made on the basis of a Computer based Online Test. This test is called as BITS Admission Test-2010 and in short as BITSAT-2010. Here the information is mentioned about the Bitsat 2010 forms, notifications, deadlines, etc.
Integrated First Degree Programmes to which admissions will be made on the basis of BITSAT-2010:
(i) at BITS, Pilani – Pilani Campus:
- B.E.(Hons.): Chemical, Civil, Computer Science, Electrical and Electronics, Electronics & Instrumentation, Mechanical, Manufacturing .
- B.Pharm.(Hons.);
- M.Sc.(Hons.): Biological Sciences, Chemistry, Economics, Mathematics, Physics and
- M.Sc.(Tech.): General Studies, Finance, Information Systems.
(ii) at BITS, Pilani – Goa Campus:
- B.E.(Hons.): Chemical, Computer Science, Electrical and Electronics, Electronics & Instrumentation, Mechanical.
- M.Sc.(Hons.): Biological Sciences, Chemistry, Economics, Mathematics, Physics. and
- M.Sc.(Tech.): Information Systems.
(iii) at BITS, Pilani – Hyderabad Campus:
- B.E.(Hons.): Chemical, Civil, Computer Science, Electronics & Communication, Electrical and Electronics, Mechanical.
- B.Pharm.(Hons.);
- M.Sc.(Hons.): Biological Sciences, Chemistry; Economics, Mathematics, Physics and
- M.Sc.(Tech.): Information Systems.
Please Note: All students admitted to M.Sc(Hons.) programmes are given an option to work for a second degree for one of the B.E. (Hons.)/B.Pharm.(Hons.) programmes under the dual degree scheme, assignment being made by competition on their performance at BITS at the end of first year, separately in Pilani, Goa and Hyderabad campuses. Under this scheme, a student normally requires five years to complete both the degrees and is awarded both the degrees, namely M.Sc.(Hons.) and B.E.(Hons.)/B.Pharm.(Hons.)
Eligibility Criteria:
To appear in BITSAT, you need to score at least 80% aggregate in PCM (Physics, Chemistry and Maths) in your Class-12th exam. You should have also at least 60% marks in each of these three subjects separately. If you are going to appear your Class-12th final exam in 2010 or have already passed the same in 2009, only then you can appear in BITSAT 2010.
If you are a first ranker in 12th class of any central or state board, you would be able for direct admission to the programme of your choice, irrespective of your BITSAT-2010 score.
How to Apply for BITSAT 2010?:
Candidates can get Application form and information brochure by cash payment or by sending DD of Rs. 900/ and the cost of the application will be Rs.800/- and Rs.400/- for SC/ST and all the female candidates. Get more details from here.
BITSAT 2010 model of examination:
- Physics-40
- Chemistry-40
- English Proficiency-15
- Logical Reasoning-10
- Mathematics-45
Important dates and deadlines:
| Deadline to apply for BITSAT-2010 | 30th January 2010 |
| Test center allotment and announcement to candidates | by 15th February 2010 |
| Candidates to reserve Test dates | 18th Feb. – 10th March 2010 |
| Candidates to download the Hall tickets with instructions | 10th April – 30th April 2010 |
| BITSAT Online tests | 10th May – 10th June 2010 |
| Candidates to apply for admission with 12th marks and preferences to Degree programmes | 20th May – 30th June 2010 |
| Admit List and Wait List announcement | 1st July 2010 |
Source: http://www.bitsadmission.com/
Check www.bitsadmission.com for more details,
If u have any doubts regarding this comment here,we will help you 
Last 3 years IITJEE Mathematics Percentage
Source : mathiit
If u want to know the percentage of other subject comment here
Check Application Status Of IIT JEE 2010
Posted by admin in Uncategorized on January 26, 2010
Check Application Status Of IIT JEE 2010:
- Click on this link: CLICK HERE and enter your IITJEE application form number and the corresponding information will be displayed.
- Click on this link: CLICK HERE and enter your speed post number and your email id.
Students who applied to online can check their status here CLICK HERE
If you have any doubt comment here we will help you
AIEEE 2009 Experience –by Rehan (Sumeet Paul)
Posted by admin in AIEEE, Material/Books on January 26, 2010
Sorry , Rehan (Sumeet Paul) to post it here without informing you ,But i thought it is good to share it to many more ,so that they will learn much more
Hi guys, I want to share my experience on how it feels when you go for AIEEE, the largest single day exam in the world…and hope you don’t
make the mistake which I did…
Morning, 8:45 am:
I headed towards my test center. I was quite nervous, anxious and other tons of useless thoughts running through my head. I had a PRE-DECIDED STRATEGY. I decided to solve 50-55 questions out of 105 questions with more emphasis on chemistry and maths, as my physics knowledge is as much disaster as Bangladesh team against Australia .
Morning 9:00 a.m:
Wow! What a sight it was, so many students with their parents holding up books and strolling here and there. The atmosphere was much more electric than IIT-JEE.
Morning 9:15 am:
I found my seat, sat there, and suddenly 1 more boy sat next to me!!!
I didn’t know AIEEE exam is given like this, and in a moment the whole class was full! NOW, WHO WON’T CHEAT, WHEN YOU’RE GIVEN EXAM SITTING WITH ANOTHER BUDDY?? It soothed my nerves to great extent.
Morning 9:20 a.m:
Question paper and OMR sheets were handed over…
**WORD OF CAUTION to 2010 aspirants**
USE BALL-PEN, many did the mistake. Of using pencil as in JEE.
And do fill the particulars damn carefully.
9:30 a.m. EXAM BEGINS!!!
What? Ye kya hai? Someone shouted, and I soon realized the reason…
AIEEE 2009
432 marks 90 questions, 4 marks questions and 8 MARKS QUESTIONS!!!
All my strategies, plans whitewashed, I didn’t expect such a change.
**WORD OF CAUTION TO 2010 aspirants**
don’t expect the pattern to be the same, AIEEE is known for throwing BIG surprises every year.
Just keep in mind 40-50% of the exam, and you are through.
Morning 9:30 to 10:30 am
I attempted MATHS first and it was the toughest Maths in the history of AIEEE!! My confidence dipped significantly, I just broke down in Tears! I could solve only 7 questions out of 30!
**WORD OF CAUTION**
NEVER attempt Maths first as you would be really EXHAUSTED in the very first hour!
Morning 10:30 to 11:30 am
Chemistry came. THE EASIEST IN THE HISTORY OF AIEEE! Solved 19 out of 30!
Tears gone! Smiles back!
11:30 to 12.30 pm, the LAST HOUR
Physics made me Phy(sick) the level was higher than the last 2 years, but I managed to solve 11/30…(not bad for mediocre student like me)
The last 15 minutes
So in all I solved 37/90 questions, no chance for NIT. Then I did which one shouldn’t do, I CHEATED. 11 Questions that too many were 8 marks questions!!!
I thought DO or DIE.
And the results came, I DIED. The person from whom I cheated was just a wild guesser…9 out of 11(7 were 8 marks ones) were wrong
And I got a rank which couldn’t fetch me a good college even on Pluto!!!
So AIEEE aspirants, here is my advice for you…
- Solve as much you know, never ever cheat, blind guess, or waste too much time on a single question.
- Just aim a sure 40-50%…don’t expect any pattern, any difficulty level, you never know how AIEEE 2010 may surprise you!
- Don’t get nervous, or excited by completing one subject, be emotionally balanced.
- Don’t mess with Maths at first go! No matter how strong you are in Maths.
- Look above 4 points!
Best of luck for AIEEE …
The logarithmic form for inverse hyperbolics
Posted by admin in AIEEE, BITSAT, IITJEE, Material/Books on January 26, 2010
It is sometimes more useful to write the inverse hyperbolic functions as logarithms, as these can be easier to manipulate.
We’ll start with the sinh-1 function again. Let’s say y=sinh-1(x), so as before this means x=sinh(y).
Now, the reason that logs get involved goes back to the original definitions of the sinh and cosh functions, which were in terms of exponentials.
Remember that:
If we add these two equations together, the e-x terms cancel out, and we just end up with:
sinh(x)+cosh(x)=ex.
This result is true whatever the name of the variable, so we can just as well write:
sinh(y)+cosh(y)=ey.
Using the relation above, that x=sinh(y), we can rewrite this equation as
x+cosh(y)=ey.
Now we can use the identity “cosh2(y)-sinh2(y)=1″ to write the “cosh(y)” in terms of sinh(y), which we’re then able to replace by x. This gives:
x+(x2+1)1/2=ey.
We’re nearly there now. If we just take logs to base e of both sides, to bring down the “y”, we’ll have an equation giving us y, and since y=sinh-1(x), the equation will be giving us an alternative form for the function sinh-1(x). So let’s do that:
ln[x+(x2+1)1/2]=y
so, swapping sides and replacing y by sinh-1(x), we get:
sinh-1(x)=ln[x+(x2+1)1/2].
This gives us a way of writing the inverse sinh function entirely in terms of functions we know already, namely logs and power functions.
We can carry out a similar procedure for cosh-1(x), to find the corresponding result:
cosh-1(x)=ln[x+(x2-1)1/2].
Let’s see whether this log form for the sinh-1 function gives the slow log-like growth for large x-values that we saw earlier.
To do this, we need to look at how the function ln[x+(x2+1)1/2] behaves as x gets large.
As x gets larger, the “1″ in the (x2+1) term becomes much smaller than the x2. So we can approximate the (x2+1) by just x2, and this approximation will become more accurate the larger x gets.
That means that (x2+1)1/2 is approximately just x, so the approximation to our equation for large values of x is:
sinh-1(x)=ln[2x].
This does give the slow log-like growth we were looking for.
Competitive Exams Previous exam papers -AIEEE, AIMS, CAT, EAMCET, GATE-EE&ECE&ME, MBA, MCA, MAT
Posted by admin in AIEEE, BITSAT, IITJEE, Material/Books on January 26, 2010
AIEEE-2002.pdf (21.03 MB) AIEEE-2003.pdf (24.38 MB) AIEEE-2004.pdf (28.8 MB) AIEEE-2005.pdf (27.27 MB) AIEEE-2006.pdf (17.89 MB) AIEEE-2007.pdf (13 MB) AIEEE-2008.pdf (14.89 MB)
All India Institute of Medical Sciences – AIMS – 10 Papers
AIIMS-1998.pdf (14.49 MB) AIIMS-1999.pdf (16.92 MB) AIIMS-2000.pdf (13.8 MB) AIIMS-2001.pdf (16.17 MB) AIIMS-2002.pdf (14.73 MB) AIIMS-2003.pdf (18.19 MB) AIIMS-2004.pdf (24.82 MB) AIIMS-2005.pdf (20.93 MB) AIIMS-2006.pdf (24.4 MB) AIIMS-2007.pdf (22.49 MB) Safdarjung_20PMT-2003.pdf (17.67 MB)
Common Admission Test – CAT – 11 Papers
CAT1996.pdf (15.2 MB) CAT1997.pdf (15.85 MB) CAT1998.pdf (19.02 MB) CAT2004.pdf (30.9 MB) CAT2005.pdf (10.46 MB) CAT2006.pdf (9.94 MB) CAT2007.pdf (13.63 MB) CAT_20Bulletin2000.pdf (18.32 MB) CAT_20Bulletin2001.pdf (22.31 MB) CAT_20Bulletin2002.pdf (17.13 MB) CAT_20Bulletin2003.pdf (15.99 MB)
EAMCET-Engineering Entrance – EAMCET – 17 Papers
EAMCET-1991.pdf (5.19 MB) EAMCET-1992.pdf (5.14 MB) EAMCET-1993.pdf (5.02 MB) EAMCET-1994.pdf (7.87 MB) EAMCET-1995.pdf (7.65 MB) EAMCET-1996.pdf (7.46 MB) EAMCET-1997.pdf (6.6 MB) EAMCET-1998.pdf (7.51 MB) EAMCET-1999.pdf (6.97 MB) EAMCET-2001.pdf (7.84 MB) EAMCET-2002.pdf (8.36 MB) EAMCET-2003.pdf (7.3 MB) EAMCET-2004.pdf (7.24 MB) EAMCET-2005.pdf (7.35 MB) EAMCET-2006.pdf (7.63 MB) EAMCET-2007.pdf (6.46 MB)
GATE – Electrical Engineering – GATE – 17 Papers
GATE-EE-1992.pdf (2.18 MB) GATE-EE-1993.pdf (1.43 MB) GATE-EE-1994.pdf (2.66 MB) GATE-EE-1995.pdf (2.62 MB) GATE-EE-1996.pdf (3.98 MB) GATE-EE-1997.pdf (3.08 MB) GATE-EE-1998.pdf (3.84 MB) GATE-EE-1999.pdf (3.84 MB) GATE-EE-2000.pdf (4.14 MB) GATE-EE-2001.pdf (4.26 MB) GATE-EE-2002.pdf (5.45 MB) GATE-EE-2003.pdf (6.46 MB) GATE-EE-2004.pdf (4.3 MB) GATE-EE-2005.pdf (4.83 MB) GATE-EE-2006.pdf (5.82 MB) GATE-EE-2007.pdf (6.18 MB) GATE-EE-2008.pdf (7.8 MB)
GATE-Electronics Communication Engineering – GATE – 17 Papers
GATE-ECE-1992.pdf (2.37 MB) GATE-ECE-1993.pdf (3.16 MB) GATE-ECE-1994.pdf (2.01 MB) GATE-ECE-1995.pdf (3.56 MB) GATE-ECE-1996.pdf (3.2 MB) GATE-ECE-1997.pdf (4.95 MB) GATE-ECE-1998.pdf (4.47 MB) GATE-ECE-1999.pdf (4.13 MB) GATE-ECE-2000.pdf (4.54 MB) GATE-ECE-2001.pdf (4.48 MB) GATE-ECE-2002.pdf (4.47 MB) GATE-ECE-2003.pdf (4.92 MB) GATE-ECE-2004.pdf (4.99 MB) GATE-ECE-2005.pdf (4.65 MB) GATE-ECE-2006.pdf (4.99 MB) GATE-ECE-2007.pdf (4.77 MB) GATE-ECE-2008.pdf (6.48 MB)
GATE-Mechanical Engeneering – GATE – 15 Papers
GATE-ME-1994.pdf (2.41 MB) GATE-ME-1995.pdf (2.45 MB) GATE-ME-1996.pdf (4.18 MB) GATE-ME-1997.pdf (4.09 MB) GATE-ME-1998.pdf (4.31 MB) GATE-ME-1999.pdf (4.58 MB) GATE-ME-2000.pdf (5.25 MB) GATE-ME-2001.pdf (4.08 MB) GATE-ME-2002.pdf (3.93 MB) GATE-ME-2003.pdf (5.47 MB) GATE-ME-2004.pdf (4.88 MB) GATE-ME-2005.pdf (6.34 MB) GATE-ME-2006.pdf (4.91 MB) GATE-ME-2007.pdf (4.8 MB) GATE-ME-2008.pdf (7.16 MB)
ICET – MBA & MCA – ICET – 6 Papers
ICET-2002.pdf (8.48 MB) ICET-2003.pdf (2.06 MB) ICET-2004.pdf (7.19 MB) ICET-2005.pdf (8.68 MB) ICET-2006.pdf (7.95 MB) ICET-2007.pdf (7.88 MB)
IIT – JAM – Biotechnology – 4 Papers (2005-2008)
IIT – JEE
Management Aptitude Test – MAT – MAT – 4 Papers
MAT2006feb.pdf (10.67 MB) MAT2006dec.pdf (12.35 MB) MAT2007may.pdf (13.88 MB) MAT2007feb.pdf (12.37 MB)
Vellore Institute of Technology – VIT – 2 Papers
MIT University Maths Physics chemistry video lectures – Wonderful
Posted by admin in AIEEE, BITSAT, IITJEE, Material/Books on January 26, 2010
MIT University Maths Physics chemistry video lectures
MIT Chemistry video lectures for chemistry students including pdf mp3 files
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Atomic Theory of Matter (PDF) |
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Discovery of Nucleus (PDF) |
(MP3)
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Wavelike Properties of Radiation (PDF) |
(MP3)
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Particle-like Nature of Light (PDF) |
(MP3)
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Matter As a Wave (PDF) |
(MP3)
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The Hydrogen Atom (PDF) |
(MP3)
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Hydrogen Atom Wavefunctions (PDF) |
(MP3)
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P Orbitals (PDF) |
(MP3)
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Electronic Structure of Multielectron Atoms (PDF) |
(MP3)
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Periodic Trends in Elemental Properties (PDF) |
(MP3)
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Covalent Bonds (PDF) |
(MP3)
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Lewis Diagrams (PDF) |
(MP3)
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Topics | VIDEOS | AUDIO |
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Breakdown of Octet Rule (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Molecular Orbital Theory (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Valence Bond Theory and Hybridization (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Hybridization and Chemical Bonding (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Bond Energies / Bond Enthalpies (PDF) | (RM – 56K) (RM – 220K) |
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Free Energy of Formation ΔGof (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Chemical Equilibrium (PDF) | (RM – 56K) (RM – 220K) |
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Chemical Equilibrium (cont.) (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Acid-Base Equilibrium (PDF) | (RM – 56K) (RM – 220K) |
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Acid-Base Equilibrium (cont.) (PDF) | (RM – 56K) (RM – 220K) |
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Acid-Base Equilibrium: Titrations (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Acid Base Titrations and Oxidation/Reduction (PDF) | (RM – 56K) (RM – 220K) |
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Oxidation/Reduction (PDF) | (RM – 56K) (RM – 220K) |
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Oxidation/Reduction (cont.) (PDF) | (RM – 56K) (RM – 220K) |
(MP3) |
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Transition Metals (PDF) | (RM – 56K) (RM – 220K) |
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Transition Metals: Crystal Field Theory (PDF) | (RM – 56K) (RM – 220K) |
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The Shapes of Molecules: VSEPR Theory (PDF) | (RM – 56K) (RM – 220K) |
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Transition Metals (PDF) | (RM – 56K) (RM – 220K) |
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Kinetics (PDF) | (RM – 56K) (RM – 220K) |
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Kinetics (cont.) (PDF) | (RM – 56K) (RM – 220K) |
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Kinetics (cont.) (PDF) | (RM – 56K) (RM – 220K) |
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Kinetics (cont.) (PDF) | (RM – 56K) (RM – 220K) |
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Kinetics: Catalysis (PDF) | (RM – 56K) (RM – 220K) |
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Review (PDF) | (RM – 56K) (RM – 220K) |
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MIT mathematics video lectures for maths students including pdf, mp3 files i.e ebook n audio tutorilas
MIT MATHS ODE & PDE VIDEO LECTURES
| LEC | TOPICS | STREAMING VIDEOs | DOWNLOAD VIDEOs |
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The Geometrical View of y’=f(x,y): Direction Fields, Integral Curves. | (RM – 56K) (RM – 80K) (RM – 220K) | |
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Euler’s Numerical Method for y’=f(x,y) and its Generalizations. | (RM – 56K) (RM – 80K) (RM – 220K) | |
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Solving First-order Linear ODE’s; Steady-state and Transient Solutions. | (RM – 56K) (RM – 80K) (RM – 220K) | |
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First-order Substitution Methods: Bernouilli and Homogeneous ODE’s. | (RM – 56K) (RM – 80K) (RM – 220K) | |
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First-order Autonomous ODE’s: Qualitative Methods, Applications. | (RM – 56K) (RM – 80K) (RM – 220K) | |
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Complex Numbers and Complex Exponentials. | (RM – 56K) (RM – 80K) (RM – 220K) | |
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First-order Linear with Constant Coefficients: Behavior of Solutions, Use of Complex Methods. | (RM – 56K) (RM – 80K) (RM – 220K) |
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Continuation; Applications to Temperature, Mixing, RC-circuit, Decay, and Growth Models. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG -117MB) |
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Solving Second-order Linear ODE’s with Constant Coefficients: The Three Cases. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 114MB) |
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Continuation: Complex Characteristic Roots; Undamped and Damped Oscillations. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 103MB) |
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Theory of General Second-order Linear Homogeneous ODE’s: Superposition, Uniqueness, Wronskians. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 111MB) |
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Continuation: General Theory for Inhomogeneous ODE’s. Stability Criteria for the Constant-coefficient ODE’s. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 103MB) |
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Finding Particular Sto Inhomogeneous ODE’s: Operator and Solution Formulas Involving Ixponentials. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 98MB) |
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Interpretation of the Exceptional Case: Resonance. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 107MB) |
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Introduction to Fourier Series; Basic Formulas for Period 2(pi). | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 118MB) |
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Continuation: More General Periods; Even and Odd Functions; Periodic Extension. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 105MB) |
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Finding Particular Solutions via Fourier Series; Resonant Terms; Hearing Musical Sounds. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 99MB) |
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Introduction to the Laplace Transform; Basic Formulas. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 95MB) |
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Derivative Formulas; Using the Laplace Transform to Solve Linear ODE’s. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 103MB) |
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Convolution Formula: Proof, Connection with Laplace Transform, Application to Physical Problems. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 83MB) |
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Using Laplace Transform to Solve ODE’s with Discontinuous Inputs. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 83MB) |
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Use with Impulse Inputs; Dirac Delta Function, Weight and Transfer Functions. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 93MB) |
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Introduction to First-order Systems of ODE’s; Solution by Elimination, Geometric Interpretation of a System. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 90MB) |
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Homogeneous Linear Systems with Constant Coefficients: Solution via Matrix Eigenvalues (Real and Distinct Case). | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 96MB) |
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Continuation: Repeated Real Eigenvalues, Complex Eigenvalues. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 97MB) |
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Sketching Solutions of 2×2 Homogeneous Linear System with Constant Coefficients. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 110MB) |
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Matrix Methods for Inhomogeneous Systems: Theory, Fundamental Matrix, Variation of Parameters. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 105MB) |
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Matrix Exponentials; Application to Solving Systems. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 97MB) |
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Decoupling Linear Systems with Constant Coefficients. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 112MB) |
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Non-linear Autonomous Systems: Finding the Critical Points and Sketching Trajectories; the Non-linear Pendulum. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 95MB) |
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Limit Cycles: Existence and Non-existence Criteria. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 95MB) |
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Relation Between Non-linear Systems and First-order ODE’s; Structural Stability of a System, Borderline Sketching Cases; Illustrations Using Volterra’s Equation and Principle. | (RM – 56K) (RM – 80K) (RM – 220K) | (MPEG – 96MB) |
MIT MATHS LINEAR ALGEBRAVIDEO LECTURES
| Topics |
Videos
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|---|---|
| The Geometry of Linear Equations | |
| Elimination with Matrices | |
| Multiplication and Inverse Matrices | |
| Factorization into A = LU | |
| Transposes, Permutations, Spaces R^n | |
| Column Space and Nullspace | |
| Solving Ax = 0: Pivot Variables, Special Solutions | |
| Solving Ax = b: Row Reduced Form R |
| Independence, Basis, and Dimension | |||||||||||||||||
| The Four Fundamental Subspaces | |||||||||||||||||
| Matrix Spaces; Rank 1; Small World Graphs | |||||||||||||||||
| Graphs, Networks, Incidence Matrices | |||||||||||||||||
| Quiz 1 Review | |||||||||||||||||
| Orthogonal Vectors and Subspaces | |||||||||||||||||
| Projections onto Subspaces | |||||||||||||||||
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| Markov Matrices; Fourier Series | |
| Quiz 2 Review | |
| Symmetric Matrices and Positive Definiteness | |
| Complex Matrices; Fast Fourier Transform | |
| Positive Definite Matrices and Minima | |
| Similar Matrices and Jordan Form | |
| Singular Value Decomposition | |
| Linear Transformations and Their Matrices |
MIT Video Lectures for IIT Aspirants
MIT PHYSICS-MECHANICS VIDEO LECTURES
| 1 | Powers of Ten – Units – Dimensions – Measurements – Uncertainties – Dimensional Analysis – Scaling Arguments | |
| 2 | 1D Kinematics – Speed – Velocity – Acceleration | |
| 3 | Vectors – Dot Products – Cross Products – 3D Kinematics | |
| 4 | 3D Kinematics – Free Falling Reference Frames | |
| 5 | Circular Motion – Centrifuges Moving – Reference Frames – Perceived Gravity | |
| 6 | Newton’s Laws | |
| 7 | Weight – Perceived Gravity – Weightlessness Free Fall – Zero Gravity in Orbit (misnomer) | |
| 8 | Friction | |
| 9 | Exam Review | |
| 10 | Hooke’s Law – Springs – Simple Harmonic Motion – Pendulum – Small Angle Approximation |
|
TOPIC
|
VIDEO
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|
|---|---|---|
| 11 | Work – Kinetic Energy – Potential Energy – Conservative Forces – Conservation of Mechanical Energy – Newton’s Law of Universal Gravitation | |
| 12 | Non-Conservative Forces – Resistive Forces – Air Drag – Terminal Velocity | |
| 13 | Potential Energy – Energy Considerations to Derive Simple Harmonic Motion | |
| 14 | Escape Velocities – Bound and Unbound Orbits – Circular Orbits – Various Forms of Energy – Power | |
| 15 | Momentum – Conservation of Momentum – Center of Mass | |
| 16 | Collisions – Elastic and Inelastic – Center of Mass Frame of Reference | |
| 17 | Impulse – RocketsVideo presented in Lecture 17 that demonstrates impulse and impact time courtesy of Dr. Peter Dourmashkin, MIT. | |
| 18 | Exam Review | |
| 19 | Rotating Rigid Bodies – Moment of Inertia – Parallel Axis and Perpendicular Axis Theorem – Rotational Kinetic Energy – Fly Wheels – Neutron Stars – Pulsars | |
| 20 | Angular Momentum – Torques – Conservation of Angular Momentum – Spinning Neutron Stars – Stellar Collapse |
| 21 | Torques – Oscillating Bodies – Hoops | |
| 22 | Kepler’s Laws – Elliptical Orbits – Satellites – Change of Orbits – Ham Sandwich | |
| 23 | Doppler Effect – Binary Stars – Neutron Stars and Black Holes | |
| 24 | Rolling Motion – Gyroscopes – VERY NON-INTUITIVE | |
| 25 | Static Equilibrium – Stability – Rope Walker | |
| 26 | Elasticity – Young’s Modulus | |
| 27 | Fluid Mechanics – Pascal’s Principle – Hydrostatics – Atmospheric Pressure – Over Pressure in Lungs and Tires | |
| 28 | Hydrostatics – Archimedes’ Principle – Fluid Dynamics – What Makes Your Boat Float? – Bernoulli’s Equation | |
| 29 | Exam Review | |
| 30 | Simple Harmonic Oscillations – Energy Considerations – Torsional Pendulum |
|
TOPIC
|
VIDEO
|
|
|---|---|---|
| 31 | Forced Oscillations – Normal Modes – Resonance – Natural Frequencies – Musical Instruments | |
| 32 | Heat – Thermal Expansion | |
| 33 | Kinetic Gas Theory – Ideal Gas Law – Isothermal Atmosphere – Phase Diagrams – Phase Transitions | |
| 34 | The Wonderful Quantum World – Breakdown of Classical Mechanics | |
| 35 | Farewell Special – High-energy Astrophysics | (RM – 80K) (RM – 300K) |
MIT PHYSICS-ELECTRICITY AND MAGNETISM VIDEO LECTURES
| 1 | What holds our world together? Electric Charges (Historical) Polarization Electric Force Coulomb’s Law(56k)|(80K)|(220k) |
| 2 | Electric Field Field Lines Superposition Inductive Charging Dipoles Induced Dipoles (56k)|(80K)|(220k) |
| 3 | Electric Flux Gauss’s Law Examples (56k |(80K|(220k) |
| 4 | Electrostatic Potential Electric Energy eV Conservative Field Equipotential Surfaces (56k)|(80K)|(220k) |
| 5 | E = -grad V More on Equipotential Surfaces Conductors Electrostatic Shielding (Faraday Cage) (56k)|(80K)|(220k) |
| 6 | Voltage Breakdown Lightning Sparks (56k)|(80K)|(220k) |
| 7 | Capacitance Field Energy (56k)|(80K)|(220k) |
| 1 | |
| 2 | |
| 3 | |
| 4 | |
| 5 | |
| 6 | |
| 7 |
| 8 | Polarization Dielectrics The Van de Graaff More on Capacitor(56k)|(80K)|(220k) |
| 9 | Currents Resistivity Ohm’s Law (56k)|(80K)|(220k) |
| 10 | : Batteries EMF Energy Conservation Power Kirchhoff’s Rules Circuits Kelvin Water Dropper (56k)|(80K)|(220k) |
| 11 | Magnetic field Lorentz Force Torques Electric Motors (DC) Oscilloscope (56k)|(80K)|(220k) |
| 12 | Review Exam 1 (Secret Top!) (56k)|(80K)|(220k) |
| 13 | Moving Charges in B-fields Cyclotron Synchrotron Mass Spectrometer Cloud Chamber Recorded on 03/08/02 (56k)|(80K)|(220k) |
| 14 | : Biot-Savart Law Gauss’ Law for Magnetic Fields Revisit the “Leyden Jar” High-Voltage Power Lines (56k)|(80K)|(220k) |
| 1 | What holds our world together? Electric Charges (Historical) Polarization Electric Force Coulomb’s Law(56k)|(80K)|(220k) |
| 2 | Electric Field Field Lines Superposition Inductive Charging Dipoles Induced Dipoles (56k)|(80K)|(220k) |
| 3 | Electric Flux Gauss’s Law Examples (56k |(80K|(220k) |
| 4 | Electrostatic Potential Electric Energy eV Conservative Field Equipotential Surfaces (56k)|(80K)|(220k) |
| 5 | E = -grad V More on Equipotential Surfaces Conductors Electrostatic Shielding (Faraday Cage) (56k)|(80K)|(220k) |
| 6 | Voltage Breakdown Lightning Sparks (56k)|(80K)|(220k) |
| 7 | Capacitance Field Energy (56k)|(80K)|(220k) |
| 29 | Snell’s Law Refraction Total Reflection Dispersion Prisms Huygens’s Principle The Illusion of Color The Weird Benham Top Land’s Famous Demo (56k)|(80K)|(220k) |
| 30 | Polarizers Malus’s Law Brewster Angle Polarization by Reflection and Scattering Why is the sky blue? Why are sunsets red? The sun will set in the lecture hall! (56k)|(80K)|(220k) |
| 31 | Rainbows A modest rainbow will appear in the lecture hall! Fog Bows Supernumerary Bows Polarization of the Bows Halos around the Sun and the Moon Mock Suns (56k)|(80K)|(220k) |
| 32 | Review Exam 3 (56k)|(80K)|(220k) |
| 33 | Double-Slit Interference Interferometers (56k)|(80K)|(220k) |
| 34 | Gratings Resolving Power Single-Slit Diffraction Angular Resolution Human Eye Telescopes (56k)|(80K)|(220k) |
| 35 | Doppler Effect The Big Bang Cosmology (56k)|(80K)|(220k) |
| 36 |
| 29 | Snell’s Law Refraction Total Reflection Dispersion Prisms Huygens’s Principle The Illusion of Color The Weird Benham Top Land’s Famous Demo (56k)|(80K)|(220k) |
| 30 | Polarizers Malus’s Law Brewster Angle Polarization by Reflection and Scattering Why is the sky blue? Why are sunsets red? The sun will set in the lecture hall! (56k)|(80K)|(220k) |
| 31 | Rainbows A modest rainbow will appear in the lecture hall! Fog Bows Supernumerary Bows Polarization of the Bows Halos around the Sun and the Moon Mock Suns (56k)|(80K)|(220k) |
| 32 | Review Exam 3 (56k)|(80K)|(220k) |
| 33 | Double-Slit Interference Interferometers (56k)|(80K)|(220k) |
| 34 | Gratings Resolving Power Single-Slit Diffraction Angular Resolution Human Eye Telescopes (56k)|(80K)|(220k) |
| 35 | Doppler Effect The Big Bang Cosmology (56k)|(80K)|(220k) |
| 36 |
thanks to ocw.mit.edu for their wonderful service
Amazing Video Lectures from the BEST Teacher in Physics
Posted by admin in AIEEE, BITSAT, IITJEE, Material/Books on January 26, 2010
WALTER H. G. LEWIN, Professor of Physics,MIT – One of the Best Physics Teachers on this planet.
Contents :
| 1 Powers of Ten – Units – Dimensions – Measurements – Uncertainties – Dimensional Analysis – Scaling Arguments 2 1D Kinematics – Speed – Velocity – Acceleration 3 Vectors – Dot Products – Cross Products – 3D Kinematics 4 3D Kinematics – Free Falling Reference Frames 5 Circular Motion – Centrifuges Moving – Reference Frames – Perceived Gravity 6 Newton’s Laws 7 Weight – Perceived Gravity – Weightlessness Free Fall – Zero Gravity in Orbit (misnomer) 8 Friction 9 Exam Review 10 Hooke’s Law – Springs – Simple Harmonic Motion – Pendulum – Small Angle Approximation 11 Work – Kinetic Energy – Potential Energy – Conservative Forces – Conservation of Mechanical Energy – Newton’s Law of Universal Gravitation 12 Non-Conservative Forces – Resistive Forces – Air Drag – Terminal Velocity 13 Potential Energy – Energy Considerations to Derive Simple Harmonic Motion 14 Escape Velocities – Bound and Unbound Orbits – Circular Orbits – Various Forms of Energy – Power 15 Momentum – Conservation of Momentum – Center of Mass 16 Collisions – Elastic and Inelastic – Center of Mass Frame of Reference 17 Impulse – Rockets Video presented in Lecture 17 that demonstrates impulse and impact time courtesy of Dr. Peter Dourmashkin, MIT.18 Exam Review 19 Rotating Rigid Bodies – Moment of Inertia – Parallel Axis and Perpendicular Axis Theorem – Rotational Kinetic Energy – Fly Wheels – Neutron Stars – Pulsars 20 Angular Momentum – Torques – Conservation of Angular Momentum – Spinning Neutron Stars – Stellar Collapse 21 Torques – Oscillating Bodies – Hoops 22 Kepler’s Laws – Elliptical Orbits – Satellites – Change of Orbits – Ham Sandwich 23 Doppler Effect – Binary Stars – Neutron Stars and Black Holes 24 Rolling Motion – Gyroscopes – VERY NON-INTUITIVE 25 Static Equilibrium – Stability – Rope Walker 26 Elasticity – Young’s Modulus 27 Fluid Mechanics – Pascal’s Principle – Hydrostatics – Atmospheric Pressure – Over Pressure in Lungs and Tires 28 Hydrostatics – Archimedes’ Principle – Fluid Dynamics – What Makes Your Boat Float? – Bernoulli’s Equation 29 Exam Review 30 Simple Harmonic Oscillations – Energy Considerations – Torsional Pendulum 31 Forced Oscillations – Normal Modes – Resonance – Natural Frequencies – Musical Instruments 32 Heat – Thermal Expansion 33 Kinetic Gas Theory – Ideal Gas Law – Isothermal Atmosphere – Phase Diagrams – Phase Transitions 34 The Wonderful Quantum World – Breakdown of Classical Mechanics 35 Farewell Special – High-energy Astrophysics |
Direct Links :
http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec1-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec2-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec3-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec4-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec5-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec6-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec7-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec8-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec9-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec10-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec11-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec12-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec13-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec14-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec15-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec16-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec17-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec18-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec19-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec20-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec21-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec22-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec23-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec24-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec25-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec26-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec27-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec28-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec29-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec30-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec31-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec32-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec33-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec34-300k.rm http://ocw.mit.edu/ans7870/8/8.01/f99/videolectures/wl99lec35-300k.rm
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