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Harshil Garg

Indiranagar, Bangalore, India - 560038

Harshil Garg Engineering Entrance trainer in Bangalore

Harshil Garg

Tutor

Indiranagar, Bangalore, India - 560038.

14 Students taught

4.3

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Overview

I am pursuing B.E EEE & Msc. Chemistry from BITS Pilani (through BITSAT). I have also cracked IIT 2012. I have a keen interest in teaching IIT/BITSAT aspirants & make them realize how easy it is to crack these. So called the most toughest competitive exams in a very smooth & smarter way. I have completed emphasis on basic concepts & their applications in practical life. I start gradually with level 0 & then take the subject to the 'pro' level from where every question of PCM becomes a piece of cake.

Languages Spoken

English

Hindi

Education

CBSE 2012

Bachelor of Engineering (B.E.)

Address

Indiranagar, Bangalore, India - 560038

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Engineering Entrance Coaching classes

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Reviews (13)

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5.0 out of 5.0 13 reviews

Harshil Garg https://s3-ap-southeast-1.amazonaws.com/tv-prod/member/photo/602110-small.jpg Indiranagar
5.00513
Harshil Garg
P

"I took React JS classes from Harshil. He is the best teacher I have ever seen. He teaches each and every concepts with an ease. He makes everything simple to grasp. He solves your issues very patiently and explains it until you understand.He gives you practical knowledge that the IT industries uses for the projects rather than theoretical knowledge.I would really recommend him for JS classes. "

Harshil Garg
R

"My physics for IIT got improved drastically. Thanks to him "

Harshil Garg
S

"He taught me to make 7 websites in 2 months along with domain name registration and web hosting. This helped me a lot in building my own personal website . I will surely recommend for anyone who wants to learn web development from scratch. "

Harshil Garg
H

"Harshil is an awesome tutor and also a great friend. He has a great personality and is always willing to help. He will continue to explain things until you have understood the concept.I think Harshil did an excellent job of sparking my interest in a course that I wasn’t very interested in. Thanks! "

Have you attended any class with Harshil? Write a Review

FAQs

1. Which classes do you teach?

I teach C++ Language, Class 10 Tuition, Class 11 Tuition, Class 12 Tuition, Class 6 Tuition, Class 7 Tuition, Class 8 Tuition, Class 9 Tuition, Engineering Entrance Coaching and Java Script Training Classes.

2. Do you provide a demo class?

Yes, I provide a free demo class.

3. How many years of experience do you have?

I have been teaching for less than a year.

Answers by Harshil (45)

Answered on 28/01/2016 IT Courses/Oracle Training/Oracle Web Administrator

1 month is enough
Answers 3 Comments
Dislike Bookmark

Answered on 27/07/2015 IT Courses/Web Designing

Firs all get the basic Knowledge of HTML5 , CSS, Javascript, Php or Python (Django). After that you can move on to CMS like Wordpress, Drupal ,Weebly etc. For any help, feel free to Contact.
Answers 17 Comments
Dislike Bookmark

Answered on 22/06/2015 Tuition/Class XI-XII Tuition (PUC)

Valency of sulphate ion is -2.
Answers 11 Comments
Dislike Bookmark

Answered on 06/06/2015 Tuition/Class XI-XII Tuition (PUC)

Hi. Hope you liked my last 'intuitive' take on limits. This time iam sharing an awesome intuitive explanation of natural log. I strongly recommend having a look at the pdf( unedited version with diagrams) named 'Intuitive logarithms' ( I couldn't do the justice here ). Also explanation for exponential is available in pdf to go through before going through logarithms.( It has some graphics added in it for better understanding which i can't reproduce efficiently here). So lets start- DEMYSTIFYING THE NATURAL LOGARITHM (ln) Intuitive explanation: The natural log gives you the time needed to reach a certain level of growth. Suppose you have an investment in a bank (who doesn’t?) with an interest rate of 100% per year, growing continuously. If you want 10x growth, assuming continuous compounding, you’d wait only ln(10) or 2.302 years. E and the Natural Log are twins: e^x is the amount of continuous growth after a certain amount of time. Natural Log (ln) is the amount of time needed to reach a certain level of continuous growth. E IS ABOUT GROWTH The number e is about continuous growth. As we saw last time, e^x lets us merge rate and time: 3 years at 100% growth is the same as 1 year at 300% growth, when continuously compounded. Intuitively, e^x means: How much growth do I get after after x units of time (and 100% continuous growth). For example: after 3 time periods I have e^3 = 20.08 times the amount of “stuff”. e^x is a scaling factor, showing us how much growth we’d get after x units of time. NATURAL LOG IS ABOUT TIME: The natural log is the inverse of e, a fancy term for opposite. Speaking of fancy, the Latin name is logarithmus naturali, giving the abbreviation ln. Now what does this inverse or opposite stuff mean? e^x lets us plug in time and get growth. ln(x) lets us plug in growth and get the time it would take. For example: e^3 is 20.08. After 3 units of time, we end up with 20.08 times what we started with. ln(20.08) is about 3. If we want growth of 20.08, we’d wait 3 units of time (again, assuming a 100% continuous growth rate). With me? The natural log gives us the time needed to hit our desired growth. LOGARITHMIC ARITHMETIC IS NOT NORMAL: You’ve studied logs before, and they were strange beasts. How’d they turn multiplication into addition? Division into subtraction? Let’s see. What is ln(1)? Intuitively, the question is: How long do I wait to get 1x my current amount? Zero. Zip. Nada. You’re already at 1x your current amount! It doesn’t take any time to grow from 1 to 1. ln(1) = 0 Ok, how about a fractional value? How long to get 1/2 my current amount? Assuming you are growing continuously at 100%, we know that ln(2) is the amount of time to double. If we reverse it (i.e., take the negative time) we’d have half of our current value. ln(.5) = – ln(2) = -.693 Makes sense, right? If we go backwards (negative time) .693 seconds we’d have half our current amount. In general, you can flip the fraction and take the negative: ln(1/3) = – ln(3) = -1.09. This means if we go back 1.09 units of time, we’d have a third of what we have now. Ok, how about the natural log of a negative number? How much time does it take to “grow” your bacteria colony from 1 to -3? It’s impossible! You can’t have a “negative” amount of bacteria, can you? At most (er… least) you can have zero, but there’s no way to have a negative amount of the little critters. Negative bacteria just doesn’t make sense. ln(negative number) = undefined Undefined just means “there is no amount of time you can wait” to get a negative amount. LOGARITHMIC MULTIPLICATION IS MIGHTY FUN: How long does it take to grow 4x your current amount? Sure, we could just use ln(4). But that’s too easy, let’s be different. We can consider 4x growth as doubling (taking ln(2) units of time) and then doubling again (taking another ln(2) units of time): Time to grow 4x = ln(4) = Time to double and double again = ln(2) + ln(2) Interesting. Any growth number, like 20, can be considered 2x growth followed by 10x growth. Or 4x growth followed by 5x growth. Or 3x growth followed by 6.666x growth. See the pattern? ln(a*b) = ln(a) + ln(b) The log of a times b = log(a) + log(b). This relationship makes sense when you think in terms of time to grow. If we want to grow 30x, we can wait ln(30) all at once, or simply wait ln(3), to triple, then wait ln(10), to grow 10x again. The net effect is the same, so the net time should be the same too (and it is). HOW ABOUT DIVISION?: ln(5/3) means: How long does it take to grow 5 times and then take 1/3 of that? Well, growing 5 times is ln(5). Growing 1/3 is -ln(3) units of time. So ln(5/3) = ln(5) – ln(3) Which says: Grow 5 times and “go back in time” until you have a third of that amount, so you’re left with 5/3 growth. In general we have ln(a/b) = ln(a) – ln(b) I hope the strange math of logarithms is starting to make sense: multiplication of growth becomes addition of time, division of growth becomes subtraction of time. Don’t memorize the rules, understand them. My gallery link: https://www.urbanpro.com/delhi/pankaj-k/2531974 Thanks for your time. Regards.

Dude one suggestion -> Keep ur post informative, short and concise. No one wants to read the whole page, people would rather prefer to go on wikipedia and read the whole thesis. Ur gallery link is sufficient .
Answers 8 Comments
Dislike Bookmark

Answered on 06/06/2015 Tuition/Class XI-XII Tuition (PUC)

Arrange your course content first. Set your charges. You are good to go.
Answers 11 Comments
Dislike Bookmark
Engineering Entrance Coaching classes 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Class 9 Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 9 Tuition

2

Board

CBSE, ICSE

CBSE Subjects taught

Mathematics

ICSE Subjects taught

Physics, Mathematics, Chemistry

Taught in School or College

Yes

Class 10 Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 10 Tuition

2

Board

CBSE, ICSE

CBSE Subjects taught

Mathematics

ICSE Subjects taught

Physics, Mathematics, Chemistry

Taught in School or College

Yes

Class 6 Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 6 Tuition

4

Class 7 Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 7 Tuition

4

Class 8 Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 8 Tuition

4

Class 11 Tuition 4.4

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 11 Tuition

6

Board

IGCSE, CBSE, ISC/ICSE, State, International Baccalaureate

ISC/ICSE Subjects taught

Chemistry, Mathematics, Physics

CBSE Subjects taught

Physics, Mathematics, Chemistry

Taught in School or College

No

State Syllabus Subjects taught

Chemistry, Mathematics, Physics

Class 12 Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Class 12 Tuition

6

Board

IGCSE, CBSE, ISC/ICSE, State, International Baccalaureate

ISC/ICSE Subjects taught

Chemistry, Mathematics, Physics

CBSE Subjects taught

Physics, Mathematics, Chemistry

Taught in School or College

No

State Syllabus Subjects taught

Chemistry, Mathematics, Physics

MSc Tuition 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Python Training classes 4.4

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

SQL Programming Training 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Web Designing Classes 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Web Designing Classes

4

Teaches web designing at proficiency level

Advanced Web Designing

Weblogic Developer Training 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Website Scripting Training 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

C++ Language Classes 4.4

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in C++ Language Classes

3

Proficiency level taught

Advanced C++, Basic C++

PHP Classes 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in PHP Classes

4

Teaches

PHP CMS, Php MySQL, PHP Realtime Project, Advanced PHP, Php AJAX, PHP Web 2.0

Mobile App Development Training 4.3

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Mobile App Development Training

2

Java Script Training classes 5.0

Class Location

Student's Home

Tutor's Home

Online (video chat via skype, google hangout etc)

Years of Experience in Java Script Training classes

4

Answers by Harshil (45)

Answered on 28/01/2016 IT Courses/Oracle Training/Oracle Web Administrator

1 month is enough
Answers 3 Comments
Dislike Bookmark

Answered on 27/07/2015 IT Courses/Web Designing

Firs all get the basic Knowledge of HTML5 , CSS, Javascript, Php or Python (Django). After that you can move on to CMS like Wordpress, Drupal ,Weebly etc. For any help, feel free to Contact.
Answers 17 Comments
Dislike Bookmark

Answered on 22/06/2015 Tuition/Class XI-XII Tuition (PUC)

Valency of sulphate ion is -2.
Answers 11 Comments
Dislike Bookmark

Answered on 06/06/2015 Tuition/Class XI-XII Tuition (PUC)

Hi. Hope you liked my last 'intuitive' take on limits. This time iam sharing an awesome intuitive explanation of natural log. I strongly recommend having a look at the pdf( unedited version with diagrams) named 'Intuitive logarithms' ( I couldn't do the justice here ). Also explanation for exponential is available in pdf to go through before going through logarithms.( It has some graphics added in it for better understanding which i can't reproduce efficiently here). So lets start- DEMYSTIFYING THE NATURAL LOGARITHM (ln) Intuitive explanation: The natural log gives you the time needed to reach a certain level of growth. Suppose you have an investment in a bank (who doesn’t?) with an interest rate of 100% per year, growing continuously. If you want 10x growth, assuming continuous compounding, you’d wait only ln(10) or 2.302 years. E and the Natural Log are twins: e^x is the amount of continuous growth after a certain amount of time. Natural Log (ln) is the amount of time needed to reach a certain level of continuous growth. E IS ABOUT GROWTH The number e is about continuous growth. As we saw last time, e^x lets us merge rate and time: 3 years at 100% growth is the same as 1 year at 300% growth, when continuously compounded. Intuitively, e^x means: How much growth do I get after after x units of time (and 100% continuous growth). For example: after 3 time periods I have e^3 = 20.08 times the amount of “stuff”. e^x is a scaling factor, showing us how much growth we’d get after x units of time. NATURAL LOG IS ABOUT TIME: The natural log is the inverse of e, a fancy term for opposite. Speaking of fancy, the Latin name is logarithmus naturali, giving the abbreviation ln. Now what does this inverse or opposite stuff mean? e^x lets us plug in time and get growth. ln(x) lets us plug in growth and get the time it would take. For example: e^3 is 20.08. After 3 units of time, we end up with 20.08 times what we started with. ln(20.08) is about 3. If we want growth of 20.08, we’d wait 3 units of time (again, assuming a 100% continuous growth rate). With me? The natural log gives us the time needed to hit our desired growth. LOGARITHMIC ARITHMETIC IS NOT NORMAL: You’ve studied logs before, and they were strange beasts. How’d they turn multiplication into addition? Division into subtraction? Let’s see. What is ln(1)? Intuitively, the question is: How long do I wait to get 1x my current amount? Zero. Zip. Nada. You’re already at 1x your current amount! It doesn’t take any time to grow from 1 to 1. ln(1) = 0 Ok, how about a fractional value? How long to get 1/2 my current amount? Assuming you are growing continuously at 100%, we know that ln(2) is the amount of time to double. If we reverse it (i.e., take the negative time) we’d have half of our current value. ln(.5) = – ln(2) = -.693 Makes sense, right? If we go backwards (negative time) .693 seconds we’d have half our current amount. In general, you can flip the fraction and take the negative: ln(1/3) = – ln(3) = -1.09. This means if we go back 1.09 units of time, we’d have a third of what we have now. Ok, how about the natural log of a negative number? How much time does it take to “grow” your bacteria colony from 1 to -3? It’s impossible! You can’t have a “negative” amount of bacteria, can you? At most (er… least) you can have zero, but there’s no way to have a negative amount of the little critters. Negative bacteria just doesn’t make sense. ln(negative number) = undefined Undefined just means “there is no amount of time you can wait” to get a negative amount. LOGARITHMIC MULTIPLICATION IS MIGHTY FUN: How long does it take to grow 4x your current amount? Sure, we could just use ln(4). But that’s too easy, let’s be different. We can consider 4x growth as doubling (taking ln(2) units of time) and then doubling again (taking another ln(2) units of time): Time to grow 4x = ln(4) = Time to double and double again = ln(2) + ln(2) Interesting. Any growth number, like 20, can be considered 2x growth followed by 10x growth. Or 4x growth followed by 5x growth. Or 3x growth followed by 6.666x growth. See the pattern? ln(a*b) = ln(a) + ln(b) The log of a times b = log(a) + log(b). This relationship makes sense when you think in terms of time to grow. If we want to grow 30x, we can wait ln(30) all at once, or simply wait ln(3), to triple, then wait ln(10), to grow 10x again. The net effect is the same, so the net time should be the same too (and it is). HOW ABOUT DIVISION?: ln(5/3) means: How long does it take to grow 5 times and then take 1/3 of that? Well, growing 5 times is ln(5). Growing 1/3 is -ln(3) units of time. So ln(5/3) = ln(5) – ln(3) Which says: Grow 5 times and “go back in time” until you have a third of that amount, so you’re left with 5/3 growth. In general we have ln(a/b) = ln(a) – ln(b) I hope the strange math of logarithms is starting to make sense: multiplication of growth becomes addition of time, division of growth becomes subtraction of time. Don’t memorize the rules, understand them. My gallery link: https://www.urbanpro.com/delhi/pankaj-k/2531974 Thanks for your time. Regards.

Dude one suggestion -> Keep ur post informative, short and concise. No one wants to read the whole page, people would rather prefer to go on wikipedia and read the whole thesis. Ur gallery link is sufficient .
Answers 8 Comments
Dislike Bookmark

Answered on 06/06/2015 Tuition/Class XI-XII Tuition (PUC)

Arrange your course content first. Set your charges. You are good to go.
Answers 11 Comments
Dislike Bookmark

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Harshil Garg describes himself as Tutor. He conducts classes in C++ Language, Class 10 Tuition and Class 11 Tuition. Harshil is located in Indiranagar, Bangalore. Harshil takes at students Home, Regular Classes- at his Home and Online Classes- via online medium. He has 6 years of teaching experience . Harshil has completed Bachelor of Engineering (B.E.) from CBSE in 2012. He is well versed in English and Hindi. Harshil has got 13 reviews till now with 100% positive feedback.

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