UrbanPro

Location Set your Location

Login Ask & Answer Success Stories Paid Courses Free Classes Tuition & Classes Fees Write a Review All Categories Help Center
Post your Learning Need Signup as a Tutor

Popular Cities

Bangalore

Hyderabad

Delhi

Mumbai

Chennai

Pune

Kolkata

Gurgaon

Ahmedabad

Jaipur

Noida

true
Aravind Banerjee BSc Tuition trainer in Kanpur/>

Aravind Banerjee

M.Sc.

Kanpur, Kanpur, India - 208001.

1 Student

Contact
Referral Discount: Get ₹ 500 off when you make a payment to start classes. Get started by Booking a Demo.

Details verified of Aravind Banerjee

Identity

Education

Know how UrbanPro verifies Tutor details

Identity is verified based on matching the details uploaded by the Tutor with government databases.

Overview

Research in Physics at Delhi University 1970 -75
Research in Mathematics at TIFR Mumbai 1976 -87
Taught M.Sc. Mathematics at Mumbai University 1986 -87
Taught M.Sc. Mathematics at Goa University 1988-95
Presently retired. Available only at my home in Kanpur .

Languages Spoken

Hindi

English

Bengali

Education

IIT Kanpur 1970

Master of Science (M.Sc.)

Address

Kanpur, Kanpur, India - 208001

Verified Info

Phone Verified

Email Verified

Report this Profile

x

Is this listing inaccurate or duplicate? Any other problem?

Please tell us about the problem and we will fix it.

Please describe the problem that you see in this page.

Type the letters as shown below *

Please enter the letters as show below

Teaches

BSc Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in BSc Tuition

20

Type of class

Regular Classes

Class strength catered to

One on one/ Private Tutions

Taught in School or College

No

BSc Branch

BSc Mathematics

BSc Mathematics Subjects

Discrete Mathematics, Number Theory, Analysis, Algebra, Calculus

Teaching Experience in detail in BSc Tuition

Taught a few students at my home.

Class 11 Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Class 11 Tuition

20

Board

CBSE, International Baccalaureate, State, ISC/ICSE

IB Subjects taught

Mathematics

ISC/ICSE Subjects taught

Mathematics

CBSE Subjects taught

Mathematics

Taught in School or College

No

State Syllabus Subjects taught

Mathematics

Teaching Experience in detail in Class 11 Tuition

Taught mathematics to a few students at my home.

Class 12 Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Class 12 Tuition

20

Board

CBSE, International Baccalaureate, State, ISC/ICSE

IB Subjects taught

Mathematics

ISC/ICSE Subjects taught

Mathematics

CBSE Subjects taught

Mathematics

Taught in School or College

No

State Syllabus Subjects taught

Mathematics

Teaching Experience in detail in Class 12 Tuition

Taught mathematics to a few students at my home.

Engineering Entrance Coaching classes

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Engineering Entrance Coaching classes

20

Engineering Entrance Exams

IIT JEE Coaching Classes

Type of class

Regular Classes

Teaching Experience in detail in Engineering Entrance Coaching classes

Taught a few students at my home.

MSc Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in MSc Tuition

20

Subject

Mathematics

Taught in School or College

Yes

Teaching Experience in detail in MSc Tuition

Experience : 25 years of Research and Teaching Research in Physics at Delhi University 1970-75 Research in Mathematics at TIFR Mumbai 1976-87 Taught M.Sc. Mathematics at Mumbai University 1986-87 Taught M.Sc. Mathematics at Goa University 1988-95 Presently retired. Available on-line or at home in Kanpur.

Math Olympiad classes

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Math Olympiad classes

20

Reviews

No Reviews yet!

FAQs

1. Do you have any prior teaching experience?

No

2. Which classes do you teach?

I teach BSc Tuition, Class 11 Tuition, Class 12 Tuition, Engineering Entrance Coaching, MSc Tuition and Math Olympiad Classes.

3. Do you provide a demo class?

Yes, I provide a free demo class.

4. How many years of experience do you have?

I have been teaching for 20 years.

Contact

Answers by Aravind Banerjee (3)

Answered on 12/12/2016 Learn Hyperbola +2 Tuition/Class XI-XII Tuition (PUC) CBSE/Class 12/Mathematics

Prove that the midpoints of chords of the hyperbola (square of x)/(square of a)--(square of y)/(square... ...more
Prove that the midpoints of chords of the hyperbola (square of x)/(square of a)–(square of y)/(square of b) = 1 parallel to the diameter y = mx lie on the diameter (square of a)my = (square of b) x?

Let the cord parallel to y=mx be y=mx+c..............(1) Then the points of intersection with the hyperbola are given by:- x^2/a^2 - (mx+c)^2/b^2 = 1 or (1/a^2-m^2/b^2)x^2-2mxc/b^2-c^2/b^2-1=0 .....(2) Let (x1,y1) and (x2,y2) be the end points of the cord. Then x1 and x2 both satisfy... ...more
Let the cord parallel to y=mx be y=mx+c..............(1) Then the points of intersection with the hyperbola are given by:- x^2/a^2 - (mx+c)^2/b^2 = 1 or (1/a^2-m^2/b^2)x^2-2mxc/b^2-c^2/b^2-1=0 .....(2) Let (x1,y1) and (x2,y2) be the end points of the cord. Then x1 and x2 both satisfy Eq.(2) So x1+x2 = [2mc/b^2]/(1/a^2-m^2/b^2) = 2mc/(b^2/a^2-m^2)...............(3) Let (h,k) be the midpoint of the cord. Then h=(x1+x2)/2 = mc/(b^2/a^2-m^2) and k=(y1+y2)/2. Now both (x1,y1) and (x2,y2) satisfy Eq(1) so that k=mh+c. Substituting the value of c from Eq(3) k=mh+(b^2/a^2-m^2)h/m = b^2/(a^2m) Or a^2 mk = b^2h Therefore the locus of the midpoint (h,k) of the cord is a^2 my = b^2x.
Answers 4 Comments
Dislike Bookmark

Answered on 25/07/2015 Learn Tuition/Class XI-XII Tuition (PUC)

Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the... ...more
Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the value of 8{sin(

Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2... ...more
Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2 = 0. or (x-3/2)^2+(y-root(3)/2)^2 = 1. Thus the locus of the point P is a circle of radious 1 with the centre at the point D with coordinates (3/2,root(3)/2). It passes through B and C. Clearly ABDC is a parallelogram and so the
Answers 9 Comments
Dislike Bookmark

Answered on 21/07/2015 Learn Tuition/Class XI-XII Tuition (PUC)

Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the... ...more
Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the value of 8{sin(

Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2... ...more
Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2 = 0. or (x-3/2)^2+(y-root(3)/2)^2 = 1. Thus the locus of the point P is a circle of radius 1 with the center at the point D with coordinates (3/2,root(3)/2). Clearly ABDC is a parallelogram and so the
Answers 9 Comments
Dislike Bookmark

Contact

Teaches

BSc Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in BSc Tuition

20

Type of class

Regular Classes

Class strength catered to

One on one/ Private Tutions

Taught in School or College

No

BSc Branch

BSc Mathematics

BSc Mathematics Subjects

Discrete Mathematics, Number Theory, Analysis, Algebra, Calculus

Teaching Experience in detail in BSc Tuition

Taught a few students at my home.

Class 11 Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Class 11 Tuition

20

Board

CBSE, International Baccalaureate, State, ISC/ICSE

IB Subjects taught

Mathematics

ISC/ICSE Subjects taught

Mathematics

CBSE Subjects taught

Mathematics

Taught in School or College

No

State Syllabus Subjects taught

Mathematics

Teaching Experience in detail in Class 11 Tuition

Taught mathematics to a few students at my home.

Class 12 Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Class 12 Tuition

20

Board

CBSE, International Baccalaureate, State, ISC/ICSE

IB Subjects taught

Mathematics

ISC/ICSE Subjects taught

Mathematics

CBSE Subjects taught

Mathematics

Taught in School or College

No

State Syllabus Subjects taught

Mathematics

Teaching Experience in detail in Class 12 Tuition

Taught mathematics to a few students at my home.

Engineering Entrance Coaching classes

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Engineering Entrance Coaching classes

20

Engineering Entrance Exams

IIT JEE Coaching Classes

Type of class

Regular Classes

Teaching Experience in detail in Engineering Entrance Coaching classes

Taught a few students at my home.

MSc Tuition

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in MSc Tuition

20

Subject

Mathematics

Taught in School or College

Yes

Teaching Experience in detail in MSc Tuition

Experience : 25 years of Research and Teaching Research in Physics at Delhi University 1970-75 Research in Mathematics at TIFR Mumbai 1976-87 Taught M.Sc. Mathematics at Mumbai University 1986-87 Taught M.Sc. Mathematics at Goa University 1988-95 Presently retired. Available on-line or at home in Kanpur.

Math Olympiad classes

Class Location

Online (video chat via skype, google hangout etc)

Student's Home

Tutor's Home

Years of Experience in Math Olympiad classes

20

No Reviews yet!

Answers by Aravind Banerjee (3)

Answered on 12/12/2016 Learn Hyperbola +2 Tuition/Class XI-XII Tuition (PUC) CBSE/Class 12/Mathematics

Prove that the midpoints of chords of the hyperbola (square of x)/(square of a)--(square of y)/(square... ...more
Prove that the midpoints of chords of the hyperbola (square of x)/(square of a)–(square of y)/(square of b) = 1 parallel to the diameter y = mx lie on the diameter (square of a)my = (square of b) x?

Let the cord parallel to y=mx be y=mx+c..............(1) Then the points of intersection with the hyperbola are given by:- x^2/a^2 - (mx+c)^2/b^2 = 1 or (1/a^2-m^2/b^2)x^2-2mxc/b^2-c^2/b^2-1=0 .....(2) Let (x1,y1) and (x2,y2) be the end points of the cord. Then x1 and x2 both satisfy... ...more
Let the cord parallel to y=mx be y=mx+c..............(1) Then the points of intersection with the hyperbola are given by:- x^2/a^2 - (mx+c)^2/b^2 = 1 or (1/a^2-m^2/b^2)x^2-2mxc/b^2-c^2/b^2-1=0 .....(2) Let (x1,y1) and (x2,y2) be the end points of the cord. Then x1 and x2 both satisfy Eq.(2) So x1+x2 = [2mc/b^2]/(1/a^2-m^2/b^2) = 2mc/(b^2/a^2-m^2)...............(3) Let (h,k) be the midpoint of the cord. Then h=(x1+x2)/2 = mc/(b^2/a^2-m^2) and k=(y1+y2)/2. Now both (x1,y1) and (x2,y2) satisfy Eq(1) so that k=mh+c. Substituting the value of c from Eq(3) k=mh+(b^2/a^2-m^2)h/m = b^2/(a^2m) Or a^2 mk = b^2h Therefore the locus of the midpoint (h,k) of the cord is a^2 my = b^2x.
Answers 4 Comments
Dislike Bookmark

Answered on 25/07/2015 Learn Tuition/Class XI-XII Tuition (PUC)

Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the... ...more
Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the value of 8{sin(

Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2... ...more
Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2 = 0. or (x-3/2)^2+(y-root(3)/2)^2 = 1. Thus the locus of the point P is a circle of radious 1 with the centre at the point D with coordinates (3/2,root(3)/2). It passes through B and C. Clearly ABDC is a parallelogram and so the
Answers 9 Comments
Dislike Bookmark

Answered on 21/07/2015 Learn Tuition/Class XI-XII Tuition (PUC)

Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the... ...more
Let P be an interior point of an equilateral triangle ABC, such that AP^2 = BP^2 + CP^2, then find the value of 8{sin(

Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2... ...more
Without loss of generality may assume that the sides of the triangle have length 1. May choose the coordinate axes so that A, B and C have coordinates (0,0), (1,0) and ( 1/2,root(3)/2 ). Let (x,y) be the coordinates of the point P. Then x^2+y^2 = (x-1)^2+y^2+(x-1/2)^2+(y-root(3)/2)^2 . i.e. x^2-3x+5/4+(y-root(3)/2)^2 = 0. or (x-3/2)^2+(y-root(3)/2)^2 = 1. Thus the locus of the point P is a circle of radius 1 with the center at the point D with coordinates (3/2,root(3)/2). Clearly ABDC is a parallelogram and so the
Answers 9 Comments
Dislike Bookmark

Contact

Aravind Banerjee conducts classes in BSc Tuition, Class 11 Tuition and Class 12 Tuition. Aravind is located in Kanpur, Kanpur. Aravind takes Regular Classes- at his Home and Online Classes- via online medium. He has 20 years of teaching experience . Aravind has completed Master of Science (M.Sc.) from IIT Kanpur in 1970. He is well versed in Hindi, English and Bengali.

X

Share this Profile

Recommended Profiles

Souptik Chakraborty

Souptik Chakraborty photo NCL Colony, Pune

Sampath Lonka

Sampath Lonka photo Yelahanka, Bangalore

Akash Varshney

Akash Varshney photo Munirka, Delhi

Kishan Kumar

Kishan Kumar photo Barra, Kanpur

Periyasamy

Periyasamy photo Sholinganallur, Chennai

Ashish Srivastava photo

Ashish Srivastava

Ashish Srivastava photo Kanpur, Kanpur

Also have a look at

Learn More

NCERT Solutions For Class 11 NCERT Class 12 Solutions CBSE Syllabus for Class 12 NCERT Solutions for Class 11 English Book 1 - Hornbill Literature Chapter 1 - The Portrait of a Lady Literature Chapter 2 - Were Not Afraid to Die Literature Chapter 3 - Discovering Tut: The Saga Continues Literature Chapter 4 - Landscape of the Soul Literature Chapter 5 - The Ailing Planet: the Green Movements Role Literature Chapter 6 - The Browning Version

Reply to 's review

Enter your reply*

1500/1500

Please enter your reply

Your reply should contain a minimum of 10 characters

Your reply has been successfully submitted.

Certified

The Certified badge indicates that the Tutor has received good amount of positive feedback from Students.

Different batches available for this Course

Book a Free Demo

This website uses cookies

We use cookies to improve user experience. Choose what cookies you allow us to use. You can read more about our Cookie Policy in our Privacy Policy

Accept All
Decline All

UrbanPro.com is India's largest network of most trusted tutors and institutes. Over 55 lakh students rely on UrbanPro.com, to fulfill their learning requirements across 1,000+ categories. Using UrbanPro.com, parents, and students can compare multiple Tutors and Institutes and choose the one that best suits their requirements. More than 7.5 lakh verified Tutors and Institutes are helping millions of students every day and growing their tutoring business on UrbanPro.com. Whether you are looking for a tutor to learn mathematics, a German language trainer to brush up your German language skills or an institute to upgrade your IT skills, we have got the best selection of Tutors and Training Institutes for you. Read more

ThinkVidya Learning Pvt Ltd © 2010-2024All Rights Reserved