Darshan Maheshwari

NIT Bhopal
SME

Biography

I've been coaching Math and Physics for 5+ years now. During this time, I've solved 10k+ questions and undertaken 400+ tutoring hours.

I'm working as a SME & online tutor with more than 5 platforms at present. I've also worked with Chegg and TutorMe for 2 years
Following are the platforms over which I provide assistance :

TutorMe.com - https://tutorme.com/tutors/12460/
Acadecraft
Hashlearn.com
Toppr.com
Inteltutors

Education

BS Electrical
NIT Bhopal

Educator Statistics

Numerade tutor for 6 years
9197 Students Helped

Topics Covered

Power Series
Powers and Polynomial
Unlock the Power of Vectors: Discover Their Limitless Possibilities
Vector Functions: Understanding the Basics
Exploring the World of Derivatives: A Comprehensive Guide
Stand Out with Differentiation Strategies | Boost Your Business
Mastering Integration Techniques for Optimal Results
Unlocking the Power of Functions: Boost Your Programming Skills
Differential Equations Made Simple: Expert Tips & Resources
Mastering Integrals: Tips and Tricks for Calculus Success
Integration
Applications of Integration: Exploring Real-World Solutions
Master Algebra Basics: Topics Reviewed at Semester Start
Introduction to Conic Sections
Breaking Limits: Unlock Your Potential with Our Expert Solutions
Unlock the Power of Sequences: Boost Your Productivity
Discover the Best Series to Binge-Watch | Your Ultimate Guide
Taylor Series
Master Trigonometry with Our Comprehensive Guide
Functions
Polar Coordinates: Understanding the Basics and Applications
Mastering Vectors: An Introduction to Vector Basics
Understanding Complex Numbers: A Comprehensive Guide
Mastering Equations and Inequalities: Your Guide to Mathematical Success
Rational Functions: Understanding Their Properties and Applications
Mastering Polynomials: Essential Tips and Tricks | [Brand Name]
Mastering Linear Functions: A Comprehensive Guide
Mastering Quadratic Functions: Unlocking Their Power
Explore the Power of Continuous Functions: Boost Your Mathematical Skills
Trig Integrals
Improper Integrals
Applications of the Derivative
Exploring the Functions of Multiple Variables
Applications of Trigonometric Functions
Graphing Trigonometry Functions
Discover the Basics of Trigonometry: Your Introduction to Triangles
Mastering Motion: Achieving Efficiency Along a Straight Line
Motion in 2d or 3d
Understanding Temperature and Heat: A Comprehensive Guide
Unlocking the Secrets of Thermal Properties: Understanding Matter
Mastering Exponents and Polynomials: A Comprehensive Guide
Mastering Exponential and Logarithmic Functions: Your Ultimate Guide
The Power of Algebraic Language: Unlocking Mathematical Potential
Mastering Partial Derivatives: Essential Techniques and Tips
Mastering the Basics of Parametric Equations: A Comprehensive Guide
Discover the Relationship Between Parallel and Perpendicular Lines
Understanding Alternating Current: A Comprehensive Guide
Unlocking the Power of Electric Potential: Exploring its Benefits
Capacitance and Dielectrics: Understanding the Basics
Discovering the Fundamentals: Newton's Laws of Motion Explained
Mastering Newton's Laws: Tips for Applying Them Effectively
Unlock the Secrets of Fluid Mechanics with Our Expert Guide
Exploring the Fascinating World of Mechanical Waves
Mastering the Rotation of Rigid Bodies: Tips & Techniques
Explore the Fascinating Dynamics of Rotational Motion
Understanding Equilibrium and Elasticity: A Comprehensive Guide
Discover the Power of Gravitation: Exploring the Science Behind It
Explore the Fascinating World of Periodic Motion - Learn More Today!
Unlock Insights with Data-Driven Graphs & Statistics
Understanding Moment Impulse and Collisions for Better Physics
Understanding Electromagnetic Waves: A Comprehensive Guide
Volume
Understanding Gauss's Law: A Comprehensive Guide
Calculating Electrical Power: Resistance and EMF
Master Direct Current Circuits with Our Expert Guide
Electromagnetic Induction: Understanding the Science and Applications
Understanding Electric Charge and Field: A Comprehensive Guide
Understanding Reflection and Refraction of Light: A Comprehensive Guide
Explore the Fascinating World of Wave Optics - Unleash Its Potential
Introduction to Sequences and Series
Introduction to Combinatorics and Probability
Find Your Dream Job: Discover the Best Work Opportunities
Unlock the Power of Kinetic Energy: Boost Your Efficiency Today
Unlocking the Power of Potential Energy: Discover the Benefits
Save Energy and Money with Effective Conservation Techniques
Understanding the Second Law of Thermodynamics: Key Principles
Master the Fundamentals of Physics: Learn Physics Basics
Introduction to Combinatorics & Probability: Understanding the Basics

Darshan's Textbook Answer Videos

01:39
Calculus: Early Transcendentals

Each limit represents the derivative of some function $ f $ at some number $ a $. State such an $ f $ and $ a $ in each case.

$ \displaystyle \lim_{\theta \to \pi/6} \frac{\sin \theta - \frac{1}{2}}{\theta - \pi/6} $

Chapter 2: Limits and Derivatives
Section 7: Derivatives and Rates of Change
Darshan Maheshwari
0:00
Calculus: Early Transcendentals

Where is the greatest integer function $ f(x) = [ x ] $ not differentiable? Find a formula for $ f' $ and sketch its graph.

Chapter 2: Limits and Derivatives
Section 8: The Derivative as a Function
Darshan Maheshwari
03:10
Calculus: Early Transcendentals

When a particle is located a distance $ x $ meters from the origin, a force of $ \cos (\frac{\pi x}{3}) $ newtons acts on it. How much work is done in moving the particle from $ x = 1 $ to $ x = 2 $? Interpret your answer by considering the work done from $ x = 1 $ to $ x = 1.5 $ and from $ x = 1.5 $ to $ x = 2 $.

Chapter 6: Applications of Integration
Section 4: Work
Darshan Maheshwari
01:57
Calculus: Early Transcendentals

A force of 10 lb is required to hold a spring stretched 4 in. beyond its natural length. How much work is done in stretching it from its natural length to 6 in. beyond its natural length?

Chapter 6: Applications of Integration
Section 4: Work
Darshan Maheshwari
05:35
Calculus: Early Transcendentals

For what values of $ c $ does the polynomial $ P(x) = x^4 + cx^3 + x^2 $ have two inflection points? One inflection point? None? Illustrate by graphing $ P $ for several values of $ c $. How does the graph change as $ c $ decreases?

Chapter 4: Applications of Differentiation
Section 3: How Derivatives Affect the Shape of a Graph
Darshan Maheshwari
0:00
Calculus: Early Transcendentals

If $ \displaystyle f(x) = \int^{\sin x}_0 \sqrt{1 + t^2} \, dt $ and $ \displaystyle g(y) = \int^y_3 f(x) \, dx $, find $ g''(\pi/6) $.

Chapter 5: Integrals
Section 3: The Fundamental Theorem of Calculus
Darshan Maheshwari
1 2 3 4 5 ... 643

Darshan's Quick Ask Videos

02:18
Intro Stats / AP Statistics

A questionnaire on hosing arrangements showed this information obtained from 25 respondents. Construct a frequency distribution for the data ( H = house , A= apartment, M =mobile home, C= condominium). H A H M H C C A H C H H H A H H H H A H H H C H H

Darshan Maheshwari
03:15
Calculus 1 / AB

The speed of an airplane was recorded every five minutes during the first 40 minutes of its journey (see table below). Use the trapezoidal rule to estimate the total distance travelled by the airplane during these 40 minutes.
time (minutes) 0 5 10 15 20 25 30 35 40
speed (km/hour) 0 171 207 243 270 292 308 315 320

Darshan Maheshwari
04:17
Calculus 3

Where does the normal line to the paraboloid
z = x^2 + y^2 at the point (2, 2, 8)
intersect the paraboloid a second time?
(x,y,z)= ?

Darshan Maheshwari
01:44
Physics 101 Mechanics

The aorta is a major artery, rising upward from the left ventricle of the heart and curving down to carry blood to the abdomen and lower half of the body. The curved artery can be approximated as a semicircular arch whose diameter is 4.77 cm. If blood flows through the aortic arch at a speed of 0.356 m/s, what is the magnitude (in m/s2) of the blood’s centripetal acceleration? (g = 9.80 m/s2)

Darshan Maheshwari
03:05
Physics 101 Mechanics

A special electronic sensor is embedded in the seat of a car that takes riders around a circular loop-the-loop ride at an amusement park. The sensor measures the magnitude of the normal force that the seat exerts on a rider. The loop-the-loop ride is in the vertical plane and its radius is 15.9 m. Sitting on the seat before the ride starts, a rider is level and stationary, and the electronic sensor reads 790 N. At the top of the loop, the rider is upside down and moving, and the sensor reads 356 N. What is the speed of the rider at the top of the loop? (g = 9.80 m/s2)

Darshan Maheshwari
02:27
Physics 101 Mechanics

A 0.43-kg ball on a stick is whirled on a vertical circle at a constant speed. When the ball is at the three o’clock position, the stick tension is 12.8 N. Find the tensions in the stick when the ball is at the six o’clock positions. (g = 9.80 m/s2)

Darshan Maheshwari
1 2 3 4 5 ... 871