When trying to explain why it’s worth mastering calculus 1, people often call it the language of science. It’s true – you can define pretty much anything in numbers and equations in master calculus 1, be it in the fields of chemistry, physics, or biology. However, it’s not that simple to get the master calculus 1 down, as it’s not quite a single discipline. There are a lot of areas that relate to different phenomenons. For example, if study mathematics then, geometry teaches us about shapes, algebra explains the mathematical symbols and how to use them… Calculus, in turn, stands for the study of continuous change.

What exactly is calculus, and where can you use it?

The name of calculus comes from a Latin word meaning a tiny pebble, as they were used for calculation in ancient times. It helps you find patterns between mathematical equations. This simplifies the tasks that include using functions involving one or multiple variables. Not only does calculus and analytic geometry are great exercise for your brain, but it also has numerous practical applications, including:

Physics

Statistics

Engineering

Business

Economics

and any field where creating a mathematical model can help reach the solution

If you haven’t learned calculus at school or simply want to get ahead of the curriculum, we’ve got good news for you – you can quickly learn calculus online! Guided by a professional lecturer, you will save time, get familiar with the most crucial concepts, and gain valuable skills in just a few hours.

This online calculus course is also an excellent option for those who have the basics of calculus down but wish to refresh and strengthen their knowledge. Following explanations and practical examples, you will brush up on your skills in no time!

Choose the online calculus course prepared by the best!

When you decide to learn calculus online, you face one more problem: how do you choose a course that doesn’t take dozens of hours and contains all the vital information? How do you find the balance between theory and practical use? Simply said, how do you choose the best tutorial from all the choices available to you on the Internet?

The most important advantage of choosing an online calculus course over face-to-face lectures is being able to select the best teachers: the boundaries of time and location do not exist on the Internet. In this course, you will learn calculus and analytic geometry from a true master! The lectures in this online calculus course have been prepared by the one and only Ad Chauhdry, who has a master’s degree in mathematics and over fifteen years of experience teaching at universities. Apart from lecturing, he’s also a mathematics researcher and a published author of scientific articles in several journals.

In forty-two lectures, Ad Chauhdry explains everything you need to know to master calculus and illustrated the concepts with practical examples in whiteboard demonstrations. As of now, he has taught thousands of people all around the world – both online and offline. With this online calculus course, you can become one of them! Start learning now and become a master of calculus today!

This course is a complete calculus encyclopedia. It is the longest course from any calculus course on udemy. There are more than 10 sections in this course and each section has bundles of videos lectures on calculus and its applications. The contents of the course focuses on

Limits and continuity.

Derivatives.

Definite and indefinite integrals.

Conic sections.

Plane curve 1 and plane curve 2.

Three dimensional coordinates system.

Partial differentiation.

Multiples integrals.

Differential equations.

Limits and Continuity:

In the first section of the course the students will learn about limits and continuity and its application along with number of exercises and examples.

Differentiation:

In this section the students will get familiar with derivatives and and geometrical interpretation of derivatives along with various exercises and examples.

Techniques of Integration:

This section is organized with various techniques of integration in indefinite integral.

Conic Sections:

Drawing and sketching and solving of problems of plane geometry of , Parabola and all planes figures.

Example Problems of Parabola, derivation of ellipse Equation, ellipse examples, derivation of hyperbola equation,

Problems and exercise of hyperbola, graphical explanation of parabola, ellipse and hyperbola.

Focus ,vertex, directrix and eccentricity of parabola, center, foci, vertices, directricx and latusrectum of ellipse.

i have describe the center, vertices, foci and equation of joint asymptotic of hyperbola

Plane Curve I and II

Asymtote of a curve.

Maxima and minima of a function.

Orthogonal trajectories of curves.

Solution of curves like cardiod and cycliod etc.

Three Dimensional Coordinates System

Slopes.

Slopes intercept form.

Point intercept form.

Spherical polar coordinates.

Cylindrical coordinates.

Paraboloid.

Hyperboloid.

Ellipsiod.

Cycliod.

Partial Differentiation

definitions.

Proofs.

Examples and exercises.

Multiples Integrals

How to solve the double and multiple Integrals.

How to find the limits in doubles and multiple integrals.

How to find the area and volume by using the double and multiple integrals.

Many examples and exercises.