This course on integrals aims to teach students how to integrate various functions, including exponential, trigonometric, logarithmic, and inverse trigonometric functions. The course covers techniques such as integration by parts, substitution, and trigonometric identities. The teaching method involves solving integrals step by step, with a focus on speed and accuracy. This course is intended for learners who have a basic understanding of calculus and want to improve their skills in integrating complex functions.
Overview
Syllabus
Integral of 1/e^x.
Integral of sqrt(e^x).
Integral of sqrt((1-x)/(1+x)).
Let me quickly integrate x/sqrt(1-x^2).
Q47, Integral of csc(x)sec(x).
[Speed Run, 1 time thru] Integral of 1/(1+sin(x)).
integral of sin(ln(x)), integration by parts with u substitution.
Integral of ln(x)/x^2, integration by parts, DI method.
integral of e^sqrt(x), integration by parts in the u-world,.
integral of x*tan^ -1(x).
integral of tan^2(x)*sec(x).
Integral of sec^6x.
Taught by
blackpenredpen
