Understanding Differential Equations and Euler's Identity

An exponential function

A polynomial function

A trigonometric function

A logarithmic function

Real and repeated

Complex

Imaginary

Real and distinct

Taylor series

Euler's identity

Pythagorean theorem

Laplace transform

cos(x) - j*sin(x)

sin(x) + j*cos(x)

cos(x) + j*sin(x)

j*cos(x) - sin(x)

To solve a polynomial equation

To calculate integrals

To simplify complex exponential terms

To derive a new equation

a1 and a2

d1 and d2

c1 and c2

b1 and b2

By gathering similar terms

By multiplying them

By adding them together

By dividing them

Current at time equals zero

Both voltage and current at time equals zero

Voltage at time equals zero

Neither voltage nor current at time equals zero

Equal to a2

Equal to v0

Equal to zero

Equal to a1

Introducing new variables

Rewriting the initial conditions

Continuing the derivation of the natural response

Solving another differential equation