Bisection Method and Numerical Analysis

Complex and unsolvable

Boring and mechanical

Simple and straightforward

Exciting and dynamic

Differentiation finds gradients, integration finds areas

They both calculate gradients

Integration is a subset of differentiation

They are unrelated processes

Newton's method

Trapezoidal rule

Simpson's rule

Bisection method

Circle

Triangle

Rectangle

Parabola

Roots are always imaginary

Lack of any existing formulas

Complexity and inefficiency of existing formulas

Too many roots to calculate

Doubling the interval

Halving the interval

Quartering the interval

Tripling the interval

It is very fast

It requires complex calculations

It only works for discontinuous functions

It is very slow and simple

The function must be quadratic

The function must be discontinuous

The function must be linear

The function must be continuous

Choosing values that are not integers

Choosing values that include multiple roots

Choosing values too far apart

Choosing values that are too close

It will find roots faster

It will only find imaginary roots

It may miss some solutions

It will find all roots