---
author: Akbar Rahman
date: \today
title: MMME2046 // Control
tags: [ mmme2046, uon, uni, control ]
uuid: 73e04dd2-ee4c-4952-a9b7-7df3930d2d2d
lecture_slides: [ ./lecture_slides/Control 1 2023.pdf, ./lecture_slides/Control 2 2022.pdf, ./lecture_slides/Control Lecture 3 2022.pptx ]
exercise_sheets: [ ./exercise_sheets/control.pdf, ./exercise_sheets/control_sols_odd.pdf ]
---
# Errata
## Exercise Sheets
### ES1, Q5 (p3)
Output column on row 3c should be $h_2$ not $h_3$.
## Lecture Slides 2 p26
First line should be
$$C(s) = \frac{5}{s(s+5)} = \frac 1s \frac{1}{1+0.2s}$$
# System and Block Diagrams
# Laplace Transform
$$F(s) = \mathscr L {F(t)} = \int^\infty_0 f(t)e^{-st} \mathrm{d}t$$
where $s = \alpha + j\omega$
The function $F(s)$ is often much easier to manipulate than periodic function $f(t)$.
## Final Value Theorem
As $f(t)$ tends to infinity, $sF(s)$ tends to 0.
## Example
$$\dot x_o = ax_o = ax_i$$
where $x_o$ is the output and $x_i$ is the input
Take the Laplace transform:
$$sX_o(s) + aX_o(s) = aX_i(s)$$
Rearrange to get equation for the transfer function:
$$G(s) = \frac{X_o}{X_i} = \frac{a}{s+a}$$
$$ X_o = GX_i $$
If $X_i$ is a unit step, then:
$$X_i = \frac1s$$
and
$$X_o = \frac{a}{s(s+a)}$$
Taking the inverse gives:
$$X_0 = 1 - e^{-at}$$
# Non-Linearity
Sometimes, components of a system will not reduce to a simple linear relationship.
When this is the case superposition and Laplace transforms do not apply/are not valid.
Reasons for this include:
- saturation
- backlash
- clearance
- coulomb friction
- material non-linearity
- flow through an orifice (choked flow)
## Linearisation
System behaviour is approximated to a linear relationship near the "nominal" operating point:
