From: Andrew Lorimer Date: Sun, 17 Jun 2018 11:21:44 +0000 (+1000) Subject: expand fields notes X-Git-Tag: yr11~99 X-Git-Url: https://git.lorimer.id.au/notes.git/diff_plain/6087721a74a6de6d233695d9a35d50374f98d590 expand fields notes --- diff --git a/physics/fields-essential.md b/physics/fields-essential.md new file mode 100644 index 0000000..3488925 --- /dev/null +++ b/physics/fields-essential.md @@ -0,0 +1,8 @@ +# Fields - essential notes + +- Magnetic field always acts N -> S +- Current always flows +ve to -ve +- Motors- AC (slip ring) or DC (split ring) +- Dot means out of page, cross means into page +- ${E_1 \over E_2}={r_1 \over r_2}^2$ +- charge produced by gravity = $GM$ diff --git a/physics/fields2.md b/physics/fields2.md new file mode 100644 index 0000000..c4ec99a --- /dev/null +++ b/physics/fields2.md @@ -0,0 +1,144 @@ +# Fields + +Non-contact forces: +- strong nuclear force +- weak nuclear force +- electromagnetic force (dipoles) +- gravitational force (monopoles) + +--- + +## Gravity + +### Newton's law of universal gravitation + +$$F_g=G{{m_1m_2}\over r^2}$$ + +where +$F_g$ is the gravitational force between $m_1$ and $m_2$ +$G$ is the gravitational constant, $6.67 \times 10^{-11} \operatorname{N m^2kg^{-2}}$ +$r$ is the distance between centre of $m_1$ and $m_2$ + + +- inverse square law +- acceleration can be calculated from $F_g$, since $F=ma$ +- all objects with mass attract each other with $F_g$ +- $F_g$ acts equally on $m_1$ and $m_2$ +- acceleration of an object close to earth's surface can be approximated by ignoring its mass ($m_2 \approx 0$) +- apparent weight may be different to gravitational (normal) weight + +### Gravitational fields + +$$g={F_g \over m}=G{M \over r^2}$$ + +where +$g$ is the gravitational field strength +$F_g$ is the force due to gravity ($=G{{m_1m_2}\over r^2}$) +$m$ is the mass of object in the field +$M$ is the mass of the central body + +- arrows towards centre of object +- closer arrows mean larger force +- parallel field lines - uniform field strength (vector) + +Characteristics of gravitational fields: +- monopoles +- attractive force +- extends to infinite distance, but diminishes with inverse square law + +### Work in a gravitational field + +Gravitational potential energy: $E_g = mg \Delta h$ +Work: $W = \Delta E_g = Fx$ + +Area under force-distance graph = $\Delta E_g$ +Area under field-distance graph = $\Delta E_g / \operatorname{kg}$ + +### Satellites + +## Electromagnetism + +### Electric fields + +- surrounds +ve and -ve charges +- exerts force on other changes in its field +- monopoles and dipoles +- attractive/repulsive forces +- can be constrained to a fixed distance (conductors / insulators) +- current flows from +ve to -ve + +#### Field lines +- +ve to -ve +- start and end $\perp$ to surface +- field lines never cross +- point charges - radiate from centre + +#### Forces + +$$F=qE$$ + +where +$F$ is the force on charged particle +$q$ is the charge of object experiencing force (Coulombs) +$E$ is the strength of the electric field (Newtons / Coloumb or Volts / metre) + +#### Work in electric fields + +$$W=qV$$ + +where +$W$ is the work done on +ve point charge or in field +$q$ is the charge of point charge being acted on +$V$ is the potential (voltage) between points + +#### Coulomb's law + + +$$F=k{{q_1q_2}\over r^2}$$ + +where +$k$ is Coulomb's constant $9.0 \times 10^9 \operatorname{N m^2 C^{-2}}$ +$q_1$ and $q_2$ are the charges on the interacting points + + +#### Electric field at distance from a charge + +$$E=k{Q \over r^2}$$ + +### Electromagnetism + +#### Lenz's law +- Right hand grip rule (relationship between directions of $I, F$) + +#### Solenoids +- Coil around core (like a transformer but field is transferred to kinetic energy) + +#### Magnetic force on charged particles + +$$F=qvB$$ + +where +$v$ is the component of velocity which is $\perp$ to magnetic field + +#### Right hand slap rule + + +**Field, current and force are all 90 degree to each other** +
+force
+|      /    field
+|   /
+|/  90 de=
+ \
+   \   +ve charge
+
+ +Force is given by $F=nBIl$ + +### Motors + +#### DC + +- current-carrying wire experiences magnetic force $F$ equal to $nBIl$ +- torque: $\tau = r_{\perp} F$ +- split ring and brushes