Transcript Lecture 9
Physics 2102 Jonathan Dowling Physics 2102 Lecture: 11 FRI 06 FEB Capacitance I 25.1–3 QuickTime™ and a decompressor are needed to see this picture. Tutoring Lab Now Open Tuesdays • Lab Location: 102 Nicholson (across the hall from class) • Lab Hours: MTWT: 12:00N–5:00PM F: 12:N–3:00PM Capacitors and Capacitance Capacitor: any two conductors, one with charge +Q, other with charge –Q –Q Potential DIFFERENCE between conductors = V Q = CV where C = capacitance Units of capacitance: Farad (F) = Coulomb/Volt +Q Uses: storing and releasing electric charge/energy. Most electronic capacitors: micro-Farads (F), pico-Farads (pF) — 10–12 F New technology: compact 1 F capacitors Capacitance • Capacitance depends only on GEOMETRICAL factors and on the MATERIAL that separates the two conductors • e.g. Area of conductors, separation, whether the space in between is filled with air, plastic, etc. +Q –Q (We first focus on capacitors where gap is filled by AIR!) Electrolytic (1940-70) Electrolytic (new) Paper (1940-70) Capacitors Variable air, mica Tantalum (1980 on) Ceramic (1930 on) Mica (1930-50) Parallel Plate Capacitor We want capacitance: C = Q/V E field between the plates: (Gauss’ Law) Q E 0 0 A Relate E to potential difference V: Area of each plate = A Separation = d charge/area = = Q/A -Q d Q Qd V E dx dx A 0 A 0 0 0 d What is the capacitance C ? Q 0 A C V d C2 m2 C2 CC C Units: 2 Nm m Nm J V +Q Capacitance and Your iPhone! Q 0 A C V d Parallel Plate Capacitor — Example • A huge parallel plate capacitor consists of two square metal plates of side 50 cm, separated by an air gap of 1 mm • What is the capacitance? C = 0A/d = (8.85 x 10–12 F/m)(0.25 m2)/(0.001 m) = 2.21 x 10–9 F (Very Small!!) Lesson: difficult to get large values of capacitance without special tricks! C2 m2 C2 CC C Units: 2 F Farad Nm m Nm J V Isolated Parallel Plate Capacitor • A parallel plate capacitor of capacitance C is charged using a battery. • Charge = Q, potential difference = V. • Battery is then disconnected. • If the plate separation is INCREASED, does Potential Difference V: (a) Increase? (b) Remain the same? (c) Decrease? • Q is fixed! • C decreases (=0A/d) • V=Q/C; V increases. +Q –Q Parallel Plate Capacitor & Battery • A parallel plate capacitor of capacitance C is charged using a battery. • Charge = Q, potential difference = V. • Plate separation is INCREASED while battery remains connected. Does the Electric Field Inside: (a) Increase? (b) Remain the Same? • V is fixed by battery! • C decreases (=e0A/d) (c) Decrease? • Q=CV; Q decreases • E = Q/0A decreases +Q –Q Spherical Capacitor What is the electric field inside the capacitor? (Gauss’ Law) E Radius of outer plate = b Radius of inner plate = a Q 4 0 r 2 Relate E to potential difference between the plates: Concentric spherical shells: Charge +Q on inner shell, –Q on outer shell b b kQ kQ V E dr 2 dr r r a a a b 1 1 kQ a b Spherical Capacitor What is the capacitance? C = Q/V = Q Q 1 1 4 0 a b 4 0 ab (b a) Radius of outer plate = b Radius of inner plate = a Concentric spherical shells: Charge +Q on inner shell, –Q on outer shell Isolated sphere: let b >> a, C 4 0 a Cylindrical Capacitor Quic kTime™ a nd a d eco mp res so r ar e n eed ed to see thi s p ictu re. What is the electric field in between the plates? Gauss’ Law! E Radius of outer plate = b Radius of inner plate = a Q 2 0 rL Length of capacitor = L +Q on inner rod, –Q on outer shell Relate E to potential difference between the plates: 20 L b C Q /V V E dr a b b ln a b b Q ln r Q ln dr 2 0 rL 2 0 L a 20 L a a Q cylindrical Gaussian surface of radius r Summary • Any two charged conductors form a capacitor. •Capacitance : C= Q/V •Simple Capacitors: Parallel plates: C = 0 A/d Spherical: C = 4e0 ab/(b-a) Cylindrical: C = 20 L/ln(b/a)]