CCR05CX1R0 Datasheet, PDF(3/71 Page) AVX Corporation – Multiayer Ceramic Leaded Capacitors

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CCR05CX1R0 Datasheet, PDF (3/71 Pages) AVX Corporation – Multiayer Ceramic Leaded Capacitors

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The Capacitor

GENERAL INFORMATION

A capacitor is a component which is capable

of storing electrical energy. It consists of two conductive

plates (electrodes) separated by insulating material which is

called the dielectric. A typical formula for determining

capacitance is:

.224 KA

C = capacitance (picofarads)

K = dielectric constant (Vacuum = 1)

A = area in square inches

t = separation between the plates in inches

(thickness of dielectric)

.224 = conversion constant

(.0884 for metric system in cm)

Capacitance â The standard unit of capacitance

is the farad. A capacitor has a capacitance of 1 farad

when 1 coulomb charges it to 1 volt. One farad is a very

large unit and most capacitors have values in the micro

(10-6), nano (10-9) or pico (10-12) farad level.

Dielectric Constant â In the formula for capacitance

given above the dielectric constant of a vacuum is

arbitrarily chosen as the number 1. Dielectric constants

of other materials are then compared to the dielectric

constant of a vacuum.

Dielectric Thickness â Capacitance is indirectly propor-

tional to the separation between electrodes. Lower volt-

age requirements mean thinner dielectrics and greater

capacitance per volume.

Area â Capacitance is directly proportional to the area of

the electrodes. Since the other variables in the equation

are usually set by the performance desired, area is the

easiest parameter to modify to obtain a specific capaci-

tance within a material group.

Energy Stored â The energy which can be stored in a

capacitor is given by the formula:

E = 1â2CV2

E = energy in joules (watts-sec)

V = applied voltage

C = capacitance in farads

Potential Change â A capacitor is a reactive

component which reacts against a change in potential

across it. This is shown by the equation for the linear

charge of a capacitor:

Iideal

where

I = Current

C = Capacitance

dV/dt = Slope of voltage transition across capacitor

Thus an infinite current would be required to instantly

change the potential across a capacitor. The amount of

current a capacitor can âsinkâ is determined by the

above equation.

Equivalent Circuit â A capacitor, as a practical device,

exhibits not only capacitance but also resistance and

inductance. A simplified schematic for the equivalent

circuit is:

C = Capacitance

Rs = Series Resistance

L = Inductance

Rp = Parallel Resistance

Reactance â Since the insulation resistance (Rp)

is normally very high, the total impedance of a capacitor

is:

where

Í± Z = RS2 + (XC - XL )2

Z = Total Impedance

Rs = Series Resistance

XC = Capacitive Reactance = 1

2 Ï fC

XL = Inductive Reactance = 2 Ï fL

The variation of a capacitorâs impedance with frequency

determines its effectiveness in many applications.

Phase Angle â Power Factor and Dissipation Factor are

often confused since they are both measures of the loss

in a capacitor under AC application and are often almost

identical in value. In a âperfectâ capacitor the current in

the capacitor will lead the voltage by 90Â°.

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