Passive filters Passive implementations of linear filters are based on combinations of
resistors (R),
inductors (L) and
capacitors (C). These types are collectively known as
passive filters, because they do not depend upon an external power supply and they do not contain active components such as
transistors. Inductors block high-frequency signals and conduct low-frequency signals, while
capacitors do the reverse. A filter in which the signal passes through an
inductor, or in which a capacitor provides a path to ground, presents less
attenuation to low-frequency signals than high-frequency signals and is therefore a
low-pass filter. If the signal passes through a capacitor, or has a path to ground through an inductor, then the filter presents less attenuation to high-frequency signals than low-frequency signals and therefore is a
high-pass filter.
Resistors on their own have no frequency-selective properties, but are added to inductors and capacitors to determine the
time-constants of the circuit, and therefore the frequencies to which it responds. The inductors and capacitors are the
reactive elements of the filter. The number of elements determines the order of the filter. In this context, an
LC tuned circuit being used in a band-pass or band-stop filter is considered a single element even though it consists of two components. At high frequencies (above about 100
megahertz), sometimes the inductors consist of single loops or strips of sheet metal, and the capacitors consist of adjacent strips of metal. These inductive or capacitive pieces of metal are called
stubs.
Single element types The simplest passive filters,
RC and
RL filters, include only one reactive element, except for the
hybrid LC filter, which is characterized by inductance and capacitance integrated in one element.
L filter An L filter consists of two reactive elements, one in series and one in parallel.
T and π filters Three-element filters can have a 'T' or 'π' topology and in either geometries, a
low-pass,
high-pass,
band-pass, or
band-stop characteristic is possible. The components can be chosen symmetric or not, depending on the required frequency characteristics. The high-pass T filter in the illustration, has a very low impedance at high frequencies, and a very high impedance at low frequencies. That means that it can be inserted in a transmission line, resulting in the high frequencies being passed and low frequencies being reflected. Likewise, for the illustrated low-pass π filter, the circuit can be connected to a transmission line, transmitting low frequencies and reflecting high frequencies. Using
m-derived filter sections with correct termination impedances, the input impedance can be reasonably constant in the pass band.
Multiple-element types Multiple-element filtration are usually constructed as a
ladder network. These can be seen as a continuation of the L,T and π designs of filters. More elements are needed when it is desired to improve some parameter of the filter such as stop-band rejection or slope of transition from pass-band to stop-band.
Reflectionless filter Reflectionless filters are passive structures that in principle have identically zero
reflection coefficient at all frequencies. Such structures may be synthesized with lumped inductors, capacitors, and resistors, or by transmission lines and resistors.
Active filters Active filters are implemented using a combination of passive and active (amplifying) components, and require an outside power source.
Operational amplifiers are frequently used in active filter designs. These can have high
Q factor, and can achieve
resonance without the use of inductors. However, their upper frequency limit is limited by the bandwidth of the amplifiers.
Other filter technologies There are many filter technologies other than lumped component electronics. These include
digital filters,
crystal filters,
mechanical filters,
surface acoustic wave (SAW) filters,
thin-film bulk acoustic resonator (TFBAR, FBAR) based filters,
garnet filters, and atomic filters (used in
atomic clocks). == The transfer function ==