A link budget is accounting of all of the gains and losses from the transmitter, through the medium (free space, cable, waveguide, fiber, etc.) to the receiver in a telecommunication system. It accounts for the attenuation of the transmitted signal due to propagation, as well as the antenna gains, feedline and miscellaneous losses. Randomly varying channel gains such as fading are taken into account by adding some margin depending on the anticipated severity of its effects. The amount of margin required can be reduced by the use of mitigating techniques such as antenna diversity or frequency hopping..

A simple link budget equation looks like this:

Received Power (dBm) = Transmitted Power (dBm) + Gains (dB) − Losses (dB)

Note that decibels are logarithmic measurements, so adding decibels is equivalent to multiplying the actual numeric ratios.

For a line-of-sight radio system, the primary source of loss is the decrease of the signal power due to uniform propagation, proportional to the inverse square of the distance (geometric spreading).

• Transmitting antennas are for the most part not isotropic aka omnidirectional.
• Completely omnidirectional antennas are rare in telecommunication systems, so almost every link budget equation must consider antenna gain.
• Transmitting antennas typically concentrate the signal power in a favoured direction, normally that in which the receiving antenna is placed.
• Transmitter power is effectively increased (in the direction of highest antenna gain). This systemic gain is expressed by including the antenna gain in the link budget.
• The receiving antenna is also typically directional, and when properly oriented collects more power than an isotropic antenna would; as a consequence, the receiving antenna gain (in decibels from isotropic, dBi) adds to the received power.
• The antenna gains (transmitting or receiving) are scaled by the wavelength of the radiation in question. This step may not be required if adequate systemic link budgets are achieved.

### Simplifications needed

Often link budget equations can become messy and complex, so there have evolved some standard practices to simplify the link budget equation

• The wavelength term is often considered part of the free space loss equation. This complexity reduction is acceptable for terrestrial communication systems, where only line of sight is considered.
• Considering all carrier wave propagation to be wavelength-independent. This is justified by the conservation of energy law that requires that the electric field decrease in power as the square of the distance regardless of frequency (in free space propagation conditions).

### Transmission line and polarization loss

In practical situations (Deep Space Telecommunications, Weak signal DXing etc. ...) other sources of signal loss must also be accounted for

• The transmitting and receiving antennas may be partially cross-polarized.
• The cabling between the radios and antennas may introduce significant additional loss.
• Doppler shift induced signal power losses in the receiver.

### Endgame

If the estimated received power is sufficiently large (typically relative to the receiver sensitivity), which may be dependent on the communications protocol in use, the link will be useful for sending data. The amount by which the received power exceeds receiver sensitivity is called the link margin.

### Equation

A link budget equation including all these effects, expressed logarithmically, might look like this:

$P_{RX} = P_{TX} + G_{TX} - L_{TX} - L_{FS} - L_M + G_{RX} - L_{RX} \,$

where:

$P_{RX}$ = received power (dBm)
$P_{TX}$ = transmitter output power (dBm)
$G_{TX}$ = transmitter antenna gain (dBi)
$L_{TX}$ = transmitter losses (coax, connectors...) (dB)
$L_{FS}$ = free space loss or path loss (dB)
$L_M$ = miscellaneous losses (fading margin, body loss, polarization mismatch, other losses...) (dB)
$G_{RX}$ = receiver antenna gain (dBi)
$L_{RX}$ = receiver losses (coax, connectors...) (dB)

The loss due to propagation between the transmitting and receiving antennas, often called the path loss, can be written in dimensionless form by normalizing the distance to the wavelength:

$L_{FS}$ (dB) = 20×log[4×π×distance/wavelength] (where distance and wavelength are in the same units)

When substituted into the link budget equation above, the result is the logarithmic form of the Friis transmission equation.

In some cases it is convenient to consider the loss due to distance and wavelength separately, but in that case it is important to keep track of which units are being used, as each choice involves a differing constant offset. Some examples are provided below.

$L_{FS}$ (dB) = 32.45 dB + 20×log[frequency(MHz)] + 20×log[distance(km)] [1]
$L_{FS}$ (dB) = - 27.55 dB + 20×log[frequency(MHz)] + 20×log[distance(m)]
$L_{FS}$ (dB) = 36.6 dB + 20×log[frequency(MHz)] + 20×log[distance(miles)]

These alternative forms can be derived by substituting wavelength with the ratio of propagation velocity (c, approximately 3×10^8 m/s) divided by frequency, and by inserting the proper conversion factors between km or miles and meters, and between MHz and (1/sec).

Because of building obstructions such as walls and ceilings, propagation losses indoors can be significantly higher. This occurs because of a combination of attenuation by walls and ceilings, and blockage due to equipment, furniture, and even people.

• For example, a “2 x 4” wood stud wall with drywall on both sides results in about 6dB loss per wall.
• Older buildings may have even greater internal losses than new buildings due to materials and line of sight issues.

Experience has shown that line-of-sight propagation holds only for about the first 3 meters. Beyond 3 meters propagation losses indoors can increase at up to 30dB per 30 meters in dense office environments.

This is a good “rule-of-thumb”, in that it is conservative (it overstates path loss in most cases). Actual propagation losses may vary significantly depending on building construction and layout.

## In waveguides and cables

Guided media such as coaxial and twisted pair electrical cable, radio frequency waveguide and optical fiber have losses that are exponential with distance.

The path loss will be in terms of dB per unit distance.

This means that there is always a crossover distance beyond which the loss in a guided medium will exceed that of a line-of-sight path of the same length.

Long distance fiber-optic communication became practical only with the development of ultra-transparent glass fibers. A typical path loss for single mode fiber is 0.2 dB/km, [2] far lower than any other guided medium.

## Examples

### Earth–Moon–Earth communications

Link budgets are important in Earth–Moon–Earth communications. As the albedo of the Moon is very low (maximally 12% but usually closer to 7%), and the path loss over the 770,000 kilometre return distance is extreme (around 250 to 310 dB depending on VHF-UHF band used, modulation format and Doppler shift effects), high power (more than 100 watts) and high-gain antennas (more than 20 dB) must be used.

• In practice, this limits the use of this technique to the spectrum at VHF and above.
• The Moon must be above the horizon in order for EME communications to be possible.

### Voyager Program

The Voyager Program spacecraft have the highest known path loss and lowest link budgets of any telecommunications circuit. Although the Deep Space Network has been able to maintain the necessary technological advances to maintain the link, the received field strength is still many billions of times weaker than a battery powered wristwatch.