# bandstop

Bandstop-filter signals

## Syntax

## Description

filters the input signal `y`

= bandstop(`x`

,`wpass`

)`x`

using a bandstop filter with a
stopband frequency range specified by the two-element vector
`wpass`

and expressed in normalized units of
*π* rad/sample. `bandstop`

uses a
minimum-order filter with a stopband attenuation of 60 dB and compensates for
the delay introduced by the filter. If `x`

is a matrix, the
function filters each column independently.

specifies additional options for any of the previous syntaxes using name-value
arguments. You can change the stopband attenuation, the Bandstop Filter Steepness, and the
type of impulse response of the filter.`y`

= bandstop(___,`Name=Value`

)

`[`

also returns the `y`

,`d`

] = bandstop(___)`digitalFilter`

object
`d`

used to filter the input.

`bandstop(___)`

with no output arguments plots
the input signal and overlays the filtered signal.

## Examples

### Bandstop Filtering of Tones

Create a signal sampled at 1 kHz for 1 second. The signal contains three tones, one at 50 Hz, another at 150 Hz, and a third at 250 Hz. The high-frequency and low-frequency tones both have twice the amplitude of the intermediate tone. The signal is embedded in Gaussian white noise of variance 1/100.

fs = 1e3; t = 0:1/fs:1; x = [2 1 2]*sin(2*pi*[50 150 250]'.*t) + randn(size(t))/10;

Bandstop-filter the signal to remove the medium-frequency tone. Specify passband frequencies of 100 Hz and 200 Hz. Display the original and filtered signals, and also their spectra.

bandstop(x,[100 200],fs)

### Bandstop Filtering of Musical Signal

Implement a basic digital music synthesizer and use it to play a traditional song. Specify a sample rate of 2 kHz. Plot the spectrogram of the song.

fs = 2e3; t = 0:1/fs:0.3-1/fs; fq = [-Inf -9:2]/12; note = @(f,g) [1 1 1]*sin(2*pi*440*2.^[fq(g)-1 fq(g) fq(f)+1]'.*t); mel = [5 3 1 3 5 5 5 0 3 3 3 0 5 8 8 0 5 3 1 3 5 5 5 5 3 3 5 3 1]+1; acc = [5 0 8 0 5 0 5 5 3 0 3 3 5 0 8 8 5 0 8 0 5 5 5 0 3 3 5 0 1]+1; song = []; for kj = 1:length(mel) song = [song note(mel(kj),acc(kj)) zeros(1,0.01*fs)]; end song = song/(max(abs(song))+0.1); % To hear, type sound(song,fs) pspectrum(song,fs,"spectrogram",TimeResolution=0.31, ... OverlapPercent=0,MinThreshold=-60)

Bandstop-filter the signal to separate the middle register from the other two. Specify passband frequencies of 230 Hz and 450 Hz. Plot the original and filtered signals in the time and frequency domains.

```
bong = bandstop(song,[230 450],fs);
% To hear, type sound(bong,fs)
bandstop(song,[230 450],fs)
```

Plot the spectrogram of the song without the middle register.

figure pspectrum(bong,fs,"spectrogram",TimeResolution=0.31, ... OverlapPercent=0,MinThreshold=-60)

### Bandstop Filter Steepness

Filter white noise sampled at 1 kHz using an infinite impulse response bandstop filter with a stopband width of 100 Hz. Use different steepness values. Plot the spectra of the filtered signals.

fs = 1000; x = randn(20000,1); [y1,d1] = bandstop(x,[ 50 150],fs,ImpulseResponse="iir",Steepness=0.5); [y2,d2] = bandstop(x,[200 300],fs,ImpulseResponse="iir",Steepness=0.8); [y3,d3] = bandstop(x,[350 450],fs,ImpulseResponse="iir",Steepness=0.95); pspectrum([y1 y2 y3],fs) legend("Steepness = " + [0.5 0.8 0.95],Location="south")

Compute and plot the frequency responses of the filters.

[h1,f] = freqz(d1,1024,fs); [h2,~] = freqz(d2,1024,fs); [h3,~] = freqz(d3,1024,fs); plot(f,mag2db(abs([h1 h2 h3]))) legend("Steepness = " + [0.5 0.8 0.95],Location="south") ylim([-120 20])

Make the filters asymmetric by specifying different values of steepness at the lower and higher passband frequencies.

[y1,d1] = bandstop(x,[ 50 150],fs,ImpulseResponse="iir",Steepness=[0.5 0.8]); [y2,d2] = bandstop(x,[200 300],fs,ImpulseResponse="iir",Steepness=[0.5 0.8]); [y3,d3] = bandstop(x,[350 450],fs,ImpulseResponse="iir",Steepness=[0.5 0.8]); pspectrum([y1 y2 y3],fs)

Compute and plot the frequency responses of the filters.

[h1,f] = freqz(d1,1024,fs); [h2,~] = freqz(d2,1024,fs); [h3,~] = freqz(d3,1024,fs); plot(f,mag2db(abs([h1 h2 h3]))) ylim([-120 20])

## Input Arguments

`x`

— Input signal

vector | matrix

Input signal, specified as a vector or matrix.

**Example: **`sin(2*pi*(0:127)/16)+randn(1,128)/100`

specifies a noisy
sinusoid

**Example: **`[2 1].*sin(2*pi*(0:127)'./[16 64])`

specifies a two-channel
sinusoid.

**Data Types: **`single`

| `double`

**Complex Number Support: **Yes

`wpass`

— Normalized stopband frequency range

two-element vector with elements in (0, 1)

Normalized stopband frequency range, specified as a two-element vector with elements in the interval (0, 1).

`fpass`

— Stopband frequency range

two-element vector with elements in (0,
`fs`

/2)

Stopband frequency range, specified as a two-element vector with elements
in the interval (0, `fs`

/2).

`fs`

— Sample rate

positive real scalar

Sample rate, specified as a positive real scalar.

`xt`

— Input timetable

timetable

Input timetable. `xt`

must contain increasing, finite, and equally spaced
row times of type `duration`

in seconds.

If a timetable has missing or duplicate time points, you can fix it using the tips in Clean Timetable with Missing, Duplicate, or Nonuniform Times.

**Example: **`timetable(seconds(0:4)',randn(5,1),randn(5,2))`

contains a
single-channel random signal and a two-channel random signal, sampled at 1 Hz for 4
seconds.

**Example: **`timetable(randn(5,1),randn(5,2),SampleRate=1)`

contains a single-channel random signal and a two-channel random
signal, sampled at 1 Hz for 4 seconds.

### Name-Value Arguments

Specify optional pairs of arguments as
`Name1=Value1,...,NameN=ValueN`

, where `Name`

is
the argument name and `Value`

is the corresponding value.
Name-value arguments must appear after other arguments, but the order of the
pairs does not matter.

**Example: **`ImpulseResponse="iir",StopbandAttenuation=30`

filters
the input using a minimum-order IIR filter that attenuates by 30 dB the frequencies
from `fpass(1)`

to `fpass(2)`

.

*
Before R2021a, use commas to separate each name and value, and enclose*
`Name`

*in quotes.*

**Example: **`'ImpulseResponse','iir','StopbandAttenuation',30`

filters the input using a minimum-order IIR filter that attenuates by 30 dB the
frequencies from `fpass(1)`

to
`fpass(2)`

.

`ImpulseResponse`

— Type of impulse response

`"auto"`

(default) | `"fir"`

| `"iir"`

Type of impulse response of the filter, specified as `"fir"`

,
`"iir"`

, or `"auto"`

.

`"fir"`

— The function designs a minimum-order, linear-phase, finite impulse response (FIR) filter. To compensate for the delay, the function appends to the input signal*N*/2 zeros, where*N*is the filter order. The function then filters the signal and removes the first*N*/2 samples of the output.In this case, the input signal must be at least twice as long as the filter that meets the specifications.

`"iir"`

— The function designs a minimum-order infinite impulse response (IIR) filter and uses the`filtfilt`

function to perform zero-phase filtering and compensate for the filter delay.If the signal is not at least three times as long as the filter that meets the specifications, the function designs a filter with smaller order and thus smaller steepness.

`"auto"`

— The function designs a minimum-order FIR filter if the input signal is long enough, and a minimum-order IIR filter otherwise. Specifically, the function follows these steps:Compute the minimum order that an FIR filter must have to meet the specifications. If the signal is at least twice as long as the required filter order, design and use that filter.

If the signal is not long enough, compute the minimum order that an IIR filter must have to meet the specifications. If the signal is at least three times as long as the required filter order, design and use that filter.

If the signal is not long enough, truncate the order to one-third the signal length and design an IIR filter of that order. The reduction in order comes at the expense of transition band steepness.

Filter the signal and compensate for the delay.

`Steepness`

— Transition band steepness

`0.85`

(default) | scalar in the interval [0.5, 1) | two-element vector with elements in the interval [0.5, 1)

Transition band steepness, specified as a scalar or two-element vector with elements in the interval [0.5, 1). As the steepness increases, the filter response approaches the ideal bandstop response, but the resulting filter length and the computational cost of the filtering operation also increase. See Bandstop Filter Steepness for more information.

`StopbandAttenuation`

— Filter stopband attenuation

`60`

(default) | positive scalar in dB

Filter stopband attenuation, specified as a positive scalar in dB.

## Output Arguments

`y`

— Filtered signal

vector | matrix | timetable

Filtered signal, returned as a vector, a matrix, or a timetable with the same dimensions as the input.

`d`

— Bandstop filter

`digitalFilter`

object

Bandstop filter used in the filtering operation, returned as a `digitalFilter`

object.

Use

`filter`

`(d,x)`

to filter a signal`x`

using`d`

. Unlike`bandstop`

, the`filter`

function does not compensate for filter delay. You can also use the`filtfilt`

and`fftfilt`

functions with`digitalFilter`

objects.Use Filter Analyzer to visualize the filter response.

Use

`designfilt`

to edit or generate a digital filter based on frequency-response specifications.

## More About

### Bandstop Filter Steepness

The `Steepness`

argument controls the width of
a filter's transition regions. The lower the steepness, the wider the transition
region. The higher the steepness, the narrower the transition region.

To interpret the filter steepness, consider the following definitions:

The

*Nyquist frequency*,*f*_{Nyquist}, is the highest frequency component of a signal that can be sampled at a given rate without aliasing.*f*_{Nyquist}is 1 (×*π*rad/sample) when the input signal has no time information, and`fs`

/2 hertz when the input signal is a timetable or when you specify a sample rate.The lower and upper

*stopband frequencies*of the filter,*f*_{stop}^{lower}and*f*_{stop}^{upper}, are the frequencies between which the attenuation is equal to or greater than the value specified using`StopbandAttenuation`

.The center of the stopband region is

*f*^{center}= (*f*_{stop}^{lower}+*f*_{stop}^{upper})/2.The

*lower transition width*of the filter,*W*^{lower}, is*f*_{stop}^{lower}–`fpass`

^{lower}, where the*lower bandpass frequency*`fpass`

^{lower}is the first element of the specified`fpass`

.The

*upper transition width*of the filter,*W*^{upper}, is`fpass`

^{upper}–*f*_{stop}^{upper}, where the*upper bandpass frequency*`fpass`

^{upper}is the second element of`fpass`

.Most nonideal filters also attenuate the input signal across the passband. The maximum value of this frequency-dependent attenuation is called the

*passband ripple*. Every filter used by`bandstop`

has a passband ripple of 0.1 dB.

To control the width of the transition bands, you can specify
`Steepness`

as either a two-element vector, [*s*^{lower},*s*^{upper}], or a scalar. When you specify `Steepness`

as a
vector, the function:

Computes the lower transition width as

*W*^{lower}= (1 –*s*^{lower}) × (*f*^{center}–`fpass`

^{lower}).When the first element of

`Steepness`

is equal to 0.5, the transition width is 50% of (*f*^{center}–`fpass`

^{lower}).As the first element of

`Steepness`

approaches 1, the transition width becomes progressively narrower until it reaches a minimum value of 1% of (*f*^{center}–`fpass`

^{lower}).

Computes the upper transition width as

*W*^{upper}= (1 –*s*^{upper}) × (`fpass`

^{upper}–*f*^{center}).When the second element of

`Steepness`

is equal to 0.5, the transition width is 50% of (`fpass`

^{upper}–*f*^{center}).As the second element of

`Steepness`

approaches 1, the transition width becomes progressively narrower until it reaches a minimum value of 1% of (`fpass`

^{upper}–*f*^{center}).

When you specify `Steepness`

as a scalar, the function designs
a filter with equal lower and upper transition widths. The default value of
`Steepness`

is 0.85.

## Version History

**Introduced in R2018a**

## See Also

### Apps

### Functions

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