# unshiftdata

Inverse of shiftdata

## Syntax

```y = unshiftdata(x,perm,nshifts) ```

## Description

`y = unshiftdata(x,perm,nshifts)` restores the orientation of the data that was shifted with `shiftdata`. The permutation vector is given by `perm`, and `nshifts` is the number of shifts that was returned from `shiftdata`.

`unshiftdata` is meant to be used in tandem with `shiftdata`. These functions are useful for creating functions that work along a certain dimension, like `filter`, `goertzel`, `sgolayfilt`, and `sosfilt`.

## Examples

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This example shifts `x`, a 3-by-3 magic square, permuting dimension 2 to the first column. `unshiftdata` shifts `x` back to its original shape.

Create a 3-by-3 magic square.

`x = magic(3)`
```x = 3×3 8 1 6 3 5 7 4 9 2 ```

Shift the matrix `x` to work along the second dimension. The permutation vector, `perm`, and the number of shifts, `nshifts`, are returned along with the shifted matrix.

`[x,perm,nshifts] = shiftdata(x,2)`
```x = 3×3 8 3 4 1 5 9 6 7 2 ```
```perm = 1×2 2 1 ```
```nshifts = [] ```

Shift the matrix back to its original shape.

`y = unshiftdata(x,perm,nshifts)`
```y = 3×3 8 1 6 3 5 7 4 9 2 ```

This example shows how `shiftdata` and `unshiftdata` work when you define `dim` as empty.

Define `x` as a row vector.

`x = 1:5`
```x = 1×5 1 2 3 4 5 ```

Define `dim` as empty to shift the first nonsingleton dimension of `x` to the first column. `shiftdata` returns `x` as a column vector, along with `perm`, the permutation vector, and `nshifts`, the number of shifts.

`[x,perm,nshifts] = shiftdata(x,[])`
```x = 5×1 1 2 3 4 5 ```
```perm = [] ```
```nshifts = 1 ```

Using `unshiftdata`, restore `x` to its original shape.

`y = unshiftdata(x,perm,nshifts)`
```y = 1×5 1 2 3 4 5 ```