# Documentation

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# abs

Absolute value and complex magnitude

## Description

example

Y = abs(X) returns the absolute value of each element in array X.

If X is complex, abs(X) returns the complex magnitude.

## Examples

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y = abs(-5)
y =

5

Create a numeric vector of real values.

x = [1.3 -3.56 8.23 -5 -0.01]'
x =

1.3000
-3.5600
8.2300
-5.0000
-0.0100

Find the absolute value of the elements of the vector.

y = abs(x)
y =

1.3000
3.5600
8.2300
5.0000
0.0100

y = abs(3+4i)
y =

5

## Input Arguments

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Input array, specified as a scalar, vector, matrix, or multidimensional array. If X is complex, then it must be a single or double array. The size and data type of the output array is the same as the input array.

Data Types: single | double | int8 | int16 | int32 | int64 | uint8 | uint16 | uint32 | uint64 | duration

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### Absolute Value

The absolute value (or modulus) of a real number is the corresponding nonnegative value that disregards the sign.

For a real value, a, the absolute value is:

• a, if a is greater than or equal to zero

• -a, if a is less than zero

abs(-0) returns 0.

### Complex Magnitude

The complex magnitude (or modulus) is the length of a vector from the origin to a complex value plotted in the complex plane.

For a complex value, $|a+bi|$ is defined as $\sqrt{{a}^{2}+{b}^{2}}$.

### Tall Array Support

This function fully supports tall arrays. For more information, see Tall Arrays.