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<?xml version="1.0" encoding="UTF-8" ?>
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<class name= "Quat" version= "3.2" >
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<brief_description >
Quaternion.
</brief_description>
<description >
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A unit quaternion used for representing 3D rotations.
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It is similar to [Basis], which implements matrix representation of rotations, and can be parametrized using both an axis-angle pair or Euler angles. But due to its compactness and the way it is stored in memory, certain operations (obtaining axis-angle and performing SLERP, in particular) are more efficient and robust against floating-point errors.
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Quaternions need to be (re)normalized.
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</description>
<tutorials >
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<link > https://docs.godotengine.org/en/latest/tutorials/3d/using_transforms.html#interpolating-with-quaternions</link>
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</tutorials>
<methods >
<method name= "Quat" >
<return type= "Quat" >
</return>
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<argument index= "0" name= "from" type= "Basis" >
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</argument>
<description >
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Returns the rotation matrix corresponding to the given quaternion.
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</description>
</method>
<method name= "Quat" >
<return type= "Quat" >
</return>
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<argument index= "0" name= "euler" type= "Vector3" >
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</argument>
<description >
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Returns a quaternion that will perform a rotation specified by Euler angles (in the YXZ convention: first Z, then X, and Y last), given in the vector format as (X angle, Y angle, Z angle).
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</description>
</method>
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<method name= "Quat" >
<return type= "Quat" >
</return>
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<argument index= "0" name= "axis" type= "Vector3" >
</argument>
<argument index= "1" name= "angle" type= "float" >
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</argument>
<description >
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Returns a quaternion that will rotate around the given axis by the specified angle. The axis must be a normalized vector.
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</description>
</method>
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<method name= "Quat" >
<return type= "Quat" >
</return>
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<argument index= "0" name= "x" type= "float" >
</argument>
<argument index= "1" name= "y" type= "float" >
</argument>
<argument index= "2" name= "z" type= "float" >
</argument>
<argument index= "3" name= "w" type= "float" >
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</argument>
<description >
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Returns a quaternion defined by these values.
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</description>
</method>
<method name= "cubic_slerp" >
<return type= "Quat" >
</return>
<argument index= "0" name= "b" type= "Quat" >
</argument>
<argument index= "1" name= "pre_a" type= "Quat" >
</argument>
<argument index= "2" name= "post_b" type= "Quat" >
</argument>
<argument index= "3" name= "t" type= "float" >
</argument>
<description >
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Performs a cubic spherical-linear interpolation with another quaternion.
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</description>
</method>
<method name= "dot" >
<return type= "float" >
</return>
<argument index= "0" name= "b" type= "Quat" >
</argument>
<description >
Returns the dot product of two quaternions.
</description>
</method>
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<method name= "get_euler" >
<return type= "Vector3" >
</return>
<description >
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Returns Euler angles (in the YXZ convention: first Z, then X, and Y last) corresponding to the rotation represented by the unit quaternion. Returned vector contains the rotation angles in the format (X angle, Y angle, Z angle).
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</description>
</method>
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<method name= "inverse" >
<return type= "Quat" >
</return>
<description >
Returns the inverse of the quaternion.
</description>
</method>
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<method name= "is_equal_approx" >
<return type= "bool" >
</return>
<argument index= "0" name= "quat" type= "Quat" >
</argument>
<description >
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Returns [code]true[/code] if this quaterion and [code]quat[/code] are approximately equal, by running [method @GDScript.is_equal_approx] on each component.
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</description>
</method>
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<method name= "is_normalized" >
<return type= "bool" >
</return>
<description >
Returns whether the quaternion is normalized or not.
</description>
</method>
<method name= "length" >
<return type= "float" >
</return>
<description >
Returns the length of the quaternion.
</description>
</method>
<method name= "length_squared" >
<return type= "float" >
</return>
<description >
Returns the length of the quaternion, squared.
</description>
</method>
<method name= "normalized" >
<return type= "Quat" >
</return>
<description >
Returns a copy of the quaternion, normalized to unit length.
</description>
</method>
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<method name= "set_axis_angle" >
<argument index= "0" name= "axis" type= "Vector3" >
</argument>
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<argument index= "1" name= "angle" type= "float" >
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</argument>
<description >
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Sets the quaternion to a rotation which rotates around axis by the specified angle, in radians. The axis must be a normalized vector.
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</description>
</method>
<method name= "set_euler" >
<argument index= "0" name= "euler" type= "Vector3" >
</argument>
<description >
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Sets the quaternion to a rotation specified by Euler angles (in the YXZ convention: first Z, then X, and Y last), given in the vector format as (X angle, Y angle, Z angle).
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</description>
</method>
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<method name= "slerp" >
<return type= "Quat" >
</return>
<argument index= "0" name= "b" type= "Quat" >
</argument>
<argument index= "1" name= "t" type= "float" >
</argument>
<description >
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Performs a spherical-linear interpolation with another quaternion.
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</description>
</method>
<method name= "slerpni" >
<return type= "Quat" >
</return>
<argument index= "0" name= "b" type= "Quat" >
</argument>
<argument index= "1" name= "t" type= "float" >
</argument>
<description >
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Performs a spherical-linear interpolation with another quaterion without checking if the rotation path is not bigger than 90°.
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</description>
</method>
<method name= "xform" >
<return type= "Vector3" >
</return>
<argument index= "0" name= "v" type= "Vector3" >
</argument>
<description >
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Transforms the vector [code]v[/code] by this quaternion.
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</description>
</method>
</methods>
<members >
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<member name= "w" type= "float" setter= "" getter= "" default= "1.0" >
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W component of the quaternion.
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</member>
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<member name= "x" type= "float" setter= "" getter= "" default= "0.0" >
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X component of the quaternion.
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</member>
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<member name= "y" type= "float" setter= "" getter= "" default= "0.0" >
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Y component of the quaternion.
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</member>
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<member name= "z" type= "float" setter= "" getter= "" default= "0.0" >
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Z component of the quaternion.
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</member>
</members>
<constants >
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<constant name= "IDENTITY" value= "Quat( 0, 0, 0, 1 )" >
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The identity rotation. Equivalent to an identity matrix. If a vector is transformed by an identity quaternion, it will not change.
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</constant>
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</constants>
</class>