I am having a thinking and searching problem here and can't find the good direction to look at... I am looking to develop an algorithm to move in a 360 image (sphere like) by using the device motion.
So if the user point the device in front of him he get the determined origin point of the image. As he moves the device around him the panoramic image moves according to it.
Any idea or source I can look into ?
Thanks and good luck to everyone with Swift :)
Thanks to Kay I could be on the right track to achieved this effect.
I am making this answer just to provide more details for those looking for the same thing.
First you need to create a CMMotionManager object.
Then use startDeviceMotionUpdatesToQueue to handle motion events.
[self.motionManager startDeviceMotionUpdatesToQueue:[NSOperationQueue currentQueue] withHandler:^(CMDeviceMotion *motion, NSError *error) {
[self processMotion];
}];
In processMotion you just need to get the attitude based on the previous one:
// Get attitude difference with previous one
CMAttitude *currentAttitude = self.motionManager.deviceMotion.attitude;
[currentAttitude multiplyByInverseOfAttitude:self.referenceAttitude];
Thanks to this you know the new angle made by the user since the last update. Then where you handle your view you convert the new Euler angle into the amount of pixels you need to move your image. Just be careful Euler angle varies between -180, 180 and are given in rad by Apple. This could be handy:
#define RADIANS_TO_DEGREES(radians) ((radians) * (180.0 / M_PI))
So in my case I just calculate the new x offset because I am just moving on the x axis.
Hope this helps.
I see two easy ways to implement this without to much math hassle:
Both approaches should be pretty easy to implement and thus I would start with one of them. If you then want to have a more sophisticated solution, you will need to dive a little bit deeper into the maths. In this case a ppossible solution can be to use the current device normal (s. for example Finding normal vector to iOS device ), project it onto the earth suface plane and take the angles' delta for the cylindric panorama.
The sphere projection is even easier in this case as you can use the nomal vector directly.
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