porcupinetree
not actually a porcupine
- Joined
- Dec 12, 2014
- Messages
- 664
- Gender
- Male
- HSC
- 2015
Hi everyone,
I realise this is probably a simple concept which I just don't seem to be able to grasp very well.
This was the question which got me thinking about it: https://imgur.com/tqbIeIi
Basically, I'm confused about how I should understand calculating the volume in part (ii) in terms of what boundaries to place on the integral - especially as we added two 'areas' that were for different boundaries.
I did realise that in part (i), for the inner cylinder/shell, the radius of the shell would typically be 1+x when the boundaries are -1 to 0 (because the domain is entirely negative, hence 1+x is 1-|x|), and that this is equivalent to 1-x with boundaries 0 to 1, which gives the desired result. Hence we can use the boundaries 0 to 1 for the integral in part (ii)
But is there a general concept here that can be applied to other situations like this, too? How should I understand adding areas/volumes like this?
Thanks
I realise this is probably a simple concept which I just don't seem to be able to grasp very well.
This was the question which got me thinking about it: https://imgur.com/tqbIeIi
Basically, I'm confused about how I should understand calculating the volume in part (ii) in terms of what boundaries to place on the integral - especially as we added two 'areas' that were for different boundaries.
I did realise that in part (i), for the inner cylinder/shell, the radius of the shell would typically be 1+x when the boundaries are -1 to 0 (because the domain is entirely negative, hence 1+x is 1-|x|), and that this is equivalent to 1-x with boundaries 0 to 1, which gives the desired result. Hence we can use the boundaries 0 to 1 for the integral in part (ii)
But is there a general concept here that can be applied to other situations like this, too? How should I understand adding areas/volumes like this?
Thanks