How is trigonometric substitution done with a triple integral? For instance, 8 int_0^r int_0^{sqrt{r^2-x^2}} int_0^{sqrt{r^2-x^2-y^2}}(1)dzdydx

Bellenik3

Bellenik3

Open question

2022-08-22

Finding the volume of a sphere with a triple integral and trig sub
How is trigonometric substitution done with a triple integral? For instance, 8 0 r 0 r 2 x 2 0 r 2 x 2 y 2 ( 1 ) d z d y d x
Here the limits have been chosen to slice an 8th of a sphere through the origin of radius r, and to multiply this volume by 8. Without converting coordinates, how might a trig substitution be done to solve this?

Answer & Explanation

Dillan Brock

Dillan Brock

Beginner2022-08-23Added 8 answers

Step 1
The volume of the sphere B ( 0 , r ) = { ( x , y , z ) : x 2 + y 2 + z 2 r 2 } is usually calculated as follows: Make the change of variable x = r cos θ sin ϕ ;   y = r sin θ sin ϕ ;   z = r cos ϕ, with the Jacobian equal to r 2 sin ϕ.
Step 2
V = B ( 0 , r ) 1 d x = 0 r 0 2 π 0 π r 2 sin ϕ d ϕ d θ d r = 4 π r 3 3
saillantpq

saillantpq

Beginner2022-08-24Added 3 answers

Step 1
The innermost integral has the value r 2 x 2 y 2 .
The next integral we are faced with is I ( x ) := 0 r 2 x 2 r 2 x 2 y 2   d y   .
During the integration x is constant. "Trigonometric substitution" means here that we somehow should use 1 sin 2 t cos 2 t to get rid of the square root. Therefore we substitute
y := r 2 x 2 sin t   , d y = r 2 x 2 cos t   d t ( 0 t π 2 )   ,
and I(x) becomes
I ( x ) = ( r 2 x 2 )   0 π / 2 cos 2 t   d t   .
Step 2
Now use the rule cos 2 ( ω t ) or sin 2 ( ω t ) integrated over an integer number of quarter periods gives half of the length of the integration interval" and obtain I ( x ) = π 4 ( r 2 x 2 ).
It remains to compute the outermost integral:
v o l ( B r ) = 8 0 r I ( x )   d x = 2 π   0 r ( r 2 x 2 )   d x = 2 π ( r 2 x x 3 3 ) | 0 r = 4 π 3   r 3   .

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