Volume questions (1 Viewer)

[richz]

Hello,

Can anyone help me with ex 6.1
A) 2a, c
B) 4
C) 6 this is the one i got the answer the rong way around..

 

[Slidey]

I love the way you don't give any hint to what book it's in or what the question is.

 

[richz]

lol, woopps i forgot, its from cambridge... lol -_-, lol i knew i forgot sumthing..

 

[KFunk]

for Ex6.1: 2. (a)

you're rotating the aread between y=4-x², x=2 and y=4 about the x-axis using perpendicular slices.

Each slice = πr₁² - πr₂²
= π(r₁² -r₂²)

where r₁ = 4 and r₂ = 4 - x²

so you get lim(δx -->0) π∑ (16 - (4-x²)²)δx (between 0 and 2)

= π∫ 8x² - x⁴ dx
= π [ 8/3.x³ - 1/5.x⁵] (between 0 and 2)
= 224π/15

 

[KFunk]

for 2. (c)

You're going to be integrating between 0 and 4 along the y-axis hence you need to express the volume/area of each disc in terms of y.

In this case the radius of each circular slice will be 2 - √(4-y) hence the area of each slice is given by π(2 - √(4-y))²δy

Have a go working it from there .

 

[richz]

thnx kfunk, u dont have to give me the answers, if its too long for u to do the entire question u can just give me sum tips, thnx

 

[richz]

for 2. (c)

You're going to be integrating between 0 and 4 along the y-axis hence you need to express the volume/area of each disc in terms of y.

In this case the radius of each circular slice will be 2 - √(4-y) hence the area of each slice is given by π(2 - √(4-y))²δy

Have a go working it from there .

yep, thats what i did i got to π(4y-(y^2)/2 + 8/3(4-y)^(3/2) +4y) between 4 and 0
and i get like 24π where did i go rong??

 

[KFunk]

yep, thats what i did i got to π(4y-(y^2)/2 + 8/3(4-y)^(3/2) +4y) between 4 and 0
and i get like 24π where did i go wrong??

You'll hate what went wrong . I think you assumed that when you substituted in '0' that the second bracket would simply disappear. Check out what happens when you subtract 8/3(4-y)^3/2 from 24 where y=0 .

 

[richz]

o yeah, duh......... lol i have been spending 2 hrs working out this exercise, thats whats bad about trying to teach urself a 4 u subject..... . This cambrigde book, doesnt really explain things.

 

[KFunk]

For 6. you're integrating about the y-axis with perp. strips so you have to talk in terms of y again.

Treat it like a (bi-quadratic?) equation. So y= 6x² - x⁴, let u=x² ---> y = 6u - u²

(*note) the area of each strip will be π(r₁² - r₂²) = π(x₁² - x₂²) = π(u₁ - u₂) where u₁ > u₂

u² - 6u +y = 0

u = 6/2 ± √(36 - 4y)/2
= 3 ± √(9 - y)
since we're integrating between y=0 and y=(9 I think?) then:
3 + √(9 -y) > 3 - √(9 - y)
therefore:
u₁ = 3 + √(9 -y)
& u₂= 3 - √(9 - y) (since u₁ > u₂)

See what you can do from there. Let me know if that's not enough (or too much even).

Sorry, that was for question 4. My bad.

 

[richz]

This is my working for 6)

δV= π (y-1)^2
y = cosx
δV= π(cosx-1)^2 δx
= π(cos^2 -2cosx+1)
V= π integral (pi/2 -> 0) cos^2x -2cosx +1 dx
= pi/2 integ. (pi/2 -> 0) cos2x +1 -4cosx +2 dx
=pi/2 (sin2x/2 +x - 4sinx +2x) (pi/2 -> 0)

anyone have any ideas why im rong.

 

[richz]

For 6. you're integrating about the y-axis with perp. strips so you have to talk in terms of y again.

Treat it like a (bi-quadratic?) equation. So y= 6x² - x⁴, let u=x² ---> y = 6u - u²

(*note) the area of each strip will be π(r₁² - r₂²) = π(x₁² - x₂²) = π(u₁ - u₂) where u₁ > u₂

u² - 6u +y = 0

u = 6/2 ± √(36 - 4y)/2
= 3 ± √(9 - y)
since we're integrating between y=0 and y=(9 I think?) then:
3 + √(9 -y) > 3 - √(9 - y)
therefore:
u₁ = 3 + √(9 -y)
& u₂= 3 - √(9 - y) (since u₁ > u₂)

See what you can do from there. Let me know if that's not enough (or too much even).

Sorry, that was for question 4. My bad.

kool, that worked, thats was just enough, if u dont want to rite all that u could just rite let u=x^2 and use to quadratic to solve it. THnx anyway

 

[KFunk]

This is my working for 6)

δV= π (y-1)^2
y = cosx
δV= π(cosx-1)^2 δx
= π(cos^2 -2cosx+1)
V= π integral (pi/2 -> 0) cos^2x -2cosx +1 dx
= pi/2 integ. (pi/2 -> 0) cos2x +1 -4cosx +2 dx
=pi/2 (sin2x/2 +x - 4sinx +2x) (pi/2 -> 0)

anyone have any ideas why im rong.

For that one I think you should try the two circle approach again.

δV = π(r₁² - r₂²)

where r₁ = 1
and r₂ = (y-1)² --> δV = π(1 - [cosx -1]²)

yielding:
π∫ 2cosx - cos²x dx
= π[2sinx - x/2 - 1/4sin2x] between 0 and π/2
= π[2 - π/4]
= 2π - π²/4


EDIT: Note, what you did was to find, if you imagine a cylinder, a funnel shape in the cylinder which is actually hollowed out. You were finding area of the hollow part of the solid, so to speak. If you take away the area I found from the area of the greater cylinder i.e π²/2 - (2π - π²/4) you get your answer ---> 3π²/4 - 2π so your method could have been valid had you recognised that you had found the hollow part of the solid and subtracted that from the area of the greater cylinder. That just came to mind so I figured I'd add it to the post. I hope that helps.