Hi there.

Now before this one We have calculated the volume of the sphere.

That in spherical coordinates and cylindrical coordinates we did.

In addition, a sphere rotating objects We have calculated and varied as

coordinate systems interact 're doing, we see how.

Here sphere similar to the problem, but We're doing a bit of a different problem.

There are still a sphere.

But this sphere with a cone're taking a nap.

So as for zero angle take a right which our

rotate around the axis when 're getting a cone surface.

Now this cone with the surface of the sphere We want to find the rest of the volume.

Of course, on this sphere Or intersecting spheres fi

Putting zero to zero will be zero volume.

Putting PI divided into two semi- will be the volume of the sphere.

This tells us one of our accounts gives you the ability to control.

Fu took the pie get zero,

If we grew up, then it will be the volume of the entire sphere.

As we see in this case, however see:elevational view of this sphere.

This cone to download and view.

F is the zero angle.

Wherein f is the zero angle.

Of course, this is cutting at a height b.

This occurred at the height of b There are terms for zero and

Create it in the long run to zero.

These cylindrical coordinates you'll have when using.

Now that three different genes To calculate the.

Here drawn the same way.

Now and in the sphere and the cone surface and global koordinar

cylindrical coordinates define.

Also as rotating objects,

we need a bottom-limiting or top curve was limiting curve.

Let's move on them to account.

Now in spherical coordinates certain sphere equation.

R is A.

A hard.

It is as simple as going to.

Forever in spherical coordinates We know little volume.

We know that the equation of the cone.

The equation for the cone is equal to zero at f.

As you can see in spherical coordinates again began to fixed limits.

When it comes to cylinder coordinates r squared plus z squared would be a square.

Because these two This is when we combine

squared plus z squared gives a squared.

We have seen it before.

Certain volume in the cylinder coordinates.

We write the equation of this cone need to coordinate the cylinder.

Roller cone coordinates equation a linear equation, z r plane.

If this height, b,

If r is zero in the horizontal, who is possessed with split r b r is zero.

Here r is zero divided by the slope b gives the tangent of the angle here.

This is the work of our describes the relationship.

Now the top and bottom Considering the limits,

As the rotary bodies, lower limit that right.

The upper boundary of this circle.

We found the correct equation here.

The equation of the circle is squared plus z that is equal to a square by square

z equals r squared minus a squared i.e. as a function of r.

This rotary bodies

In our calculations we will use size.

Now we need to find the limits of integration.

Sphere is very simple.

The boundaries are integral.

A scratch is going to.

Fu also going to zero for zero.

In the following we need the cylinder b.

r goes to zero is zero.

But this is our

from the surface of the cone i.e. z r b is equal to zero divide,

the right of this equation, in the circle

to the equation z squared r squared minus goes.

This is the integral over Would it be appropriate to do?

However, because we are here We accept the following.

We are writing the limits of z r.

However, in contrast r z we could write out the boundaries.

But I see here is a limit to scratch is going on this cone.

Here scratch circle can go on.

This can be written, but a You can not get by integrals.

You must write two integral.

This does not seem very appropriate.

The two integrals can do, instead of making a single For that you will choose to do with integrals.

Now in spherical coordinates

like this:Once variables a separable function.

In addition, the fixed limits.

Theta of zero to two pi r Reset between fi reset the zero of f.

Therefore this is the easiest global There seems to be at the coordinates.

Cylindrical coordinates again theta, but are separated from scratch

r is zero and z is from the surface of the cone,

The equation of the circle from the right Coming up to the equation.

So here's one of the z, z on integral, but limits vary.

We'd like to do as solids of revolution

r squared minus a squared circle of the upper limit,

towards lower boundary of the cone, cone produces the correct equation.

b r r is zero divided.

Where f is obvious.

We know the formula.

g is clear.

r r d.

Yet here is the integral over

z to later When you want two

various other ways to be an integral do not get on our integral type.

Here also integral emerges.

Now let's account for this integration.

In the first integral variable was divided into.

This is a two theta pi comes from.

Coming from the square is a cube divided by three.

FI minus sine cosine integral fi.

hence the above minus cosine fi zero.

therefore, the following is in the negative for.

Replace them, we can arrange some more.

There are two pi divided by a cube here.

But this, see reset a minus cosine fi multiplied.

i.e. b d b is the bottom of the cone since it was high.

It's a times cosine

See if we use that for this to be zero Disconnect one of the cube, where a there.

Here a times cosine fi will b zero.

a minus b.

Here, too, will be a square.

There are two pi divided by three.

Or a zero minus cosine for two

times for sine-squared divided by zero two as you can.

Here you have a cube.

We concluded with them.

As we can control:the br br see if zero was this height.

If b is zero it down.

Remove half the volume of the sphere.

b has to be equal to zero.

Because b closer to See This cone is getting tighter,

Meanwhile there will be a volume is shrinking.

also if you get a D minus, See the full sphere that time comes.

Indeed, when we look at here, when b is equal to a zero.

b is zero, when the volume of the hemisphere,

when b is equal to minus Turns out the volume of a full sphere.

In cylinder coordinates the situation is somewhat different.

Refer to the following integral We need to have accounts.

This upper limit.

This lower limit.

This integral is not very difficult.

We have done it before.

If we say that u r squared minus a squared, u would force a split second that.

of r d r a d u'y gives the negative half.

Bi geliyo two factors and the minus sign.

There are two cons.

There are one-half.

This is a split second force the second would be divided three integral force.

But I need to divide the three splits in two.

Thus two thirds coming.

This is easy.

b, and r is zero constant.

Then the r squared are also divided by three integral cubes.

r is zero is true if r is zero for the cube is going on here.

Gene simple geometric properties Using wherein the required

simplification doing just that The same formula is obtained.

As you can see in d If equal is zero.

If b is zero interest hemisphere.

If b is equal to minus the Remove the outcome of a full sphere.

Here is a sample you added I give homework to do.

These examples on your own work pekiÅtirebilme lets you thoroughly.

There is already a difference from the previous one b.

This body weight on the z-axis around the z axis with the center

moment of inertia, d v r squared second moment.

Again, as I always say them in random functions

but b in selected technology,

Examples are similar to those encountered in nature We have received so simple integration.

Our goal is already very complex integrals not calculate these calculations

Specific examples will reinforce the view method, a little bit of your other courses in physics,

technology courses that you'll encounter in Do not integral types of accounts.

No results as the control will also have the opportunity to.

The second problem is similar to the first but with a cone cut

b z is the surface of the sphere cut with a horizontal plane.

So this is not exactly a dome, a partial dome.

It is also used in many places.

You want us to find the volume.

Now it coordinates two types of can be calculated again.

In cylinder coordinates or spherical coordinates.

Let's see which one will come easily?

I can already see This side view.

when z is equal to b cut cylinder

coordinates this The definition of boundaries is very easy.

z is equal to b.

Above the surface of the sphere is an easy to.

But we'll see, but this is a very difficult global

coordinates of this surface Definition little more complicated.

Yet here's the tip geometry.

So if b is zero half-dome.

Half-ku, with sphere dome.

If you see a backwards b is equal to b There is nothing grows grows.

Has to be zero at the end.

If you get a minus instead of a full sphere b I need you can not find the full results.

It looks a bit like the other.

At the other, with a cone cut dome that was generated

If the above plus Kubba following cone.

Here are just above the dome.

How will this summer integrals?

Now spherical surface and the horizontal plane

equation in cylindrical coordinates bit easier.

B z is the horizontal plane equation z is in spherical coordinates r

Once your rib was fine.

According to z b is equal to the global coordinates the equation of the horizontal plane.

As well as in terms of r f You can also account.

The following is the account can be denominated.

But in spherical coordinates There is a convenience.

Supremely simple equation of the surface of the sphere.

Here, a simple horizontal plane.

Here a bit more complicated horizontal plane.

In the global koordinatar sphere equation is simple but

cylindrical coordinates of the sphere equation is not equal to a constant.

Now that ha, questions may come to mind.

Which coordinates are more appropriate here?

Global or cylindrical coordinates for?

As you can see here some a simpler, more difficult here.

Here is more difficult, more simple here.

One of the integral in which to do?

Here you have fun.

Let fi Zera integrated to the first, run on before?

There is here also there z.

Once on z, on or before r?

Therefore, they decided should be given topics.

In the previous problems It was easier to make these decisions.

Now let's do the following here: Our goal is to learn these things.

Let's do so well in both cylinder,

Let's also on the sphere and Let's see how that develops.

If the parties have little Let's see how we handle it.

Now before you roll 'll start by coordinates.

Yet again, I have two questions here.

Let z integrated on or before Let's first integrated run on?

Now that the first step was to write the equations,

in that the boundaries of dome above the plane below.

In the second step, let's write these integrals.

Let's write.

First, let's write on the cylinder.

Here on the cylinder There are some preparations that.

z equals zero zero b in space.

a circle of radius r is zero occurs because

When you cut here b r is zero if this is obvious.

a squared minus b squared.