Um CO2 constant zu reduzieren, soll er anINDE像 wenn er festως auf Einständigkeit im Woo stern learning

Gutenberogramm

Wir kommen jetzt an das

Okay, das ist meine Komma

Fortunately, keinen Aussagen

Okay, die Relation zu diesen Zeits von Time Delimiters ist durchgeführt

by this formula, which is easy and insane,

because the real-time derivative is very important

in this situation, where we can grasp the kind of correctness

which we may also call the connectedness,

and the time derivative, which is the physical configuration

that we raise the call once we find the real-time derivative

of the physical vector, which is the deformation that

we can expand easily and we can develop it in small numbers.

So we discussed that.

Velocity, we can do it like that.

The time derivative is the deformation gradient,

and also is the gradient of velocity.

And then we can talk about length,

the time derivative of the

zirconium, which is the constant.

So we can take this small format here.

The constant of the zirconium is the constant of the time derivative.

The time derivative of the zirconium is the constant of the time derivative.

And then we also argue that the state is constant

over the volume during which the volume is going through the relation of change.

This can be expressed by constraining the velocity of the years

to the force zero of course.

But the key is that we can also discuss how to do this.

We can discuss how to take derivatives according to the effective argument.

Then we introduce the velocity gradient.

We have to speak about z.

So s, the time derivative of s, that is the gradient of velocity.

If we change the derivative of the gradient with respect to the effective argument,

with respect to the lower effective argument,

this is what we call the state of the velocity gradient.

In terms of f and the derivative, it comes in a different format.

And then more or less for formal reasons,

if f can be multiplied by z to the power of y,

then we can find out all the introduces of one of the different introduces.

Where you identify this derivative of the left,

and all the other cases that constitute the total number of the expressions that we have on the problem.

Of course, we can also try to express all the necessary relationships in terms of time derivative.

In the inverse of f.

Sometimes there is a whole different way to do this.

That is the conflict between some f and x times the power of f.

In the unit time derivative of f and the zero of f.

And that is the relationship between the limit of time derivative of f and the inverse of f.

Okay.

So, we also, for example, we discussed at the end of this class,