Calculus! For beginners, with a ‘no theorems’ approach!

Quote: Originally posted by aga

The "lim delta t->0" part is a mystery. Basically i do not know how it is applied to the delta x/delta v part, so cannot compute the whole thing. Sorry if my Density appears to be increasing.

Quote: Originally posted by blogfast25

You aren't supposed to be able to compute: $$\lim_{\Delta t \to 0}\frac{\Delta x}{\Delta t}$$

$$v(t)=6t+2$$

and:

$$a(t)=6$$

... are both correct. From a kinetic PoV, speed is the first derivative of position (in time) and acceleration is the first derivative of speed (in time).

Regarding:

$$v = \frac{x(t_2)-x(t_1)}{t_2-t_1}$$

That would be the average value of v over the interval t₁ to t₂.

To find the instantaneous speed v(t) we need to take the limit:

$$v(t)= \lim_{\Delta t \to 0} \frac{\Delta x}{\Delta t}$$
$$v(t)= \lim_{\Delta t \to 0} \frac{x(t+\Delta t)-x(t)}{\Delta t}$$

Let's work out the numerator first:

$$x(t+\Delta t)-x(t)=3(t+\Delta t)^2+2(t+\Delta t)+4 - (3t^2+2t+4)$$


$$= 3(t^2+2t\Delta t+(\Delta t)^2)+2t+2\Delta t+4-3t^2-2t-4$$
$$=3t^2+6t\Delta t+3(\Delta t)^2+2t+2\Delta t+4-3t^2-2t-4$$
$$=6t\Delta t+3(\Delta t)^2+2\Delta t$$
$$=\Delta t(6t+3\Delta t+ 2)$$

Then divide by Δt, so:

$$v(t)=\lim_{\Delta t \to 0} (6t+3\Delta t+ 2)$$

For:

$$\Delta t \to 0$$

Then:

$$v(t)=6t+2$$

'On paper' we can work out:

$$v(t)=\frac{dx(t)}{dt}$$

... for any x(t) but you can imagine what kind of a kerfuffle that becomes for complicated functions x(t)!

And for that reason, aga, we simply apply The Rules!

[Edited on 27-3-2016 by blogfast25]

I see !

So with a limit,

f seriously> 0 where v(caught) > limit

where f is the Speeding Fine and v is the Speed

'Limit' is certainly no theory ...

[Edited on 27-3-2016 by aga]

Quote: Originally posted by aga

'Limit' is certainly no theory ...

Yours isn't, that much is clear!

"Dad, are we nearly there yet??"
"Integrals coming up soon, son!"

Take a deep breath...

Quote: Originally posted by blogfast25

$$q=\frac{\pi \Delta T}{\frac{1}{2k}\ln \frac{D}{d}+\frac{1}{hD}}$$ Determine for which value of D, in function of k and h, q is minimised. Hint: Set: $$q=\frac{\pi \Delta T}{u}$$ Then see if: $$\frac{1}{u}$$ ... has an optimum.

Quote: Originally posted by aga

Is it a trick question, did i just get it wrong, or sometimes there is no optimum ?

Integration (“anti-derivation”):

Quote: Originally posted by aga

That done, i see now with my remaining good eye that Integration is basically the opposite of a Derivative. Using the accelleration example, knowing the accelleration at time t, the integral of accelleration a(t) would tell you the speed v(t) ? Are there anti-rules to go with integration, same as rules for derivatives ? Edit: Oh ! They're the same rules backwards ?

Quote: Originally posted by blogfast25

We call it the integration constant. So we really have to write: $$y=\int x^2dx= \frac13 x^3+C$$

@aga:

Thank me when you've solved your first Real World differential equation.

As regards the interest in this thread, its page views/posts ratio is fairly normal, so I expect a lot of 'lurkers' and that's fine with me. Of course it would have been nice to get a few more active participants but it is what it is. Among aspiring scientists the interest in theory is often surprisingly low. 'They'll learn!' is my attitude to that.

Quote: Originally posted by aga

Maybe a future Probability Calculation lesson would be good, so we could calculate stuff like that.

Ahhh... probability! One of the hardest, most counter-intuitive and most misunderstood concepts in mathematics.

Quote: Originally posted by yobbo II

$$ \int dx=x+C $$ is that the same thing as $$ \int 1 dx=x+C $$

Quote: Originally posted by yobbo II

C

Quote: Originally posted by yobbo II

Do you see that aga, it's C

Aga, here you make a mistake. What is the derivative of xⁿ? It is not n, but nx^n-1. The integeral of n equals nx + C and not xⁿ + C.

---------------------------------------------------------------------------------------------

The problem of integration of 0 leading to a non-zero value is a very subtle one. Only formally, it can be equal to a non-zero constant.

I'm quite sure blogfast25 will introduce the concept of definite integrals, which compute the surface of a function between its graph and the x-axis. In such cases, the constant disappears and definite values are generated. In such cases, the integral of 0 always is zero, except for the special case when integration occurs from a constant to infinity. Specially defined 0-functions can yield non-zero values in such cases (in fact, the inverse of a dirac-function). A dirac function is a function which is zero everywhere, except for one single value, where it is infinite with the property that the surface area of the single spike, which has zero thickness and infinite height, equals 1.

For now, just forget about the 0-integral being non-zero if you are a starter in this subject

[Edited on 29-3-16 by woelen]

Quote: Originally posted by woelen

Aga, here you make a mistake. What is the derivative of xn? It is not n, but nxn-1. The integeral of n equals nx + C and not xn + C

Quote: Originally posted by woelen

For now, just forget about the 0-integral being non-zero if you are a starter in this subject

Quote: Originally posted by aga

Er, the +/- thing is presumably because x^2 could be with x=-2, or +2, so the derived 4 could be from +2 or -2. the 'dx' thing is confusing, mostly because i have not properly studied your earlier explanation of the various notations. 3rd example looses me when you set u = 7x and suddenly the sin() function evaporates.

Ok, I'll just post these now, just to keep you awake at night!

Exercises:

1.
$$y=\int (3x^5-2\sqrt{x})dx$$
2.
$$y=\int 5\cos dx$$
3. (b is a constant)
$$y=\int (bx^2-4\sin x)dx$$
4. (alpha is a constant)
$$y=\int(2x-\alpha)^3dx$$
Hint: chain rule: set:
$$u=2x-\alpha$$
5.
$$y=\int x \cos(x^2-3)dx$$
Hint: chain rule: set:
$$u=x^2-3$$
6.
$$y=\int e^{2x-7}dx$$
Hint: chain rule.

7.
$$y=\int x^6\ln |x^7|dx$$
Hints:

Set:
$$u=x^7$$
and:
$$\int \ln|u|=u \ln u -u$$
8.
$$y=\int \cos(3x)[\sin(3x)]^2dx$$
Hint: set:
$$u=\sin(3x)$$
9.
$$y=\int x\sqrt{x+1}dx$$
Hint: set:
$$x=u-1$$


[Edited on 29-3-2016 by blogfast25]

[Edited on 29-3-2016 by blogfast25]

Quote: Originally posted by aga

OK. Cheers. Kinda got it. |n| = abs(n) as in the absolute value with no sign of a sign ...

Quote: Originally posted by aga

OK. Hands up. My legs have fallen off at the first hurdle.

Quote: Originally posted by aga

Appologies for not getting it immediately. Definitely i need to backtrack and go over this some more, particularly the 'd' notation. It's not your explanations at fault, just my understanding thereof, which will take some time to resolve (probably more questions too). Basically i 'must try harder', and will do.

This isn't easy stuff. The whole thread is probably worth several months of A/GCSE level math.

So spend a little time on it (and off it) and get back when things have cleared up a bit?

[Edited on 30-3-2016 by blogfast25]

I don’t know if this will help a lot with aga’s “d woes” but here’s an attempt to enlighten.

Look at the following figure: a smooth and continuous function y=f(x) is shown with the tangent line (red) in the point (x,y):



The inset shows the situation in (x,y) hugely magnified. Because of the limit taking:

$$\Delta x \to 0$$

... dx and dy are infinitesimals, very small and about as close to zero as can be imagined. But they are real numbers and we showed above that:
$$\frac{dy}{dx}=y'$$
So:
$$dy=y’dx$$
But also for example:
$$dx=\frac{dy}{y'}$$

So, dy and dx, although infinitesimally small, are ‘mathematical objects’ that can be manipulated like any other. And that is essentially what we do when we use the substitution method.

Another example of substitution:

$$y=\int \frac{x^2}{(x^3+3)^4}dx$$
Call:
$$u=x^3+3$$
So:
$$u'=\frac{du}{dx}=3x^2$$
So:
$$du=3x^2dx$$
Also:
$$x^2dx=\frac13 du$$
Now substitute these expressions into y:
$$y=\int \Big(\frac13\Big) \frac{du}{u^4}$$
Apply the Constant Rule and rework a bit:
$$y=\frac13 \int u^{-4}du=-\frac19 u^{-4+1}=-\frac19 u^{-3}$$
So:
$$y=-\frac19 (x^3+3)^{-3}+C$$

[Edited on 31-3-2016 by blogfast25]

Quote: Originally posted by aga

Amazingly that little inset of the dx / dy actually is mega helpful ! It is the difference in x and the differnce in y when those differences are almost not there. A (brief) explanation of that there Limit Theory could be helpful here. Specifically the notation of x -> 0 i vaguely remember meaning something like 'tending towards zero'.

Ok, upwards and onwards.

So I'm trying to show what:

$$y'(x)=\lim_{\Delta x \to 0}\frac{\Delta y}{\Delta x}= \lim_{\Delta x \to 0}\frac{y(x+\Delta x)-y(x)}{\Delta x}=\frac{dy}{dx}$$
... really means. Look at the picture:



The ACTUAL gradient ( = 1st derivative) of f(x) is the gradient of the red tangent line in (x,y). y = f(x) is the blue line.

Now say we draw a chord between (x,y) and point 1. We would then calculate Δy and Δx and the ratio Δy/Δx would give us a crude approximation of the gradient.

Now if we draw another chord between (x,y) and point 2 then notice that Δy and Δx would both decrease and the ratio Δy/Δx would be slightly better approximation of the actual gradient.

Even smaller become Δy and Δx for a chord between (x,y) and point 3 and the ratio Δy/Δx would be yet closer to the true gradient.

It follows that if we keep reducing the size of the interval Δx, the estimate of the real gradient becomes more and more accurate and that is the meaning of:

$$\Delta x \to 0$$

Remember that for a simple function like y = x²:
$$y'(x)=\lim_{\Delta x \to 0}\frac{y(x+\Delta x)-y(x)}{\Delta x}$$
$$y'(x)=\lim_{\Delta x \to 0}\frac{(x+\Delta x)^2-x^2}{\Delta x}$$
$$y'(x)=\lim_{\Delta x \to 0}\frac{x^2+2x\Delta x+(\Delta x)^2-x^2}{\Delta x}$$

$$y'(x)=\lim_{\Delta x \to 0}\frac{2x\Delta x+(\Delta x)^2}{\Delta x}$$
$$y'(x)=\lim_{\Delta x \to 0}\frac{\Delta x(2x +\Delta x)}{\Delta x}$$
$$y'(x)=\lim_{\Delta x \to 0} (2x +\Delta x)$$
$$y'(x)=2x$$



Finally, the required incantation: 'gremlins, gremlins, go away, don't come back another day'



[Edited on 2-4-2016 by blogfast25]

Integration by parts:

Quote: Originally posted by aga

Phew ! Great. One last bit and i think i'll get it : $$\int dy = \int (x-1)dx$$ $$y = \int (x-1)dx$$ so far it seems that the entire 'dx' part just disappears : would that happen anyway if it was worked out fully instead of applying the handy rules ? This bit is being stubborn too $$u = x^2-9$$ this bit works fine ! $$u' = 2x$$ $$u'=\frac{du}{dx}=2x$$ why is dx = 1 ? Quote: Another segment to follow tonite... Eeek ! Not got this one properly sorted yet ! edit: in the case of $$y = \int (x-1)dx$$ i would have to use $$u = (x-1)$$ then $$y = \int udu$$ then substitute back yes ? [Edited on 5-4-2016 by aga]

Yes, integration makes the differential dx disappear, because of the same reason: integration is the anti-operator of differentiation. It does that when you apply the handy rules.

See:

$$y=\int (x-1)dx$$

Here we can apply the sum rule:

$$y=\int xdx -\int 1dx=\frac12 x^2-x+C$$

But it can also be solved by substitution:

$$u=x-1$$
$$u'=x$$
$$du=dx$$
$$y=\int udu=\frac12 u^2$$
$$=\frac12 (x-1)^2+C$$
$$=\frac12 (x^2-2x+1)+C$$
$$y=\frac12 x^2-x+\frac12 +C$$
Which is of course the same solution (C is a constant: adding 0.5 to is doesn't change that)
<hr>
But:
$$u'=\frac{du}{dx}=2x$$

... in no way does it follow that 'dx is 1': it isn't.

Will hold my horses for now...

[Edited on 5-4-2016 by blogfast25]

Quote:

... in no way does it follow that 'dx is 1'. Will hold my horses for now...

We'll let it sink in for now and continue bright and bushy tailed on the morrow.

Quote: Originally posted by yobbo II

Just to be sure what problem 1) above is saying is: $$ F(x) = 3x^5-2\sqrt{x} $$ Find y Correct? And the integral of dx = x ? It's hard to grasp. How is the intergal of an infinitesimal (a constant) = x [Edited on 5-4-2016 by yobbo II]

Quote: Originally posted by aga

$$y=\int xdx -\int 1dx=\frac12 x^2-x+C$$ Oh ! I See now ! I treat the 'dx' term as a whole unit, and no matter where it ends up in intermediate fiddling about, it buggers off after applying the rules !

Quote: Originally posted by aga

GCSE ? I recall integration, trigonometry and quadratic equations from my 'O' level course aged 16. Sadly didn't progress further than that - money was a more immediate need than qualifications at the time.

Quote: Originally posted by aga

$$y=\int e^{2x-7}dx$$ isn't e the 'teflon number' that is the same when derived, so probably the same when integrated $$y=e^{2x-7}+C$$

Quote: Originally posted by aga

Oh dear. I think i should give up ..... ... imagining that i 'get it' regarding to the chain rule, certainly how to reverse it. It would probably be easier to 'get' if the functions in the examples were simpler : instead of $$\int \frac {sin(5x) cos(x^3) \sqrt [x^{\frac 12}] {x^2-2x+1}}{\sqrt {popeye}} dx$$ something like $$\int (x-1)x^2dx$$ I'll go back to page 3 or 4 and start again with the derivatives chain rule.

It's a deal!

Compute:

$$\int (x-1)x^2dx$$

Quote: Originally posted by blogfast25

Compute: $$\int (x-1)x^2dx$$

Quote: Originally posted by aga

Quote: Originally posted by blogfast25   Compute: $$\int (x-1)x^2dx$$ I will when i feel sure i actually DO understand the chain rule for derivatives properly, especially knowing which bit is a function of a function of x, and how to identify those bits in the thing we're deriving, then identify what those results look like when integrating.

Sure but this one doesn't even need substitution:

$$(x-1)x^2=x^3-x^2$$

Quote: Originally posted by aga

$$y = \int (x-1)x^2dx$$ $$(x-1)x^2dx$$ $$=(x-1)dx^3$$ $$=dx^4-dx^3$$ $$=dx(x^3-x^2)$$ $$=(x^3-x^2)dx$$ $$y = \int (x^3-x^2)dx$$ Sum/diff rule $$y = \int x^3dx - \int x^2dx$$ $$y = \frac {x^4}{4} - \frac {x^3}{3}$$ $$12y = 3x^4 - 4x^3$$ $$4y = x^4 - 1\frac 13 x^3$$ Those bits seem fine, yet the Chain Rule, forward and reverse are <strike>mis</strike> not understood.

Quote: Originally posted by aga

At this stage it is just 'C', no matter what you do to it (apart from trying to include it in a function of x or y).

@aga:

Thanks for these answers.

1, 4 and 5 all have the correct final answer.

BUT. For example:

$$y=-\frac 17 \int \sin(6-7x)dx$$

... is not correct and should have been:

$$y=-\frac 17 \int \sin(6-7x)d(6-7x)$$

Because:

$$d(6-7x)=0-7dx=-7dx$$

That's where that factor:

$$-\frac 17$$

... comes from.

So for the more general case:

$$\int f(ax+b)dx=\frac 1a \int f(ax+b)d(ax+b)$$

Then integrate.
<hr>
I suggest we draw a temporary line under the substitution/chain rule and move on to newer pastures. I will revisit integration by substitution/chain rule again a little later.

Deal?

[Edited on 8-4-2016 by blogfast25]

The Definite Integral:

Quote: Originally posted by aga

Bugger. If i could do the previous bit, this bit looks a lot easier. Perhaps a break from pure maths and back to synthesising stuff for a while ?

The next few episodes are probably easier to grasp than much of what went before.

But if I build in a break now, chances are we'll never resume again...

So let's bite the bullet!

Tomorrow: definite integrals by integrating between two boundaries.

[Edited on 9-4-2016 by blogfast25]

Quote: Originally posted by aga

Perhaps i should just get a Maths Disabled badge and carry on regardless ? (Free parking sounds good - i can certainly calculate that one !)

We'll address the u-gremlins again later, then we'll see what badge fits.

The purpose of this mini-tour of calculus is mainly to understand its place in science, less to churn out integration-proficient under-graduates.

Trust me, you haven't done so bad so far.

And u-gremlins will soon be destroyed by means of computer assisted integration, coming to you soon, HERE!


[Edited on 10-4-2016 by blogfast25]

2. Eliminating C with two boundary conditions:

Quote: Originally posted by aga

Bugger. If i could do the previous bit, this bit looks a lot easier. Perhaps a break from pure maths and back to synthesising stuff for a while?

Quote: Originally posted by Darkstar

If you ever want to go back to learning organic chemistry, I'm down for picking up where we left off in blog's QM/QC thread.

Me too. I've got a follow-up post ready on organo-metallics applied to Grignard reactions. But I've held back to avoid 'information overflow'...

[Edited on 10-4-2016 by blogfast25]

Quote: Originally posted by Darkstar

If you ever want to go back to learning organic chemistry,

Quote: Originally posted by blogfast25

Any problems/questions/comments on definite integrals so far?

Surface area under a function's curve:

It can be shown that the expression:
$$\int_a^b f(x)dx=\Big[F(x)\Big]_a^b$$
... mathematically corresponds to the green hatched area in the figure below:

So that calculation yields the surface area contained between the curve of f(x), the x-axis and the boundaries x=a and x=b.

This can be understood somewhat intuitively as follows. Imagine a very thin slice of surface area with width dx and height y(x). Its surface area is:
$$dA=f(x)dx$$

The sum total of all these slices between a and b would the actual hatched surface area A. This is where the integration symbol:
$$\int$$
... comes from: integration between boundaries is an extended summation and the integration symbol an elongated ‘S’.

Worked example:

Determine the hatched area A for:
$$y=\sin x$$
Between:
$$x=0, x=\pi$$

$$A=\int_0^{\pi} \sin x dx$$
$$A=\Big[-\cos x\Big]_0^{\pi}$$
$$A=[- \cos \pi -(-\cos 0)]=(-(-1)-0)=1$$
Worked physics example: Isothermal compression of an Ideal Gas, work needed.

If a volume V₀ of ideal gas at pressure p₀ is kept at constant temperature then according to Boyle’s Law for any other pressure p and volume V the following relationship holds:
$$p_0V_0=pV$$


We can also write accordingly:
$$p(V)=p_0\frac{V_0}{V}$$
Thermodynamics tells us that to carry out an infinitesimally small compression dV, an infinitesimal amount of mechanical work dW has to be expended, according to:
$$dW=-p(V)dV$$
(The negative sign is needed because dV < 0 but dW > 0)

It can be shown that for a compression from V₀ to V (at constant temperature) the total amount W corresponds to the red hatched area in the graph above, so:
$$W=\int_{V_0}^V (-p(V))dV$$
$$W=\int_{V_0}^V (-p_0\frac{V_0}{V})dV$$
$$W=-p_0V_0\int_{V_0}^V \frac{1}{V}dV$$
$$W=-p_0V_0\big[\ln V\big]_{V_0}^V$$
$$W=-p_0V_0(\ln V-\ln V_0)$$
$$W=-p_0V_0\ln \frac{V}{V_0}$$
Finally:
$$W=p_0V_0\ln \frac{V_0}{V}$$
<hr>
Simple Exercise:

Determine the value of the blue hatched area:



Where:
$$y=5-2x$$
with boundaries:
$$x=0, x=2$$

[Edited on 11-4-2016 by blogfast25]

If expulsion does get discussed again, may i remind the teaching staff of the modulus of those negatives i still have in safe keeping from the 1992 school cultural visit to Paris.

You know, the ones of yourselves with 'Monsieur Fouetter la Derriere' at madame Fifi's place on the Rue de La Huchette ...

Speaking of that Blue Hatched Area clearly visible in the photos :-

$$y=5-2x$$
$$x=0, x=2$$
$$BHA = \int_0^2 (5-2x)dx$$
sum/diff rule
$$BHA = \Big[\int 5dx - \int 2xdx \Big]_0^2$$
$$BHA = \Big[(5x + C) - (\frac {2x^2}{2} + C) \Big]_0^2$$
C cancels out, 2's cancel out
$$BHA = \Big[5x - x^2 \Big]_0^2$$
$$BHA = (5(2) - 2^2) - (5(0) - 0^2)$$
$$BHA = (10 - 4) - (0 - 0)$$
$$BHA = 6$$

... although the total area in the photos seems much larger

[Edited on 12-4-2016 by aga]

Looking good Blogfast! Fun to see you teaching stuff I've just been learning this past year. Looking forward to seeing you go over Rotational volumes in a week or so

Quote: Originally posted by aga

Hmm. i forgot. you're not in the 'Fifi Affair' photos. Erm, how about the Epcot Centre 2012 photos ? Yes. I have those too.

Uh, drunk...? I don't get it...

Your answers, upon quick review, are correct, but I didn't check your basic math skills at the end

Quote: Originally posted by aga

$$y=5-2x$$ $$x=0, x=2$$ $$BHA = \int_0^2 (5-2x)dx$$ sum/diff rule $$BHA = \Big[\int 5dx - \int 2xdx \Big]_0^2$$ $$BHA = \Big[(5x + C) - (\frac {2x^2}{2} + C) \Big]_0^2$$ C cancels out, 2's cancel out $$BHA = \Big[5x - x^2 \Big]_0^2$$ $$BHA = (5(2) - 2^2) - (5(0) - 0^2)$$ $$BHA = (10 - 4) - (0 - 0)$$ $$BHA = 6$$

... is 100 % correct.

You can also verify it by geometrical means. The area is the sum of a rectangle and a right angled triangle, both with width = 2.

The height of the rectangle is 1 (because y=5 - 2 . 2 = 1), so its area is 2 . 1 = 2.

The height of the triangle is 5 - 1 = 4, so its area is (4 . 2)/2 = 4.

The sum is 2 + 4 = 6.

[Edited on 12-4-2016 by blogfast25]

Quote: Originally posted by The Volatile Chemist

Looking good Blogfast! Fun to see you teaching stuff I've just been learning this past year. Looking forward to seeing you go over Rotational volumes in a week or so

I wasn't going to do Rotational volumes but I'll gladly do it by special request. It's a good example of how to set up a differential equation.

Quote: Originally posted by aga

So, where next ? (from self: simple diversion at the point of indecision) Oh ! It's QM/OC time. (from self: give direction)

The next bit you'll really like: how to compute integrals using software, on the tinkerwebs, no downloads. Hands free!

OC/QM to resume very shortly...

[Edited on 13-4-2016 by blogfast25]

Integration with Wolfram Alpha’s DSolve:

Quote: Originally posted by aga

Erm, i like the Human method best. The computers only know what we tell 'em (mostly) so MUCH better for humans to be able to do the maths instead of relying on mechanical devices. Also, the Human programmer can make mistakes, causing the computer to give the Wrong answers (which always look Right in nicely formatted text/graphics).

That's a bit of an idealistic position, aga. This is an extremely basic course.

Now imagine Big Calculus: problems that involve systems of simultaneous DEs, non-separable, perhaps second order (or higher) and non-linear. You'd need all the help you could get, trust me!

Of course it's to be preferred to solve 'by hand' what you can (can I take this as your commitment to battle your own u-gremlins? ) but that's not always possible.

Re. MS, we all like to bitch about them but would you really want to do without Excel (or similar)?

[Edited on 13-4-2016 by blogfast25]