You can do substitution. Like for ex7, you can let t=x+2 And it will work like ex6 : )

Good point tho I will pin it so that others will see it. Thanks

Thanks for the reply! I tried the t=x+2 substitution and I ended up with the same four partial fractions of the video, except in the third I got C-4B in the numerator instead of just C and in the fourth I got 4B-2C+D instead of just D, but since they're all some sums of constant terms that do not involve x, I'm assuming I can easily replace those two numerators with, say, C' and D' respectively.

@@nomoremathhere just subbed to your channel, extra cool content!!

@@nomoremathhere Prove it without taking substitution

Glad to hear. Thank you!

Thanks

I’m deadddd

Perfect format for this kind of overview video - where you are laying out many cases and examples so we can compare side-by-side. Thank you so much! I also love that you gave us a few practice questions. 🙂

You’re welcome! I am happy to help!

Good Luck :))

Play 2x speed for review

You have a test already by September 15? My kids just started school today. They'll learn how to do basic fractions this year, not partial fraction decomposition. They're only in 3rd grade.

Mine was yesterday, a differential equation, autonomous, it had 3 factors. Guess what, the time gave negative :D It's likely wrong

@@Eltodofull Diff Eq was the hardest class I took. I studied philosophy, not math, but I really wanted to learn about chaos properly to apply it in philosophy. So I struggled through the class. Really interesting stuff, but hard.

Hlo all might midoriya here 😂

🙌

Thanks Dave!

: )))))) thank you!

I found the first 2 minutes super helpful as strategy for what formats to aim for ! Screenshotted the board at 2:10 for review!

same bro, neither my teacher could explain it to me in 5 minutes jeje

My first cal 2 exam I failed but i started watching your videos and doing the practice sheets you post and have became very fluent in my trig identities, trig sub, partial fractions, u sub, and improper integrals✊🏻

@@JesusMartinez-zu3xl I know this was 7 months ago but great job!! I'm tryna be like you haha

@@oralia3340 awesome sauce girl!! I ended up with a A in Cal 2. You got this! Currently in differential equations and its so much easier compared to cal 2.

@@JesusMartinez-zu3xldo you need calc 3 for differential equations or is calculus 2 enough ?

@@12degreesnowman11 depends on the university. Im a mechanical engineering student so we need dif q for fluids. Didn't use much of cal 3 in dif q though

There is a way to work with repeated complex roots, without using convolution. You can construct a linear combination of the transforms of sin(t), cos(t), t*sin(t), and t*cos(t). Properties of even and odd Laplace transform functions can often eliminate two of these choices. You then use the s-derivative theorem to find L{t*sin(t)} and L{t*cos(t)}, and solve for the unknown coefficients.

see if he responds

Better luck next time :)

Glad to help 😃

For the case of repeated roots, you can use Heaviside cover-up to find the coefficient on the highest power of the repeated term. I prefer to assign the first letters for terms I can get with Heaviside cover-up, and put those first. Then, I descend the power for all other terms of the repeated root. In his case, that's coefficient B. Coefficient C can also be found with Heaviside cover-up. Once you use x=0 for Heaviside cover-up, that value is spoken-for, and can't directly be used again. You can use other unrelated values of x, and you just need as many choices for x as you have unknowns. There is a general method for Heaviside cover-up, that involves taking derivatives and using the same value again, until you find all coefficients of the repeated power. However, I find it is more trouble than it is worth. There is a trick with repeated roots, where x=infinity can be one of your values. It involves partially clearing the fraction, by multiplying by the repeated root just once. Then take the limit as x goes to infinity. Here's how I'd solve his example: Given: (2*x - 5)/[x^2*(x + 1)] Set up partial fractions: A/(x + 1) + B/x^2 + C/x Use Heaviside coverup for A & B: At x = -1, A = (2*(-1) - 5)/[(-1)^2] = -7 At x = 0, B = (2*0 - 5)/(0 + 1) = -5 You could plug in x=1 as a strategic value to find C. Alternatively, you can partially multiply by one copy of x: (2*x - 5)/[x^2*(x + 1)] = -7/(x + 1) - 5/x^2 + C/x Multiply by 1 copy of x: (2*x - 5)/[x*(x + 1)] = -7*x/(x + 1) - 5/x + C Take the limit as x goes to infinity: 0 = -7 - 0 + C C = +7 Result: -7/(x + 1) - 5/x^2 + 7/x

The first two can be solved using trigonometric substitution, the latter two require you to know the derivatives of inverse trigonometric functions

That can be simplified to 1/(u^6+1) (u^2+1) But still, that's just evil if you expant it and try to do it by partial fraction. Yaa, it's just too long 😂😂

Michael Wu first let me wooooosh myself, then I’ll say that this is an integration technique which you will learn if you learn calculus

@@ericw2391 also useful in telescoping series sometimes

王Eric You also use it in Laplace transform.

The technique of partial fraction decomposition (not really the motivation or the final steps of integrating the resulting fractions) is one you can easily do in algebra 2 or precalculus. In some books it is part of the systems of equations chapter.

That it looks interesting is useful data about yourself! That’s awesome. Just keep learning new math skills, and this will eventually become easy for you. 🙂

That's because I think his wrong starting @5:30 case 2: irreducible quadratic factors. (I commented this to him) "I think you're wrong on Quadratic partial fraction form, the first Constant (in this case B) should be multiplied to the derivative of the denominator + the 2nd Constant (in this case C). The partial fraction form @6:18 should be (B(2x)+C)/(X^2+4). And the rest of this video has a wrong Quadratic partial fraction form."

@@janconfusio7178 no, what he’s done is correct for case 3, as I’ve done multiple times since I watched this and it’s always like this, as that’s what your meant to do for a brackets/symbol to a power. Case 2 I’m not so certain on as I’ve always done it a different way, but case 3 he’s done correctly

Figured it out now, sorry. It was cover-up method

when you can factorised it, its become linear (x=2). if can't factorised, then remain it as quadratic

You could treat (x - 2)^2 as a quadratic, and go through the same exercise to set it up as if it were an irreducible quadratic, and you'd get an equally valid result. It's generally easier if you use the fact that it is a repeated linear factor, rather than a quadratic, to your advantage, since Heaviside coverup will help you get one of the coefficients on it. Using a repeated linear factor helps get you closer to where you ultimately want to be, for an application of this process, such as integration or Laplace transforms. As an example, consider: 1/((x - 3)*(x - 2)^2) Treating (x - 2)^2 as if it were an irreducible quadratic, we get: 1/((x - 3)*(x - 2)^2) = A/(x - 3) + (B*x + C)/(x - 2)^2 H-cover-up for A, at x=3: A = 1/((3 - 2)^2) = 1 Thus: 1/((x - 3)*(x - 2)^2) = 1/(x - 3) + (B*x + C)/(x - 2)^2 Let x=0, to solve for C: 1/((0 - 3)*(0 - 2)^2) = 1/(0 - 3) + C/(0 - 2)^2 -1/12 = -1/3 + C/4 C = 1 Let x=1 to solve for B: 1/((1 - 3)*(1 - 2)^2) = 1/(1 - 3) + (B*1 + 1)/(1 - 2)^2 -1/2 = -1/2 + B + 1 B = -1 Result: 1/((x - 3)*(x - 2)^2) = 1/(x- 3) + (-x + 1)/(x - 2)^2 And this is equivalent to what you'd get, if you did use the repeated linear factor to your advantage, which is: 1/(x - 3) - 1/(x - 2)^2 - 1/(x - 2)

From what I understand, it is not possible to express the solution to this using analytic methods.

@@angelmendez-rivera351 if you are not able to do this question then don't reply.

Logical Proofs I will reply if I want to. You presented a problem, and I presented you a fact about the problem. It is not my problem if you do not like it. How about you present the solution yourself, since you are acting so high and mighty? I would love to see you solve this equation step by step and provide all 3 complex solutions in exact form. If you are not able to do so, then maybe you should stay silent and stop acting all arrogant for no reason.

@@angelmendez-rivera351 He is not arrogant.

Given: (3*x^2 - 3*x + 8)/(x^3 - 3*x^2 + 4*x - 12) Factor the bottom: 3 sign swaps = 3 or 1 positive roots are possible 12 as the final term = 1, 2, 3, 4, 6, and 12 are possible roots, as are their negatives x = +3 is a root Use polynomial division to reduce to a quadratic and linear term: (x - 3)*(x^2 + 4) Thus, our fraction becomes: (3*x^2 - 3*x + 8)/[(x - 3)*(x^2 + 4)] Set up partial fractions: A/(x - 3) + (B*x + C)/(x^2 + 4) Heaviside coverup for A at x = 3: A = (3*3^2 - 3*3 + 8)/(3^2 + 4) = 2 Thus: (3*x^2 - 3*x + 8)/[(x - 3)*(x^2 + 4)] = 2/(x - 3) + (B*x + C)/(x^2 + 4) Let x=0, to solve for C: 8/[(-3)*(4)] = 2/(0 - 3) + C/(4) -2/3 = -2/3 + C C = 0 Let x = 1, to solve for B: (3*1^2 - 3*1 + 8)/[(1 - 3)*(1^2 + 4)] = 2/(1 - 3) + B/(1^2 + 4) -8/10 = -1 - B/5 B = -4 + 5 = 1 Result: 2/(x - 3) + x/(x^2 + 4)

Heaviside coverup.

6:30, you can do that with complex factors, since there is technically no such thing as an irreducible quadratic. It often ends up not helping you, since it is simpler to use the standard method, but you can do it nevertheless. 7:40, yes, you can generalize the cover-up method, using derivatives, to more directly get at the remaining solutions when you have the repeated factors in the denominator.

Using his example at 6:30, here's how it could work with complex factors: Given: (4*x^2 - 9*x + 2)/((x + 3)*(x^2 + 4)) Factor the quadratic with complex roots: (4*x^2 - 9*x + 2)/((x + 3)*(x + 2*i)*(x - 2*i)) Partial fractions: (4*x^2 - 9*x + 2)/((x + 3)*(x + 2*i)*(x - 2*i)) = A/(x + 3) + B/(x + 2*i) + C/(x - 2*i) H-coverup: at x =-3, A = (4*(-3)^2 - 9*(-3) + 2)/((-3)^2 + 4) = 5 at x = -2*i, B = (4*(-2*i)^2 - 9*(-2*i) + 2)/(((-2*i) + 3)*((-2*i) - 2*i)) = -1/2 - 3/2*i at x = +2*i, C will equal the conjugate of B, thus, C = -1/2 + 3/2*i Thus, the expression expands as: 5/(x + 3) + (-1/2 - 3/2*i)/(x + 2*i) + (-1/2 + 3/2*i)/(x - 2*i) After simplifying it to remove the imaginary numbers, it will become: 5/(x + 3) - x/(x^2 + 4) - 6/(x^2 + 4)

Please try the 4 questions at the end. And I have solutions to them in the description

@@blackpenredpen do you have a vidéo where you explain how to find A B C like a demonstration

Catalin Chirita Check the description, as he said.