Differentiation Question (Showing first derivative of something) (1 Viewer)

TearsOfFire · Feb 6, 2009

I'm stuck with this differentiation question:

Given y= x(x+1)^3, Show that dy/dx = (4x+1)(x+1)^2

So far, this is what I've done ( I'm not too sure if I'm correct)

You use the product rule and the chain rule, and I got

u=x, u'=1
v=(x+1)^3, v'=3(1)(x+1)^2 (You use the chain rule right?)

u'v + v'u

But then I get stuck... after subbing in the values I don't know how to get to show it.. Have I done something wrong?

Any help would be very much appreciated. I've just got a whole bunch of similar questions, but I'm able to differentiate but I have no idea how to work it out from there.

Thanks in advance

independantz · Feb 6, 2009

Timothy.Siu · Feb 6, 2009

lolokay · Feb 6, 2009

so you have
(x+1)³ + 3(x+1)²x
..then factorise

kurt.physics · Feb 6, 2009

TearsOfFire said:
I'm stuck with this differentiation question:

Given y= x(x+1)^3, Show that dy/dx = (4x+1)(x+1)^2

So far, this is what I've done ( I'm not too sure if I'm correct)

You use the product rule and the chain rule, and I got

u=x, u'=1
v=(x+1)^3, v'=3(1)(x+1)^2 (You use the chain rule right?)

u'v + v'u

But then I get stuck... after subbing in the values I don't know how to get to show it.. Have I done something wrong?

Any help would be very much appreciated. I've just got a whole bunch of similar questions, but I'm able to differentiate but I have no idea how to work it out from there.

Thanks in advance

Okay, so you have done everything right, you just need to factorise in order to simplify. You have

$u = x$
$u' = 1$
$v = (x + 1)^3$
$v' = 3(x + 1)^2$

As you know

$\frac{dy}{dx} = u \frac{dv}{dx} + v \frac{du}{dx}$

therefore

$\frac{dy}{dx} = x \times 3(x + 1)^2 + (x + 1)^3 \times 1$
$= (x + 1)^2 (3x + (x + 1) )$
$= (x + 1)^2(4x + 1)$

Which can be written

$(4x + 1)(x + 1)^2$

So we are just factorizing $(x + 1)^2$ out of it.

TearsOfFire · Feb 6, 2009

Timothy.Siu said:
lol

lol, silly me. I've only just been taught how to differentiate, so I was kind of looking for some way to get the answer... But I forgot the basics of algebra. lol

Finx · Feb 6, 2009

Would it be possible to expand and differentiate?

Timothy.Siu · Feb 6, 2009

yeah thats fine

Trebla · Feb 6, 2009

A less conventional method (if you hate using the product rule) is that you could note that:
x(x + 1)³ = ([x + 1] - 1)(x + 1)³
= (x + 1)⁴ - (x + 1)³

Then you easily differentiate without thinking about the product rule lol

azureus88 · Feb 6, 2009

Trebla said:
A less conventional method (if you hate using the product rule) is that you could note that:
x(x + 1)³ = ([x + 1] - 1)(x + 1)³
= (x + 1)⁴ - (x + 1)³

Then you easily differentiate without thinking about the product rule lol

lol nice

Differentiation Question (Showing first derivative of something) (1 Viewer)

TearsOfFire

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independantz

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Timothy.Siu

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lolokay

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kurt.physics

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TearsOfFire

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Finx

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Timothy.Siu

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Trebla

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azureus88

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