Preliminary mathematics marathon (1 Viewer)

hscishard

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That's not entirely correct ...

Yes this is a red herring thus why I asked it.
This 3 unit or 2unit?

This won't fail then.
y=root cos^2x
Let u=cos^2x

Dy/du x du/dx

dy/du =1/2u^-1/2
du/dx = -2sinxcosx

Therefore dy/dx = -2sinxcosx/2u^1/2
=-sinxcosx/root(cos^2x)
 

mirakon

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or do this

cos^2 (2x)= 0.5+0.5cos4x

then differentiate

(0.5+0.5cos4x )^1/2

which should be easy. then sub x= pi/4 voila.
 

mirakon

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um aren't you supposed to be in school?

i have the day off, exam weeks
 

nikkifc

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y=root cos^2x
Let u=cos^2x

Dy/du x du/dx

dy/du =1/2u^-1/2
du/dx = -2sinxcosx

Therefore dy/dx = -2sinxcosx/2u^1/2
=-sinxcosx/root(cos^2x)
I think that is the correct expression for dy/dx. Now what happens if you sub x=pi/4?
 

Trebla

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How do you differentiate absolutes?

y=|x|
y'=|1|
So uhhh it's always one?
Think about what you know about that graph. Is the slope of it always equal to 1 across the entire domain?
 

hscishard

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Ok so..
y=root x^2
uhhh...
Let u = x
dy/du x du/dx
=1 x 1 = 1.

y^2 = x^2 ????
2y(dy/dx) = 2x
dy/dx = x/y
dy/dx = x/|x|

= +/-1... how are we meant to sub in the x values.
Ooo I get it. -1 when x<0 and 1 when x>0


So how do you do it...the 3 unit way
 
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DNETTZ

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Hmm, for y=|x| at x=0 the gradient is undefined isnt it?

Because

y'(x) = sqrt(x^2)/x

Therefore cannot divide by 0?
</pre>
 

DNETTZ

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Reading above posts, i think thats a bit odd the signum rule gives no indication for x=0 does it for y=|x|?
 

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