Re: English, Modern History, Visual Arts Tutoring - 99.55ATAR, Extended Eastern Subur
This guy would pick up the soap from the shower floor in a prison for you. He is dedicated, committed and knows his stuff I would definitely pm him if you're looking to lift up your marks!
Hey BOS, this may sounds like a stupid question but in what circumstances would i not use phenolphthalein as my indicator in a titration?
According to wiki: An acid-base titration is the determination of the concentration of an acid or base by exactly neutralizing the acid/base with an acid...
http://i.imgur.com/t5YSB.jpg
Half Yearly's are tomorrow so any help would be great
I have no idea how to do d (ii), something to do with an angle subtended at the centre of a circle is double that at the circ???
for e) how do i decide whether the vector between 2 points is z1 - z2 or z2 - z1?
since there is a multiple root then nx^n-1 + m = 0
therefore x^n-1 = -m/n - [1]
we also know that x(x^n-1 + m) = b
subbing in [1]:
x = b/(-m/n + m) = bn/m(n-1)
=) x^n-1 also = [bn/m(n-1)]^n-1
solving simultaneously with [1]:
[bn/m(n-1)]^n-1 = -m/n
therefore [b/(n-1)] ^ n-1 . [n/m] ^ n-1...
Thanks for the help guys but i dont see how the angle at z1 made by z4 and z2 = arg(z1-z2) - arg (z1 - z4) isnt the argument take from the origin? I guess what im try to say is how can you find an argument of a vector?
sorry man, i'm still not seeing it... arg(a-b)/arg(c-b) = arg(a-b) -arg(c-b) do you have to use the result that opposite angles of a cyclic quad are supplementary? I still cant put the pieces together.
nah, man it's its just plain old Jeff here. I made this account ages ago with Zach and I'm not sure why we chose scardizzle, i guess we thought it was kinda funny but anyway sorry for any misconceptions caused.
your question isn't making much sense to me. Where did you get the b term from? The only advice i can give atm is this q probably involves differentiating and making x the subject
P is a variable point on the ellipse with equation x^2/a + y^2/b = 1 and S and S' are the foci. Show that PS and PS' are equally inclined to the tangent at P.