I feel really bad about this, e^1, sorry about all this faulting I'm going to throw at you... >.<;
}<br />\end{alignedat})
The question's worth 4 marks - from that, I can instantly tell you that this isn't enough. In fact, to answer it I'm going to use knowledge of physics that is NOT required for methods (if you're also doing specialist, you should know this, though):
Velocity is a vector quantity, and so is acceleration. If you want to play with them, you have to take into account their directions. The methods study design only considers kinematics in straight-line motion, so you don't need to worry about the direction of motion beyond if it should be negative or positive. In this case, it's not straight-line motion - and so, you have to break it up into rectangular components. I've attached a picture of my working out of it, tell me if any part confuses you and I'll explain it.
(the red numbers represent the order of my steps)
[Note the triangle symbol (uppercase delta) is used instead of the 'd' (lowercase delta). This is because we are not dealing with infinitely small quantities. Also, acceleration is the change in velocity with respect to time.]
Let's play "where calculus symbols come from"!
Hahah, lowercase delta actually looks like this:
. See, when we change from bigger numbers to infinitesmalls, someone decided we're going to change from greek letters to arabic (who knows why?). So, the "d" in dy/dx is, in fact, just a normal d that we use in everyday life (including the word everyday
).
For more fun, you may now that
\: \Delta x)
becomes
\:dx)
when we make it infinitely small. The integral sign is actually an elongated S, which stands for "sum" (as the first statement is read "the sum from ecks equal ay to be...")
Just to add a tiny bit, when I did methods I wrote it like this, being aware (as Euler had said) that infinity is a concept. This however is not necessary.
=\lim_{k \to \infty} {\int\limits_{0}^{k}e^{-x}dx} = \lim_{k \to \infty} [-e^{-x}]_0^{k} = - \lim_{k \to \infty} {e^{-k}} + 1)
I'm pretty that's what was trying to be avoided, but that way of writing is certainly more correct than what I did.
EDIT: Fixed image, with a weird white box to reduce the size.
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