Prelim 2016 Maths Help Thread (1 Viewer)

kawaiipotato · Jun 20, 2016

Paradoxica said:
$\int e^x $d$e$

Answer: (e^(x+1))/(x+1) + C (assuming e is a variable and not Euler's Number)

InteGrand · Jun 20, 2016

kawaiipotato said:
Answer: (e^(x+1))/(x+1) + C (assuming e is a variable and not Euler's Number)

$\noindent Except if $x = -1$, when the answer is $\ln |e|+ \mathcal{C}$. :$\mathcal{P}$$

Green Yoda · Jun 21, 2016

For which values of k does (2k-3)x^2+(k+1)x-1=0 has two roots.
I know how to do these questions but the answer says k>1 or k<-11
Is this wrong? as I get the delta as k^2+10k-10

InteGrand · Jun 21, 2016

Rathin said:
For which values of k does (2k-3)x^2+(k+1)x-1=0 has two roots.
I know how to do these questions but the answer says k>1 or k<-11
Is this wrong? as I get the delta as k^2+10k-10

$\noindent The discriminant is $\Delta = \left(k+1\right)^2 - 4\left(2k-3\right)\cdot (-1) = k^2 + 2k + 1 + 8k - 12 = k^2 + 10 k\, \color{blue}{ - 11}$ (rather than your $-10$). This factors into $\Delta = \left(k+11\right)\left(k-1\right)$, and so the given answers are right.$

Green Yoda · Jun 21, 2016

InteGrand said:
$\noindent The discriminant is $\Delta = \left(k+1\right)^2 - 4\left(2k-3\right)\cdot (-1) = k^2 + 2k + 1 + 8k - 12 = k^2 + 10 k\, \color{blue}{ - 11}$ (rather than your $-10$). This factors into $\Delta = \left(k+11\right)\left(k-1\right)$, and so the given answers are right.$

OMFG...I expanded the first part as k^2+2x+2
I am retarded

Paradoxica · Jun 21, 2016

InteGrand said:
$\noindent Except if $x = -1$, when the answer is $\ln |e|+ \mathcal{C}$. :$\mathcal{P}$$

Just waiting for you to pounce on that...

Suu · Jun 22, 2016

HMm, just wondering, how would you find the derivative of a circle?

InteGrand · Jun 22, 2016

Suu said:
HMm, just wondering, how would you find the derivative of a circle?

$\noindent For the upper half of a circle of radius $a$ ($a$ some constant greater than $0$), we can write it as $y=\sqrt{a^2-x^2}$, $-a<x<a$. Then $y^\prime = \frac{-x}{\sqrt{a^2-x^2}}$, for $-a<x<a$. You can do a similar computation for the lower half, where $y=-\sqrt{a^2-x^2}$ $\Big{(}$well it'll just be the negative of what was found above, i.e. $y^\prime = \frac{x}{\sqrt{a^2-x^2}}$$\Big{)}$.$

leehuan · Jun 22, 2016

Suu said:
HMm, just wondering, how would you find the derivative of a circle?

The idea is that a derivative isn't strictly defined in terms of one variable if we're talking about implicit functions, which is what a circle is.

A circle is not actually a function because it fails the vertical line test. That's why you have to do what InteGrand did and consider two relevant semi-circles

Suu · Jun 23, 2016

leehuan said:
The idea is that a derivative isn't strictly defined in terms of one variable if we're talking about implicit functions, which is what a circle is.

A circle is not actually a function because it fails the vertical line test. That's why you have to do what InteGrand did and consider two relevant semi-circles

Ahh, I see now ^^
I spent a bit too much time on the bus two days ago thinking about derivation ^^

Green Yoda · Jun 25, 2016

for what values of m is the following real
x^2+2mx+2(m+12)=0
I got m<=-4 or m>=6
but the answer is m<=-4 or m>6, why so?

davidgoes4wce · Jun 25, 2016

Rathin said:
for what values of m is the following real
x^2+2mx+2(m+12)=0
I got m<=-4 or m>=6
but the answer is m<=-4 or m>6, why so?

Just be careful it couldn't be equal to $m \leq 4$ (no need for the equal to sign)

Green Yoda · Jun 25, 2016

davidgoes4wce said:
Just be careful it couldn't be equal to $m \leq 4$ (no need for the equal to sign)

But isnt it Δ>=0 for real values cuz Δ=0 is still an real value?

InteGrand · Jun 25, 2016

The roots will be real if and only if the discriminant is non-negative (doesn't need to be strictly positive; when the discriminant is 0, the roots are real, but they're identical, i.e. double root).

Green Yoda · Jun 25, 2016

So why is m>6 and not m>=6?

davidgoes4wce · Jun 25, 2016

I was just reading off a link online

http://www.slideshare.net/swartzje/166-quadratic-formula

Not sure how reliable it is

davidgoes4wce · Jun 25, 2016

If the Discriminant > 0 (there are two roots)

If the Discriminant =0 (there is 1 root)

If the Discriminant <0 (there are 0 roots)

InteGrand · Jun 25, 2016

Rathin said:
So why is m>6 and not m>=6?

In the absence of any further information, I'd guess it's just a typo or something.

Green Yoda · Jun 25, 2016

InteGrand said:
In the absence of any further information, I'd guess it's just a typo or something.

No further info was given, probs just a textbook mistake?

Nailgun · Jun 25, 2016

Rathin said:
But isnt it Δ>=0 for real values cuz Δ=0 is still an real value?

This is correct

delta is only imaginary when it is less than 0

this is because in quad formula delta is square rooted

can't square root a negative number and get real answers

however you can square root 0 and postiives

Prelim 2016 Maths Help Thread (1 Viewer)

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