Prelim 2016 Maths Help Thread (1 Viewer)

Green Yoda · Jul 31, 2016

NOTE I AM WRITING a as alpha and b as beta
(a+b)=3, (ab)=-13
b)
cross multiply 1/a^2 + 1/b^2
to get (a^2+b^2)/(a^2*b^2)
=((a+b)^2-2ab))/(ab)(ab)
=((3)^2-2(-13))/(-13)(-13)
=35/169

jathu123 · Jul 31, 2016

Orwell said:
Parts 2 and 3 are what I'm stumped on.

Part 3: If you sub b into the original equation, it must turn out to be 0 (since b is a root). So b^2-3b-13=0. Now multiply each side by -2, you get -2b^2+6b+26=0. Now subtract 26 from both sides and rearrange the LHS to get 6b-2b^2=-26. So you can see the LHS is exactly what the question wants you to find, so the answer is just -26

yeh I'm just using alpha and beta as a and b, ceebs

Kreisler · Jul 31, 2016

Help pls

InteGrand · Jul 31, 2016

Kreisler said:
Help pls

$\noindent For simplicity, write $s\equiv \sin x$ and $c\equiv \cos x$. Note $s^{2}=1-c^2$ (trig. identity), so the equation becomes$

$\begin{align*}2\left(1-c^2\right)&= 3\left(c+1\right) \\ \iff 2 - 2c^2 &= 3c +3 \\ \iff 2c^2 +3c +1 &= 0 \\ \iff \frac{\left(2c+2\right)\left(2c+1\right)}{2}&= 0 \\ \iff \left(c+1\right)\left(2c+1\right) &= 0 \\ \iff c = -1 &\text{ or } c = -\frac{1}{2}\end{align*}$

$\noindent So we just need to solve $\cos x = -1$ or $\cos x = -\frac{1}{2}$, for $0\leq x \leq 2\pi$. If $\cos x = -1$, the solution is $x = \frac{3\pi}{2}$. For $\cos x = -\frac{1}{2}$, the solutions are $x = \frac{2\pi}{3}$ or $\frac{4\pi}{3}$. So the solutions to the original equation are $x=\frac{2\pi}{3},\frac{4\pi}{3}$ or $\frac{3\pi}{2}$.$

Orwell · Jul 31, 2016

InteGrand · Jul 31, 2016

Orwell said:

$\noindent For simplicity, write $u\equiv|x+1|$. Then the given equation is$

$\begin{align*}u^2 -4u-5 &= 0 \\ \iff \left(u+1\right)\left(u-5\right) &= 0 \\ \iff u = -1 &\text{ or } u=5.\end{align*}$

$\noindent There are no solutions for $u=-1$ since $u\geq 0$, being an absolute value. So we only need to look at $u=5$, i.e. $|x+1|=5$. This has solutions $x+1 = \pm 5 \iff x = -1\pm 5 \iff x = 4$ or $-6$. So the solution to the original equation is $x=4$ or $-6$.$

Orwell · Jul 31, 2016

From which God were you birthed Integrand?

Kreisler · Jul 31, 2016

Help again pls ;_;

Kreisler · Jul 31, 2016

Sorry sent same question in twice : /

Orwell · Jul 31, 2016

Hippity hoppity helpitus.

Paradoxica · Jul 31, 2016

Kreisler said:
Help again pls ;_;

Let the roots be a, 2a

Then the sum of the roots: 3a = -m

Product: 2a² = k

9a² = m²

18a² = 2m²

9k = 2m²

------------------------------

x² - px + p = 0

The roots are opposite in sign if and only if the product of the roots is a negative number.

The product of the roots is p, but the question stated that p is positive. Therefore, the roots are never opposite in sign.

=============================

Δ = p² - 4p

The roots exist if and only if Δ ≥ 0

p² - 4p ≥ 0

p² -4p + 4 ≥ 4

(p-2)² ≥ 2²

p-2 ≥ 2 OR p-2 ≤ -2

p ≥ 4 OR p ≤ 0

p ≥ 4 since p > 0

Paradoxica · Jul 31, 2016

Orwell said:
Hippity hoppity helpitus.

Same approach as Integrand...

4(1-sin²θ) = 6sinθ + 6

6(1+sinθ) - 4(1-sinθ)(1+sinθ)= 0

(2-4sinθ)(1+sinθ) = 0

You can carry the rest...

------------------------------------

(x+1)² = 8y-24 = 8(y-3)

Kreisler · Jul 31, 2016

Help me pls

Orwell · Jul 31, 2016

Green Yoda · Jul 31, 2016

Orwell said:

Q80
i)
(a+b)=4
(ab)=2

ii)
3(a+b)=12=-b/a
3a*3b=9ab=18=c/a
a=0 b=-12 c=6
new eqn = x^2-12x+6

81)
if (a+b)=0 then -b/a =0 therefore -b=0
therefore -(1+m)=0
m=1

trecex1 · Jul 31, 2016

Q80i) just use -b/a and c/a
ii) Make a monic quadratic in form x^2 -(3α+3β) +9αβ (use part i))
Q81, use sum of roots equate them to 0.
These are pretty intuitive quadratic function questions to be honest.

Green Yoda · Jul 31, 2016

Kreisler said:
Help me pls

Q77
i) complete the square
x^2-2x=-4y-9
(x-1)^2=-4y-8
(x-1)^2=-4(y+2)

ii) It is an vertical negative parabola vertex at (1,-2), focal length 1 so the focus is at -1 units from vertex (1,-3) by inspection
iii) directrix is +1 units from vertex, so its y=-1

Q78
i)
Δ=4k^2-4(8k-15)
4k^2-32k+60
k^2-8k+15

ii)
Δ=k^2-8k+15>=0
(k-3)(k-5)>=0
k<=3 or k>=5

iii)
3(2k)=2(8k-15)
6k=16k-30
10k=30
k=3

Green Yoda · Jul 31, 2016

What is the answer to Q80(ii)? I am unsure about this one.

InteGrand · Jul 31, 2016

Rathin said:
What is the answer to Q80(ii)? I am unsure about this one.

$\noindent Find the values of $3\alpha \cdot 3\beta$ (call this $P$ for product of the roots) and $3\alpha +3\beta$ (call this $S$ for the sum of the roots). Then a desired quadratic equation is $x^2 -Sx + P = 0$. (This is true for general quadratic equations when we want a sum of roots to be a given number $S$ and the product of roots to be a given number $P$.)$

Green Yoda · Jul 31, 2016

would u then just sub b as (3a+3b) and c as 9ab?
to get x^2-(3a+3b)+9ab? or do we need numerical results?

Prelim 2016 Maths Help Thread (1 Viewer)

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