-
Want to help us with this year's BoS Trials? Let us know before 30 June. See this thread for details -
Looking for HSC notes and resources? Check out our Notes & Resources page
HSC 2015 Maths Marathon (archive) (1 Viewer)
- Thread starter Trebla
- Start date
- Status
Re: HSC 2015 2U Marathon
sinx=2cosx
Tanx=2
x=63.43,243.43
x=1.107 radians, 4.249 radians
Thank you.
Oops. I was thinking it couldn't equal twice at once.Why can't we have?
sinx=2cosx
Tanx=2
x=63.43,243.43
x=1.107 radians, 4.249 radians
Thank you.
integral95
Well-Known Member
- Joined
- Dec 16, 2012
- Messages
- 779
- Gender
- Male
- HSC
- 2013
Re: HSC 2015 2U Marathon
However I would simply divide both sides by
to get a quadratic in terms of tanx i.e
 -3\sin(x)\cos(x) +2\cos^{2}x =0 \Rightarrow tan^2x -3tanx +2 = 0 )
Cool method -3\sin(x)\cos(x) +2\cos^{2}x =0 \,\,\,\,\,\, $where 0 \leq x\leq 2\pi \\ \\ $Rewriting:$ \, \, \, \\ sin^{2}x -2\sin(x)\cos(x) +\cos^{2}(x) +\cos(x)\cos(x) -\sin(x)\cos(x) =0 \\ (\sin(x)-\cos(x))^{2} + \cos(x)(\cos(x) - \sin(x)) =0 \\ (\sin(x)-\cos(x))^{2} - \cos(x)(\sin(x) - \cos(x)) =0 \\ \\ $Taking$ $(\sin(x)-\cos(x))$ $out$ $as$ $a$ $common$ $factor:$ \\ (\sin(x)-\cos(x))(\sin(x)-\cos(x) -\cos(x)) =0 \\(\sin(x)-\cos(x))(\sin(x)-2\cos(x))=0 \\ $Now, $ $either$ \sin(x)=\cos(x)\, $or$ \sin(x)=2\cos(x) \,$.$ $However,$ $this$ $can$ $not$ $be$ $true.$ \\ \\ \therefore \sin(x)=\cos(x) \\\therefore \tan(x)=1 $for $ \,0 \leq x\leq 2\pi \\ \therefore x=\frac{\pi}{4} \, $,$ 5\pi/4 )
However I would simply divide both sides by
to get a quadratic in terms of tanx i.e
Re: HSC 2015 2U Marathon
 -3\tan(x) +2 =0 \\ (\tan(x)-2)(\tan(x)-1) =0 \\ \tan(x)=2 \, \, \, \, \, \tan(x) = 1 \\ \\ \therefore x=\frac{\pi}{4} \, ,\tan^{-1}2,\, \frac{5\pi}{4} \, , \tan^{-1}2 +\pi )
ah i seeCool method
However I would simply divide both sides by
to get a quadratic in terms of tanx i.e
PhysicsMaths
Active Member
- Joined
- Dec 9, 2014
- Messages
- 179
- Gender
- Male
- HSC
- 2015
PhysicsMaths
Active Member
- Joined
- Dec 9, 2014
- Messages
- 179
- Gender
- Male
- HSC
- 2015
Re: HSC 2015 2U Marathon
NEXT QUESTION
Find the derivative of x^3 using first principles
NEXT QUESTION
Find the derivative of x^3 using first principles
Re: HSC 2015 2U Marathon
Let = x^{1/3} )
. The inverse function is then =x^3 )
.
We know from first principles (done in an earlier Q on this page) that=3x^2)
, so the slope of the tangent on the graph of )
at a point (t, t3) is 3t2.
Hence the slope of the tangent on the corresponding point on the inverse function's graph (that is, the point (t3, t) on the graph of y = f(x)) is the reciprocal of this, which is
. Replacing t with 
(so that t3 becomes ^3 = t)
), we find that the slope on the graph of y = f(x) at the point )
is ^2}=\frac{1}{3}t^{-\frac{2}{3}})
.
Since the derivative)
gives the slope of the tangent on the graph of y = f(x) at the point )=\left ( t,t^{\frac{1}{3}} \right ))
, the derivative is =\frac{1}{3}x^{-\frac{2}{3}})
(replacing t with x).
Let
We know from first principles (done in an earlier Q on this page) that
Hence the slope of the tangent on the corresponding point on the inverse function's graph (that is, the point (t3, t) on the graph of y = f(x)) is the reciprocal of this, which is
Since the derivative
dan964
what
Re: HSC 2015 2U Marathon
^
here is a proper way to do it by first principles.
I have used Liebnitz notation instead of 'h'
and the limit is Δx→0 not x (that is an error)
^
here is a proper way to do it by first principles.
I have used Liebnitz notation instead of 'h'
and the limit is Δx→0 not x (that is an error)
Last edited:
leehuan
Well-Known Member
- Joined
- May 31, 2014
- Messages
- 5,805
- Gender
- Male
- HSC
- 2015
Re: HSC 2015 2U Marathon
Alternate solution. Same working out, just without the substitution. The difference of two cubes isn't really avoidable.
 \left( { \left( \sqrt [ 3 ]{ x+h } \right) }^{ 2 }+\sqrt [ 3 ]{ x+h } \sqrt [ 3 ]{ x } +{ \left( \sqrt [ 3 ]{ x } \right) }^{ 2 } \right) }{ h\left( { \left( \sqrt [ 3 ]{ x+h } \right) }^{ 2 }+\sqrt [ 3 ]{ x+h } \sqrt [ 3 ]{ x } +{ \left( \sqrt [ 3 ]{ x } \right) }^{ 2 } \right) } } )
-x }{ h\left( { \left( \sqrt [ 3 ]{ x+h } \right) }^{ 2 }+\sqrt [ 3 ]{ x+h } \sqrt [ 3 ]{ x } +{ \left( \sqrt [ 3 ]{ x } \right) }^{ 2 } \right) } } \\ =\lim _{ h\rightarrow 0 }{ \frac { h }{ h\left( { \left( \sqrt [ 3 ]{ x+h } \right) }^{ 2 }+\sqrt [ 3 ]{ x+h } \sqrt [ 3 ]{ x } +{ \left( \sqrt [ 3 ]{ x } \right) }^{ 2 } \right) } } )
 }^{ 2 }+\sqrt [ 3 ]{ x+h } \sqrt [ 3 ]{ x } +{ \left( \sqrt [ 3 ]{ x } \right) }^{ 2 } \right) } } \\ =\frac { 1 }{ \left( { \left( \sqrt [ 3 ]{ x } \right) }^{ 2 }+\sqrt [ 3 ]{ x } \sqrt [ 3 ]{ x } +{ \left( \sqrt [ 3 ]{ x } \right) }^{ 2 } \right) } \\ =\frac { 1 }{ 3\sqrt [ 3 ]{ { x }^{ 2 } } } )
I don't see why not. The only important thing to notice however is that he used both parametrics and inverse functions, which are parts of the 3U course. (Nonetheless, I haven't heard of 3U knowledge being prohibited in a 2U paper.)
Alternate solution. Same working out, just without the substitution. The difference of two cubes isn't really avoidable.
Last edited:
FrankXie
Active Member
Re: HSC 2015 2U Marathon
Next Question
Next Question
dan964
what
Re: HSC 2015 2U Marathon
hmm
I would approach this by using the chord of contact formula
and calculate then the angles and lengths necessary to use either sine or cosine rule
hmm
I would approach this by using the chord of contact formula
and calculate then the angles and lengths necessary to use either sine or cosine rule
Re: HSC 2015 2U Marathon
Note that the line y = 2x + 1 passes through S(0, 1), the focus of the parabola. The directrix of the parabola is the line y = -1. Let MP be the foot of the perpendicular from P to the directrix, and let MQ be the similar point for Q. Let XP be the foot of the perpendicular from P to the x-axis, and XQ be the similar point for Q.
Note that by definition of the parabola, PS = PMP, so PS = PXP + XPMP = y1 + 1. Similarly, QS = y2 + 1. Also, PQ = PS + QS.
Now, at the points P and Q:
y = 2x + 1 and
, so
.
The abscissae of P and Q are the solutions to this quadratic equation, so by sum of roots, x1 + x2 = 8.
Therefore,
PQ = PS + QS
= (y1 + 1) + (y2 + 1)
= ((2x1 + 1) + 1) + ((2x2 + 1) + 1)
= 2(x1 + x2) + 4
= 2×8 + 4
= 20.
Let P = (x1, y1) (so y1 = 2x1 + 1), and let Q = (x2, y2) (so y2 = 2x2 + 1).Next Question
Note that the line y = 2x + 1 passes through S(0, 1), the focus of the parabola. The directrix of the parabola is the line y = -1. Let MP be the foot of the perpendicular from P to the directrix, and let MQ be the similar point for Q. Let XP be the foot of the perpendicular from P to the x-axis, and XQ be the similar point for Q.
Note that by definition of the parabola, PS = PMP, so PS = PXP + XPMP = y1 + 1. Similarly, QS = y2 + 1. Also, PQ = PS + QS.
Now, at the points P and Q:
y = 2x + 1 and
The abscissae of P and Q are the solutions to this quadratic equation, so by sum of roots, x1 + x2 = 8.
Therefore,
PQ = PS + QS
= (y1 + 1) + (y2 + 1)
= ((2x1 + 1) + 1) + ((2x2 + 1) + 1)
= 2(x1 + x2) + 4
= 2×8 + 4
= 20.
FrankXie
Active Member
Re: HSC 2015 2U Marathon
 $ and $ Q(x_2,y_2). $ Then $ y_1=2x_1+1, y_2=2x_2+1, $ and $ x_1, x_2 $ are solutions of the quadratic equation $ x^2=4(2x+1), $ or $ x^2-8x-4=0. $ sum of roots $ x_1+x_2=8, $ product of roots $ x_1x_2=-4. $ So $ (x_1-x_2)^2=(x_1+x_2)^2-4x_1x_2=80. $ Therefore, $ PQ=\sqrt{(x_1-x_2)^2+(y_1-y_2)^2}=\sqrt{(x_1-x_2)^2+(2x_1+1-2x_2-1)^2}=\sqrt{(x_1-x_2)^2+4(x_1-x_2)^2}=\sqrt{80+320}=20. )
My solution applies to more general situations, disregarding the position of the focus, we can find the length of any chord without finding the coordinates of points of intersection.Next Question
Drsoccerball
Well-Known Member
- Joined
- May 28, 2014
- Messages
- 3,657
- Gender
- Undisclosed
- HSC
- 2015
Re: HSC 2015 2U Marathon
New question:
New question:
Last edited:
- Status