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HSC 2015 Maths Marathon (archive) (2 Viewers)
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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
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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
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PhysicsMaths
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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
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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
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Re: HSC 2015 2U Marathon
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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
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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
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Re: HSC 2015 2U Marathon
New question:
New question:
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