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3u Mathematics Marathon V 1.1 (1 Viewer)
- Thread starter Riviet
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pLuvia
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Is it all over (x3-1)??
Slidey
But pieces of what?
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Integrate each on its own:
Question 2)
Evaluate the integral of |x^2-9| from -1 to 5, w.r.t. x.
First substitution is u=x^4+1, du=4x^3
Second, u=x^3-1, du=3x^2 dx
So the answer is: (x^4+1)^3/12 - ln(x^3-1)/3 + C
Second, u=x^3-1, du=3x^2 dx
So the answer is: (x^4+1)^3/12 - ln(x^3-1)/3 + C
Question 2)
Evaluate the integral of |x^2-9| from -1 to 5, w.r.t. x.
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pLuvia
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What does the w.r.t.x actually mean? Make x the subject?
∫[-1 to 5] (x2 - 9) dx
= [x3/3 - 9x] [-1 to 5]
= 12
= [x3/3 - 9x] [-1 to 5]
= 12
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pLuvia
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Next question
Using Newtons method twice, solve the equation
logex = cos x has a root near x = 1
Using Newtons method twice, solve the equation
logex = cos x has a root near x = 1
P
pLuvia
Guest
I know what it stands for but does it mean just to integrate with x's in the answer?
I should know this but hey
I should know this but hey
I
icycloud
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Since it is an absolute value, we must split the range.Slide Rule said:
i.e. we solve x^2-9 >= 0 and x^2-9 < 0
Thus the range -1 ---> 5 becomes -1 ---> 3 and 3 ---> 5 respectively to 9-x^2 and x^2-9
Thus, I = ∫(-1 ---> 5) |x^2-9| dx
= ∫(-1 ---> 3) (9-x^2) dx + ∫(3 ---> 5) (x^2 - 9) dx
= (-1 ---> 3) [9x - x^3/3] + (3----> 5) (x^3/3 - 9x)
= 27 -9 + 9 - 1/3 + 125/3 - 45 - 9 + 27
= 41 1/3 (or 124/3) #
Thus the range -1 ---> 5 becomes -1 ---> 3 and 3 ---> 5 respectively to 9-x^2 and x^2-9
Thus, I = ∫(-1 ---> 5) |x^2-9| dx
= ∫(-1 ---> 3) (9-x^2) dx + ∫(3 ---> 5) (x^2 - 9) dx
= (-1 ---> 3) [9x - x^3/3] + (3----> 5) (x^3/3 - 9x)
= 27 -9 + 9 - 1/3 + 125/3 - 45 - 9 + 27
= 41 1/3 (or 124/3) #
It's hard to explain it but it means to differentiate x, treating it as "the variable" and all other terms as constants etc.pLuvia said:I know what it stands for but does it mean just to integrate with x's in the answer?
I should know this but hey
nick1048
Mè çHöP ŸèW
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lol I think people understand this concept better once they've studied inverse trig functions to identify the difference between having respect for a pronumeral rather than merely making it the subject. Don't fret if you don't understand this idea fully as yet.Riviet said:
I
icycloud
Guest
Pluvia said:
Let x_1 = 1
f(x) = ln(x) - cos(x) = 0
f'(x) = 1/x + sin(x)
First go:
x_2 = x_1 - f(x_1)/f'(x_1)
= 1 - (ln(1)-cos(1))/(1/1+sin(1))
= 1.9826.........
Second go:
x_3 = x_2 - f(x_2)/f'(x_2)
= 1.9826..... - (ln(1.9826...) - cos(1.9826...))/(1/1.9826... + sin(1.9826...))
= 2.2871......
= 2.287 (3dp) #
f(x) = ln(x) - cos(x) = 0
f'(x) = 1/x + sin(x)
First go:
x_2 = x_1 - f(x_1)/f'(x_1)
= 1 - (ln(1)-cos(1))/(1/1+sin(1))
= 1.9826.........
Second go:
x_3 = x_2 - f(x_2)/f'(x_2)
= 1.9826..... - (ln(1.9826...) - cos(1.9826...))/(1/1.9826... + sin(1.9826...))
= 2.2871......
= 2.287 (3dp) #
Question 4
Prove that [cos(x) - cos(5x) + cos(9x)] / [sin(x) - sin(5x) + sin(9x)] = cot(5x)
I
icycloud
Guest
Sure.Riviet said:
Hint:
Group the LHS as:
[cos(x) + cos(9x) - cos(5x)] / [sin(x) + sin(9x) - sin(5x)]
Then use some clever transformation with expansions of cos(A+B), cos(A-B), sin(A+B) or sin(A-B).
If you need another hint, do reply again. =D
[cos(x) + cos(9x) - cos(5x)] / [sin(x) + sin(9x) - sin(5x)]
Then use some clever transformation with expansions of cos(A+B), cos(A-B), sin(A+B) or sin(A-B).
If you need another hint, do reply again. =D
After i learnt a new trig formula today, i suddenly knew what to do:icycloud said:
LHS=[cos9x + cosx - cos5x] / [sin9x + sinx - sin5x]
={2cos[(9x+x)/2]cos[(9x-x)/2]-cos5x} / {2sin[(9x+x)/2]cos[(9x-x)/2]-sin5x}
=(2cos5xcos4x-cos5x) / (2sin5xcos4x-sin5x)
=[cos5x(2cos4x-1)] / [sin5x(2cos4x-1)]
=cos5x/sin5x
=cot5x
=RHS!!! WOOT WOOT! ;D
QED
={2cos[(9x+x)/2]cos[(9x-x)/2]-cos5x} / {2sin[(9x+x)/2]cos[(9x-x)/2]-sin5x}
=(2cos5xcos4x-cos5x) / (2sin5xcos4x-sin5x)
=[cos5x(2cos4x-1)] / [sin5x(2cos4x-1)]
=cos5x/sin5x
=cot5x
=RHS!!! WOOT WOOT! ;D
QED
Next Question:
If tan a, tan b, tan y are the roots of the equation x3-(a+1)x2+(c-a)x-c=0 , show that a + b + y = n(pi) + pi/4 , where n is an integer.
P.S This one seems difficult. I personally haven't done it yet!
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YBK
w00t! custom status!! :D
Riviet said:
What's the relationship between tan and pi?
I replaced x with tan a which equals zero... and did the same for tan b and tan y.
This makes them all equal to each other...
Therefore (I think): tan a = tan b = tan y
I'm probably wrong... which topic is that question from? Haven't encountered anything similar... confusing :s
Mountain.Dew
Magician, and Lawyer.
here goes:
consider tan(A+B+Y)...
i will use this notation: TA = tanA, TB = tanB, TC = tanC
now, tan(A+B+Y) = tan(A+b) + TY / (1 - tan(A+B)*TY)
now, expand further: tan(A+B+Y) = [(TA + TB) / (1- TA*TB)] + TY / (1 - [TY[TA + TB]/(1-TATB)])
then, times numerator and denominator by 1-TATB
SO, tan(A+B+Y) = [TA + TB + TY(1-TATB)] / (1 - TATB - [(TA + TB)TY])...starting to look good now...
tan(A+B+Y) = [TA + TB + TY - TATBTY] / [1 - (TATB + TATY + TBTY)]...looks familiar?
tan(A+B+Y) = ([sum of single roots] - [product of roots]) / (1 - [sum of double roots])
tan(A+B+Y) = [a+1] - [c] / 1 - [c - a] = a+1- c / 1 - c + a = 1
therefore, tan(A+B+Y) = 1
THEREFORE, by the general solution, [tanA = M, A = n(pi) + tan-1M]
(A+B+Y) = n(pi) + tan-1(1) = n(pi) + pi/4, n an integer.
mmmmmm yummy rice and sauce Riviet!
i will use this notation: TA = tanA, TB = tanB, TC = tanC
now, tan(A+B+Y) = tan(A+b) + TY / (1 - tan(A+B)*TY)
now, expand further: tan(A+B+Y) = [(TA + TB) / (1- TA*TB)] + TY / (1 - [TY[TA + TB]/(1-TATB)])
then, times numerator and denominator by 1-TATB
SO, tan(A+B+Y) = [TA + TB + TY(1-TATB)] / (1 - TATB - [(TA + TB)TY])...starting to look good now...
tan(A+B+Y) = [TA + TB + TY - TATBTY] / [1 - (TATB + TATY + TBTY)]...looks familiar?
tan(A+B+Y) = ([sum of single roots] - [product of roots]) / (1 - [sum of double roots])
tan(A+B+Y) = [a+1] - [c] / 1 - [c - a] = a+1- c / 1 - c + a = 1
therefore, tan(A+B+Y) = 1
THEREFORE, by the general solution, [tanA = M, A = n(pi) + tan-1M]
(A+B+Y) = n(pi) + tan-1(1) = n(pi) + pi/4, n an integer.
mmmmmm yummy rice and sauce Riviet!
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Mountain.Dew
Magician, and Lawyer.
okay, now to continue the grand marathon:
this was posted in the 2U maths marathon thread, but it was deemed too hard for 2U, so instead, it is here:
Question: I am in a poker game, and I am dealt 5 cards from an ordinary 52-card deck. What is the PROBABILITY (hehehe i know people have P'lty) that I will get:
(i) one pair
(ii) a two pair
(iii) a triple
(iv) a straight
(v) a flush
(vi) a full house
(vii) a four-of-a-kind
(viii) a royal flush?
(ix) high card? (ie no poker combinations...i leave this till last cos i think this is the hardest one...)
this was posted in the 2U maths marathon thread, but it was deemed too hard for 2U, so instead, it is here:
Question: I am in a poker game, and I am dealt 5 cards from an ordinary 52-card deck. What is the PROBABILITY (hehehe i know people have P'lty) that I will get:
(i) one pair
(ii) a two pair
(iii) a triple
(iv) a straight
(v) a flush
(vi) a full house
(vii) a four-of-a-kind
(viii) a royal flush?
(ix) high card? (ie no poker combinations...i leave this till last cos i think this is the hardest one...)
Mountain.Dew
Magician, and Lawyer.
thankee riviet, thankee *bows to riviet*
now, who will attempt this question of poker?
now, who will attempt this question of poker?