girlworld_club
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Re: HSC 2013 2U Marathon
thanks. haha silly me
thanks. haha silly me
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HSC 2013 Maths Marathon (archive) (1 Viewer)
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mahmoudali
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Shazer2
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Re: HSC 2013 2U Marathon
Answer is D. Since concavity at a is upwards, so f''(a) > 0, and the gradient at a is negative, so f'(a) < 0.
Give a reasoning with your answer so I know you know how to do it
Menomaths
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Menomaths
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Re: HSC 2013 2U Marathon
My method:
2cos^2(x)+1=3-2sin^2(x)
2cos^2(x) = 2-2sin^2(x)
cos^2(x) = 1-sin^2(x)
cos^2(x) = cos^2(x)
Since 1-sin^2(x) = cos^2(x)
Is this a viable method to solve this question or do I have to muck around with one side w/o touching the other?
My method:
2cos^2(x)+1=3-2sin^2(x)
2cos^2(x) = 2-2sin^2(x)
cos^2(x) = 1-sin^2(x)
cos^2(x) = cos^2(x)
Since 1-sin^2(x) = cos^2(x)
Is this a viable method to solve this question or do I have to muck around with one side w/o touching the other?
girlworld_club
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Re: HSC 2013 2U Marathon
Differentiate:
Kt / ( bt + (K - bt)e^-Kt )
where T is a constant.
Differentiate:
Kt / ( bt + (K - bt)e^-Kt )
where T is a constant.
Re: HSC 2013 2U Marathon
Can someone explain how do you find the distance traveled in calculus. So when they give you the formula for velocity and displacement and ask you to find the total distance, is it just the displacement? I get really confused with this.
Can someone explain how do you find the distance traveled in calculus. So when they give you the formula for velocity and displacement and ask you to find the total distance, is it just the displacement? I get really confused with this.
Re: HSC 2013 2U Marathon
I would like to know this too? Do you have to only work on one side or can you solve both sides at once?
My method:
2cos^2(x)+1=3-2sin^2(x)
2cos^2(x) = 2-2sin^2(x)
cos^2(x) = 1-sin^2(x)
cos^2(x) = cos^2(x)
Since 1-sin^2(x) = cos^2(x)
Is this a viable method to solve this question or do I have to muck around with one side w/o touching the other?
Carrotsticks
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Re: HSC 2013 2U Marathon
LHS = ... = ... = ... = RHS
--------------
RHS = ... = ... = ... = LHS-
--------------
LHS = ... = X
RHS = ... = X
Therefore LHS = RHS.
You can do one of the following.
LHS = ... = ... = ... = RHS
--------------
RHS = ... = ... = ... = LHS-
--------------
LHS = ... = X
RHS = ... = X
Therefore LHS = RHS.
RealiseNothing
what is that?It is Cowpea
Re: HSC 2013 2U Marathon
How about adding a variable (say X) to the RHS then you can play around with both sides at the same time, as long as you prove that X=0.
Shazer2
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Carrotsticks
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Re: HSC 2013 2U Marathon
That is valid, but I've never really seen a problem that needed that.
Carrotsticks
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Re: HSC 2013 2U Marathon
Is this an arithmetic series and we just apply the formula don't we?
Carrotsticks
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Re: HSC 2013 2U Marathon
Hint: Consider the identity sin(x) = cos(90-x)
Not quite, the angles are in AP but the actual terms may not necessarily be in AP.
Hint: Consider the identity sin(x) = cos(90-x)
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