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2007 Abbotsleigh Q8 (1 Viewer)

Carrotsticks

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Multiply both sides of (i) by 2n.

I suspect this because the expression in (ii) is the EXACT same thing as (i), except in sigma notation (doesn't change anything) and there's a 2n in front.
 

seanieg89

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From previous part, LHS<4n^2/pi=n^2*(4/pi) < n^2*(pi/2).
 
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seanieg89

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Multiply both sides of (i) by 2n.

I suspect this because the expression in (ii) is the EXACT same thing as (i), except in sigma notation (doesn't change anything) and there's a 2n in front.
It isn't quite the same. But 2n*(RHS of i) is strictly smaller than RHS of ii.
 
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Even if you multiply by 2n it doesn't fall out.

Thanks sean and carrot.
 

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Yep yep, OP wanted a hint so I just gave him a start and hoped he would figure out the rest.


 

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For part i - did you just integrate the area using the equation of the graph, then state that the rectangles would be less than that?
 

RealiseNothing

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For part i - did you just integrate the area using the equation of the graph, then state that the rectangles would be less than that?
Integrate the curve to find the area:











This is the area under the curve.

Now add up the rectangles. They all have area width times length, and the width is always one, so the area of each rectangle is just equal to the height, which is the 'y' value, so just sub in 'x' values into the equation of the curve. The sum of the areas of the rectangles is:



This is however, less than the area under the curve, so:



Divide both sides by 'n':



As required.
 

bleakarcher

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Integrate the curve to find the area:











This is the area under the curve.

Now add up the rectangles. They all have area width times length, and the width is always one, so the area of each rectangle is just equal to the height, which is the 'y' value, so just sub in 'x' values into the equation of the curve. The sum of the areas of the rectangles is:



This is however, less than the area under the curve, so:



Divide both sides by 'n':



As required.
Don't you integrate from x=1 to n?
 

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