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Integration (1 Viewer)

Lukybear

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Find the value of k for which the line y = kx bisects the area enclosed by the curve 4y=4x-x^2 and the x-axis.

How do you do this.

Towards the end i found the solution in this equation:

(1-2k+k^2)(1-k) = 1/2

But i dont know how to solve this equation.
 

Revacious

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i got k = 1 - 1/cuberoot 2 tell me if thats right and ill tell you how i did it, cos its a bit annoying to type up
 

kelllly

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I'll do it for you:

(1 - 2k + k^2)(1 - k) = 1/2
(1 - k)^2(1 - k) = 1/2
(1 - k)^3 = 1/2
1 - k = (1/2)^(1/3)
1 - (1/2)^(1/3) = k
k = 1 - 1/(cube root 2)

Is that right, Lukybear?
 
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untouchablecuz

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doesnt seem right

edit: oh wait, it is : )

also, correction: in the third line its meant to be When x=4-4k
 

Lukybear

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Untouch thxs for post up.

Could you explain in your method:
A1 = ....
A2 = .... and how they both equal half of area?
 

untouchablecuz

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notice that A1 represents the area enclosed above the line and parabola and that A2 represents the area enclosed below the line, parabola and the x axis

because we want to find k such that the area is bisected, we LET A1=A2 and solve for k

get me?
 
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