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Geometrical Applications of Calculus (1 Viewer)
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namburger
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Just using the quotient rule in each one, if there's a mistake, it will most likely be due to the immense amount of algebra. Try simplifying as much as possible to make life easier
EDIT: did you get first derivative right or are you stuck on second?
EDIT: did you get first derivative right or are you stuck on second?
namburger
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y' = (12x^2 - 80x - 1) / (4x^2+1)^3FDownes said:
Let A = 4x^2+1
y'' = [(24x-80)A^3 - 3A^2.8x.(12x^2 - 80x - 1)]/A^6
=[(24x-80)A^3 - 24xA^2.(12x^2 - 80x - 1)]/A^6
=[8(3x-10)A^3 - 24xA^2(12x^2 - 80x - 1)]/A^6
=8[(3x-10)A - 3x(12x^2 - 80x - 1)]/A^4
=8[(12x^3-40x^2+3x-10) - 3(12x^2-80x-1)]/A^4
=8[-24x^3+200x^2+6x-10]/A^4
=-16 (12x^3 - 100x^2 - 3x + 5)/ (4x^2+1)^4
Last edited:
Sorry, I should have checked earlier, but the textbook has a different answer to what you've got there. According to it, the first derivative is;
(20x2 - 120x - 1)/(4x2 + 1)4
And the second derivative is;
[-8(60x3 - 420x2 - 9x + 15)]/(4x2 + 1)5
(20x2 - 120x - 1)/(4x2 + 1)4
And the second derivative is;
[-8(60x3 - 420x2 - 9x + 15)]/(4x2 + 1)5
namburger
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Ok if you got the same answer as me for the first derivative, that is quite a coincidence if the answer is wrong. I'll redo it, and see if i get the same answer
y=(5 - x)/(4x^2 + 1)^2
let A = 4x^2 + 1
y'= [-A^2 - 2A.8x.(5-x)]/A^4
= [-A - 16x(5-x)]/A^3
= [- 4x^2- 1- 80x+ 16^2]/A^3
= (12x^2-80x-1)/(4x^2+1)^3
Therefore textbook is wrong
y=(5 - x)/(4x^2 + 1)^2
let A = 4x^2 + 1
y'= [-A^2 - 2A.8x.(5-x)]/A^4
= [-A - 16x(5-x)]/A^3
= [- 4x^2- 1- 80x+ 16^2]/A^3
= (12x^2-80x-1)/(4x^2+1)^3
Therefore textbook is wrong
Last edited:
namburger
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lol NP
Just don't waste your time doing these questions with stupid values. Understand the process because you won't get these questions where algebra is a bitch and one mistake is fatal. The questions you get on diffrentiation should be usually simple, nothing to complex because they are looking if you are using the right process
Just don't waste your time doing these questions with stupid values. Understand the process because you won't get these questions where algebra is a bitch and one mistake is fatal. The questions you get on diffrentiation should be usually simple, nothing to complex because they are looking if you are using the right process
tacogym27101990
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yeah it looks like the book is wrong
Thanks guys, but it looks like I've run in to more troubles;
Find the maximum possible area if a straight 8m length of fencing is placed across a corner to enclose a triangular space.
So, I figure
= A = 1/2xy
= x2 + y2 = 82
= y2 = 64 - x2
= y = (64 - x2)1/2
= A = 1/2x(64 - x2)1/2
= A' = 1/2(64 - x2)1/2 - x2/4(64 - x2)-1/2
After that, my working falls apart. Can someone help me out?
EDIT: Man I'm bad at this subject....
Find any stationary points or inflexions on the curve y = x(x - 2)3
I just end up with stat points at x = 0 and 2, where they should be points of inflexion at x = 2 and 1, and a minimum at 1/2.
Find the maximum possible area if a straight 8m length of fencing is placed across a corner to enclose a triangular space.
So, I figure
= A = 1/2xy
= x2 + y2 = 82
= y2 = 64 - x2
= y = (64 - x2)1/2
= A = 1/2x(64 - x2)1/2
= A' = 1/2(64 - x2)1/2 - x2/4(64 - x2)-1/2
After that, my working falls apart. Can someone help me out?
EDIT: Man I'm bad at this subject....
Find any stationary points or inflexions on the curve y = x(x - 2)3
I just end up with stat points at x = 0 and 2, where they should be points of inflexion at x = 2 and 1, and a minimum at 1/2.
Last edited:
Mark576
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y=x(x-2)3
y'=(x-2)3+3x(x-2)2=(x-2)2(4x-2)
y'=0 will give the stationary points:
For y'=0, x=2,1/2.
y''=2(x-2)(4x-2)+4(x-2)2=(x-2)(8x-4+4x-8)=(x-2)(12x-12)
From this we find x=1, is a point of inflection, and x=2 is a horizontal point of inflection [as it satisfies y'=0 and y''=0], which we can verify by observing the sign of y'' as it passes through x=2.
Testing x=1/2 for maximum or minimum:
y''=(1/2-2)(6-12) > 0 => x=1/2 is a minimum stationary point.
y'=(x-2)3+3x(x-2)2=(x-2)2(4x-2)
y'=0 will give the stationary points:
For y'=0, x=2,1/2.
y''=2(x-2)(4x-2)+4(x-2)2=(x-2)(8x-4+4x-8)=(x-2)(12x-12)
From this we find x=1, is a point of inflection, and x=2 is a horizontal point of inflection [as it satisfies y'=0 and y''=0], which we can verify by observing the sign of y'' as it passes through x=2.
Testing x=1/2 for maximum or minimum:
y''=(1/2-2)(6-12) > 0 => x=1/2 is a minimum stationary point.
namburger
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A' = 1/2(64 - x<sup>2</sup>)<sup>1/2</sup> - x<sup>2</sup>/4(64 - x<sup>2</sup>)<sup>-1/2
Ill assume the top is correct
let A' = 0
Multiply both sides by </sup>(64 - x<sup>2</sup>)<sup>1/2
(64-x^2)/2 - x^2/4 = 0
2(64-x^2)-x^2=0
128-3x^2=0
x=6.53(to 2.d.p.)
</sup>
Ill assume the top is correct
let A' = 0
Multiply both sides by </sup>(64 - x<sup>2</sup>)<sup>1/2
(64-x^2)/2 - x^2/4 = 0
2(64-x^2)-x^2=0
128-3x^2=0
x=6.53(to 2.d.p.)
</sup>
namburger
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A = 1/2x(64 - x<sup>2</sup>)<sup>1/2FDownes said:Hmm... The answer in the book is 16m2, ergo my working for that question is probably wrong.
*sigh* This isn't good. I have a mathematics test on wednesday...
Sub in 6.53 and you get 15, which is quite close haha
</sup>