• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

Please help solve... (2 Viewers)

gurmies

Drover
Joined
Mar 20, 2008
Messages
1,209
Location
North Bondi
Gender
Male
HSC
2009
Lolwut, why differentiate? What do you think, there are multiple roots or something? -.-
 

dp624

Active Member
Joined
Oct 16, 2008
Messages
2,326
Gender
Male
HSC
2008
If anyone can solve..
cos^2 x=tan x
1=tan x sec^2 x
1=tan x (1+tan^2 x)
tan^3 x + tan x -1=0

I just can't solve after this..
let tan x = y
y^3 + y - 1 = 0
and there's some formula which can be used for solving degree-3 equations

but that's sort of cheating, no?
 

dp624

Active Member
Joined
Oct 16, 2008
Messages
2,326
Gender
Male
HSC
2008
yeah it's not pretty
LOL i had a calculator that could give me solutions to 2,3,4 degree roots - but it wasn;t allowed in the exam =S
 

Drongoski

Well-Known Member
Joined
Feb 22, 2009
Messages
4,255
Gender
Male
HSC
N/A
Next somebody's gonna pose Fermat's "Last Theorem" on BOS for a quick solution!
 

kwabon

Banned
Joined
May 26, 2008
Messages
646
Location
right behind you, mate
Gender
Male
HSC
2009
dunno whether right or not

cos^2 x =tan x
cos^2 x = sin x / cos x
cos^3 x= sin x
cos^3 x/sin x = 1
cot x ( cos^2 x) = 1
cot x = 1 / cos^2 x
1/tan x = sec^2 x
1= tan x(tan^2 x +1 )

therefore
tan^2 x + 1 =1
tan^2 x = 0
tan x = 0
x = pi*n
(where n is an integer)

and
tan x = 1
x = pi*n + pi/4
(where n is an integer)

hence
x = pi*n + pi/4 and x = pi*n

lol, thats wat i got, and think its wrong

hope it helped and good luck!!
 
Last edited:

Timothy.Siu

Prophet 9
Joined
Aug 6, 2008
Messages
3,449
Location
Sydney
Gender
Male
HSC
2009
dunno whether right or not

cos^2 x =tan x
cos^2 x = sin x / cos x
cos^3 x= sin x
cos^3 x/sin x = 1
cot x ( cos^2 x) = 1
cot x = 1 / cos^2 x
1/tan x = sec^2 x
1= tan x(tan^2 x +1 )

therefore
tan^2 x + 1 =1

tan^2 x = 0
tan x = 0
x = pi*n
(where n is an integer)

and
tan x = 1
x = pi*n + pi/4
(where n is an integer)

hence
x = pi*n + pi/4 and x = pi*n

lol, thats wat i got, and think its wrong

hope it helped and good luck!!
nope
if x^1000 (x+1)=1
can u say therefore x+1=1, x=0 LOL

using your method we ever need to use the quadratic formula
e.g.
x^2+5x+2=0
x(x+5)=-2
x=-2 or x+5=-2
x=-2 or x=-7

ur method would only work, IF the solutions were THE SAME for tanx=1 and tan^2 x=0
 
Last edited:

clintmyster

Prophet 9 FTW
Joined
Nov 12, 2007
Messages
1,067
Gender
Male
HSC
2009
Uni Grad
2015
dunno whether right or not

cos^2 x =tan x
cos^2 x = sin x / cos x
cos^3 x= sin x
cos^3 x/sin x = 1
cot x ( cos^2 x) = 1
cot x = 1 / cos^2 x
1/tan x = sec^2 x
1= tan x(tan^2 x +1 )

therefore
tan^2 x + 1 =1
tan^2 x = 0
tan x = 0
x = pi*n
(where n is an integer)

and
tan x = 1
x = pi*n + pi/4
(where n is an integer)

hence
x = pi*n + pi/4 and x = pi*n

lol, thats wat i got, and think its wrong

hope it helped and good luck!!
wouldn't you know straight away its wrong if you sub back your solution into the original equation?
 

cutemouse

Account Closed
Joined
Apr 23, 2007
Messages
2,250
Gender
Undisclosed
HSC
N/A
If anyone can solve..
cos^2 x=tan x
1=tan x sec^2 x
1=tan x (1+tan^2 x)
tan^3 x + tan x -1=0

I just can't solve after this..
[maths]x=\tan ^{(-1)}\left[-\left(\frac{2}{3 \left(9+\sqrt{93}\right)}\right)^{1/3}+\frac{\left(\frac{1}{2} \left(9+\sqrt{93}\right)\right)^{1/3}}{3^{2/3}}\right]\\=\tan ^{(-1)}\left[\frac{-2 \left(\frac{3}{9+\sqrt{93}}\right)^{1/3}+\left(2 \left(9+\sqrt{93}\right)\right)^{1/3}}{6^{2/3}}\right]\\x=\tan ^{(-1)}\left[-\frac{\left(1+i \sqrt{3}\right) \left(\frac{1}{2} \left(9+\sqrt{93}\right)\right)^{1/3}}{2 3^{2/3}}+\frac{1-i \sqrt{3}}{2^{2/3} \left(3 \left(9+\sqrt{93}\right)\right)^{1/3}}\right]\\x=\tan ^{(-1)}\left[-\frac{\left(1-i \sqrt{3}\right) \left(\frac{1}{2} \left(9+\sqrt{93}\right)\right)^{1/3}}{2 3^{2/3}}+\frac{1+i \sqrt{3}}{2^{2/3} \left(3 \left(9+\sqrt{93}\right)\right)^{1/3}}\right][/maths]

EDIT: How do I do line breaks in LateX :S -- Thanks Jetblack
 
Last edited:

Users Who Are Viewing This Thread (Users: 0, Guests: 2)

Top