MedVision ad

Simple trig? (1 Viewer)

enigma_1

~~~~ Miss Cricket ~~~~
Joined
Feb 27, 2013
Messages
4,281
Location
Lords
Gender
Female
HSC
2014
How do I do this? Sorry been long since I last touched trig :( Just need someone to jog my memory, cheers.

Solve this equation for 0<= x <=360 degrees.

tanx = (root2) -1
 

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
x = arctan(sqrt(2) - 1) = very hard

The problem is that disgusting square root of 2..

I have an idea, let's eliminate that square root by first isolating it and then squaring both sides!

(root2) = tanx + 1 (isolate root2)

2 = (tanx)^2 + 2tanx + 1 (squaring both sides)

(tanx)^2 + 2tanx - 1 = 0 (re-arrange)

Then solve quadratic :)
 

braintic

Well-Known Member
Joined
Jan 20, 2011
Messages
2,137
Gender
Undisclosed
HSC
N/A
x = arctan(sqrt(2) - 1) = very hard

The problem is that disgusting square root of 2..

I have an idea, let's eliminate that square root by first isolating it and then squaring both sides!

(root2) = tanx + 1 (isolate root2)

2 = (tanx)^2 + 2tanx + 1 (squaring both sides)

(tanx)^2 + 2tanx - 1 = 0 (re-arrange)

Then solve quadratic :)
Its not hard at all - simply use your calculator.

arctan(sqrt 2 - 1) = 22.5 degrees

sqrt 2 - 1 is positive, and the other quadrant in which tan is +ve is the 3rd.

x=22.5 and (180+22.5)

No need for a quadratic equation. The quadratic gives unwanted solutions anyway.
 

HeroicPandas

Heroic!
Joined
Mar 8, 2012
Messages
1,547
Gender
Male
HSC
2013
Its not hard at all - simply use your calculator.

arctan(sqrt 2 - 1) = 22.5 degrees

sqrt 2 - 1 is positive, and the other quadrant in which tan is +ve is the 3rd.

x=22.5 and (180+22.5)

No need for a quadratic equation. The quadratic gives unwanted solutions anyway.
I realized that when you solve the quadratic, you end up with tanx = 1 + root2 lol
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top