How do you solve #6cos^2x+5cosx+1=0# in the interval [0,360]?

1 Answer

#x=120^o, 240^o, 109.5^o, 250.5^o#

Explanation:

Let's take a look at the equation:

#6cos^2+5cosx+1=0#

I find it hard to focus on factoring when looking at trig functions within a polynomial, so let's just get rid of that for a second by saying:

#X=cosx# and so therefore:

#6X^2+5X+1=0#

Now let's factor:

#(3X+1)(2X+1)=0#

And so therefore:

#3X+1=0 => X=-1/3#

#2X+1=0 => X=-1/2#

And so:

#X=cosx=-1/3, -1/2#

Ok - so now what?

Cosine is negative where the adjacent is negative (that is to say, where the line along the x-axis making the triangle we're looking at runs along the negative part of the axis). So we're in quadrants 2 and 3.

Let's work out the reference angles, starting with #cosx=-1/2#:

This one is a special triangle - the 30/60/90 triangle - and so we know the reference angle is #60^o# or #pi/3#. We can take #pi/3# away from #pi# to see the angle in Q2 (#pi-pi/3=(2pi)/3#) and add to #pi# to see the angle in Q3 (#pi+pi/3=(4pi)/3#):

grandars.ru

And now #cosx=-1/3#:

This one isn't so neat. It's roughly #70.5^o#, which will give us #180-70.5=109.5^o# and #180+70.5=250.5^o#. (I'm hoping my fellow answer writers will fill in a clean radian fraction but due to time constraints I need to leave this part of the answer undone).