How do you solve #2cosx+1=0# algebraically?

2 Answers
Jun 14, 2018

#(2pi)/3, (4pi)/3# on #0<=x<=2pi#

Explanation:

#2cosx+1=0#

#2cosx=-1#

#cosx=-1/2#

#cos^-1(-1/2) = x#

Use the unit circle to solve:

#cos^-1(-1/2) = (2pi)/3, (4pi)/3#

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Jun 14, 2018

Given:

#2cos(x)+1=0#

Subtract 1 from both sides of the equation:

#2cos(x)+1color(red)(-1)=0color(red)(-1)#

#2cos(x)=-1#

Divide both sides of the equation by 2:

#2/color(red)(2)cos(x)=-1/color(red)(2)#

#cos(x)=-1/2#

Use the inverse cosine function on both sides:

#color(red)(cos^-1)(cos(x))=color(red)(cos^-1)(-1/2)#

#x=cos^-1(-1/2)#

Within the domain #0<=x<2pi# the above equation is true for 2 values of x:

#x = 2/3pi and x = 4/3pi#

To represent all of the possible solutions, we add integer multiples of #2pi# to both answers:

#x = 2/3pi+ 2npi and x = 4/3pi + 2npi, n in ZZ#