How do you find the solution to #5sin^2theta+2sintheta=0# if #0<=theta<2pi#?

1 Answer
Alan P.
Jan 9, 2017

#theta in {0,2.730,3.146,5.872}# (to 3 decimal places)

Explanation:

Given
#color(white)("XXX")5sin^2(theta)+2sin(theta)=0#

Factoring
#color(white)("XXX")sin(theta) * (5sin(theta)+2)=0#

#rArr# (for #theta in (-pi/2,pi/2)#)
#color(white)("XXX"){:(sin(theta)=0,color(white)("XX"),5sin(theta)+2=0), (rarr theta=0,,rarr sin(theta)=-2/5), (,,theta=-0.411516846 "( using calculator)") :}#

Since #sin(theta)=sin(theta+kpi), k in ZZ#
for the specified domain, #theta in [0,2pi)#
#color(white)("XXX"){: (theta= 0 or pi," or ",theta=pi-0.411516846 or 2pi-411516846), (,,theta=2.7300758075 or 5.8716684611) :}#

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