How do you solve #sin^2A=cosA-1#?

1 Answer
Alan P.
Dec 3, 2016

#A=k * 2pi, k in ZZ#

Explanation:

Based on the Pythagorean Theorem we know
#color(white)("XXX")sin^2(A)+cos^2(A)=1#
or, more applicable in this case:
#color(white)("XXX")sin^2(A)=1-cos^2(A)#

Therefore the given
#color(white)("XXX")sin^2(A)=cos(A)-1#
can be written as
#color(white)("XXX")1-cos^2(A)=cos(A)-1#

Rearranging into standard quadratic form:
#color(white)("XXX")cos^2(A)+cos(A)-2=0#
then factoring:
#color(white)("XXX")(cos(A)+2)(cos(A)-1)=0#
giving:
#{:("either",cos(A)=-2," or",cos(A)=1), (,"impossible since "cos in[-1,+1],,rarrA=0+k*2pi"," k in ZZ) :}#

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