First of all, x/2 will be in the second quadrant, since x is in the fourth quadrant. The sine of x/2 will therefore be positive.
Use the formula for sin (x/2) in terms of cos x.
sin(x/2) = sqrt([1-cos(x)]/2) = sqrt (1/6) = sqrt6/6
You got the right answer, but you it ssmes to have been a lucky guess.
Cos x is NOT always positive, but it is in this case.
Find the exact value of sinx/2 if cosx = 2/3 and 270 < x < 360.
A)1/3
B)-1/3
C)sqrt 6/6
D)-sqrt 6/6
C, since I KNOW cosx is always positive but I don't know the work involved. I know the half angle formula
4 answers
Thank you. It wasn't really a guess it was either C or D and then I just knew it was positive so that just leaves C.
Jon,
Perhaps it would help if you drew an x-y axis system with a unit radius vector in each of the four quadrants.
then in quadrant 1
sin T = y/1 so +
cos T = x/1 so -
tan T = y/x so +
then in quadrant 2
sin T = y/1 so +
cos T = x/1 so - because x is - in q 2
tan T = y/x so -
then in quadrant 3
sin T = y/1 so -
cos T = x/1 so -
tan T = y/x so + because top and bottom both -
then in quadrant 4
sin T = y/1 so -
cos T = x/1 so +
tan T = y/x so -
sin has same sign as its inverse csc
cos has same sign as its inverse sec
tan has same sign as its inverse ctan
Perhaps it would help if you drew an x-y axis system with a unit radius vector in each of the four quadrants.
then in quadrant 1
sin T = y/1 so +
cos T = x/1 so -
tan T = y/x so +
then in quadrant 2
sin T = y/1 so +
cos T = x/1 so - because x is - in q 2
tan T = y/x so -
then in quadrant 3
sin T = y/1 so -
cos T = x/1 so -
tan T = y/x so + because top and bottom both -
then in quadrant 4
sin T = y/1 so -
cos T = x/1 so +
tan T = y/x so -
sin has same sign as its inverse csc
cos has same sign as its inverse sec
tan has same sign as its inverse ctan
then in quadrant 1
sin T = y/1 so +
cos T = x/1 so +
tan T = y/x so +
sin T = y/1 so +
cos T = x/1 so +
tan T = y/x so +
1 answer