How do you find the exact value of sin67.5 degrees?

2 Answers
Jim H
Jul 2, 2015

We could use the half-angle identity:
sin(1/2x)= +- sqrt((1-cosx)/2)

Explanation:

67.5^2 = 1/2(135^@) (Multiply 67.5 xx 2.)

The formula doesn't tell us whether sin 67.5^@ is positive or negative, but, since it is an acute angle we know that the sine is positive. (Be careful of the difference between "sign" and "sine").

We also need cos135^@. (That is the special angle that is 45^@ in Quadrant II.)

cos135^@ = -sqrt2/2.

Now use the formula ans simplify:

sin 67.5^@ = sin(1/2(135^@)) = sqrt((1-cos135^@)/2)

= sqrt((1-(-sqrt2/2))/2) = sqrt((1+sqrt2/2)/2)

= sqrt ((2+sqrt2)/4) = sqrt (2+sqrt2)/2

sin 67.5^@ = sqrt (2+sqrt2)/2

Nghi N.
Jul 3, 2015

Find sin 67.5

Explanation:

Call sin 67.5 = sin x

cos 2x = cos 135 = - (sqrt2)/2 = 1 - 2sin^2 x

2sin^2 x = 1 + (sqrt2)/2 = (2 + sqrt2)/2

sin^2 x = (2 + sqrt2)/4

sin x = sin 67.5 = (sqrt(2 + sqrt2))/2

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