How do you evaluate sin (arccos.5 + arcsin .6)?

2 Answers
Nghi N.
Aug 15, 2015

Evaluate sin [arccos 0.5 + arcsin 0.6]

Ans: 0,99

Explanation:

Using calculator:
cos x = 0.5 --> arc x = 60 deg
sin x = 0.6 --> arc x = 36.87 deg
sin (60 + 36.87) = sin 96.87 = 0.99

Jim H
Aug 15, 2015

sin(arccos 0.5 + arcsin 0.6) = 0.3 + 0.8sqrt0.75

Explanation:

If we want to do this without a calculator or trig tables, use the following:

arccos 0.5 is some alpha in [0, pi] with cos alpha = 0.5.
We will need sin alpha so we note that with alpha in [0, pi], we have sin alpha is positive.

Therefore sin alpha = sqrt(1-cos^2 alpha) = sqrt 0.75

By similar reasoning, arcsin 0.6 is some beta in [-pi/2, pi/2] with sin beta = 0.6 and cos beta = sqrt(1-0.36) = sqrt (0.64) = 0.8

We have been asked to find sin(alpha + beta).

Use

sin(alpha + beta) = sin alpha cos beta + cos alpha sin beta and the values above to get:

sin(alpha + beta) = (sqrt0.75)(0.8)+(0.5)(0.6)

= 0.3 + 0.8sqrt0.75

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