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Solution 4.3:9

From Förberedande kurs i matematik 1

Revision as of 11:31, 30 September 2008 by Ian (Talk | contribs)

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Using the formula for double angles on sin 160 gives

sin160=2cos80sin80

On the right-hand side, we see that the factor cos80 has appeared, and if we use the formula for double angles on the second factor ( sin80 ),

2cos80sin80=2cos802cos40sin40

we obtain a further factor cos40. A final application of the formula for double angles on sin40 gives us all three cosine factors:

2cos802cos40sin40=2cos802cos402cos20sin20

We have thus succeeded in showing that

sin160=8cos80cos40cos20sin20

which can also be written as

cos80cos40cos20=sin1608sin20

If we draw the unit circle, we see that 160 makes an angle of 20 with the negative x -axis, and therefore the angles 20 and 160 have the same y -coordinate in the unit circle, i.e.

sin20=sin160.

This shows that

cos80cos40cos20=sin1608sin20=81

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Solution 4.3:9

From Förberedande kurs i matematik 1