let cos(A)= 1/5^(1/2) with A in Q 4. find tan(2A)
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The 1/2 power is the same as the square root, so
_
cos(A) = 1/Ö5
The formula for tan(2A) is
2·tan(A)
tan(2A) = -------------
1 - tan²(A)
sin(A)
so we need tan(A). We know that tan(A) = --------
cos(A)
and we have cos(A), so we need to get sin(A).
We know that sin²(A) = 1 - cos²(A), so substituting
_
1/Ö5 for cos(A),
_
sin²(A) = 1 - (1/Ö5)² = 1 - 1/5 = 4/5
Taking square roots:
_____ _
sin(A) = ±Ö(4/5) = ± 2/Ö5
Since we know that A is in Q 4, and since the
sine is negative in the 4th quadrant,
we must take the negative sign, so
_
sin(A) = -2/Ö5 _
sin(A) -2/Ö5
So tan(A) = -------- = --------
cos(A) 1/Ö5
_
Multiply top and bottom by Ö5 and you get:
tan(A) = -2
Now we plug that in:
2·tan(A) 2(-2) -4 -4 4
tan(2A) = ------------- = ----------- = ------- = ----- = ---
1 - tan²(A) 1 - (-2)² 1 - 4 -3 3
Edwin
