Question 1084769: Given that  find all possible coordinates for point P(x,y) in the unit circle
Found 2 solutions by josmiceli, Edwin McCravy:
Answer by josmiceli(19441)   (Show Source):
Answer by Edwin McCravy(20064)  (Show Source):
You can put this solution on YOUR website!
Here's a different approach for finding the two points P(x,y)
Since  , draw a right triangle whose
opposite side is the numerator of 3/5, which is 3, and whose adjacent
side is the denominator of 3/5, which is 5. Then θ will be the
angle with opposite side 3 and adjacent side 5:
Calculate the hypotenuse by the Pythagorean theorem:
We place the triangle on a graph so that the vertex is at the origin,
and draw a circle with center at the origin. But this circle is not
the unit circle.
The unit circle has radius 1, but the above circle has radius √34, so we
divide everything by √34, to make the circle become the unit circle,
so we have the first value of P(x,y):
Also, since tangent is positive in QIII, we can also reflect everything
across the origin, and the angle is increased by 180°, and get another
point P(x,y).
Edwin
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