Question
Let S be the circle in the xy-plane defined by the equation .
Let P be a point on the circle S with both coordinates beinw positive. Let the tangent to S and P intersect the coordinate axes at the points M and N. Then, the mid-point of the line segment MN mues lie on the curve.
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Find the area of the triangle formed by the positive x-axis and the normal and the tangent to the circle at .Question Text | Let S be the circle in the xy-plane defined by the equation . Let P be a point on the circle S with both coordinates beinw positive. Let the tangent to S and P intersect the coordinate axes at the points M and N. Then, the mid-point of the line segment MN mues lie on the curve. |