Problems

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Find the locus of the points \(X\) such that the tangents drawn from \(X\) to a given circle have a given length.

The point \(A\) is fixed on a circle. Find the locus of the point \(X\) which divides the chords that end at point \(A\) in a \(1:2\) ratio, starting from the point \(A\).

Let \(O\) be the center of the rectangle \(ABCD\). Find the geometric points of \(M\) for which \(AM \geq OM, BM \geq OM\), \(CM \geq OM\), and \(DM \geq OM\).

Construct the triangle \(ABC\) along the side \(a\), the height \(h_a\) and the angle \(A\).

Construct a straight line passing through a given point and tangent to a given circle.

Three segments whose lengths are equal to \(a, b\) and \(c\) are given. Construct a segment of length: a) \(ab/c\); b) \(\sqrt {ab}\).

Construct a triangle with the side \(c\), median to side \(a\), \(m_a\), and median to side \(b\), \(m_b\).