Problems

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Found: 2
  • We call two figures congruent if their corresponding sides and angles are equal. Let \(ABD\) an \(A'B'D'\) be two right-angled triangles with right angle \(D\). Then if \(AD=A'D'\) and \(AB=A'B'\) then the triangles \(ABD\) and \(A'B'D'\) are congruent.

  • It follows from the previous statement that if two lines \(AB\) and \(CD\) are parallel than angles \(BCD\) and \(CBA\) are equal.

We prove the other two assertions from the description:

  • The sum of all internal angles of a triangle is also \(180^{\circ}\).

  • In an isosceles triangle (which has two sides of equal lengths), two angles touching the third side are equal.