Matemática Elementar

Problema 1

Prove that the sum of the interior angles of any triangle is $180°$ .

Hint: Draw a line through one vertex parallel to the opposite side and use properties of parallel lines cut by a transversal.

Problemas

1. Prove that the sum of the interior angles of any triangle is $180°$ .

Hint: Draw a line through one vertex parallel to the opposite side and use properties of parallel lines cut by a transversal.

2. In isosceles triangle $ABC$ , $\overline{AB} \cong \overline{AC}$ . Point $M$ is the midpoint of $\overline{BC}$ . Prove that $\angle B \cong \angle C$ .

Hint: Draw segment $\overline{AM}$ and use the SSS congruence criterion.

3. In $\triangle PQR$ , $\angle P = 47°$ and $\angle Q = 65°$ . In $\triangle XYZ$ , $\angle X = 47°$ and $\angle Y = 65°$ . Side $PQ = 10 \text{ cm}$ and side $XY = 15 \text{ cm}$ .

(a) Are the two triangles similar? Justify using a similarity criterion.

(b) If $QR = 8 \text{ cm}$ , find $YZ$ .

4. In the figure, $\overline{DE}$ is the midsegment of $\triangle ABC$ , connecting the midpoints $D$ of $\overline{AB}$ and $E$ of $\overline{AC}$ . The vertices are $A(0, 6)$ , $B(0, 0)$ , and $C(8, 0)$ .

(a) Find the coordinates of $D$ and $E$ .

(b) Show that $DE = \frac{1}{2} \cdot BC$ and $\overline{DE} \parallel \overline{BC}$ .

5. In right triangle $\triangle ABC$ with $\angle B = 90°$ , the altitude $\overline{BD}$ is drawn to the hypotenuse $\overline{AC}$ , creating two smaller right triangles $\triangle ABD$ and $\triangle CBD$ that share leg $\overline{BD}$ . Given $AD = 4$ and $DC = 9$ , find $BD$ .

Then prove, in general, that if $\overline{BD}$ is the altitude to the hypotenuse of right triangle $\triangle ABC$ (right angle at $B$ ), then $BD^2 = AD \cdot DC$ .

Gabarito — Triangle Proofs

1. Given: $\triangle ABC$ with interior angles $\angle A$ , $\angle B$ , $\angle C$ .

To prove: $\angle A + \angle B + \angle C = 180°$ .

Proof:

Through vertex $A$ , draw line $\ell$ parallel to $\overline{BC}$ .
$\overline{AB}$ is a transversal cutting parallel lines $\ell$ and $\overleftrightarrow{BC}$ . By the Alternate Interior Angles Theorem, the angle on the left side of $A$ along $\ell$ equals $\angle B$ . Call this angle $\angle 1$ , so $\angle 1 = \angle B$ .
$\overline{AC}$ is a transversal cutting the same parallel lines. By the Alternate Interior Angles Theorem, the angle on the right side of $A$ along $\ell$ equals $\angle C$ . Call this angle $\angle 2$ , so $\angle 2 = \angle C$ .
Angles $\angle 1$ , $\angle A$ , and $\angle 2$ together form a straight angle along line $\ell$ at point $A$ . Therefore:

$\angle 1 + \angle A + \angle 2 = 180°$

Substituting from steps 2 and 3:

$\angle B + \angle A + \angle C = 180°$

$\blacksquare$

2. Given: $\triangle ABC$ with $AB = AC$ . $M$ is the midpoint of $\overline{BC}$ .

To prove: $\angle B \cong \angle C$ .

Proof:

Draw segment $\overline{AM}$ .
In $\triangle ABM$ and $\triangle ACM$ :
- $AB = AC$ (given),
- $BM = CM$ ( $M$ is the midpoint of $\overline{BC}$ ),
- $AM = AM$ (reflexive property — shared side).
By the SSS (Side-Side-Side) congruence criterion, $\triangle ABM \cong \triangle ACM$ .
Since corresponding parts of congruent triangles are congruent (CPCTC), $\angle B \cong \angle C$ .

$\blacksquare$

3. (a) First find the third angles:

$\angle R = 180° - 47° - 65° = 68°$ $\angle Z = 180° - 47° - 65° = 68°$

All three pairs of corresponding angles are equal: $\angle P = \angle X = 47°$ , $\angle Q = \angle Y = 65°$ , $\angle R = \angle Z = 68°$ .

By the AA (Angle-Angle) Similarity Postulate, $\triangle PQR \sim \triangle XYZ$ .

(b) Since the triangles are similar, corresponding sides are proportional. Sides $PQ$ and $XY$ are corresponding (opposite the equal angles $\angle R$ and $\angle Z$ ):

$\frac{PQ}{XY} = \frac{QR}{YZ}$

$\frac{10}{15} = \frac{8}{YZ}$

$YZ = \frac{8 \times 15}{10} = 12 \text{ cm}$

4. (a) $D$ is the midpoint of $\overline{AB}$ :

$D = \left(\frac{0+0}{2},\; \frac{6+0}{2}\right) = (0, 3)$

$E$ is the midpoint of $\overline{AC}$ :

$E = \left(\frac{0+8}{2},\; \frac{6+0}{2}\right) = (4, 3)$

(b) Compute $DE$ :

$DE = \sqrt{(4-0)^2 + (3-3)^2} = \sqrt{16} = 4$

Compute $BC$ :

$BC = \sqrt{(8-0)^2 + (0-0)^2} = \sqrt{64} = 8$

Therefore $DE = 4 = \frac{1}{2} \cdot 8 = \frac{1}{2} \cdot BC$ . $\checkmark$

For parallelism: $D(0,3)$ and $E(4,3)$ have the same $y$ -coordinate, so $\overline{DE}$ is horizontal (slope $= 0$ ). $B(0,0)$ and $C(8,0)$ also have the same $y$ -coordinate, so $\overline{BC}$ is horizontal (slope $= 0$ ).

Since both segments have slope $0$ , $\overline{DE} \parallel \overline{BC}$ . $\checkmark$

This confirms the Triangle Midsegment Theorem: the segment connecting the midpoints of two sides of a triangle is parallel to the third side and half its length.

5. Finding $BD$ :

In right triangle $\triangle ABC$ with right angle at $B$ and altitude $\overline{BD}$ to hypotenuse $\overline{AC}$ , the altitude creates two smaller triangles. By the geometric mean relation:

$BD^2 = AD \cdot DC = 4 \times 9 = 36$

$BD = 6$

Proof of $BD^2 = AD \cdot DC$ in general:

Given: $\triangle ABC$ with $\angle B = 90°$ . $D$ is the foot of the altitude from $B$ to $\overline{AC}$ , so $\overline{BD} \perp \overline{AC}$ .

To prove: $BD^2 = AD \cdot DC$ .

In $\triangle ABD$ : $\angle ADB = 90°$ (since $BD \perp AC$ ) and $\angle A = \angle A$ (shared angle).
In $\triangle ABC$ : $\angle ABC = 90°$ (given) and $\angle A = \angle A$ .
Therefore $\triangle ABD \sim \triangle ACB$ by AA similarity ( $\angle A = \angle A$ and $\angle ADB = \angle ABC = 90°$ , so $D \leftrightarrow B$ and $B \leftrightarrow C$ ).
Similarly, in $\triangle CBD$ : $\angle BDC = 90°$ and $\angle C = \angle C$ .
In $\triangle ABC$ : $\angle ABC = 90°$ and $\angle C = \angle C$ .
Therefore $\triangle CBD \sim \triangle CAB$ by AA similarity ( $\angle C = \angle C$ and $\angle BDC = \angle ABC = 90°$ , so $D \leftrightarrow A$ and $B \leftrightarrow B$ ).
Since $\triangle ABD \sim \triangle ACB$ and $\triangle CBD \sim \triangle CAB$ , by transitivity $\triangle ABD \sim \triangle BCD$ (correspondence: $A \leftrightarrow B$ , $B \leftrightarrow C$ , $D \leftrightarrow D$ ).
From $\triangle ABD \sim \triangle BCD$ , corresponding sides are proportional. Match the sides opposite the equal angles:

$\frac{AD}{BD} = \frac{BD}{DC}$

Cross-multiplying:

$BD^2 = AD \cdot DC$

$\blacksquare$