The sum of angles in any triangle is 180°. This uses known theorems and logic to show a specific result.

Vertical angles are the pairs of opposite angles formed when two lines intersect; they are congruent.

Every point (x,y)(x,y)(x,y) goes to (x−3, y+2)(x-3, y+2)(x−3,y+2).

By SSS , the triangles are congruent. So corresponding sides correspond to corresponding angles exactly.

17cm

Yes, an example of this would be numbers 2, 4, 6, 8, 10 → inductive guess: next is 12 (pattern: add 2). Induction uses observed examples to form a conjecture, but it’s not certain. You must later prove it if you want certainty.

If A, B, and C are collinear with B between A and C, then AC = AB + BC = 6 + 4 = 10 cm.

90-degree rotation about the origin

Sum of interior angles = 180°. ∠C = 180° − (60° + 70°) = 180° − 130° = 50°.

1) 2 pairs of // sides    2) both opposite sides ≅ 

3) both opposite <≅    4) 1 pair of sides // & ≅ 

5) Diagonals bisect     

6) One < is supp. to both consecutive angles

Logic rules hold when used correctly. In geometry, proven theorems from true premises show true conclusions. A correctly deduced statement remains true.

Two lines intersect at point O, forming angles ∠1, ∠2, ∠3, ∠4 in order. 

Suppose ∠1 and ∠3 are vertical.∠1 and ∠2 are a linear pair, so ∠1 + ∠2 = 180°. 

Also, ∠2 and ∠3 are a linear pair, so ∠2 + ∠3 = 180°. Subtract the equal expressions: (∠1 + ∠2) − (∠2 + ∠3) = 180° − 180° ⇒ ∠1 − ∠3 = 0 ⇒ ∠1 = ∠3.

Therefore, vertical angles are congruent. □

180-degree rotation about the origin

Side AB between ∠A and ∠B equals DE between ∠D and ∠E, so by the ASA the triangles are congruent: △ABC≅△DEF.

Let rectangle ABCD with right angles at each corner. Diagonals are AC and BD. Consider triangles △ABC and △CDA.

Using SAS on triangles △ABC and △CDA, we deduce △ABC≅△CDA. Corresponding parts give AC = BD. Diagonals are congruent.

• AB=CD

• BC=DABC = DABC=DA

• ∠B=∠D=90