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Section 5.4: Four Sided Polygons

Section 5.4: Four Sided Polygons. By Joe Lenahan. Polygons. Polygons- closed plane figure made up of several line segments that are joined together. The sides do not cross each other. Exactly two sides meet at every vertex. These are examples of polygons. Polygons. J. L. O. E. C.

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Section 5.4: Four Sided Polygons

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  1. Section 5.4: Four Sided Polygons By Joe Lenahan

  2. Polygons Polygons- closed plane figure made up of several line segments that are joined together. The sides do not cross each other. Exactly two sides meet at every vertex. These are examples of polygons

  3. Polygons J L O E C JOEL is not a polygon because a polygon consists entirely of segments P R PRICY is not a polygon. In a polygon, consecutive sides intersect only at endpoints. Nonconsecutive sides do not intersect I Y

  4. Naming Polygons You name polygons by starting at any vertex and then proceeding either clockwise or counter clockwise D A B C If you start at A, the polygon would be called either ABCD or ADCB

  5. Convex Polygon Convex polygon- Every interior angle is less than 180o These are all convex polygons

  6. Convex Polygons O L P M N LMNOP is not convex because P is greater then 180. LMNOP is a concave figure which is a figure in which at least one interior angle is more than 180

  7. Diagonals of Polygons Diagonal- any segment that connects two nonconsecutive vertices of a polygon A H B G C F D E In polygon ABCDEFGH, CH and AF are diagonals

  8. Quadrilaterals Quadrilateral Quadrilateral- four sided polygon Special Quadrilaterals Rhombus -a parallelogram in which at least two consecutive sides are congruent Parallelogram - quadrilateral in which both pairs of opposite sides are parallel and congruent Rectangle - a parallelogram in which at least one angle is right Square - a parallelogram that is both a rhombus and a square

  9. More Special Quadrilaterals Kite- a quadrilateral in which two disjoint pairs of consecutive sides are congruent Trapezoid - a quadrilateral only have one pair of parallel sides, the bases Isosceles Trapezoid - a trapezoid in which the non-parallel sides are congruent

  10. Sample Problems Is this a polygon? The answer is no because a circle doesn’t have any sides or vertices L Starting at point F, what would the name of this polygon be? F N FLXN or FNXL X

  11. More Sample Problems Give the most descriptive names for the following shapes:  congruent congruent The most descriptive name is rectangle The most descriptive name is parallelogram

  12. Practice Problems x3 D 1) A x4 2x-1 B C 3xy Find x and y if ABCD is a rectangle.

  13. Practice Problems Continued 2) • Always, Sometimes, Never • A trapezoid is a parallelogram • A square is a rhombus • A polygon is a parallelogram • An isosceles trapezoid is a polygon • A square is an isosceles trapezoid • A parallelogram is a rectangle

  14. Practice Problems Cont’ Name this polygon, stating at point Z and two diagonals 3) P O I X Z F W Y

  15. Answers • 1) y=7, x=5 • 2) N,A,S,A,N,S • 3) ZYWFXPOI or ZIOPXFXY, and YP and IX

  16. For Your Enjoyment Just A Boring Square

  17. Bibliography • "Polygon Properties." Math.Com: the World of Math Online. 2005. Math.Com. 30 May 2008 <http://www.math.com/tables/geometry/polygons.htm>. • Rhoad, Richard, George Milauskas, and Robert Whipple. Geometry for Enjoyment and Challenge. Evanston, Illinois: McDougal Littell, 1991.

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