Facilities Planning, 4th Edition James A

Slides:

Advertisements

Similar presentations

What is the most specific name for the quadrilateral?

Advertisements

Fig. 4-1, p Fig. 4-2, p. 109 Fig. 4-3, p. 110.

Chapter 6 Quadrilaterals.

HW #17 pg. 194 #5-7, 15-17, 21, 26, 29.  Theorem 3.8  If two lines intersect to form two congruent angles that are a linear pair, then the lines must.

P.464. Table 13-1, p.465 Fig. 13-1, p.466 Fig. 13-2, p.467.

Fig. 11-1, p p. 360 Fig. 11-2, p. 361 Fig. 11-3, p. 361.

Table 6-1, p Fig. 6-1, p. 162 p. 163 Fig. 6-2, p. 164.

Quadrilaterals Project

Honors Geometry Section 4.5 (3) Trapezoids and Kites.

CP Geometry Mr. Gallo. What is a Trapezoid Trapezoid Isosceles Trapezoid leg Base Base Angles leg Base Angles If a quadrilateral is a trapezoid, _________________.

Trapezoids and Kites Chapter 6 Section 6 Tr.

6-6 Trapezoids and Kites.

Trapezoids and Kites Section 8.5.

1 MADE BY NORBERT GAUCI Class AREA OF A PARALLELOGRAM Its opposite sides are parallel. Opposite sides and opposite angles are equal. Its diagonals.

Quadrilateral Proofs.

CHAPTER 23 Quadrilaterals. Special Quadrilaterals 1. Square a) All sides are the same length b) All angles are the same size (90°) c) Its diagonals bisect.

Activity In your group, you will be given a card. You will be using a Bubble Map to describe the shape. In the middle of the Bubble Map, please draw the.

Rectangle Proofs A rectangle is a parallelogram with four right angles and congruent diagonals.

Flow System, Activity Relations and Space Requirement

Geometry Mr. Zampetti Unit 3, Day 4

Properties of Quadrilaterals

© T Madas Show me a shape with…. © T Madas Show me a shape with… 4 equal sides.

5.11 Use Properties of Trapezoids and Kites. Vocabulary  Trapezoid – a quadrilateral with exactly one pair of parallel sides. Base Base Angle Leg.

Geometry Section 6.5 Trapezoids and Kites. A trapezoid is a quadrilateral with exactly one pair of opposite sides parallel. The sides that are parallel.

6-6 Trapezoids and Kites Objective: To verify and use properties of trapezoids and kites.

Quadrilaterals. Rectangles Grade PreK and not-in-school definition: Right angles and 2 long and 2 shorter sides Grade 3 and up school definition: Quadrilateral.

5.2 Proving Quadrilaterals are Parallelograms Definition of Parallelogram: Both pairs of opposite sides are parallel.

Ways of proving a quadrilaterals are parallelograms Section 5-2.

Ch 8 test Things I would know. How to name consecutive angles/vertices/sides Or Non consecutive angles/vertices/sides.

Parallelograms have Properties Click to view What is a parallelogram? A parallelogram is a quadrilateral with both pairs of opposite sides parallel.

Rhombus 1.Both pairs of opposite sides are parallel 2. Both pairs of opposite sides are congruent 3. Both pairs of opposite angles are congruent 4. Consecutive.

Geometry 6-4 Properties of Rhombuses, Rectangles, and Squares.

Special parallelograms. PropertyParallelogramRhombusRectangleSquare All sides congruent XX Opposite sides congruent XXXX Opposite sides parallel XXXX.

Quadrilaterals ParallelogramsRectangleRhombusTrapezoids Isosceles Trapezoid Squares Orange Book Page 14: Do you know the tree?

Properties of Quadrilaterals

True False Each vertex is not the endpoint of exactly two sides.

Warm up. Let’s grade your homework QUIZ Quadrilaterals Day 4 Kite Trapezoid Trapezium.

RHOMBUS PRACTICE PROBLEMS GEO153 RHOMBUS 2 pair parallel sides ALL sides equal opposite angles equal diagonals are perpendicular.

BELL RINGER (THINK, PAIR, SHARE) 1. List as many properties as you can about the sides, angles, and diagonals of a square and a rectangle.

A D B C Definition: Opposite Sides are parallel.

8.5 – Use Properties of Trapezoids and Kites. Trapezoid: Consecutive interior angles are supplementary A B C D m  A + m  D = 180° m  B + m  C = 180°

5.3.1 Use Angle Bisectors of Triangles Chapter 5: Relationships within Triangles SWBAT: Define and use Angle Bisector Theorem. Define incenter You will.

Special Quadrilaterals. KITE  Exactly 2 distinct pairs of adjacent congruent sides  Diagonals are perpendicular  Angles a are congruent.

5.4 Quadrilaterals Objectives: Review the properties of quadrilaterals.

Chapter 8 Geometry Part 1. 1.Introduction 2.Classifying Angles 3.Angle Relationships 4.Classifying Triangles 5.Calculating Missing Angles Day…..

Text Illustrations in PPT Chapter 11. Source Coding and Error Correction Techniques Principles of Communications, 6th Edition Rodger E. Ziemer William.

Sections  A parallelogram must have:  Both pair of opposite sides congruent  Both pair of opposite angles congruent  Consecutive angles that.

6.5 Trapezoids and kites Base angles Isosceles trapezoids Midsegments.

8.5 Trapezoids. Parts of a Trapezoid Parts The bases of a trapezoid are the parallel sides The legs of the trapezoid connect the bases The base angles.

SQUARE Opposite sides are parallel All the angles are 90º PARALLELOGRAM Opposite sides are equal in length Opposite sides are parallel RECTANGLE Opposite.

Parallelograms have Properties

Chapter 6 Inequalities in Geometry page 202

Angle Relationships Lesson 1.5.

SQUARE All sides equal Opposite sides parallel All angles are right

Chapter 5 -- Quadrilaterals

Auxiliary Drawings (Text Chapter 11)

Polygons with four sides

4.2: The Parallelogram and the Kite Theorems on Parallelograms

Angle Relationships.

Trapezoid Special Notes!

Parallelogram Rectangle Rhombus Square Trapezoid Kite

A Parade of Four-Sided Polygons

4.2: The Parallelogram and the Kite Theorems on Parallelograms

Facilities Planning and Design Course code:

Data Mining, Second Edition, Copyright © 2006 Elsevier Inc.

Text Illustrations in PPT Chapter 4. Phase and Frequency Modulation

Facilities Planning, 4th Edition James A

Base angles Isosceles trapezoids Midsegments

Quadrilaterals Properties Quadrilaterals Properties

Presentation transcript:

Text Illustrations in PPT Chapter 3- Flow Systems, Activity Relationships and Space Requirements Facilities Planning, 4th Edition James A. Tompkins, Tompkins Associates, Inc. ISBN: 978-0-470-44404-7

fig_03_01 Logistics system. FLOW SYSTEMS fig_03_01 Logistics system.

fig_03_02 Materials management system.

fig_03_03 Material flow system.

fig_03_04 Physical distribution system

to-front. (d ) Circular. (e) Odd-angle. MATERIAL FLOW SYSTEMS A- Flow within Workstations B- Flow within Departments fig_03_05 Flow within product departments. (a) End-to-end. (b) Back-to-back. (c) Front- to-front. (d ) Circular. (e) Odd-angle.

fig_03_06 Flow within process departments. (a) Parallel fig_03_06 Flow within process departments. (a) Parallel. (b) Perpendicular. (c) Diagonal.

fig_03_07 The line flow pattern. Flow within Product and Process Departments with Material Handling Considerations fig_03_07 The line flow pattern.

fig_03_08The spine flow pattern.

fig_03_09 The loop flow pattern.

fig_03_10 The tree flow pattern.

C- Flow between Departments fig_03_11 Flow within a department considering the locations of input/output points. (a) At the same location. (b) On adjacent sides. (c) On the same side. (d ) On opposite sides.

fig_03_17 Flow planning hierarchy.

(b) Interrupted flow paths. fig_03_18 The impact of interruptions on flow paths. (a) Uninterrupted flow paths. (b) Interrupted flow paths.

fig_03_19 Illustration of how backtracking impacts the length of flow paths.

fig_03_20 Illustration of how backtracking impacts the length of flow paths.

fig_03_21 Volume-variety layout classification DEPARTMENTAL PLANNING fig_03_21 Volume-variety layout classification

table_03_01

fig_03_22

fig_03_23

fig_03_24

fig_03_25

fig_03_26

fig_03_27

fig_03_28

fig_03_29

fig_03_30

fig_03_31

fig_03_32

fig_03_33

fig_03_34

fig_03_35

fig_03_36

fig_03_37

fig_03_38

fig_03_39

fig_03_40

fig_03_41

fig_03_42

fig_03_43

fig_03_44

fig_03_45

fig_03_46

prob_03_01

prob_03_02

prob_03_03

prob_03_04

prob_03_05

prob_03_06

prob_03_07

prob_03_08

prob_03_09

prob_03_10

prob_03_11

prob_03_12

table_03_02

table_03_02a

table_03_03

table_03_04

table_03_05

tableun_03_01