26 Math Review Part 2 Inches to Feet & Areas

Slides:

Advertisements

Similar presentations

Working with Shapes in Two Dimensions

Advertisements

Employability in Agricultural/Horticultural Industry.

Volume is the amount of space inside a three-dimensional (3-D) shape

Architecture From Math to Building Design. Scale Scale is a Ratio Scale is a Ratio A ratio compares one thing to another A ratio compares one thing to.

Calculating board Feet linear feet square feet

Exponents By Monica Yuskaitis. Location of Exponent An An exponent is a little number high and to the right of a regular or base number. 3 4 Base Exponent.

Ventilation 1 - Program Basic Math & Problem Solving

Test Review Pay attention. What is the difference between area and perimeter? PERIMETER- – Distance AROUND the edge of a figure – Measures in regular.

Formulas for Perimeter and Area

Find the slope of the line through each pair of points.

Constrution Mathematics Review

Calculating the area of a TRIGLE AN.

Rectangle The area of a rectangle is by multiplying length and height. The perimeter of a rectangle is the distance around the outside of the rectangle.

Ms. Cuervo CAHSEE Prep AREA. Area 7MG 2.1 Students will find the area of rectangles, squares, trapezoids, parallelograms, triangles and circles. Vocabulary:

The area of a rectangle equals its length times the width (base times the height). A = length x width = lw or A = base x height = bh Area of a Rectangle.

Chapter 10 Test Formula Review.  Find the circumference of a circle with a diameter of 10. Identify the formula needed for the following questions.

Review of Long Division 6.4 – Dividing Polynomials Long Division.

Areas and Perimeter of Rectangles, Square, Triangles and Circles

The circumference of the circle is 50  feet. The area of the shaded region = ________ example 1 :

Agriculture Mechanics I.  Square measure is a system for measuring area. The area of an object is the amount of surface contained within defined limits.

Lesson 18 Surface Area & Volume Volume of Cylinders.

Objective Calculate the amount of materials needed for a construction project.

Definition: Rectangle A rectangle is a quadrilateral with four right angles.

Worktext p. 181 Worktext p ___ units × ___ units = ___ square units 1 6 units

Perimeter and Area January 24, Perimeter Example 1Find the Perimeter a. a square with a side length of 10 inches10 in. P = 4sPerimeter formula =

Exponents. Location of Exponent An An exponent is a little number high and to the right of a regular or base number. 3 4 Base Exponent.

EXAMPLE 1 Finding Area and Perimeter of a Triangle Find the area and perimeter of the triangle. A = bh 1 2 P = a + b + c = (14) (12) 1 2 =

Unit 3 - Study Guide. Questions 1 & 2 The Pythagorean Theorem states that the square of the length of the hypotenuse is equal to the sum of the squares.

Toddrick’s Shape Scrapbook By:Toddrick Newton. The perimeter, P, of a rectangle is given by the formula P = 2(l + w) where l is the length width of the.

 © 2004 Refrigeration Training Services - R1 Subject 4 Basic Math & Measurement v1.2 1 Measurements Inches Feet Yard Basic Math & Measurement.

Vocab Area/Perimete r Surface AreaVolume Finding Missing Values

Perimeter, Circumference and Area. Perimeter and Circumference Perimeter : The distance around a geometric figure. Circumference: The distance around.

Find the Area of a Square Example 1 Find the area of the square. SOLUTION Use the formula for the area of a square and substitute 9 for s. A = s 2 Formula.

Math Review Basics Using Multiplication and Division.

Geometry – Triangles and Trapezoids.  All Triangles are related to rectangles or parallelograms : Each rectangle or parallelogram is made up of two triangles!

14.0 Math Review 14.2 Inches to Feet & Areas. Division 80 ÷ 5 = 16 Also written as:

15.0 Math Review 14.5 Using Basic Formulas. Converting Units Converting 6 inches of Mercury into Inches of Water Inches of Mercury are multiplied by 13.6.

Day 1 Part 1 Technician’s Guide & Workbook for Home Evaluation and Performance Improvement.

Opening Activity 1. What is the area of a rectangle with a length of 5 inches and a width of 12 inches? (Remember: A=lw) A=lw A=(5)(12) 2. What is the.

Area & Perimeter Scrapbook

Area of Composite Shapes

Measurement Warm-up Stringing Lights Powerpoint Squaring a Circle

GEOMETRY REVIEW.

16.0 Math Review 14.6 Working With TAB Equations

R1 Fundamentals of Refrigeration

Perimeter Area and Circumference

Pop Quiz Surface Area of a Rectangular Prism SA=2LW + 2WH + 2LH

Dividing by a number is the inverse of multiplying by that number

Exponents By Monica Yuskaitis.

R1 Fundamentals of Refrigeration

Fractions and Decimals

Chapter 1 Section 1.7 Area and Perimeter.

Chapter 1 Section 1.7 Area and Perimeter.

Geometry Jeopardy.

Knowledge of quantities / calculating areas

Part 3 Module 6 Units of Measure in Geometry

Exponents By Monica Yuskaitis.

Calculating the Area of a Right Triangle

1-5 Geometric Formulas Polygons

Volumes of Prisms and Cylinders

Area of Triangles and Trapezoids

Jeopardy Final Jeopardy Perimeter Area Volume $100 $100 $100 $100 $100

By- Sabrina,Julianna, and Killian

Finding the area of fractional side lengths

Describe the shape resulting from the cross section.

Math Review #2 Jeopardy Expressions and Equations

Presentation transcript:

26 Math Review Part 2 Inches to Feet & Areas

Division 80 ÷ 5 = 16 Also written as: 5 80 1 6 5 3 30

Multiplication and Division 6 x 5 x 4 = 120 4 x 6 x 5 = 120 10 ÷ 5 x 4 = ? 10 ÷ (5 x 4) = 1/2 (10 ÷ 5) x 4 = 8 (10 x 4) ÷ 5 = 8

Multiplication and Division 0.56 x 0.35 = ? 0.56 x 0.35 = .196 0.56 ÷ 0.35= ? 0.56 ÷ 0.35 = 1.6 0.56 x 0.007 = .00392 0.56 ÷ 0.007 = 80 0.007 ÷ 0.56 = 0.0125

Multiplication and Division What is 6 feet 3 inches in feet? 1 foot = 12 inches 3 inches = 3 ÷ 12 = 0.25 feet 6 + 0.25 = 6.25 feet

Area Calculations For Squares and rectangles the area (A) is equal to length (L) x width (W) or A = L x W Width Length

Area Calculations A = L x W Square L = W = 3 3 x 3 = 9 Square Something Width = 3 Length = 3

Area Calculations For Squares and rectangles the area (A) is equal to length (L) x width (W) or A = L x W Width = 6 feet 3 inches Length = 3 feet

Area Calculations For Squares and rectangles the area (A) is equal to length (L) x width (W) or A = L x W Width = 6 feet 3 inches = 6 + (3 ÷ 12) = 6.25 feet Length = 3 feet A = L x W = 3 x 6.25 = 18.75 square feet

Area of a Triangle For any triangle with a right angle the area is the length multiplied by the width (of the two legs meeting at the right angle) divided by 2.

Area of a Right Triangle For any triangle with a right angle the area is the length multiplied by the width (of the two legs meeting at the right angle) divided by 2.

Area of a Right Triangle For any triangle with a right angle the area is the length multiplied by the height of the two legs where the right triangle is divided by 2. 90o 90o 90o 90o 90o = right angle

Area of a Triangle For any triangle with a right angle the area is the length multiplied by the height of the two legs where the right triangle is divided by 2. 90o 90o Length 90o 90o Width

Area of a Triangle A = hb X b ÷ 2

Area of a Triangle A = hb X b ÷ 2 hb 90o 90o

Area of a Triangle A = hb X b ÷ 2 hb 90o 90o b

Area of a Triangle A = hb X b ÷ 2 = hb= 6’ 90o 90o b = 14’ A = 6 X 16 ÷ 2 = 48 Sq. Ft.

Area of a Triangle Calculate the wall area for the following drawing: 3.66 ft 8.0 ft 18.75 ft

Area of a Triangle Calculate the wall area for the following drawing: 3.66 ft 8.0 ft X 18.75 ft = 150 ft2 8.0 ft 18.75 ft

Area of a Triangle Calculate the wall area for the following drawing: 3.66 ft hb b 18.75 ft 8.0 ft 3.66 ft X 18.75 ft ÷ 2 = 34.3 ft2

Area of a Triangle Calculate the wall area for the following drawing: 3.66 ft 34.3 ft2 8.0 ft 150 ft2 18.75 ft

Area of a Triangle Calculate the wall area for the following drawing: 3.66 ft 34.3 ft2 8.0 ft 150 ft2 150 ft2 + 34.3 ft2 = 184.3 ft2 18.75 ft

Area of a Circle A = 3.14 x R x R Radius = R Diameter = 2 x R

Area of a Circle A = 3.14 x R x R Radius = ½ R = 4 inches Diameter = 8 inches A = 3.14 x 4 x 4 A = 50.24 square inches

Area of a Circle A = 3.14 x R x R Radius = ½ R = 4 inches Diameter = 8 inches A = 3.14 x 4 x 4 A = 50.24 square inches

Area of a Circle A in square inches = A in square feet 12 x 12 = 144 50.24 ÷ 144 = ? A = 50.24 square inches 0.3488888888888…

Measuring Areas in Cubic Feet

Step 1 Finding the Area/Volume in Cubic Feet Calculate the wall area for the following drawing: 3.66 ft 34.3 ft2 8.0 ft 150 ft2 150 ft2 + 34.3 ft2 = 184.3 ft2 18.75 ft

Step 2 Find the Length 184.3 ft2

Step 2 Find the Length 184.3 ft2 40.3 ft

Step 3 Multiply Area X Length 184.3 ft2 X 40.3 ft = 7,427.29 ft3 40.3 ft

Converting Units Converting 6 inches of Mercury into Inches of Water Inches of Mercury are multiplied by 13.6 to get inches of water 6” of Mercury = 13.6 x 6 = 81.6 inches of water Note: 81.6” ÷ 12” = feet of water = 6.8’

Converting Units Convert 82 Inches of Water to Inches of Mercury Inches of water are multiplied by 0.0735 to get Inches of Mercury 82” x 0.0735 = 6.027” of Mercury

Converting Units LPS x 0.472 = CFM CFM x 2.12 = LPS HP x 0.746 = Kilowatts 1Watt = 3.412 Btu/h Ft of H2O x 0.433 = psi psi x 2.31 = Ft of H2O [F0 – 32] x 5/9 = C0 [C0 x 9/5] + 32 = F0 h = Ppsia ÷ 0.433 Ppsia = psi + 14.7 Tons of Refrigeration = HP x 4.716 Tons of Refrigeration = BTU/minute x 200 Note: HP x 4.716 = Btu/minute x 200

Converting Units Square inches are divided by 144 to get square feet 72 in2 = ? Ft2 72 ÷ 144 = 0.5 Ft2 Note: Ft2 x 144 = in2

Using Equations 3 600 3 x 200 = = 2 400 2 x 200 2 400 = 3 600

Using Equations Fan Law CFMnew RPMnew = CFMold RPMold CFMold RPMold = CFMnew RPMnew

Using Equations = x = x x = 3 600 2 400 3 600 400 400 2 400 3 400 600

Using Equations Fan Law CFMnew RPMnew = CFMold RPMold CFMnew x = RPMold RPMnew CFMold