Section 2.1 Imperial Length Measurements
(I) Reading Fractions Goals
Reading Fractions
Reading Halves on a Measuring Tape
Reading Quarters on a Measuring Tape
Reading Eights on a Measuring Tape
Reading Tape Measurements
Answer:________
Answer:________
(II) Reading Halves on a Measuring Tape
(III) Reading Quarters on a Measuring Tape
Answer:________ Answer:________
Answer:________
(IV) Reading Eights on a Measuring Tape
Answer:________ Answer:________
Answer:________
(V) Reading Tape Lengths
Ans:________
Ans:________
Ans:________
Ans:________
Practice Problems:
State the imperial length for each diagram below.
1.
2.
3.
4.
5.
6.
7.
Ans:________
Ans:________
Ans:________
Ans:________
Ans:________
Use the tape below to determine the indicated length.
Note: The smallest measurement (in Red) is in the ______________ position.
Ans:________
Ans:________
Ans:________
Practice Problems:
State the imperial length for each diagram below.
1.
2.
3.
4.
5.
P.62 – P.63 #5 and #6
Reading Imperial Tape Measurements
State the indicated tape lengths.
(I) Quarter Measurements
1. Tape measurement = _________
2. Tape Measurement = _________
(II) Eighth Measurements
3. Tape measurement = _________
4. Tape Measurement = _________
5. Tape Measurement = _________
6. Tape Measurement = _________
(III) Sixteenth Measurements
7. Tape Measurement = _________
8. Tape Measurement = _________
9. Tape Measurement = _________
(IV) Mixture of Measurements
10. Tape Measurement = _________
11. Tape Measurement = _________
12. Tape Measurement = _________
13. Tape Measurement = ___________
Reading Imperial Tape Measurements
1. Tape measurement = _________
2. Tape Measurement = _________
3. Tape measurement = _________
4. Tape Measurement = _________
5. Tape Measurement = _________
6. Tape Measurement = _________
7. Tape Measurement = ___________
8. Tape Measurement = _______
9. Tape Measurement = _________
10. Tape Measurement = _________
11. Tape Measurement = ___________
Estimating Length Using References
Review Reading an actual imperial measurement
1.
2.
Goals
Review Reading Imperial Tape Measurement
What is a Referent ?
Using References to Estimate Length in Imperial Measurements
Ans:________
Ans:________
Ans:________
3.
Using referents for imperial units
Unit Referent
Inch (in.) Thumb Length Foot (ft.) Foot Length Yard (yd.) Arm span Mile (mi.) Distance walked in
20 minutes
Note: The distance between the tip of the thumb to the knuckle is approximately 1 inch. This is called a referent measurement.
The thumb length, foot length, and arm span are referents.
Each referent is an approximate measure for an imperial unit.
Classroom Activity – Using References to Approximate Length
Item Referent Estimated
Measurement
Actual Measurement
Desk Width of hand ≈ 4“
Example 1 Estimating Lengths Using Imperial Units
Describe how you would estimate the width (across) your desk.
Solution
The most appropriate imperial unit is the inch.
Use the width of your hand as a referent. It is about 4 in. across.
Line up one hand with one edge of the desk.
Count how many times you place your hands, one next to the other, to go from one edge of the desk to the other.
Multiply the number of hands by 4, to get the approximate width of the desk in inches.
Use a tape to determine the actual measurement.
Using Referents to Estimate Length
(i) Get in groups (3 to 4) where you will have items to measure using the referent measurement indicated to determine an estimated length.
(ii) Use the measuring device (ruler or tape) to determine the actual length of that
item.
Item 1 Length of Pencil
Determine how many thumb lengths to measure from one end of the pencil to the other to attain an estimated measure then use the ruler or tape to determine the actual measure.
Item 2 Length of course textbook
Determine how many hand widths to measure from one end of the cover to the other end of the cover along the longest edge. Then use the ruler or tape to determine the actual measure.
Item Referent Estimated
Measurement
Actual Measurement
Pencil Thumb (Tip to first joint) ≈ 1“
Item Referent Estimated
Measurement
Actual Measurement
Textbook Width of hand ≈ 4“
Item 3 Length of a floor tile
Use the length of your foot to determine the length of one floor tile to attain an estimated measure then use the ruler or tape to determine the actual measure.
Item 4 Width of the classroom
Hold a piece of string from your nose to the longest finger of an outstretched arm. Have your partner cut the string to this length.
Use this string to estimate then record the width of the classroom, in arm spans to calculate the estimated measurement. Then use the tape to determine the actual measure.
Item Referent Estimated
Measurement
Actual Measurement
Floor Tile Foot (Back of heel to toe) ≈ 1 foot
Item Referent Estimated
Measurement
Actual Measurement
Width of Classroom
Arm span ≈ 3 ft.
QUESTION: Why is it necessary to have standardized measurements for length instead of using referents as a means to measuring?
______________________________________________________________
______________________________________________________________
Converting Imperial Units
(I) Converting Inches to Feet
1 ft. = 12 in.
Goals
Converting Inches to Feet
Converting Feet to Inches
Adding Feet and Inches
Converting Miles to Yards
(II) Converting Feet to Inches
(III) Adding Feet and Inches
1 ft. = 12 in.
(IV) Converting Miles to Yards
1 mi. = 1760 yds
P.68 - 69 #3, #4, #6, #7
Practice Sheet for Imperial Measurement
1. Express each of the following in feet and inches:
(a) 9″ + 13″ (b) 4′ 5″ + 3′ 3″
(c) 6′ 5″ + 8′ 11″ (d) (2′ 7″) x 3
(e) 1′ 11″ + 6″
Reading SI (Metric) Measurements
SI units Abbreviation Relationship between units
millimeter mm
centimetre cm 1 cm = 10 mm
metre m 1 m = 100 cm
kilometre km 1 km = 1000 m
(I) Reading Metric Measurement
Remember: On each ruler (or tape) 1 cm = 10 mm Goals
Reading Metric Measurement
Determining length in SI units
Converting between SI units for length
(II) Determining Length in SI Units
Ex. State the length of each line in millimeters and centimeters.
(a)
(b)
___mm ___cm
___mm ___cm
___mm ___cm
(c)
(III) Converting Between SI Units for Length
Example: Determine the width of the door in the indicated SI unit.
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Width of Door
Determine the measurement of each item in the indicated SI unit.
1. Your desk
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Width of Desk
2. Your Height
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Height
3. Width of the classroom
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Width of Room
4. Height of the Classroom Door
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Height of
Door
5. Width of the Textbook
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Width of
Textbook
6. Inside Width of One Window Pane
Item SI Measurement (mm)
SI Measurement (cm)
SI Measurement (m) Window Pane
Relating SI and Imperial Units
(I) Reading SI (metric) units
The smallest metric measurement on the ruler below is the _____________.
How many divisions make up 1 cm? Answer:_______________
Examples: For each ruler determine the length of the line based on the unit indicated.
(a)
Goals
Reading SI units
Converting SI units to Imperial units
___mm ___cm
___mm ___cm
(b)
When we use metric measurements for determining length it is based on increments of 10
SI units Abbreviation Relationship between units
millimeter mm
centimetre cm 1 cm = 10 mm
metre m 1 m = 100 cm
kilometre km 1 km = 1000 m
(II) Comparing Imperial Units to SI Units & SI Units to Imperial Units
Example: (i) Determine the height of the door in the indicated SI unit.
(ii) Use the conversion table to determine the measurement in imperial units.
(iii) Measure the object in imperial units.
Item SI Measurement (m)
Converted Imperial Measurement
(nearest ft.)
Recorded Imperial Measurement
(ft & in.) Height of Door
1 in = 25.4 mm
1 in = 2.54 cm
1 ft = 0.3048 m
1 yd = 0.9144 m
1 mi = 1.6093 km
Comparing SI Units to Imperial Units
(i) Determine the measurement of the identified item in SI units.
(ii) Use the conversion table to determine the measurement in imperial units.
(iii) Measure the item in imperial units.
Item SI Measurement (m)
Converted Imperial Measurement
(nearest ft.)
Recorded Imperial Measurement
(ft. & in.) Width of
Smartboard Length of Room
Comparing Imperial Units to SI Units
(i) Determine the measurement of the identified item in Imperial units.
(ii) Use the conversion table to determine the measurement in SI units.
(iii) Measure the item in SI units.
Item Imperial
Measurement (ft. & in.)
Converted SI Measurement
(m)
Recorded SI Measurement
(m) Your Height
1 in = 25.4 mm
1 in = 2.54 cm
1 ft = 0.3048 m
1 yd = 0.9144 m
1 mi = 1.6093 km
Converting SI and Imperial Measurement
(I) Converting SI Measurement to Imperial Measurement
Ex. Convert to the imperial measurement indicated.
(a) 42 cm to inches
(b) 50 km/h to mph
(c) 100 m to yards
(d) 6 km to miles Goals
Converting SI measurement to Imperial measurement
Converting Imperial measurement to SI measurement
1 in = 25.4 mm
1 in = 2.54 cm
1 ft = 0.3048 m
1 yd = 0.9144 m
1 mi = 1.6093 km
(II) Converting Imperial Measurement to SI Measurement
Ex. Convert to the SI measurement indicated.
(a) 18 inches to cm
(b) 45 mph to km/h
(c) 20 yd. to meters
(d) 202 miles to km
1 in = 25.4 mm
1 in = 2.54 cm
1 ft = 0.3048 m
1 yd = 0.9144 m
1 mi = 1.6093 km
P.90 #1d, f #2c, e #4d, e #5 #6a #7 #8a, b
Practice Sheet:
Converting SI and Imperial Measurement
1. Convert each length to centimetres. Round to the nearest tenth.
a) 9 inches b) 11 inches
2. Convert each SI length to the closest inch.
a) 5 cm b) 35 cm
4. Convert each to the nearest centimetre.
a) 5 feet b) 7 feet
5. Convert each SI distance to miles. Round each answer to the nearest 0.1 of a unit.
a) 5 km b) 15 km
1 in = 25.4 mm
1 in = 2.54 cm
1 ft = 0.3048 m
1 yd = 0.9144 m
1 mi = 1.6093 km
6. Convert each imperial distance to SI units. Round each answer to the nearest tenth of a unit.
a) 5 mi b) 300 mi
7. A conservation officer is measuring the length of young salmon, or fry.
The average length is 2.54 in. What is this length in centimetres?
8. Brian’s driver’s licence lists his height as 181 cm. How tall is Brian in feet and inches?
9. Melissa is making blinds for her windows. In order to raise the blinds, she needs 80 yards of string. How many metres of string are needed?
1 in = 25.4 mm
1 in = 2.54 cm
1 ft = 0.3048 m
1 yd = 0.9144 m
1 mi = 1.6093 km
Section 2.4 Working With Length
Applications of Measured Length (I) Perimeter
When carpenters are building homes (as in the floor plan below) they have to install trim such as baseboard within each room. How do they determine how much baseboard to order before installing?
Goals
Solving problems that involve length, perimeter or circumference of a circle
ANSWER:
______________________________________________________________
______________________________________________________________
Example: Calculate the perimeter of each rectangle.
(a) (b) length = 7 in. and width =
(II) Shipping Packages by Courier
A courier sometimes has to measure packages to determine shipping charges.
Review: Some shapes are circular and the distance around a circle is known as the _______________
Formula is C = _____ or C = _____
Example: Determine the circumference for each circle to the nearest hundredth of a unit.
(a) (b)
10 cm
4 cm
76 cm
18 in.
Example: To ship with Canada Post the
length + girth (distance around an object) must be less than 3 m.
Example: Determine the length + girth measurement for each package below.
(a) (b)
5 cm
91 cm
P.98 – P.99 #1, #2a, b #6 #7 #8 #9 #10
Section 2.4 Working With Length
continued
(I) Application of Midpoint
A midpoint is a number half way between 2 numbers.
Example: Determine the number that represents the midpoint between
(a) 0 and 10 (b) 1 and 8
Example: Determine the midpoint distance (or half) of the given measurements:
(a) 28″ (b) (c)
Goals
Application problems that involve length
and midpoint
Example: Hanging Pictures
You purchase a picture that will be hung in the center of a wall that is 1200 inches wide. There are 2 hooks on the back of the picture that are 24 inches apart.
(a) Where is the midpoint of the wall?
(b) How far to the left and right of the midpoint will you have to insert nails into the wall?
Example: Landscaping
You are going to build a semicircular flowerbed that will have a diameter of 9 feet along the front foundation from the corner of the house to the main entrance which measures 15 feet.
(a) Determine the midpoint of the foundation.
(b) How far from the corner of the foundation will the flowerbed start?
