Geometry

3-D Objects - Edges, faces and vertices in cuboids
3-D Objects - Edges, faces and vertices in cylinders

By the end of the lesson, the learner should be able to:

model cuboids using local materials
count faces, edges, and vertices in cuboids
appreciate cuboids in packaging

Learners use locally available materials to model cuboids
Learners count faces, edges, and vertices in open and closed cuboids
Learners share findings with other groups

How do we use containers in daily life?

MENTOR Mathematics Learner's Book Grade 6, page 203
Locally available materials
Cuboid models
Paper
MENTOR Mathematics Learner's Book Grade 6, page 204
Cylinder models

Oral questions Written exercise Group work

Geometry
Measurements

3-D Objects - Plane figures in 3-D objects
Pythagorean Relationship - Sides of a right-angled triangle

By the end of the lesson, the learner should be able to:

identify nets of 3-D objects
recognize plane figures in 3-D objects
appreciate the relationship between 2-D and 3-D shapes

Learners study nets of cubes, cuboids, and cylinders
Learners identify squares, rectangles, and circles in nets
Learners describe plane figures found in 3-D objects

How do we use containers in daily life?

MENTOR Mathematics Learner's Book Grade 6, page 205
Nets of 3-D objects
Cut-outs of rectangles, squares, and circles
- Smart Minds Mathematics Learner's Book pg. 89
- Ladders
- Right-angled triangle models

Oral questions Written exercise Project work

Measurements

Pythagorean Relationship - Establishing the relationship
Pythagorean Relationship - Finding unknown sides

By the end of the lesson, the learner should be able to:
- State the Pythagorean relationship
- Verify Pythagorean relationship by counting squares
- Appreciate the relationship between sides of a right-angled triangle

In groups, learners are guided to:
- Trace and draw right-angled triangle with sides 3 cm, 4 cm and 5 cm
- Draw squares on each side and divide into 1 cm squares
- Count squares and compare: squares on height + squares on base = squares on hypotenuse

What is the Pythagorean relationship?

- Smart Minds Mathematics Learner's Book pg. 91
- Square grids
- Rulers and pencils
- Smart Minds Mathematics Learner's Book pg. 92
- Calculators
- Triangle diagrams

- Written assignments - Class activities - Oral questions

Measurements

Pythagorean Relationship - Real life applications

By the end of the lesson, the learner should be able to:
- Identify real life situations involving Pythagorean relationship
- Solve real life problems using Pythagorean relationship
- Value the application of Pythagorean relationship in daily life

In groups, learners are guided to:
- Solve puzzle finding missing sides marked with letters
- Calculate length of ladder inclined on wall
- Use IT devices to explore applications in construction and surveying

Where do we apply Pythagorean relationship in daily life?

- Smart Minds Mathematics Learner's Book pg. 93
- Puzzles
- Digital devices

- Written assignments - Class activities - Oral questions

Measurements

Length - Converting units of length
Length - Addition involving length

By the end of the lesson, the learner should be able to:
- Identify units of length (cm, dm, m, Dm, Hm)
- Convert units of length from one form to another
- Show interest in converting units of length

In groups, learners are guided to:
- Study Washika going up stairs labelled cm, dm, m, Dm, Hm
- Note that each step is 10 times the previous
- Generate conversion tables: 1 Hm = 10 Dm = 100 m = 1000 dm = 10000 cm

Why do we convert units of length?

- Smart Minds Mathematics Learner's Book pg. 94
- Conversion charts
- Metre rulers
- Smart Minds Mathematics Learner's Book pg. 96
- Maps
- Number cards

- Oral questions - Written exercises - Observation

Measurements

Length - Subtraction involving length
Length - Multiplication involving length

By the end of the lesson, the learner should be able to:
- Describe the process of subtracting lengths
- Subtract lengths involving Hm, Dm, m, dm and cm
- Show confidence in subtracting lengths

In groups, learners are guided to:
- Make cards with subtraction problems
- Regroup where necessary (borrow from higher unit)
- Solve problems comparing distances covered by Joan and John

How do we subtract lengths with different units?

- Smart Minds Mathematics Learner's Book pg. 98
- Number cards
- Charts
- Smart Minds Mathematics Learner's Book pg. 99
- Word problems
- Calculators

- Written exercises - Oral questions - Observation

Measurements

Length - Division involving length

By the end of the lesson, the learner should be able to:
- Describe the process of dividing lengths
- Divide lengths involving Hm, Dm, m, dm and cm
- Show interest in division of lengths

In groups, learners are guided to:
- Read story of relay race team of 4 members covering 6 Hm 5 Dm 6 m
- Divide each unit starting from highest, convert remainders
- Solve problems about road sections tarmacked by workers

How do we divide lengths by whole numbers?

- Smart Minds Mathematics Learner's Book pg. 100
- Word problems
- Charts

- Written exercises - Oral questions - Observation

Measurements

Length - Perimeter and circumference of circles
Area - Square metres, acres and hectares

By the end of the lesson, the learner should be able to:
- Define perimeter and circumference
- Calculate perimeter of plane figures and circumference of circles
- Appreciate the use of perimeter and circumference in real life

In groups, learners are guided to:
- Measure distance around chalkboard, door and window
- Measure circumference and diameter of circular objects
- Establish relationship: Circumference ÷ Diameter = π (3.14 or 22/7)

How do we find the circumference of a circle?

- Smart Minds Mathematics Learner's Book pg. 101
- Circular objects
- Tape measures
- Smart Minds Mathematics Learner's Book pg. 106
- Metre rulers

- Written assignments - Class activities - Oral questions

Measurements

Area - Area of a rectangle
Area - Area of a parallelogram

By the end of the lesson, the learner should be able to:
- State the formula for area of a rectangle
- Calculate area of rectangles
- Appreciate the use of area in real life

In groups, learners are guided to:
- Trace and cut out rectangles
- Find area by multiplying length and width
- Complete tables with length, width and area of rectangles

How do we find the area of a rectangle?

- Smart Minds Mathematics Learner's Book pg. 108
- Rectangular cut-outs
- Grid papers
- Smart Minds Mathematics Learner's Book pg. 110
- Paper cut-outs
- Scissors

- Written assignments - Class activities - Oral questions

Measurements

Area - Area of a rhombus
Area - Area of a trapezium

By the end of the lesson, the learner should be able to:
- Derive the formula for area of a rhombus
- Calculate area of rhombuses
- Value accuracy in calculating area

In groups, learners are guided to:
- Cut out square WXYZ and mark point K on line WX
- Cut triangle WKZ and paste on line XY to form rhombus
- Discover: Area = Base length × Perpendicular height

How do we find the area of a rhombus?

- Smart Minds Mathematics Learner's Book pg. 112
- Square cut-outs
- Scissors
- Smart Minds Mathematics Learner's Book pg. 114
- Paper cut-outs
- Rulers

- Written assignments - Class activities - Oral questions

Measurements

Area - Area of circles

By the end of the lesson, the learner should be able to:
- Derive the formula for area of a circle
- Calculate area of circles using πr²
- Show interest in finding area of circles

In groups, learners are guided to:
- Draw circle with radius 7 cm and divide into 16 sectors
- Cut and rearrange sectors to form rectangle
- Discover: Length = πr, Width = r, Area = πr²

How do we find the area of a circle?

- Smart Minds Mathematics Learner's Book pg. 116
- Pair of compasses
- Manila paper

- Written assignments - Class activities - Oral questions

Measurements

Area - Area of borders
Area - Area of combined shapes

By the end of the lesson, the learner should be able to:
- Define the area of a border
- Calculate area of borders (shaded regions)
- Value accuracy in calculating area of borders

In groups, learners are guided to:
- Read story of Mary putting picture in frame
- Calculate: Area of border = Area of larger shape - Area of smaller shape
- Solve problems about picture frames, carpets and swimming pools

How do we find the area of a border?

- Smart Minds Mathematics Learner's Book pg. 119
- Picture frames
- Diagrams
- Smart Minds Mathematics Learner's Book pg. 121
- Combined shape diagrams
- Calculators

- Written exercises - Oral questions - Observation

Measurements

Volume and Capacity - The cubic metre (m³)
Volume and Capacity - Converting m³ to cm³

By the end of the lesson, the learner should be able to:
- Identify the cubic metre as a unit of measuring volume
- Make a model of a 1 metre cube
- Show interest in measuring volume

In groups, learners are guided to:
- Use metre rule, long sticks and strings to measure and cut 12 sticks of 1 m each
- Join sticks using strings to form a 1 metre cube
- Observe safety when using panga to cut sticks

What is a cubic metre?

- Smart Minds Mathematics Learner's Book pg. 122
- Metre rule
- Long sticks, strings
- Smart Minds Mathematics Learner's Book pg. 123
- 1 metre cube model
- Calculators

- Oral questions - Practical activities - Observation

Measurements

Volume and Capacity - Converting cm³ to m³
Volume and Capacity - Volume of cubes

By the end of the lesson, the learner should be able to:
- Explain conversion of cm³ to m³
- Convert cubic centimetres to cubic metres
- Show confidence in converting units of volume

In groups, learners are guided to:
- Make number cards with volumes in cm³ (2,000,000 cm³, 7,000,000 cm³)
- Convert to m³ by dividing by 1,000,000
- Solve problems about oil tankers and water tanks

How do we convert cubic centimetres to cubic metres?

- Smart Minds Mathematics Learner's Book pg. 124
- Number cards
- Calculators
- Smart Minds Mathematics Learner's Book pg. 125
- Clay, plasticine
- Manila paper

- Written exercises - Oral questions - Observation

Measurements

Volume and Capacity - Volume of cuboids

By the end of the lesson, the learner should be able to:
- State the formula for volume of a cuboid
- Calculate volume of cuboids
- Appreciate the use of volume in real life

In groups, learners are guided to:
- Draw cuboid and shade one face (cross-sectional area)
- Establish: Volume = Length × Width × Height
- Model cuboids using locally available materials

How do we find the volume of a cuboid?

- Smart Minds Mathematics Learner's Book pg. 126
- Clay, cartons
- Rulers

- Written exercises - Oral questions - Observation

Measurements

Volume and Capacity - Volume of cylinders
Volume and Capacity - Relating volume to capacity

By the end of the lesson, the learner should be able to:
- State the formula for volume of a cylinder
- Calculate volume of cylinders using πr²h
- Show interest in finding volume of cylinders

In groups, learners are guided to:
- Arrange pile of similar coins to form cylinder
- Measure diameter and height
- Establish: Volume = πr² × height

How do we find the volume of a cylinder?

- Smart Minds Mathematics Learner's Book pg. 128
- Coins, cylindrical objects
- Rulers
- Smart Minds Mathematics Learner's Book pg. 130
- Containers, basin
- Measuring cylinder

- Written assignments - Class activities - Oral questions

Measurements

Volume and Capacity - Application of volume and capacity
Time, Distance and Speed - Units of measuring time

By the end of the lesson, the learner should be able to:
- Calculate capacity of containers in litres
- Solve problems involving volume and capacity
- Appreciate the application of volume and capacity in daily life

In groups, learners are guided to:
- Collect containers of different shapes
- Find volume and convert to capacity in litres
- Solve problems about tanks, tins and pipes

Where do we use volume and capacity in daily life?

- Smart Minds Mathematics Learner's Book pg. 132
- Various containers
- Digital devices
- Smart Minds Mathematics Learner's Book pg. 134
- Clock faces
- Stopwatches

- Written assignments - Class activities - Oral questions

Measurements

Time, Distance and Speed - Converting hours and minutes

By the end of the lesson, the learner should be able to:
- State the relationship between hours and minutes
- Convert hours to minutes and minutes to hours
- Appreciate the use of time conversions

In groups, learners are guided to:
- Make clock face using paper cut-out
- Move minute hand clockwise to complete one turn (60 minutes)
- Establish: 1 hour = 60 minutes

How do we convert hours to minutes?

- Smart Minds Mathematics Learner's Book pg. 136
- Paper clock faces
- Stopwatches

- Written assignments - Class activities - Oral questions

Measurements

Time, Distance and Speed - Converting minutes and seconds
Time, Distance and Speed - Converting hours and seconds

By the end of the lesson, the learner should be able to:
- State the relationship between minutes and seconds
- Convert minutes to seconds and seconds to minutes
- Show confidence in converting time units

In groups, learners are guided to:
- Use stopwatch to observe seconds in different minutes
- Establish: 1 minute = 60 seconds
- Solve problems about water pumps, walking distances

How do we convert minutes to seconds?

- Smart Minds Mathematics Learner's Book pg. 138
- Stopwatches
- Number cards
- Smart Minds Mathematics Learner's Book pg. 140
- Calculators
- Conversion charts

- Written exercises - Oral questions - Observation

Measurements

Time, Distance and Speed - Converting units of distance
Time, Distance and Speed - Speed in km/h

By the end of the lesson, the learner should be able to:
- State the relationship between kilometres and metres
- Convert kilometres to metres and metres to kilometres
- Appreciate the use of distance conversions

In groups, learners are guided to:
- Estimate distances to nearby places in kilometres
- Convert estimated distances to metres
- Establish: 1 km = 1,000 m

How do we convert kilometres to metres?

- Smart Minds Mathematics Learner's Book pg. 142
- Maps
- Measuring tapes
- Smart Minds Mathematics Learner's Book pg. 144
- Athletics field
- Stopwatches

- Written exercises - Oral questions - Observation

Measurements

Time, Distance and Speed - Speed in m/s
Time, Distance and Speed - Converting km/h to m/s and vice versa

By the end of the lesson, the learner should be able to:
- Calculate speed in metres per second
- Solve problems involving speed in m/s
- Value the application of speed in real life

In groups, learners are guided to:
- Mark 100 m distance in the field
- Run 100 m race and record time using stopwatch
- Calculate speed in m/s

What is speed in metres per second?

- Smart Minds Mathematics Learner's Book pg. 145
- Measuring tape
- Stopwatches
- Smart Minds Mathematics Learner's Book pg. 146
- Conversion charts
- Digital devices

- Written exercises - Oral questions - Observation

Measurements

Temperature - Temperature in our environment

By the end of the lesson, the learner should be able to:
- Define temperature as degree of hotness or coldness
- Describe temperature conditions as warm, hot or cold
- Show interest in learning about temperature

In groups, learners are guided to:
- Take walk outside classroom and observe temperature
- Discuss temperature conditions as warm, hot or cold
- Record temperature changes at different times of day

What is temperature?

- Smart Minds Mathematics Learner's Book pg. 149
- Thermometers
- Charts

- Oral questions - Written exercises - Observation

Measurements

Temperature - Comparing temperature
Temperature - Units of measuring temperature

By the end of the lesson, the learner should be able to:
- Compare temperature of different objects
- Use warmer, colder, hotter to compare temperature
- Appreciate the importance of temperature in daily life

In groups, learners are guided to:
- Shake hands with partner and compare warmth
- Compare coldness of tap water and ice cubes
- Compare temperature of metallic and wooden objects

How do we compare temperature?

- Smart Minds Mathematics Learner's Book pg. 150
- Ice cubes
- Metallic and wooden objects
- Smart Minds Mathematics Learner's Book pg. 151
- Thermometers
- Sufuria, water

- Written assignments - Class activities - Oral questions

Measurements

Temperature - Converting °C to Kelvin
Temperature - Converting Kelvin to °C

By the end of the lesson, the learner should be able to:
- State the relationship between °C and Kelvin
- Convert temperature from degrees Celsius to Kelvin
- Value accuracy in temperature conversions

In groups, learners are guided to:
- Measure water temperature before heating and at boiling point
- Compare readings in °C and Kelvin
- Establish: Kelvin = °C + 273

How do we convert degrees Celsius to Kelvin?

- Smart Minds Mathematics Learner's Book pg. 153
- Thermometers
- Calculators
- Smart Minds Mathematics Learner's Book pg. 154
- Temperature tables

- Written assignments - Class activities - Oral questions

Measurements

Temperature - Temperature changes
Money - Profit

By the end of the lesson, the learner should be able to:
- Calculate rise or drop in temperature
- Solve problems involving temperature changes
- Show interest in temperature changes in daily life

In groups, learners are guided to:
- Record temperature at different times (8:00 a.m., 2:00 p.m.)
- Calculate temperature rise: Final temp - Initial temp
- Calculate temperature drop: Initial temp - Final temp

How do we calculate temperature changes?

- Smart Minds Mathematics Learner's Book pg. 155
- Thermometers
- Digital devices
- Smart Minds Mathematics Learner's Book pg. 157
- Classroom shop
- Paper money

- Written assignments - Class activities - Oral questions

Measurements

Money - Loss

By the end of the lesson, the learner should be able to:
- Define loss in business transactions
- Calculate loss given buying and selling prices
- Appreciate the importance of avoiding loss in business

In groups, learners are guided to:
- Compare buying price and selling price in tables
- Identify when selling price is lower than buying price
- Establish: Loss = Buying price - Selling price

What is loss in business?

- Smart Minds Mathematics Learner's Book pg. 159
- Price tables
- Charts

- Written assignments - Class activities - Oral questions

Measurements

Money - Percentage profit
Money - Percentage loss

By the end of the lesson, the learner should be able to:
- Define percentage profit
- Calculate percentage profit
- Show confidence in calculating percentage profit

In groups, learners are guided to:
- Draw tables with buying price, selling price and profit
- Work out percentage profit = (Profit ÷ Buying price) × 100%
- Solve problems about shirts, books and goods

How do we calculate percentage profit?

- Smart Minds Mathematics Learner's Book pg. 160
- Tables
- Calculators
- Smart Minds Mathematics Learner's Book pg. 162

- Written exercises - Oral questions - Observation

Measurements

Money - Discount
Money - Percentage discount

By the end of the lesson, the learner should be able to:
- Define discount as reduction from marked price
- Calculate discount given marked price and selling price
- Appreciate the benefit of discounts to buyers

In groups, learners are guided to:
- Read story of Regina bargaining for shoes in shop
- Establish: Discount = Marked price - Selling price
- Solve problems about blouses, blankets and bicycles

What is a discount?

- Smart Minds Mathematics Learner's Book pg. 164
- Price tags
- Charts
- Smart Minds Mathematics Learner's Book pg. 166
- Tables
- Calculators

- Written exercises - Oral questions - Observation

Measurements

Money - Commission and percentage commission

By the end of the lesson, the learner should be able to:
- Define commission as payment for selling goods
- Calculate commission and percentage commission
- Value the role of commission in business

In groups, learners are guided to:
- Read story of Mzee Mambo Leo's motor vehicle firm
- Study table showing Dansam's weekly commission
- Calculate: % Commission = (Commission ÷ Value of goods sold) × 100%

What is commission in business?

- Smart Minds Mathematics Learner's Book pg. 167
- Commission tables
- Calculators

- Written exercises - Oral questions - Observation

Measurements

Money - Interpreting bills
Money - Preparing bills

By the end of the lesson, the learner should be able to:
- Identify different types of bills
- Interpret components of bills (date, amount, items)
- Appreciate the importance of bills in transactions

In groups, learners are guided to:
- Look at water bills and electricity bills
- Identify components: billing date, metre number, amount payable
- Use digital devices to search for other types of bills

What are the components of a bill?

- Smart Minds Mathematics Learner's Book pg. 171
- Sample bills
- Digital devices
- Smart Minds Mathematics Learner's Book pg. 172
- Bill formats
- Paper money

- Written assignments - Class activities - Oral questions

Measurements

Money - Postal charges

By the end of the lesson, the learner should be able to:
- Identify postal services and charges
- Calculate cost of sending letters, parcels and postcards
- Appreciate postal services in communication

In groups, learners are guided to:
- Visit nearby post office to gather information
- Prepare chart showing postal charges by mass limits
- Calculate costs for different letters and parcels

How do we calculate postal charges?

- Smart Minds Mathematics Learner's Book pg. 173
- Postal charge tables
- Charts

- Written assignments - Class activities - Oral questions

Measurements

Money - Mobile money services

By the end of the lesson, the learner should be able to:
- Identify mobile money services (deposit, withdraw, transfer, save, borrow)
- Explain the importance of mobile money services
- Value the convenience of mobile money

In groups, learners are guided to:
- Read story of Mr Mamboleo using mobile money in his shop
- Identify services: pay bill, transfer, save, withdraw, borrow
- Complete word puzzle circling mobile money services

What are mobile money services?

- Smart Minds Mathematics Learner's Book pg. 178
- Word puzzles
- Charts

- Written exercises - Oral questions - Observation

Measurements

Money - Mobile money transactions

By the end of the lesson, the learner should be able to:
- Interpret mobile money transaction tables
- Calculate transfer costs, withdrawal costs and interest on loans
- Appreciate the efficiency of mobile money transactions

In groups, learners are guided to:
- Study Uwezo Mobile Money transaction tables
- Calculate costs for different transaction ranges
- Calculate interest on loans and savings from mobile lending apps

How do we calculate mobile money transaction costs?

- Smart Minds Mathematics Learner's Book pg. 179
- Transaction tables
- Calculators

- Written assignments - Class activities - Oral questions

Geometry

Angles - Angles on a straight line

By the end of the lesson, the learner should be able to:
- Identify angles formed on a straight line
- State that angles on a straight line add up to 180°
- Show interest in learning about angles

In groups, learners are guided to:
- Go outside classroom and identify angles made by objects in relation to ground
- Draw line AB and mark point P, measure angle APB using protractor
- Draw lines LP and KP and measure angles APL, LPK, KPB

What is the sum of angles on a straight line?

- Smart Minds Mathematics Learner's Book pg. 184
- Protractors
- Rulers

- Oral questions - Written exercises - Observation

Geometry

Angles - Angles at a point
Angles - Vertically opposite angles

By the end of the lesson, the learner should be able to:
- Identify angles formed at a point
- State that angles at a point add up to 360°
- Appreciate the relationship between angles at a point

In groups, learners are guided to:
- Trace and cut out diagram with angles ACB, ACD and BCD
- Use protractor to measure each angle
- Find sum of angles and establish they add up to 360°

What is the sum of angles at a point?

- Smart Minds Mathematics Learner's Book pg. 186
- Protractors
- Paper cut-outs
- Smart Minds Mathematics Learner's Book pg. 187
- Scissors

- Written assignments - Class activities - Oral questions

Geometry

Angles - Alternate angles on a transversal
Angles - Corresponding angles on a transversal

By the end of the lesson, the learner should be able to:
- Define a transversal
- Identify alternate angles on a transversal
- Value the properties of alternate angles

In groups, learners are guided to:
- Draw two parallel lines and a transversal crossing them
- Mark angles d and f, cut them out using scissors
- Place angle f on top of angle d and compare (alternate angles are equal)

What are alternate angles?

- Smart Minds Mathematics Learner's Book pg. 188
- Rulers
- Scissors
- Smart Minds Mathematics Learner's Book pg. 190
- Scissors, protractors

- Written assignments - Class activities - Oral questions

Geometry

Angles - Co-interior angles on a transversal

By the end of the lesson, the learner should be able to:
- Identify co-interior angles on a transversal
- State that co-interior angles add up to 180°
- Appreciate the relationship between co-interior angles

In groups, learners are guided to:
- Draw pair of parallel lines and a transversal
- Mark angles n and p, cut them out
- Place two angles on a straight line and observe they add up to 180°

What is the sum of co-interior angles?

- Smart Minds Mathematics Learner's Book pg. 191
- Rulers
- Scissors, protractors

- Written assignments - Class activities - Oral questions

Geometry

Angles - Angles in a parallelogram
Angles - Interior angles of triangles, rectangles, squares

By the end of the lesson, the learner should be able to:
- Identify properties of angles in a parallelogram
- State that opposite angles are equal and interior angles add up to 360°
- Show confidence in working with parallelogram angles

In groups, learners are guided to:
- Use 4 straws and string to form rectangular shape
- Push top straw sideways to form parallelogram
- Measure angles a, b, c, d and find that opposite angles are equal

What are the properties of angles in a parallelogram?

- Smart Minds Mathematics Learner's Book pg. 193
- Straws, string
- Protractors
- Smart Minds Mathematics Learner's Book pg. 195
- Protractors
- Polygon cut-outs

- Written exercises - Oral questions - Observation

Geometry

Angles - Interior angles of rhombus, parallelogram, trapezium, pentagon, hexagon

By the end of the lesson, the learner should be able to:
- Identify interior angles of various polygons
- Calculate sum of interior angles using formula (n-2) × 180°
- Appreciate the relationship between sides and interior angles

In groups, learners are guided to:
- Trace and cut out rhombus, parallelogram, trapezium
- Measure interior angles and find sums
- Sub-divide pentagon into 3 triangles, hexagon into 4 triangles

How do we calculate sum of interior angles of any polygon?

- Smart Minds Mathematics Learner's Book pg. 197
- Polygon cut-outs
- Protractors

- Written exercises - Oral questions - Observation

Geometry

Angles - Exterior angles of polygons

By the end of the lesson, the learner should be able to:
- Identify exterior angles of polygons
- State that sum of exterior angles of any polygon is 360°
- Show interest in calculating exterior angles

In groups, learners are guided to:
- Trace and cut out quadrilateral, measure exterior angles A, B, C, D
- Find sum of exterior angles (360°)
- Draw and find sum of exterior angles of pentagon, hexagon

What is the sum of exterior angles of any polygon?

- Smart Minds Mathematics Learner's Book pg. 201
- Polygon cut-outs
- Protractors

- Written assignments - Class activities - Oral questions

Geometry

Geometrical Constructions - Measuring angles
Geometrical Constructions - Bisecting angles

By the end of the lesson, the learner should be able to:
- Use a protractor to measure angles accurately
- Draw angles of given sizes
- Show interest in measuring angles

In groups, learners are guided to:
- Trace and draw figures with angles ABC, BAC, ACB, ACD
- Place protractor with centre at vertex, straight edge along one line
- Read angle measure from correct scale

How do we measure angles using a protractor?

- Smart Minds Mathematics Learner's Book pg. 207
- Protractors
- Rulers
- Smart Minds Mathematics Learner's Book pg. 208
- Pair of compasses

- Oral questions - Practical activities - Observation

Geometry

Geometrical Constructions - Constructing 90° angle
Geometrical Constructions - Constructing 45° angle

By the end of the lesson, the learner should be able to:
- Construct an angle of 90° using a pair of compasses and ruler
- Verify the constructed angle using a protractor
- Show confidence in constructing 90° angles

In groups, learners are guided to:
- Draw horizontal line, mark point A
- With compasses at A, make arcs on line at points X and Y
- With centres X and Y, draw arcs above line to intersect at T, join T to A

How do we construct an angle of 90°?

- Smart Minds Mathematics Learner's Book pg. 210
- Pair of compasses
- Rulers, protractors
- Smart Minds Mathematics Learner's Book pg. 211
- Rulers

- Practical exercises - Oral questions - Observation

Geometry

Geometrical Constructions - Constructing 60° angle
Geometrical Constructions - Constructing 30° angle

By the end of the lesson, the learner should be able to:
- Construct an angle of 60° using a pair of compasses and ruler
- Verify the constructed angle using a protractor
- Show interest in constructing angles

In groups, learners are guided to:
- Draw straight line, mark point A
- With A as centre, make arc intersecting line at Y
- With Y as centre and same radius, draw arc to intersect first at K, join K to A

How do we construct an angle of 60°?

- Smart Minds Mathematics Learner's Book pg. 213
- Pair of compasses
- Rulers, protractors
- Smart Minds Mathematics Learner's Book pg. 214
- Rulers

- Practical exercises - Oral questions - Observation

Geometry

Geometrical Constructions - Constructing 120° angle

By the end of the lesson, the learner should be able to:
- Construct an angle of 120° using a pair of compasses and ruler
- Verify the constructed angle
- Show confidence in constructing obtuse angles

In groups, learners are guided to:
- Draw straight line, mark point M
- With centre M, make arc at C, with centre C make arc at E
- With centre E and same radius, make arc at F, join E to M (angle EMB = 120°)

How do we construct an angle of 120°?

- Smart Minds Mathematics Learner's Book pg. 215
- Pair of compasses
- Rulers, protractors

- Practical exercises - Oral questions - Observation

Geometry

Geometrical Constructions - Constructing 105° and 75° angles
Geometrical Constructions - Constructing equilateral triangles

By the end of the lesson, the learner should be able to:
- Construct angles of 105° and 75°
- Combine construction of 90° and 60° to get 105°
- Value the application of angle constructions

In groups, learners are guided to:
- Draw line MN, mark point T
- Construct 90° angle (NTO = 90°), then construct 60° on other side (angle KTO = 60°)
- Bisect angle KTO to get 30°, thus angle PTN = 90° + 15° = 105°

How do we construct an angle of 105°?

- Smart Minds Mathematics Learner's Book pg. 216
- Pair of compasses
- Rulers
- Smart Minds Mathematics Learner's Book pg. 218

- Written assignments - Practical activities - Oral questions

Geometry

Geometrical Constructions - Constructing isosceles triangles

By the end of the lesson, the learner should be able to:
- Construct isosceles triangles given side measurements
- Verify that two sides and two angles are equal
- Show confidence in constructing triangles

In groups, learners are guided to:
- Draw straight line, mark point M, mark point N 5 cm away
- With M as centre and radius 7 cm, draw arc above line
- With N as centre and radius 5 cm, draw arc to intersect at P, join points

How do we construct an isosceles triangle?

- Smart Minds Mathematics Learner's Book pg. 219
- Pair of compasses
- Rulers

- Written assignments - Practical activities - Oral questions

Geometry

Geometrical Constructions - Constructing scalene triangles

By the end of the lesson, the learner should be able to:
- Construct scalene triangles given three side measurements
- Verify that all sides and angles are different
- Value accuracy in triangle constructions

In groups, learners are guided to:
- Draw straight line, mark point A, mark point B 6 cm away
- With A as centre and radius 5 cm, draw arc
- With B as centre and radius 8 cm, draw arc to intersect at C, join points

How do we construct a scalene triangle?

- Smart Minds Mathematics Learner's Book pg. 220
- Pair of compasses
- Rulers

- Practical exercises - Oral questions - Observation

Geometry

Geometrical Constructions - Constructing circles

By the end of the lesson, the learner should be able to:
- Construct circles given radius or diameter
- Measure and verify the dimensions of constructed circles
- Appreciate the application of geometrical constructions in real life

In groups, learners are guided to:
- Use pair of compasses to draw circles with different diameters
- Measure diameter of circles drawn
- Calculate radius from diameter (radius = diameter ÷ 2)

How do we construct circles with given measurements?

- Smart Minds Mathematics Learner's Book pg. 221
- Pair of compasses
- Rulers

- Written assignments - Practical activities - Oral questions

Data Handling and Probability

Data Handling - Meaning of data and data collection

By the end of the lesson, the learner should be able to:
- Define data as information gathered by observation, questioning or measurement
- Collect data through simple activities
- Show interest in collecting data

In groups, learners are guided to:
- Use digital device to find meaning of data
- Select favourite fruit from options (banana, watermelon, orange, mango)
- Write favourite fruit on paper and drop in basket, count responses

What is data?

- Smart Minds Mathematics Learner's Book pg. 222
- Pieces of paper
- Basket

- Oral questions - Written exercises - Observation

Data Handling and Probability

Data Handling - Frequency tables
Data Handling - Determining suitable scale

By the end of the lesson, the learner should be able to:
- Define a frequency table
- Represent data using tally marks and frequency
- Appreciate the use of frequency tables in organizing data

- Ask class teacher to show class register
- Identify number of learners present each day
- Record findings using tally marks in frequency table

How do we represent data in a frequency table?

- Smart Minds Mathematics Learner's Book pg. 223
- Class registers
- Frequency table templates
- Smart Minds Mathematics Learner's Book pg. 225
- Graph papers
- Rulers

- Written assignments - Class activities - Oral questions

Data Handling and Probability

Data Handling - Drawing pictographs

By the end of the lesson, the learner should be able to:
- Define a pictograph
- Draw pictographs to represent data
- Value the use of pictures in representing data

In groups, learners are guided to:
- Study chart showing wild animals at Masai Mara National Park
- Trace and cut out animals, stick under suitable category
- Use symbols to represent quantities (key: 1 symbol = specific value)

What is a pictograph?

- Smart Minds Mathematics Learner's Book pg. 226
- Bloating paper
- Scissors, glue

- Written assignments - Practical activities - Oral questions

Data Handling and Probability

Data Handling - Drawing bar graphs
Data Handling - Interpreting information from bar graphs

By the end of the lesson, the learner should be able to:
- Identify components of a bar graph (axes, bars, scale)
- Draw bar graphs to represent data
- Appreciate the use of bar graphs in data representation

In groups, learners are guided to:
- Make boxes of different colours and pile similar colours together
- Draw two axes: vertical (frequency) and horizontal (categories)
- Draw bars of same thickness with heights representing values

How do we draw a bar graph?

- Smart Minds Mathematics Learner's Book pg. 228
- Graph papers
- Rulers, coloured pencils
- Smart Minds Mathematics Learner's Book pg. 231
- Bar graph samples
- Worksheets

- Written exercises - Practical activities - Observation

Data Handling and Probability

Data Handling - Drawing pie charts
Data Handling - Interpreting pie charts

By the end of the lesson, the learner should be able to:
- Define a pie chart as a circle divided into sectors
- Calculate angles for each sector
- Draw pie charts to represent data

In groups, learners are guided to:
- Read story of Ndole the bus driver spending salary on fees, savings, food
- Draw circle and shade fractions (1/2, 1/4, 1/4)
- Calculate sector angles: (value ÷ total) × 360°

How do we draw a pie chart?

- Smart Minds Mathematics Learner's Book pg. 233
- Pair of compasses
- Protractors
- Smart Minds Mathematics Learner's Book pg. 236
- Pie chart samples
- Calculators

- Written exercises - Practical activities - Observation

Data Handling and Probability

Data Handling - Drawing line graphs

By the end of the lesson, the learner should be able to:
- Define a line graph as showing relationship between two quantities
- Draw line graphs to represent data
- Appreciate the use of line graphs in showing trends

In groups, learners are guided to:
- Study table showing packets of milk and cost in shillings
- Choose appropriate scale, draw and mark axes
- Plot points using table values, join points with straight line

How do we draw a line graph?

- Smart Minds Mathematics Learner's Book pg. 238
- Graph papers
- Rulers

- Written exercises - Practical activities - Observation

Data Handling and Probability

Data Handling - Interpreting travel graphs

By the end of the lesson, the learner should be able to:
- Draw and interpret travel graphs
- Calculate distance, time and speed from travel graphs
- Show interest in using graphs to represent journeys

In groups, learners are guided to:
- Study table showing Lugai's journey from town A to town B
- Draw travel graph with time on horizontal axis and distance on vertical axis
- Calculate distance at specific times, total time and average speed

How do we use travel graphs to show journeys?

- Smart Minds Mathematics Learner's Book pg. 240
- Graph papers
- Calculators

- Written assignments - Class activities - Oral questions