Ratio and Formula Revision

Today's Objectives

Recap Ratio and Formula concepts

Practice Examples

Typical Exam questions for both Ratio and Formula

Exam Prep

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Slide 1: Slide

MathematicsUpper Secondary (Key Stage 4)Further Education (Key Stage 5)

This lesson contains 33 slides, with interactive quizzes and text slides.

Lesson duration is: 60 min

Items in this lesson

Today's Objectives

Recap Ratio and Formula concepts

Practice Examples

Typical Exam questions for both Ratio and Formula

Exam Prep

Slide 1 - Slide

Ratio

The relationship between two amounts, represented by two numbers or a percentage, expressing how much bigger one is than the other

Formula

What is substitution? Substitution means replacing the variables (letters) in an algebraic expression with their numerical values. We can then work out the total value of the expression.

°C = (°F - 32) × 5/9;

Slide 2 - Slide

Ratio

The relationship between two amounts, represented by two numbers or a percentage, expressing how much bigger one is than the other

Examples

Slide 3 - Slide

Simplifying Ratio

Like a fraction divide both sides by the same number until you can divide no more!

Slide 4 - Slide

Example

Slide 5 - Slide

corbettmaths.com

Slide 6 - Link

Sharing Ratio

Slide 7 - Slide

Sharing Ratio

Slide 8 - Slide

corbettmaths.com

Slide 9 - Link

Slide 10 - Slide

Last week 1600 hot drinks were sold in Ella’s Café.

The ratio of cups of coffee to cups of tea sold is 7:3.

A cup of coffee on average costs £2.30.

A cup of tea on average costs £1.80.

Slide 11 - Quiz

Exam Question

Mike and Anne buy a takeaway.

The bill comes to £38.50

They agree to split the bill in the ratio 7:4

Calculate how much Mike pays for his share of the bill?

(3 marks)

Slide 12 - Slide

Answer

£20.50

£24.00

£23.00

£24.50

Slide 13 - Quiz

Exam Question

Last week 1600 hot drinks were sold in Ella’s Café.

The ratio of cups of coffee to cups of tea sold is 7:3.

A cup of coffee on average costs £2.30.

A cup of tea on average costs £1.80.

How much can Ella expect to have made through sales of cups of coffee and tea last week?

Slide 14 - Slide

Worked Answer

7+3 +10 parts

1600 / 10 = 160 = one part

160 x 7 =1120 coffee

160 x 3 = 480 tea

1120 x 2.30 = £2576

480 x 1.80 =£864

£2576 + £864 = £3440

Slide 15 - Slide

Exam Question

£290 of all money raised will be split between the cost of the activities and the cost of transport using a ratio of 7:1.

Calculate how much of the £290 will go towards the cost of the

activities.

Answer below.

Show your working out. see quiz next slide

Slide 16 - Slide

What's the answer?

£253.75

£242.25

£300

£252.50

Slide 17 - Quiz

Substitution

What is substitution?

Substitution means replacing the variables (letters) in an algebraic expression with their numerical values.

We can then work out the total value of the expression.

Slide 18 - Slide

Formula - BIDMAS

Slide 19 - Slide

What do you do with the A and R?

0.85A + 0.15R

Multiply

Divide

Take away

Add

Slide 20 - Quiz

What does this mean?

3(p+2)

I don't know!

Multiply then do Brackets

Brackets first then multiply by 3

Brackets first then add 3

Slide 21 - Quiz

What does this mean?

Divide 9 by 5

Multiply 9 by 5

Add 9 and 5

Minus 5 from 9

Slide 22 - Quiz

Try these!

Slide 23 - Slide

corbettmaths.com

Slide 24 - Link

Exam Question

Dr. Khan uses the following formula to calculate a patient’s recommended maximum heart rate after intensive exercise.

M = 187 – 0.85A + 0.15R

Where M = maximum heart rate in beats per minute (bpm)

A = age (years)

R = heart rate when resting (bpm)

Glenn is 60 years old.

His heart rate when resting is 80 beats per minute. Find the recommended heart rate.

Slide 25 - Slide

M = 187 – 0.85A + 0.15R
A = age (years)
R = heart rate when resting (bpm)
Glenn is 60 years old.
Heart rate when resting is 80 beats

134

143

124

148

Slide 26 - Quiz

Exam Question

Tim has bought new furniture for one of his rental properties.

He considers 2 options for transferring the furniture to the property.

Option A: Use the furniture shop’s delivery service.

The cost to the customer of this service can be calculated using the formula below:

C = 25 + 0.65d

C = cost in pounds

d = distance in miles from shop to delivery point

The shop is 46 miles from the property where it is to be delivered to.

Slide 27 - Slide

What is the answer?

£50.09

£54.90

£45.99

£44.90

Slide 28 - Quiz

Exam Question

Mrs Wallis has heard that the average monthly temperature in the Loire in August last year was 70°F.

She knows of 2 methods for changing temperatures in degrees Fahrenheit to degrees Celsius.

Method A: As an estimate, subtract 30 from the given temperature and divide by 2.

Method B: For an accurate result use the formula:

where C = temperature in °C and F = temperature in °F

Convert 70°F to °C using both methods and compare the results.

Comment on the accuracy of method A.

Slide 29 - Slide

Worked Answer

Method A

70 - 30 = 40 / 2 = 20 degrees C

Method B

C= 5/9 (F-32)

C = 5/9 (70-32)

C= 5/9 (38)

C= 0.5555 x 38

C= 21.1 degrees F

Slide 30 - Slide

Exam Question

The tins have a diameter of 20cm and a height of 9cm

Tins are filled to 4cm below the top to allow room for the cake mixture to rise.

Delia has made 2 litres of cake mix.

Will this be enough for one tin? (6 marks)

Use the following formula:

V = 11 r2 h

where r is the radius of the circular cake tin base and h is the height of the cake tin.

Let p = 3.14 or use the π button on your calculator.

Note that 1cm3 = 1ml

Slide 31 - Slide

Worked Answer

V = 3.14 x 10x10 x 5

V = 3.14x100x5

V= 314 x 5

V=1570 ml

= 1.57 litres

Slide 32 - Slide

Any Questions?

Practice Paper

Slide 33 - Slide

Ratio and Formula Revision

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