05. Percentage of Amount & Percentage Change

Question 1

Find the percentages of the following:

1(a) $40\%$ of $120$

ANSWER: Simple text answer

Answer: $48$

Workings:

$\dfrac{40}{100} \times 120 = 48$

Marks = 1

1(b) $80\%$ of $800$

ANSWER: Simple text answer

Answer: $640$

Workings:

$\dfrac{80}{100} \times 800 = 640$

Marks = 1

1(c) $70\%$ of $230$

ANSWER: Simple text answer

Answer: $161$

Workings:

$\dfrac{70}{100} \times 230 = 161$

Marks = 1

1(d) $99\%$ of $130$

ANSWER: Simple text answer

Answer: $128.7$

Workings:

$\dfrac{99}{100} \times 130 = 128.7$

Marks = 1

1(e) $28\%$ of $900$

ANSWER: Simple text answer

Answer: $252$

Workings:

$\dfrac{28}{100} \times 900 = 252$

Marks = 1

Question 2

Tommy went to the shop where there was a $20\%$ off sale taking place.

The shirt he wanted to buy was originally $\pounds20$ .

How much money does he save in the sale?

ANSWER: Simple text answer

Answer: $\pounds 4$

Workings:

$0.8 \times \pounds20 = \pounds16$

$\pounds20 - \pounds16 = \pounds4$

Marks = 2

Question 3

A bike costs $£350$ [/latex] but is reduced by $35\%$ .

What does the bike cost after the reduction?

ANSWER: Simple text answer

Answer: $£227.50$

Workings:

$0.65 x £350 = £227.50$

Marks = 2

Question 4

In a school of 600 pupils, 64% walk to school regularly.

How many pupils walk to school regularly?

ANSWER: Simple text answer

Answer: $384$

Workings: $0.64 \times 600 = 384$

Marks = 2

Question 5

Tommy buys a rare painting for $£3200$ .

He eventually sells it for $£3800$ .

Work out the percentage increase in value of the painting.

ANSWER: Simple text answer

Answer: $18.75$

Workings:

$\dfrac{3800}{3200} = 0.1875$

$0.1875 \times 100 = 18.75\%$

Marks = 2

Question 6

Jane fills her empty car with 12 litres of petrol.

After driving for the day the car now has 7.5 litres of petrol in the tank.

Calculate the percentage decrease of petrol in the car.

ANSWER: Simple text answer

Answer: $37.5\%$

Workings:

$\dfrac{7.5}{12} = 0.625$

$1 - 0.625 = 0.375$ so $37.5\%$

Marks = 2

Question 7

A speed boat travels from A to B for the first part of a journey and then B to C to complete a journey.

For the entire journey, A to C, the boat travels at an average speed of $21$ kmph.

During the journey, from B to C, the boat only travels at a speed of $13$ kmph.

Calculate the percentage decrease in average speed between the first and second part of the journey, given that the distance off each part is equal.

ANSWER: Simple text answer

Answer: $55.2$

Workings:

$\dfrac{13 + x}{2} = 21$ so $x = 29$ kmph

$\dfrac{13}{29} = 0.448$ so percentage decrease $= 1 - 0.448 = 0.552$

Marks = 3