Algebra 1 (W1-S1) Lesson - Cardiff University

Summary

This lesson from Cardiff University's International Study Centre covers Algebra 1, specifically surds and indices. It details multiplying, dividing, simplifying, adding, and subtracting surds, as well as multiplying, dividing, powers, negative and fractional indices. The lesson includes examples and exercises.

Full Transcript

Cardiff University
International Study Centre

Week 1 Session 1

Algebra 1
Learning Objectives
To be able to multiply, divide, add and subtract surds
To be able to simplify surds
To be able to use the laws of indices
 Section 1

Surds
Multiplying surds
Dividing surds
Simplifying surds
Adding surds
Subtracting surds

2
Key points
Multiplying surds
𝑎 × 𝑏 = 𝑎𝑏

Dividing surds
𝑎
𝑎 ÷ 𝑏=
𝑏

Simplifying surds
We can take out square numbers and find their root

4𝑎 = 4 × 𝑎 = 2 𝑎
Adding and subtracting surds
If we have several of the same surd, we can add or subtract them

𝑏+2 𝑏 =3 𝑏

3
Example 1 – Multiplying surds
Multiply the following surds.

2× 3

3 × 10

5× 2

2 5× 7

12 × 3 3

3 6×4 2

4
Example 2 – Dividing surds
Divide the following surds.

10 ÷ 2

12 ÷ 6

3÷ 7

2 30 ÷ 6

10 ÷ 3 2

6 14 ÷ 2 2

5
Example 3 – Simplifying surds
Simplify the following surds.

25

12

200

2 32

3 156

5 2 10

6
Example 4 – Adding and subtracting surds
Add and subtract the following surds.

5+3 5

2 2− 2

20 + 45

2 32 − 4 2

48 + 6 12

180 − 20 − 2 5

7
Exercise
Compute and simplify the following.

1) 3 5 × 3 3 6) 5 2 × 5 6

2) 4 21 ÷ 2 3 7) 4 3 × 2 6

3) 32 − 8 8) 6 42 ÷ 2 7

4) 20 30 ÷ 5 6 9) 2 3 × 2 5

5) 507 − 48 − 75 10) 320 − 20 − 20

Calculator note:
Only use a calculator to help with
multiplying or dividing numbers!
You need to do the work by hand to
get marks on the exam. 8
Answers

1) 3 5 × 3 3 ⟶ 9 15 6) 5 2 × 5 6 ⟶ 50 3

2) 4 21 ÷ 2 3 ⟶2 7 7) 4 3 × 2 6 ⟶ 24 2

3) 32 − 8 ⟶2 2 8) 6 42 ÷ 2 7 ⟶3 6

4) 20 30 ÷ 5 6 ⟶4 5 9) 2 3 × 2 5 ⟶ 4 15

5) 507 − 48 − 75 ⟶4 3 10) 320 − 20 − 20 ⟶4 5

9
 Section 2

Indices
Multiplying indices
Dividing indices
Powers of indices
Negative indices
Fractional indices

10
Key points
Multiplying indices
𝑥 ×𝑥 =𝑥
Dividing indices
𝑥 ÷𝑥 =𝑥
Powers of indices
𝑥 =𝑥
Negative indices

1
𝑥 =
𝑥
Fractional indices

𝑥 = 𝑥

11
Example 1 – Multiplying indices
Multiply the following indices.

𝑥 ×𝑥

3𝑥 × 5𝑥

𝑥 ×𝑥×𝑥

𝑥 ×𝑥

𝑥 ×𝑦

2𝑥 𝑦 × 𝑥 𝑦

12
Example 2 – Dividing indices
Divide the following indices.

𝑥 ÷𝑥

𝑥 ÷𝑥

15𝑥 ÷ 3𝑥

𝑥 ÷𝑥

2𝑥 ÷ 3𝑦

2𝑥 𝑦 ÷ 𝑥𝑦

13
Example 3 – Powers of indices
Simplify the following expressions.

𝑥

2

2𝑦

7𝑥

2𝑥𝑦

3 4𝑎𝑏

14
Example 4 – Power of zero
Simplify the following.

𝑥

4

3𝑥

(3𝑥)

15
Example 5 – Negative indices
These expressions are written in “index form”. Write them in ordinary form.

𝑥

𝑥

4

5𝑥

5𝑥

1
𝑥
7
16
Example 6 – Fractional indices
These expressions are written in “index form”. Write them in ordinary form.

𝑥

𝑥

27

16

4𝑥

17
Exercise Match the ordinary form expressions (numbers) with their index form expressions (letters).

1 1
1 𝑥 11 × A 𝑥 K 𝑥
𝑥 𝑥
1
2 12 𝑥
B
1
L
𝑥 𝑥 𝑥
1
2
3 𝑥
13 𝑥 1
C 𝑥 M 𝑥
2
1
4 𝑥 14
𝑥 D 𝑥 N 𝑥
1 1
5 15
𝑥 𝑥 E 𝑥 O 2𝑥
1
6 16 𝑥 ×𝑥 1
2𝑥
F 𝑥 P 𝑥
2 4
2
7 17
𝑥 𝑥
G 𝑥 Q 𝑥
1
8 𝑥 𝑥 18 H 𝑥 R
4𝑥 𝑥
𝑥 𝑥
9 19 I 2𝑥 S 2𝑥
𝑥 4
1
10 20 4𝑥 J 𝑥 T 𝑥
𝑥 18
Answers
1 1
1P 𝑥 11 Q × A 𝑥 K 𝑥
𝑥 𝑥
1
2E 12 R 𝑥 1
𝑥 B 𝑥 L 𝑥
1
2
3K 𝑥
13 T 𝑥 1
C 𝑥 M 𝑥
2
1
4J 𝑥 14 D
𝑥 D 𝑥 N 𝑥
1 1
5M 15 G
𝑥 𝑥 E 𝑥 O 2𝑥
1
6B 16 L 𝑥 ×𝑥 1
2𝑥
F 𝑥 P 𝑥
2 4
2
7S 17 O
𝑥 𝑥
G 𝑥 Q 𝑥
1
8N 𝑥 𝑥 18 C H 𝑥 R
4𝑥 𝑥
𝑥 𝑥
9A 19 F I 2𝑥 S 2𝑥
𝑥 4
1
10 H 20 I 4𝑥 J 𝑥 T 𝑥
𝑥 19