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- Linear Equations (Basic)

Still Confused?

Try reviewing these fundamentals first.

Still Confused?

Try reviewing these fundamentals first.

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That's that last lesson.

Start now and get better math marks!

Get Started NowStart now and get better math marks!

Get Started NowStart now and get better math marks!

Get Started NowStart now and get better math marks!

Get Started Now- Lesson: 1a2:08
- Lesson: 1b1:24
- Lesson: 2a1:11
- Lesson: 2b1:08
- Lesson: 2c1:10
- Lesson: 2d1:27
- Lesson: 3a1:42
- Lesson: 3b2:49

Continue from the previous section, we will solve linear equations in diagram, equation, and word problems forms. However, in addition to subtraction and addition, we will teach you how to solve linear equations that also involve multiplications and divisions.

Basic concepts: Dividing integers, Model and solve one-step linear equations: $ax = b$, $\frac{x}{a} = b$, Solving two-step linear equations using addition and subtraction: $ax + b = c$,

Related concepts: Solving linear equations using multiplication and division, Solving two-step linear equations: $ax + b = c$, ${x \over a} + b = c$, Solving linear equations using distributive property: $a(x + b) = c$, Solving linear equations with variables on both sides,

- 1.Find x in the equation modelled by each diagram.a)

b)

- 2.Solve.a)$3 + \frac{x}{4} = 51$b)$17 = 10 + \frac{x}{{ - 2}}$c)$\frac{x}{{ - 6}} - 21 = - 9$d)$- 1 = 23 + \frac{x}{8}$
- 3.The amount of time needed for an ice cube to melt when the temperature is between 10 °C to 30 °C can be expressed by the equation $t = 16 - \frac{C}{2}$, where t is the amount of time for the ice cube to melt in minute; and C is the temperature in degree Celsius.a)Will the ice melt in 10 minutes if the temperature is 10 °C?b)What was the lowest temperature for the ice cube to melt in 5 minutes?

21.

Linear Equations (Basic)

21.1

Model and solve one-step linear equations: $ax = b$, $\frac{x}{a} = b$

21.2

Solving two-step linear equations using addition and subtraction: $ax + b = c$

21.3

Solving two-step linear equations using multiplication and division: $\frac{x}{a} + b = c$

21.4

Solving two-step linear equations using distributive property: $\;a\left( {x + b} \right) = c$

We have over 1650 practice questions in Secondary 2 Maths for you to master.

Get Started Now21.1

Model and solve one-step linear equations: $ax = b$, $\frac{x}{a} = b$

21.2

Solving two-step linear equations using addition and subtraction: $ax + b = c$

21.3

Solving two-step linear equations using multiplication and division: $\frac{x}{a} + b = c$

21.4

Solving two-step linear equations using distributive property: $\;a\left( {x + b} \right) = c$