标签: math

Day 2 Math: Ratios (比率)

📐 Day 2 Math: Ratios (比率)

🎧 Listen to the Lesson (听讲解)

Hello, Sisi! Today we’re learning about Ratios(比率). Ratios are very important in PSLE Math!

📚 Key Vocabulary (重点词汇)

Ratio 比率
Simplify 化简
Equivalent 等价的
Ratio unit 比率单位
Total 总和
Difference 差值
Remain 剩余
Change 变化

🔹 Part 1: What is a Ratio? (什么是比率?)

A ratio(比率) compares two or more quantities. We write it using a colon :.

For example: If there are 3 boys(3个男孩) and 5 girls(5个女孩) in a class:

  • The ratio of boys to girls is 3 : 5
  • Total students = 3 + 5 = 8

📌 Key Rule (关键规则)

✅ Always simplify ratios to their simplest form(最简形式).

Example: 6 : 8 = 3 : 4 (divide both by 2)

🎮 Interactive Demo: See Ratios! (比率可视化)

Boys (男孩)

Girls (女孩)




🔹 Part 2: Simplifying Ratios (化简比率)

To simplify(化简) a ratio, divide both sides by their highest common factor (HCF)(最大公约数).

💡 Example 1 (例题1)

Q: Simplify the ratio 12 : 18

A:

  • HCF of 12 and 18 = 6
  • 12 ÷ 6 = 2, 18 ÷ 6 = 3
  • Simplified ratio = 2 : 3

💡 Example 2 (例题2)

Q: Simplify the ratio 15 : 25 : 35

A:

  • HCF of 15, 25, and 35 = 5
  • 15 ÷ 5 = 3, 25 ÷ 5 = 5, 35 ÷ 5 = 7
  • Simplified ratio = 3 : 5 : 7

🎮 Interactive Demo: Simplify This Ratio! (化简练习)




🔹 Part 3: Ratio Problems (比率应用题)

Problem Type 1: Ratio & Total (比率与总和)

💡 Example (例题)

Q: The ratio of apples to oranges is 3 : 4. There are 28 fruits in total. How many apples are there?

A:

  • Total ratio units = 3 + 4 = 7 units
  • 1 unit = 28 ÷ 7 = 4
  • Apples = 3 units = 3 × 4 = 12

Problem Type 2: Ratio Change (比率变化)

💡 Example (例题)

Q: The ratio of boys to girls in a class is 2 : 3. After 5 more boys join, the ratio becomes 3 : 4. How many girls are there?

A:

  • Boys = 2u, Girls = 3u (before)
  • After 5 boys: Boys = 2u + 5, Girls = 3u
  • New ratio: (2u + 5) : 3u = 3 : 4
  • 4(2u + 5) = 3(3u) → 8u + 20 = 9u
  • u = 20
  • Girls = 3u = 3 × 20 = 60

🔹 Part 4: Practice Questions (练习题)

Q1: Simplify the ratio 10 : 15



Q2: The ratio of red balls to blue balls is 4 : 5. There are 36 balls in total. How many red balls?



Q3: The ratio of X to Y is 2 : 5. If X = 12, what is Y?



📝 Summary (本节总结)

  • ✅ A ratio(比率) compares quantities using :
  • ✅ Always simplify(化简) ratios to simplest form
  • ✅ Use ratio units(比率单位) to solve problems
  • ✅ Total ratio units = sum of all parts

Day 1 Math: Mixed Fraction Operations (分数混合运算)

🧮 Day 1 Math: Mixed Fraction Operations (分数混合运算)

Hello, Sisi! Today we will learn about fraction multiplication 分数乘法 and fraction division 分数除法. This is a key topic for P6 Math and the PSLE exam!

📚 Key Vocabulary (重点词汇)

Fraction 分数
Numerator 分子
Denominator 分母
Multiply
Divide
Reciprocal 倒数
Simplify 化简
Lowest terms 最简分数

🔹 Part 1: Fraction Multiplication (分数乘法)

To multiply fractions 乘分数, we follow a simple rule:

📌 The Rule (规则)

Multiply the numerators(分子乘分子), then multiply the denominators(分母乘分母).

💡 Example (例题)

Q: Calculate 2/3 × 4/5

A:

  • Numerators: 2 × 4 = 8
  • Denominators: 3 × 5 = 15
  • Answer = 8/15 (already in lowest terms)

🎮 Interactive Demo: See the Rule! (互动演示)

Click the button to watch the numbers move(移动)!

2/3 × 4/5 = ?

🔹 Part 2: Fraction Division (分数除法)

To divide fractions 除分数, we use the “flip and multiply”(颠倒相乘)method:

📌 The 3 Steps (三步法)

Step 1: Keep the first fraction as it is(保持不变)

Step 2: Change ÷ to ×, then flip the second fraction (reciprocal)(颠倒求倒数)

Step 3: Multiply as usual!(照常相乘!)

💡 Example (例题)

Q: Calculate 3/4 ÷ 2/3

A:

  • Step 1: Keep 3/4
  • Step 2: Change to × and flip → 3/4 × 3/2
  • Step 3: 3 × 3 = 9, 4 × 2 = 8
  • Answer = 9/8 = 1 1/8 (mixed number)

🎮 Interactive Demo: Flip & Multiply! (颠倒相乘演示)

3/4 ÷ 2/3 = ?

🔹 Part 3: Simplifying Answers (化简答案)

Always simplify 化简 your answer to the lowest terms 最简分数! If the numerator is bigger than the denominator, convert to a mixed number(带分数).

📌 How to Simplify (如何化简)

Find the HCF(最大公约数)of the numerator and denominator, then divide both by it.

Example: 6/8 → HCF of 6 and 8 is 2 → 3/4 ✅

🔹 Part 4: Practice Questions (练习题)

Q1: What is 1/4 × 1/2 = ?

Q2: What is 2/3 ÷ 1/3 = ?

Q3: Simplify 4/6 = ?

📝 Summary (本节总结)

  • Multiply: Numerator × Numerator, Denominator × Denominator(分子乘分子,分母乘分母)
  • Divide: Keep, Flip, Multiply(保持,颠倒,相乘)
  • ✅ Always simplify(化简) to lowest terms
  • ✅ Convert to mixed number(带分数) if numerator > denominator