Complete the following multiplication and division calculations involving fractions (show all the steps).

4.1.1. [tex]$\frac{4}{6} \div \frac{3}{12}$[/tex]

4.1.2. [tex]$\frac{7}{9} \times \frac{4}{28}$[/tex]

4.1.3. [tex]$4 \frac{1}{6} \times 6 \frac{2}{5}$[/tex]

4.1.4. [tex]$\frac{3}{17}+6$[/tex]

Divide 6 4 ​ by 12 3 ​ by multiplying 6 4 ​ by 3 12 ​ and simplifying: 6 4 ​ ÷ 12 3 ​ = 3 8 ​ .
Multiply 9 7 ​ by 28 4 ​ by multiplying numerators and denominators and simplifying: 9 7 ​ × 28 4 ​ = 9 1 ​ .
Multiply 4 6 1 ​ by 6 5 2 ​ by converting to improper fractions, multiplying, and simplifying: 4 6 1 ​ × 6 5 2 ​ = 3 80 ​ .
Add 17 3 ​ and 6 by converting 6 to a fraction with denominator 17 and adding: 17 3 ​ + 6 = 17 105 ​ .

3 8 ​ , 9 1 ​ , 3 80 ​ , 17 105 ​ ​
Explanation

Problem Analysis We are asked to perform fraction operations, including division, multiplication, and addition. Let's tackle each operation step by step.

Dividing Fractions To divide 6 4 ​ by 12 3 ​ , we multiply 6 4 ​ by the reciprocal of 12 3 ​ , which is 3 12 ​ . So, we have: 6 4 ​ ÷ 12 3 ​ = 6 4 ​ × 3 12 ​ = 6 × 3 4 × 12 ​ = 18 48 ​ Now, we simplify the fraction by dividing both the numerator and the denominator by their greatest common divisor, which is 6: 18 48 ​ = 18 ÷ 6 48 ÷ 6 ​ = 3 8 ​ We can also express this as a mixed number: 2 3 2 ​

Multiplying Fractions To multiply 9 7 ​ by 28 4 ​ , we multiply the numerators and the denominators: 9 7 ​ × 28 4 ​ = 9 × 28 7 × 4 ​ = 252 28 ​ Now, we simplify the fraction by dividing both the numerator and the denominator by their greatest common divisor, which is 28: 252 28 ​ = 252 ÷ 28 28 ÷ 28 ​ = 9 1 ​

Multiplying Mixed Numbers To multiply 4 6 1 ​ by 6 5 2 ​ , we first convert the mixed numbers to improper fractions: 4 6 1 ​ = 6 4 × 6 + 1 ​ = 6 25 ​ 6 5 2 ​ = 5 6 × 5 + 2 ​ = 5 32 ​ Now, we multiply the improper fractions: 6 25 ​ × 5 32 ​ = 6 × 5 25 × 32 ​ = 30 800 ​ We simplify the fraction by dividing both the numerator and the denominator by their greatest common divisor, which is 10: 30 800 ​ = 30 ÷ 10 800 ÷ 10 ​ = 3 80 ​ We can also express this as a mixed number: 26 3 2 ​

Adding a Fraction and a Whole Number To add 17 3 ​ and 6, we convert 6 to a fraction with a denominator of 17: 6 = 17 6 × 17 ​ = 17 102 ​ Now, we add the two fractions: 17 3 ​ + 6 = 17 3 ​ + 17 102 ​ = 17 3 + 102 ​ = 17 105 ​ We can also express this as a mixed number: 6 17 3 ​

Final Answers Therefore, the results of the calculations are: 4.1.1. 6 4 ​ ÷ 12 3 ​ = 3 8 ​ = 2 3 2 ​ 4.1.2. 9 7 ​ × 28 4 ​ = 9 1 ​ 4.1.3. 4 6 1 ​ × 6 5 2 ​ = 3 80 ​ = 26 3 2 ​ 4.1.4. 17 3 ​ + 6 = 17 105 ​ = 6 17 3 ​


Examples
Fractions are used in everyday life, such as when cooking, measuring ingredients, or splitting a bill with friends. Understanding how to perform operations with fractions is essential for accurate calculations in these situations. For example, if a recipe calls for 3 2 ​ cup of flour and you want to double the recipe, you need to multiply 3 2 ​ by 2, which gives you 3 4 ​ or 1 3 1 ​ cups of flour. Similarly, when splitting a $100 bill three ways, each person pays 3 1 ​ of the bill, which is approximately $33.33.

Answered by GinnyAnswer | 2025-07-03

The calculations yield the following results: 6 4 ​ ÷ 12 3 ​ = 3 8 ​ , 9 7 ​ × 28 4 ​ = 9 1 ​ , 4 6 1 ​ × 6 5 2 ​ = 3 80 ​ , and 17 3 ​ + 6 = 17 105 ​ .
;

Answered by Anonymous | 2025-07-04