Simplify $\left[\frac{6}{7}+\frac{3}{8}-\frac{1}{2}\right] \frac{4}{3}$ and find its reciprocal.

Question

GinnyAnswer · Answer

Simplify the expression inside the brackets by finding a common denominator: 7 6 ​ + 8 3 ​ − 2 1 ​ = 56 41 ​ . 
 Multiply the result by 3 4 ​ : 56 41 ​ × 3 4 ​ = 168 164 ​ . 
 Simplify the fraction: 168 164 ​ = 42 41 ​ . 
 Find the reciprocal of the simplified fraction: 41 42 ​ ​ . 
 
 Explanation 
 
 Understanding the Problem We are asked to simplify the expression [ 7 6 ​ + 8 3 ​ − 2 1 ​ ] 3 4 ​ and then find its reciprocal. Let's start by simplifying the expression inside the brackets. 
 
 Finding a Common Denominator To simplify the expression inside the brackets, we need to find a common denominator for the fractions 7 6 ​ , 8 3 ​ , and 2 1 ​ . The least common multiple (LCM) of 7, 8, and 2 is 56. So, we will rewrite each fraction with a denominator of 56. 
 
 Rewriting Fractions Now, we rewrite the fractions with the common denominator: 7 6 ​ = 7 × 8 6 × 8 ​ = 56 48 ​ 8 3 ​ = 8 × 7 3 × 7 ​ = 56 21 ​ 2 1 ​ = 2 × 28 1 × 28 ​ = 56 28 ​ 
 
 Calculating the Sum Next, we calculate the sum inside the brackets: 56 48 ​ + 56 21 ​ − 56 28 ​ = 56 48 + 21 − 28 ​ = 56 41 ​ 
 
 Multiplying by 4/3 Now, we multiply the result by 3 4 ​ :
 56 41 ​ × 3 4 ​ = 56 × 3 41 × 4 ​ = 168 164 ​ 
 
 Simplifying the Fraction We simplify the fraction 168 164 ​ by dividing both the numerator and the denominator by their greatest common divisor (GCD). The GCD of 164 and 168 is 4. 168 ÷ 4 164 ÷ 4 ​ = 42 41 ​ 
 
 Finding the Reciprocal Finally, we find the reciprocal of the simplified fraction 42 41 ​ . The reciprocal is obtained by swapping the numerator and the denominator, which gives us 41 42 ​ . 
 
 Final Answer Therefore, the simplified expression is 42 41 ​ and its reciprocal is 41 42 ​ .

Examples 
 Fractions and their reciprocals are fundamental in various real-life scenarios, such as scaling recipes, calculating proportions in construction, or determining gear ratios in mechanics. For instance, if you need to increase a recipe by a factor of 3 4 ​ , you multiply each ingredient by this fraction. Conversely, if you want to reduce the recipe back to its original size, you multiply by the reciprocal, 4 3 ​ . Understanding these concepts allows for accurate adjustments and ensures the desired outcome in practical applications.

Anonymous · Answer

To simplify [ 7 6 ​ + 8 3 ​ − 2 1 ​ ] 3 4 ​ , we find it equals 42 41 ​ . The reciprocal of this fraction is 41 42 ​ . 
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Simplify $\left[\frac{6}{7}+\frac{3}{8}-\frac{1}{2}\right] \frac{4}{3}$ and find its reciprocal.

Answer (2)

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