Problem 4
Question
The _______ products for the proportion \(\frac{5}{2}=\frac{6}{x}\) are \(5 x\) and 12
Step-by-Step Solution
Verified Answer
The cross products are \(5x\) and \(12\).
1Step 1 - Understand Cross Multiplication
To solve proportions, we use cross multiplication. For the proportion \( \frac{5}{2} = \frac{6}{x} \), we cross multiply the terms directly across the equals sign to form the products.
2Step 2 - Identify the Products
The cross products for the proportion \( \frac{5}{2} = \frac{6}{x} \) are \(5 \cdot x\) and \(2 \cdot 6\). Here, \(5 \cdot x\) is directly multiplied on one side, and \(2 \cdot 6\) is multiplied on the other.
3Step 3 - Express the Equation
Set the cross products equal to each other: \(5x = 12\). This equation is derived from the cross multiplication steps.
Key Concepts
Understanding ProportionsThe Process of Equation SolvingExploring Cross Products
Understanding Proportions
Proportions are mathematical statements that express the equality of two ratios or fractions. When given a proportion, such as \(\frac{5}{2} = \frac{6}{x}\), it indicates that both fractions represent the same value or quantity.
Proportions are used to solve problems where one or more quantities are unknown, allowing us to find the missing value accurately. In real life, we often use proportions when dealing with recipes, scaling items in art, or in situations involving maps for distances.
The central idea behind proportions is that if two ratios are equivalent, multiplying or dividing the terms on each side by the same number will still yield equivalent ratios.
Proportions are used to solve problems where one or more quantities are unknown, allowing us to find the missing value accurately. In real life, we often use proportions when dealing with recipes, scaling items in art, or in situations involving maps for distances.
The central idea behind proportions is that if two ratios are equivalent, multiplying or dividing the terms on each side by the same number will still yield equivalent ratios.
The Process of Equation Solving
Equation solving involves finding the value of an unknown variable that makes an equation true. In the case of proportions, equation solving helps to identify the value that keeps both sides of the proportion equal.
For the proportion \(\frac{5}{2} = \frac{6}{x}\), we apply the concept of cross multiplication to set an equation. When we multiply the terms across one diagonal, we obtain \(5 \cdot x\), and when we multiply across the other diagonal, we get \(2 \cdot 6\). This gives us the equation \(5x = 12\).
Solving this equation involves isolating the variable \(x\) to find its specific value. To do this, you divide both sides of the equation by 5. Concluding the solution gives us \(x = \frac{12}{5}\), which is the value that satisfies the initial proportion.
For the proportion \(\frac{5}{2} = \frac{6}{x}\), we apply the concept of cross multiplication to set an equation. When we multiply the terms across one diagonal, we obtain \(5 \cdot x\), and when we multiply across the other diagonal, we get \(2 \cdot 6\). This gives us the equation \(5x = 12\).
Solving this equation involves isolating the variable \(x\) to find its specific value. To do this, you divide both sides of the equation by 5. Concluding the solution gives us \(x = \frac{12}{5}\), which is the value that satisfies the initial proportion.
Exploring Cross Products
Cross products are an essential tool in solving proportions efficiently. By defining a clear mathematical relationship between the terms of proportional fractions, cross products offer a systematic way to work through equations.
When dealing with the proportion \(\frac{5}{2} = \frac{6}{x}\), cross products involve multiplying diagonal terms to compare them. Here, the numbers 6 and 2 create one product, while 5 and \(x\) form the other. These products must be equal for the proportion to hold true, thus leading us to the equation \(5x = 12\).
Cross products simplify the complex process of determining unknown values by breaking it down into smaller, more manageable mathematical steps. This method is particularly useful in educational settings as it helps students develop a clearer understanding of relationships between numbers.
When dealing with the proportion \(\frac{5}{2} = \frac{6}{x}\), cross products involve multiplying diagonal terms to compare them. Here, the numbers 6 and 2 create one product, while 5 and \(x\) form the other. These products must be equal for the proportion to hold true, thus leading us to the equation \(5x = 12\).
Cross products simplify the complex process of determining unknown values by breaking it down into smaller, more manageable mathematical steps. This method is particularly useful in educational settings as it helps students develop a clearer understanding of relationships between numbers.
Other exercises in this chapter
Problem 3
Fill in the blanks. a. To multiply rational expressions, multiply their ______ and multiply their ______. To divide two rational expressions, multiply the first
View solution Problem 3
Fill in the blanks. Because of the division by \(0,\) the expression \(\frac{8}{0}\) is ____.
View solution Problem 4
Fill in the blank: If a job can be completed in \(t\) hours, then the rate of work can be expressed as \(\frac{1}{\underline{\phantom{xx}}}\) of the job is completed per hour.
View solution Problem 4
Fill in the blanks. When solving a rational equation, if we obtain a number that does not satisfy the original equation, the number is called an ______________
View solution