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Chapter 4: Problem 2

Explain the difference between direct variation and inverse variation.

Short Answer

Expert verified
Direct variation: \( y = kx \); both variables increase together. Inverse variation: \( y = \frac{k}{x} \); as one increases, the other decreases.

Step by step solution

01

Understanding Direct Variation

Direct variation occurs when two variables, say \( x \) and \( y \), are related in such a way that as one variable increases, the other also increases. This relationship can be expressed by the formula \( y = kx \), where \( k \) is a constant known as the constant of variation. In this formula, \( y \) is directly proportional to \( x \). For example, if \( k = 3 \), then the equation is \( y = 3x \).
02

Understanding Inverse Variation

Inverse variation describes a situation where two variables are related such that as one variable increases, the other decreases. The relationship can be captured by the equation \( y = \frac{k}{x} \), where \( k \) is a constant. Here, \( y \) is inversely proportional to \( x \). For example, if \( k = 6 \), then the equation is \( y = \frac{6}{x} \).
03

Comparing Direct and Inverse Variation

In direct variation, both variables change in the same direction; if \( x \) increases, \( y \) also increases. However, in inverse variation, the variables change in opposite directions; if \( x \) increases, \( y \) decreases. The formulas \( y = kx \) (direct variation) and \( y = \frac{k}{x} \) (inverse variation) show these relationships mathematically.

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Direct Variation
Direct variation is a simple and common relationship found in algebra. When two variables have a direct variation relationship, they change in tandem. This means if one variable goes up, the other follows the same path and increases too. The formula that describes this is\[ y = kx \]where \( y \) is directly proportional to \( x \), and \( k \) is a constant, known as "the constant of variation."
  • This constant, \( k \), determines how much \( y \) changes for every unit change in \( x \).
  • For example, if \( k = 3 \), the equation becomes \( y = 3x \), suggesting that for every increase in \( x \) by 1, \( y \) increases by 3.
This relationship is often used when dealing with problems involving rates, such as speed, cost and time. Think of it like a consistent pattern, always in sync with changes.
Inverse Variation
Inverse variation presents a contrasting idea. Here, as one variable increases, the other decreases. Such a relationship can be described by the formula:\[ y = \frac{k}{x} \]where \( y \) is inversely proportional to \( x \), and \( k \) remains a constant.
  • In inverse variation, \( k \) helps balance and define how the change in \( x \) will inversely affect \( y \).
  • For instance, with \( k = 6 \), the equation \( y = \frac{6}{x} \) suggests that as \( x \) increases, \( y \) becomes smaller, maintaining the value of the product \( xy = k \).
This idea is useful in scenarios where two quantities need to maintain a constant product, such as work and time calculations. Imagine working fewer hours daily but maintaining the same total weekly work hours.
Proportional Relationships
Proportional relationships are at the core of understanding both direct and inverse variation. In these relationships, the way two variables relate is through a consistent and predictable pattern involving a constant.
  • Direct proportionality ensures that the ratio between two quantities stays the same. For example, if the constant \( k = 5 \), then \( \frac{y}{x} = 5 \).
  • In inverse proportion, however, it is the product that remains constant. This can be seen as \( xy = k \). In this situation, doubling one variable halves the other.
Understanding these relationships is crucial wherever there is a need to predict one variable based on changes in another, which is a common requirement in many fields of science, economics, and daily life.

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Most popular questions from this chapter

Give an example of a function g for which \(2 \mathrm{g}(x) \neq \mathrm{g}(2 x) .\) Give an example of a function \(\mathrm{f}\) for which \(2 \mathrm{f}(x)=\mathrm{f}(2 x)\)

In \(6-12,\) tell whether the variables vary directly, inversely, or neither. A bank pays 4\(\%\) interest on all savings accounts. A depositor receives \(I\) dollars in interest when the balance in the savings account is \(P\) dollars.

In \(11-16,\) determine if the function has an inverse. If so, list the pairs of the inverse function. If not, explain why there is no inverse function. $$ \left\\{(x, y) : y=x^{2}+2 \text { for } 0 \leq x \leq 5\right\\} $$

In \(11-16,\) determine if the function has an inverse. If so, list the pairs of the inverse function. If not, explain why there is no inverse function. $$ \\{(-1,3),(-1,5),(-2,7),(-3,9),(-4,11)\\} $$

a. Sketch the graph of \(y=x^{2}\) b. Sketch the graph of \(y=-x^{2}\) c. Describe the graph of \(y=-x^{2}\) in terms of the graph of \(y=x^{2}\) . d. What transformation maps \(y=x^{2}\) to \(y=-x^{2} ?\)
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