Textbook Question
For each substance, find the pH from the given hydronium ion concentration to the nearest tenth. See Example 2(a). limes, 1.6*10^-2
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6. Exponential & Logarithmic Functions
Properties of Logarithms
8:41 minutesProblem 33
Textbook Question
In Exercises 1–40, use properties of logarithms to expand each logarithmic expression as much as possible. Where possible, evaluate logarithmic expressions without using a calculator.logb ((√x y^3)/z^3)
Verified step by step guidance1
Start by applying the quotient rule of logarithms: \( \log_b \left( \frac{a}{c} \right) = \log_b a - \log_b c \). In this case, \( a = \sqrt{x} y^3 \) and \( c = z^3 \).
Apply the quotient rule: \( \log_b \left( \frac{\sqrt{x} y^3}{z^3} \right) = \log_b (\sqrt{x} y^3) - \log_b (z^3) \).
Next, apply the product rule of logarithms to \( \log_b (\sqrt{x} y^3) \): \( \log_b (ab) = \log_b a + \log_b b \). Here, \( a = \sqrt{x} \) and \( b = y^3 \).
Apply the product rule: \( \log_b (\sqrt{x} y^3) = \log_b (\sqrt{x}) + \log_b (y^3) \).
Use the power rule of logarithms: \( \log_b (a^n) = n \log_b a \). Apply it to each term: \( \log_b (\sqrt{x}) = \log_b (x^{1/2}) = \frac{1}{2} \log_b x \) and \( \log_b (y^3) = 3 \log_b y \), and \( \log_b (z^3) = 3 \log_b z \).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Properties of Logarithms
The properties of logarithms are rules that simplify the manipulation of logarithmic expressions. Key properties include the product rule (log_b(MN) = log_b(M) + log_b(N)), the quotient rule (log_b(M/N) = log_b(M) - log_b(N)), and the power rule (log_b(M^p) = p * log_b(M)). Understanding these properties is essential for expanding logarithmic expressions effectively.
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Logarithmic Expansion
Logarithmic expansion involves breaking down a logarithmic expression into simpler components using the properties of logarithms. This process allows for easier evaluation and manipulation of the expression. For example, the expression log_b((√x y^3)/z^3) can be expanded into separate logarithms for the numerator and denominator, making it simpler to analyze.
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Evaluating Logarithmic Expressions
Evaluating logarithmic expressions involves calculating the value of the logarithm based on known values or properties. In some cases, this can be done without a calculator by recognizing common logarithmic values or simplifying the expression. For instance, if specific values for x, y, and z are provided, one can substitute them into the expanded expression to find a numerical result.
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