key term - Logarithmic Properties

5 Must Know Facts For Your Next Test

1. The product rule for logarithms states that $\log_b(xy) = \log_b(x) + \log_b(y)$, where $b$ is the base of the logarithm.
2. The power rule for logarithms states that $\log_b(x^n) = n\log_b(x)$, where $n$ is any real number.
3. The quotient rule for logarithms states that $\log_b(\frac{x}{y}) = \log_b(x) - \log_b(y)$.
4. The logarithm of 1 is always 0, regardless of the base: $\log_b(1) = 0$.
5. The logarithm of the base $b$ is always 1: $\log_b(b) = 1$.

Review Questions

• Explain how the product rule for logarithms can be used to simplify expressions involving multiplication of logarithmic terms.
  • The product rule for logarithms states that $\log_b(xy) = \log_b(x) + \log_b(y)$, where $b$ is the base of the logarithm. This property allows you to rewrite a logarithm of a product as the sum of the individual logarithms. For example, $\log_5(12) = \log_5(3) + \log_5(4)$, as 12 = 3 × 4. This can be used to simplify more complex expressions involving the multiplication of logarithmic terms.
• Describe how the power rule for logarithms can be used to evaluate logarithms of powers.
  • The power rule for logarithms states that $\log_b(x^n) = n\log_b(x)$, where $n$ is any real number. This property allows you to rewrite a logarithm of a power as the product of the exponent and the logarithm of the base. For instance, $\log_2(8^3) = 3\log_2(8)$, as 8^3 = 512. This rule is particularly useful when evaluating logarithms of powers, as it reduces the computation to a simpler form.
• Analyze how the logarithmic properties can be applied to solve separable differential equations.
  • Logarithmic properties play a crucial role in solving separable differential equations, which are of the form $\frac{dy}{dx} = f(x)g(y)$. By applying the logarithmic properties, such as the product rule and the power rule, the differential equation can be transformed into a form that can be integrated. For example, if the differential equation is $\frac{dy}{dx} = \frac{y}{x}$, we can use the logarithmic properties to rewrite it as $\frac{dy}{y} = \frac{dx}{x}$, which can then be integrated to obtain the solution involving logarithmic functions.