LOGARITHMIC LIMITS AND DERIVATIVES

Revision sheet excerpt

📋 Course Outline

  1. Derivative of Product
  2. Primitive of Logarithm
  3. Limit of Logarithm at Zero
  4. Limit of Logarithm at Infinity
  5. Limit of Functions at Zero and Infinity
  6. Limit of Logarithm with Function Limit
  7. Limit Calculation Techniques
  8. Logarithm Limit Examples

📖 1. Derivative of Product

🔑 Key Concepts & Definitions

  • Product Rule: If u(x)u(x) and v(x)v(x) are differentiable functions, then the derivative of their product is: (uv)=uv+uv(uv)' = u'v + uv' This rule allows calculating the derivative of a product by differentiating each function separately and combining the results.

  • Primitive (Antiderivative): A function FF is a primitive of ff if F=fF' = f.
    In the context of the product rule, the primitive of uu\frac{u'}{u} (with u0u \neq 0) is lnu\ln|u|.

  • Logarithmic Derivative: For a differentiable, non-zero function uu, the derivative of lnu\ln|u| is: ddxlnu=uu\frac{d}{dx} \ln|u| = \frac{u'}{u} This links derivatives of functions to their logarithms, useful in integration and limit calculations.

  • Limit Behavior of Logarithms:

    • limx0+lnx=\lim_{x \to 0^+} \ln x = -\infty
    • limx+lnx=+\lim_{x \to +\infty} \ln x = +\infty
      Understanding these helps evaluate limits involving logarithms.
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Quiz preview

1. What is the derivative of the product of two differentiable functions called?

2. What is the primitive (antiderivative) of the function $ rac{u'}{u}$, where $u$ is differentiable and non-zero?

3. What is the role or purpose of understanding the limit of the logarithm function as its argument approaches zero from the right?

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Flashcards preview

Derivative of product — rule?

$(uv)' = u'v + uv'$

Primitive of $ rac{u'}{u}$ — function?

$oxed{ ext{Primitive} = ext{ln}|u| + C}$

Limit of $ ext{ln } x$ at zero?

$- ext{Infinity}$

Limit of $ ext{ln } x$ at infinity?

$+ ext{Infinity}$

Limit of $f(x)$ at zero or infinity?

Depends on the function's behavior near the point.

Limit of $ ext{ln } U(x)$ — when $U(x) o ext{?}$

$+ ext{Infinity}$ if $U(x) o+ ext{Infinity}$; $- ext{Infinity}$ if $U(x) o 0^+$; $ o ext{ln }k$ if $U(x) o k>0$.

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