1D - Algebraic fractions
Addition and subtraction of algebraic fractions:
- Algebraic fractions can only be added or subtracted when they have a common denominator.
1D - Example 1: Addition and subtraction of algebraic fractions
Simplify each of the following
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1D - Example 1: Video solution
1D - Example 1: Practice
Question 1: ABC Question 2: ABC 1D - Example 1: Solutions
Question 1: ABC Question 2: ABC |
Simplifying algebraic fractions:
- Algebraic fractions can only be simplified if the factor is common to the denominator and the numerator.
1D - Example 2: Simplifying algebraic fractions
Simplify each of the following
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1D - Example 2: Video solution
1D - Example 2: Practice
Question 1: ABC Question 2: ABC 1D - Example 2: Solutions
Question 1: ABC Question 2: ABC |
1D - Example 3: Simplifying algebraic fractions
Simplify each of the following
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1D - Example 3: Video solution
1D - Example 3: Practice
Question 1: ABC Question 2: ABC 1D - Example 3: Solutions
Question 1: ABC Question 2: ABC |
1D - Example 4: Simplifying algebraic fractions
Simplify each of the following
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1D - Example 4: Video solution
1D - Example 4: Practice
Question 1: ABC Question 2: ABC 1D - Example 4: Solutions
Question 1: ABC Question 2: ABC |
1D - Example 5: Simplifying algebraic fractions
Simplify each of the following algebraic fraction \[\frac{x^2-3x-4}{x^2+4x+3}\div \frac{x^2-16}{x^2+x-6}\]
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1D - Example 5: Video solution
1D - Example 5: Practice
Question 1: ABC Question 2: ABC 1D - Example 5: Solutions
Question 1: ABC Question 2: ABC |