Worksheets — Set 20
Algebra II · Honors · Sequences, series, and summation
Print and write your answers. Use diagrams to show thinking.
Warm-up
1. Factor completely: x² − 576 = ___ 2. Rewrite x² + 48x + 30 in square form: ___ 3. Interpret the structure of: 23(x + 1)² − 25
_See printable PDF for diagram._
Written practice
1. Factor completely: x² − 529 = ___ 2. Rewrite x² + 46x + 29 in square form: ___ 3. Interpret the structure of: 22(x + 1)² − 24 4. Which form reveals zeros? (A) standard (B) factored — letter: ___ 5. Complete the square for x² + 24x + ___ 6. Simplify: √(x² + 40x + 400) for x ≥ 0 = ___ 7. Factor completely: x² − 676 = ___ 8. Rewrite x² + 52x + 32 in square form: ___
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More written practice
1. Interpret the structure of: 25(x + 1)² − 27 2. Complete the square for x² + 27x + ___ 3. Simplify: √(x² + 46x + 529) for x ≥ 0 = ___ 4. Factor completely: x² − 841 = ___ 5. Rewrite x² + 58x + 35 in square form: ___ 6. Interpret the structure of: 28(x + 1)² − 30
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Patterns and rules
1. Factor completely: x² − 1600 = ___ 2. Rewrite x² + 80x + 46 in square form: ___ 3. Interpret the structure of: 39(x + 1)² − 41
_See printable PDF for diagram._
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Stretch
1. Factor completely: x² − 2304 = ___ 2. Rewrite x² + 96x + 54 in square form: ___
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Parent tip: Look for common factors and special patterns