5.5 solving polynomial equations part 1 1. factoring patterns 2
TRANSCRIPT
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5.5 Solving Polynomial EquationsPart 1
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2Factoring Patterns
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Perfect Cubes
1 8 27 64 125 216 343 512 729 1000
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• A. Factor the polynomial x
3 – 729. If the polynomial cannot be factored, write prime.
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What’s the first thing we do when we factor?
• Pull out the GCF!
Examples: Factor the expression.
• 1. 64h4 – 27h
• 2. x3 y + 343y
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• B. Factor the polynomial
24x
5 + 3x
2y
3. If the polynomial cannot be factored, write prime.
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• A. Factor the polynomial
a
2 + 3ay + 2ay
2 + 6y
3. If the polynomial cannot be factored, write prime.
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• B. Factor the polynomial
x
3 + 5x
2 – 4x – 20. If the polynomial cannot be factored, write prime.
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10You try!
• 1. Factor the polynomial d
3 + 2d
2 + 4d + 8. If the polynomial cannot be factored, write prime.
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11You try!
• 2. Factor the polynomial 64x
9 + 27y
5. If the polynomial cannot be factored, write prime.
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12You try!
• 3. Factor the polynomial r
3 + 4r2 – 9r – 36. If the polynomial cannot be factored, write prime.
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13You try!
• 4. Factor the polynomial 54x
5 + 128x
2y
3. If the polynomial cannot be factored, write prime.
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Solving Polynomial Equations
Algebra 2
5.5 Day 2
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Quadratic Form
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Quadratic Form
• It is like factoring a quadratic – just not second degree.
Examples:
1. x4 + 10x2 + 16 2. x4 – 6x2 – 27
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Quadratic Form
Examples:
3. 25x4 – 36 4. 4x6 – 20x4 + 24x2
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Solve polynomials by factoring
1. Put the polynomials in standard form
2. Factor as far as you can – starting with the GCF – be careful
3. Set all the factors with variables equal to zero
4. Solve these new equations
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Examples: Solve.
1. x2 + 2x = 0
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Examples: Solve.
2. 54x3 – 2 = 0
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Solve.
3. 3x3 + 7x2 = 12x 4. x3– 18 = - 2x2 + 9x
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Solve.
5. x 4 – 29x 2 + 100 = 0