QUESTION IMAGE
Question
- $x^{3}+27$
- $x^{3}-125$
- $125x^{3}-y^{3}$
- $27x^{3}+64$
- $x^{3}-216y^{3}$
- $27x^{3}+y^{3}$
- $3x^{4}+192x$
- $16x^{5}-54x^{2}$
Step1: Sum of cubes formula: $a^3+b^3=(a+b)(a^2-ab+b^2)$; Difference of cubes formula: $a^3-b^3=(a-b)(a^2+ab+b^2)$
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Problem 1: $x^3+27$
Step1: Rewrite as sum of cubes
$x^3+3^3$
Step2: Apply sum of cubes formula
$(x+3)(x^2-3x+9)$
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Problem 3: $x^3-125$
Step1: Rewrite as difference of cubes
$x^3-5^3$
Step2: Apply difference of cubes formula
$(x-5)(x^2+5x+25)$
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Problem 5: $125x^3-y^3$
Step1: Rewrite as difference of cubes
$(5x)^3-y^3$
Step2: Apply difference of cubes formula
$(5x-y)(25x^2+5xy+y^2)$
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Problem 7: $27x^3+64$
Step1: Rewrite as sum of cubes
$(3x)^3+4^3$
Step2: Apply sum of cubes formula
$(3x+4)(9x^2-12x+16)$
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Problem 9: $x^3-216y^3$
Step1: Rewrite as difference of cubes
$x^3-(6y)^3$
Step2: Apply difference of cubes formula
$(x-6y)(x^2+6xy+36y^2)$
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Problem 11: $27x^3+y^3$
Step1: Rewrite as sum of cubes
$(3x)^3+y^3$
Step2: Apply sum of cubes formula
$(3x+y)(9x^2-3xy+y^2)$
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Problem 13: $3x^4+192x$
Step1: Factor out GCF $3x$
$3x(x^3+64)$
Step2: Rewrite as sum of cubes
$3x(x^3+4^3)$
Step3: Apply sum of cubes formula
$3x(x+4)(x^2-4x+16)$
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Problem 15: $16x^5-54x^2$
Step1: Factor out GCF $2x^2$
$2x^2(8x^3-27)$
Step2: Rewrite as difference of cubes
$2x^2((2x)^3-3^3)$
Step3: Apply difference of cubes formula
$2x^2(2x-3)(4x^2+6x+9)$
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- $\boldsymbol{(x+3)(x^2-3x+9)}$
- $\boldsymbol{(x-5)(x^2+5x+25)}$
- $\boldsymbol{(5x-y)(25x^2+5xy+y^2)}$
- $\boldsymbol{(3x+4)(9x^2-12x+16)}$
- $\boldsymbol{(x-6y)(x^2+6xy+36y^2)}$
- $\boldsymbol{(3x+y)(9x^2-3xy+y^2)}$
- $\boldsymbol{3x(x+4)(x^2-4x+16)}$
- $\boldsymbol{2x^2(2x-3)(4x^2+6x+9)}$