QUESTION IMAGE
Question
describe the end behavior of each function.
- $f(x)=x^2 - 8x + 15$ 2) $f(x)=-x^3 + 4x^2 - 7$
simplify each expression.
- $(12r + 10r^2 + 9r^5)+(r + 6r^2)$ 4) $(14x^2 - 14x^4 - 11x)-(13x^2 + 4x^4)$
find each product.
- $(2 - 3x)^2$ 6) $(2x - 6)(2x + 6)$
- $(8a^2 + 8a - 1)(8a^2 + 6a + 6)$ 8) $(-3n^2 - 2n - 8)(-6n^2 + 2n - 4)$
expand completely.
- $(y + x)^4$ 10) $(y - 3x)^3$
evaluate each function using synthetic division at the given value.
- $f(n)=-5n^4 - 28n^3 + 13n^2 + 7n - 2$ at $n = -6$
- $f(n)=n^4 + 3n^3 + 5n^2 + 5n - 12$ at $n = -2$
factor each completely.
- $r^2 - 4$ 14) $27n^2 + 18n + 3$
- $6r^3 - 5r^2 - 12r + 10$ 16) $4b^3 - 4b^2 - 360b$
- $6a^3 - 30a^2 + 36a$ 18) $x^3 + 13x^2 + 36x$
divide. use long division use synthetic
- $(x^3 - 10x^2 + 7x)÷(x - 1)$ 20) $(n^3 - 4n^2 + 9)÷(n - 4)$
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1) End Behavior of $f(x)=x^2-8x+15$
Step1: Identify degree and leading coeff.
Degree = 2 (even), Leading coefficient = 1 (positive)
Step2: Define end behavior
As $x\to+\infty$, $f(x)\to+\infty$; As $x\to-\infty$, $f(x)\to+\infty$
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2) End Behavior of $f(x)=-x^3+4x^2-7$
Step1: Identify degree and leading coeff.
Degree = 3 (odd), Leading coefficient = -1 (negative)
Step2: Define end behavior
As $x\to+\infty$, $f(x)\to-\infty$; As $x\to-\infty$, $f(x)\to+\infty$
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3) Simplify $(12r+10r^2+9r^5)+(r+6r^2)$
Step1: Combine like terms
$9r^5 + (10r^2+6r^2) + (12r+r)$
Step2: Calculate sums
$9r^5 + 16r^2 + 13r$
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4) Simplify $(14x^2-14x^4-11x)-(13x^2+4x^4)$
Step1: Distribute negative sign
$14x^2-14x^4-11x-13x^2-4x^4$
Step2: Combine like terms
$(-14x^4-4x^4)+(14x^2-13x^2)-11x$
Step3: Calculate sums
$-18x^4 + x^2 - 11x$
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5) Find product $(2-3x)^2$
Step1: Apply square of difference
$(a-b)^2=a^2-2ab+b^2$, $a=2, b=3x$
Step2: Expand and simplify
$2^2 - 2(2)(3x) + (3x)^2 = 4 - 12x + 9x^2$
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6) Find product $(2x-6)(2x+6)$
Step1: Apply difference of squares
$(a-b)(a+b)=a^2-b^2$, $a=2x, b=6$
Step2: Expand and simplify
$(2x)^2 - 6^2 = 4x^2 - 36$
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7) Find product $(8a^2+8a-1)(8a^2+6a+6)$
Step1: Distribute each term
$8a^2(8a^2+6a+6)+8a(8a^2+6a+6)-1(8a^2+6a+6)$
Step2: Expand each term
$64a^4+48a^3+48a^2+64a^3+48a^2+48a-8a^2-6a-6$
Step3: Combine like terms
$64a^4+(48a^3+64a^3)+(48a^2+48a^2-8a^2)+(48a-6a)-6$
Step4: Calculate sums
$64a^4 + 112a^3 + 88a^2 + 42a - 6$
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8) Find product $(-3n^2-2n-8)(-6n^2+2n-4)$
Step1: Distribute each term
$-3n^2(-6n^2+2n-4)-2n(-6n^2+2n-4)-8(-6n^2+2n-4)$
Step2: Expand each term
$18n^4-6n^3+12n^2+12n^3-4n^2+8n+48n^2-16n+32$
Step3: Combine like terms
$18n^4+(-6n^3+12n^3)+(12n^2-4n^2+48n^2)+(8n-16n)+32$
Step4: Calculate sums
$18n^4 + 6n^3 + 56n^2 - 8n + 32$
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9) Expand $(y+x)^4$
Step1: Apply binomial theorem
$(a+b)^4=a^4+4a^3b+6a^2b^2+4ab^3+b^4$, $a=y, b=x$
Step2: Substitute and expand
$y^4 + 4y^3x + 6y^2x^2 + 4yx^3 + x^4$
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10) Expand $(y-3x)^3$
Step1: Apply binomial theorem
$(a-b)^3=a^3-3a^2b+3ab^2-b^3$, $a=y, b=3x$
Step2: Substitute and expand
$y^3 - 3y^2(3x) + 3y(3x)^2 - (3x)^3$
Step3: Simplify terms
$y^3 - 9y^2x + 27yx^2 - 27x^3$
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11) Evaluate $f(n)=-5n^4-28n^3+13n^2+7n-2$ at $n=-6$ (Synthetic Division)
Step1: List coefficients and root
Coefficients: $-5, -28, 13, 7, -2$; Root: $-6$
Step2: Perform synthetic division
-6 | -5 -28 13 7 -2
30 -12 -6 -6
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-5 2 1 1 -8Step3: Identify remainder (function value)
Remainder = $-8$
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12) Evaluate $f(n)=n^4+3n^3+5n^2+5n-12$ at $n=-2$ (Synthetic Division)
Step1: List coefficients and root
Coefficients: $1, 3, 5, 5, -12$; Root: $-2$
Step2: Perform synthetic division
-2 | 1 3 5 5 -12
-2 -2 -6 2
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1 1 3 -1 -10Step3: Identify remainder (function value)
Remainder = $-10$
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13) Factor $r^2-4$
Step1: Apply difference of squares
$a^2-b^2=(a-b)(a+b)$, $a=r, b=2$
Step2: Write factored form
$(r-2)(r+2)$
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14) Factor $27n^2+18n+3$
Step1: Factor out GCF (3)
$3(9n^2+6n+1)$
Step2: Factor quadratic
$9n^2+6n+1=(3n+1)^2$
Step3: Write final form
$3(3n+1)^2$
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15) Factor $6r^3-5r^2-12r+10$
Step1: Group terms
$(6r^3-5r^2)+(-12r+10)$
Step2: Factor GCF from groups
$r^2(6r-5)-2(6r-5)$
Step3: Factor common binomial
$(r^2-2)(6r-5)$
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16) Factor $4b^3-4b^2-360b$
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