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Question
- $x^2 + 2x - 24$
- $m^2 - 5m - 50$
- $u^2 - 10u - 56$
- $v^2 - 11v - 42$
- $a^2 + 9a - 70$
- $x^2 - 2x - 8$
- $v^2 - v - 12$
- $k^2 - 6k - 72$
- $x^2 + 5x - 6$
- $n^2 + n - 72$
- (partially obscured, likely a quadratic) - 24
- $p^2 - p - 20$
- $r^2 + 6r - 55$
- $a^2 + 2a - 8$
All problems require factoring quadratic trinomials of the form $x^2+bx+c$, which means finding two numbers that multiply to $c$ and add to $b$, then writing the trinomial as $(x+m)(x+n)$ where $m$ and $n$ are those two numbers.
17) Factor $x^2+2x-24$
Step1: Find pair: sum=2, product=-24
Numbers are $6$ and $-4$ (since $6+(-4)=2$, $6\times(-4)=-24$)
Step2: Write factored form
$(x+6)(x-4)$
18) Factor $m^2-5m-50$
Step1: Find pair: sum=-5, product=-50
Numbers are $5$ and $-10$ (since $5+(-10)=-5$, $5\times(-10)=-50$)
Step2: Write factored form
$(m+5)(m-10)$
19) Factor $u^2-10u-56$
Step1: Find pair: sum=-10, product=-56
Numbers are $4$ and $-14$ (since $4+(-14)=-10$, $4\times(-14)=-56$)
Step2: Write factored form
$(u+4)(u-14)$
20) Factor $v^2-11v-42$
Step1: Find pair: sum=-11, product=-42
Numbers are $3$ and $-14$ (since $3+(-14)=-11$, $3\times(-14)=-42$)
Step2: Write factored form
$(v+3)(v-14)$
21) Factor $a^2+9a-70$
Step1: Find pair: sum=9, product=-70
Numbers are $14$ and $-5$ (since $14+(-5)=9$, $14\times(-5)=-70$)
Step2: Write factored form
$(a+14)(a-5)$
22) Factor $x^2-2x-8$
Step1: Find pair: sum=-2, product=-8
Numbers are $2$ and $-4$ (since $2+(-4)=-2$, $2\times(-4)=-8$)
Step2: Write factored form
$(x+2)(x-4)$
23) Factor $v^2-v-12$
Step1: Find pair: sum=-1, product=-12
Numbers are $3$ and $-4$ (since $3+(-4)=-1$, $3\times(-4)=-12$)
Step2: Write factored form
$(v+3)(v-4)$
24) Factor $k^2-6k-72$
Step1: Find pair: sum=-6, product=-72
Numbers are $6$ and $-12$ (since $6+(-12)=-6$, $6\times(-12)=-72$)
Step2: Write factored form
$(k+6)(k-12)$
25) Factor $x^2+5x-6$
Step1: Find pair: sum=5, product=-6
Numbers are $6$ and $-1$ (since $6+(-1)=5$, $6\times(-1)=-6$)
Step2: Write factored form
$(x+6)(x-1)$
26) Factor $n^2+n-72$
Step1: Find pair: sum=1, product=-72
Numbers are $9$ and $-8$ (since $9+(-8)=1$, $9\times(-8)=-72$)
Step2: Write factored form
$(n+9)(n-8)$
28) Factor $p^2-p-20$
Step1: Find pair: sum=-1, product=-20
Numbers are $4$ and $-5$ (since $4+(-5)=-1$, $4\times(-5)=-20$)
Step2: Write factored form
$(p+4)(p-5)$
29) Factor $r^2+6r-55$
Step1: Find pair: sum=6, product=-55
Numbers are $11$ and $-5$ (since $11+(-5)=6$, $11\times(-5)=-55$)
Step2: Write factored form
$(r+11)(r-5)$
30) Factor $a^2+2a-8$
Step1: Find pair: sum=2, product=-8
Numbers are $4$ and $-2$ (since $4+(-2)=2$, $4\times(-2)=-8$)
Step2: Write factored form
$(a+4)(a-2)$
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- $(x+6)(x-4)$
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- $(x+2)(x-4)$
- $(v+3)(v-4)$
- $(k+6)(k-12)$
- $(x+6)(x-1)$
- $(n+9)(n-8)$
- $(p+4)(p-5)$
- $(r+11)(r-5)$
- $(a+4)(a-2)$