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Using factoring, which values are the solutions to the quadratic equation 2m2+7m−30=0? A: m = - 10 or m = 3^2 B: m = -6 or m = 5^2 C: m = -5 or m = 3 D: m = 6 or m = -5^2
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Using factoring, which values are the solutions to the quadratic equation 2m2+7m−30=0?

A: m = - 10 or m = 3^2
B: m = -6 or m = 5^2
C: m = -5 or m = 3
D: m = 6 or m = -5^2

User Jaskiratjd
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2.9k points

2 Answers

15 votes
15 votes

Answer:


\sf B. \quad m=-6 \quad or \quad m=(5)/(2)

Step-by-step explanation:

Given equation:


\sf 2m^2+7m-30=0

Factor:


\implies \sf 2m^2+12m-5m-30=0


\implies \sf 2m(m+6)-5(m+6)=0


\implies \sf (2m-5)(m+6)=0

Therefore:


\implies \sf 2m-5=0 \implies m=(5)/(2)


\implies \sf m+6=0 \implies m=-6

Therefore, the solutions are:


\sf m=-6 \quad or \quad m=(5)/(2)

User Zulander
by
2.9k points
11 votes
11 votes

Answer:

B: m = -6 or m = 5/2

Step-by-step explanation:


\rightarrow \sf 2m^2 +7m - 30 = 0

breakdown


\rightarrow \sf 2m^2 +12m -5m- 30 = 0

take out common factor


\rightarrow \sf 2m(m +6) -5(m+ 6) = 0

collect into groups


\rightarrow \sf (2m -5)(m+ 6) = 0

set to zero


\rightarrow \sf 2m -5=0, \ m+ 6 = 0

change sides


\rightarrow \sf m=2.5, \ m= -6

User Perspectivus
by
3.5k points
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