SOLUTION: m^3+2m^2-3m=0 Solve each equation so Far i have M(M^2+2m-3)=0

Algebra.Com
Question 72957: m^3+2m^2-3m=0 Solve each equation so Far i have
M(M^2+2m-3)=0
Found 2 solutions by funmath, bucky:
Answer by funmath(2933)   (Show Source): You can put this solution on YOUR website!
m^3+2m^2-3m=0
M(M^2+2m-3)=0
Good start, now finish factoring.
m(m____)(m___)=0
fill the blanks with two integers that multiply to give you the last term, -3, but add to give you the middle coefficient, +2.
3*-1=-3 and 3+(-1)=+2
m(m+3)(m-1)=0
Set each factor equal to 0 and solve:
m=0 or m+3=0 or m-1=0
m=0 or m+3-3=0-3 or m-1+1=0+1
m=0 or m=-3 or m=1
Happy Calculating!!!!!
Answer by bucky(2189)   (Show Source): You can put this solution on YOUR website!
AMP Parsing Error of [m*(m^2+2m-3=0]: Invalid expression. Closing bracket expected =0 at /home/ichudov/project_locations/algebra.com/templates/Algebra/Expression.pm line 187. .
.
So far you are correct.
.
The next thing you can do is notice that the term can be factored. It
factors into .
.
Now you can return to your equation and substitute these factors for and
you will then have:
.

.
Notice that this equation will be true if any of the factors on the left side equals zero.
This is because a zero factor on the left side is a multiplier and it will make the whole
left side equal to zero which is also the right side. Therefore, with a zero factor the
equation is balanced because 0 equals 0 is the result.
.
So all you have to do is set each of the three factors equal to zero and solve for m.
.
The first factor is m and setting it equal to zero says: . This becomes one
of the answers.
.
The second factor is and setting it equal to zero results in: . You
can solve for m by subtracting +3 from both sides to get rid of the +3 on the left side.
When you subtract +3 from both sides you get and that is the second answer.
.
Finally, the third factor is and setting it equal to zero gives you the equation
. You can solve this equation for m by adding 1 to both sides to eliminate the
-1 on the left side. Adding +1 to both sides of this equation results in .
.
So the three possible answers for m are 0, -3, and +1. Each of these three can be substituted
back into the original equation given in the problem, and that equation will become
equal on both sides.
.
I hope this helps you understand the problem a little more. The hardest part of this problem
was to recognize that you could factor the quadratic terms and then to find the factors. It
takes a lot of practice to do this and you are well on your way to getting it. Keep up the
good work!
RELATED QUESTIONS

Solve each equation. m(3) + 2m(2) - 3m =... (answered by tutorcecilia)
44. m^3+2m^2-3m=0 (answered by stanbon,hayek)
m^3+2m^2-3m=0 (answered by jim_thompson5910)
Solve the equation with a repeated factor: m^3 + 2m^2 - 3m =... (answered by checkley75)
Solve. m³+ 2m² - 3m =... (answered by zeynep)
Solve for each variable Show me so I understand {{{(3)/(2m)-(6)/(2m+m^2)=... (answered by Boreal)
The directions say: Solve the equation. Check your solution. {{{2m/(m+4) = 3/(m-1)}}} (answered by stanbon,josmiceli)
M^2+2M=3 (answered by zoomkaboom4)
Please help me to solve as an equation with three solutions: m^3+2m^2-3m=0 Thank... (answered by Earlsdon)