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Identical expressions
- 5x(2x- six)(9x+ twelve)= zero
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Similar expressions
- 5x(2x-6)(9x-12)=0
- 5x(2x+6)(9x+12)=0
5x(2x-6)(9x+12)=0 equation
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The solution
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[src]
5*x*(2*x - 6)*(9*x + 12) = 0
$$5 x \left(2 x - 6\right) \left(9 x + 12\right) = 0$$
Detail solution
Given the equation:
$$5 x \left(2 x - 6\right) \left(9 x + 12\right) = 0$$
Because the right side of the equation is zero, then the solution of the equation is exists if at least one of the multipliers in the left side of the equation equal to zero.
We get the equations
$$5 x = 0$$
$$2 x - 6 = 0$$
$$9 x + 12 = 0$$
solve the resulting equation:
1.
$$5 x = 0$$
Divide both parts of the equation by 5
We get the answer: x1 = 0
2.
$$2 x - 6 = 0$$
Move free summands (without x)
from left part to right part, we given:
$$2 x = 6$$
Divide both parts of the equation by 2
We get the answer: x2 = 3
3.
$$9 x + 12 = 0$$
Move free summands (without x)
from left part to right part, we given:
$$9 x = -12$$
Divide both parts of the equation by 9
We get the answer: x3 = -4/3
The final answer:
$$x_{1} = 0$$
$$x_{2} = 3$$
$$x_{3} = - \frac{4}{3}$$
$$5 x \left(2 x - 6\right) \left(9 x + 12\right) = 0$$
Because the right side of the equation is zero, then the solution of the equation is exists if at least one of the multipliers in the left side of the equation equal to zero.
We get the equations
$$5 x = 0$$
$$2 x - 6 = 0$$
$$9 x + 12 = 0$$
solve the resulting equation:
1.
$$5 x = 0$$
Divide both parts of the equation by 5
x = 0 / (5)
We get the answer: x1 = 0
2.
$$2 x - 6 = 0$$
Move free summands (without x)
from left part to right part, we given:
$$2 x = 6$$
Divide both parts of the equation by 2
x = 6 / (2)
We get the answer: x2 = 3
3.
$$9 x + 12 = 0$$
Move free summands (without x)
from left part to right part, we given:
$$9 x = -12$$
Divide both parts of the equation by 9
x = -12 / (9)
We get the answer: x3 = -4/3
The final answer:
$$x_{1} = 0$$
$$x_{2} = 3$$
$$x_{3} = - \frac{4}{3}$$
Rapid solution
[src]
x1 = -4/3
$$x_{1} = - \frac{4}{3}$$
x2 = 0
$$x_{2} = 0$$
x3 = 3
$$x_{3} = 3$$
x3 = 3
Sum and product of roots
[src]
sum
3 - 4/3
$$- \frac{4}{3} + 3$$
=
5/3
$$\frac{5}{3}$$
product
0*(-4) ------*3 3
$$3 \frac{\left(-4\right) 0}{3}$$
=
0
$$0$$
0