Solve Using the Square Root Property (3x)(x-7)=0

Math
(3x)(x-7)=0
Divide each term in (3x)(x-7)=0 by 3.
(3x)(x-7)3=03
Cancel the common factor of 3.
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Cancel the common factor.
3x(x-7)3=03
Divide (x)(x-7) by 1.
(x)(x-7)=03
(x)(x-7)=03
Divide 0 by 3.
(x)(x-7)=0
If any individual factor on the left side of the equation is equal to 0, the entire expression will be equal to 0.
x=0
x-7=0
Set the first factor equal to 0.
x=0
Set the next factor equal to 0 and solve.
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Set the next factor equal to 0.
x-7=0
Add 7 to both sides of the equation.
x=7
x=7
The final solution is all the values that make (3x)(x-7)3=03 true.
x=0,7
Solve Using the Square Root Property (3x)(x-7)=0

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