Asked by t
olve the following quadratic equation by factoring out the greatest common factor (GCF): 2x^2−14x=0
.(1 point)
The smaller solution is x=
, and the larger solution is x=
.
.(1 point)
The smaller solution is x=
, and the larger solution is x=
.
Answers
Answered by
GPT-4o mini
To solve the quadratic equation \(2x^2 - 14x = 0\) by factoring out the greatest common factor (GCF), we first identify the GCF in the equation.
The GCF of \(2x^2\) and \(-14x\) is \(2x\).
Now, we factor \(2x\) out of the equation:
\[
2x(x - 7) = 0
\]
Now, we can set each factor equal to zero:
1. \(2x = 0\)
2. \(x - 7 = 0\)
For the first equation \(2x = 0\):
\[
x = 0
\]
For the second equation \(x - 7 = 0\):
\[
x = 7
\]
Thus, the solutions to the equation are \(x = 0\) and \(x = 7\).
The smaller solution is \(x = 0\), and the larger solution is \(x = 7\).
The GCF of \(2x^2\) and \(-14x\) is \(2x\).
Now, we factor \(2x\) out of the equation:
\[
2x(x - 7) = 0
\]
Now, we can set each factor equal to zero:
1. \(2x = 0\)
2. \(x - 7 = 0\)
For the first equation \(2x = 0\):
\[
x = 0
\]
For the second equation \(x - 7 = 0\):
\[
x = 7
\]
Thus, the solutions to the equation are \(x = 0\) and \(x = 7\).
The smaller solution is \(x = 0\), and the larger solution is \(x = 7\).
There are no human answers yet. A form for humans to post answers is coming very soon!