Question
What value of b will cause the system to have an infinite number of solutions?
A system of equations. y equals 6 x plus b. negative 3 x plus StartFraction one-half EndFraction y equals negative 3.
A coordinate grid with a line labeled negative 3 x plus StartFraction one-half EndFraction y equals negative 3 and passes through the points (1, 0) and (0, negative 6).
-6
-3
3
6
A system of equations. y equals 6 x plus b. negative 3 x plus StartFraction one-half EndFraction y equals negative 3.
A coordinate grid with a line labeled negative 3 x plus StartFraction one-half EndFraction y equals negative 3 and passes through the points (1, 0) and (0, negative 6).
-6
-3
3
6
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine the value of \( b \) that will cause the system of equations to have an infinite number of solutions, we need to analyze the given equations:
1. The first equation is given as:
\[
y = 6x + b
\]
2. The second equation can be re-arranged. Given:
\[
-3x + \frac{1}{2}y = -3
\]
we can multiply all terms by 2 to eliminate the fraction:
\[
-6x + y = -6
\]
Rearranging this gives us:
\[
y = 6x - 6
\]
For the system to have an infinite number of solutions, the two equations must represent the same line. This will happen if their slopes and y-intercepts are the same.
From the equations, we can see that:
- The slope of the first equation \( y = 6x + b \) is \( 6 \) and its y-intercept is \( b \).
- The slope of the second equation \( y = 6x - 6 \) is also \( 6 \) and its y-intercept is \(-6\).
For the two lines to be the same, the y-intercepts must equal each other. Therefore, we set \( b \) equal to \(-6\):
\[
b = -6
\]
Thus, the value of \( b \) that will cause the system to have an infinite number of solutions is:
\[
\boxed{-6}
\]
1. The first equation is given as:
\[
y = 6x + b
\]
2. The second equation can be re-arranged. Given:
\[
-3x + \frac{1}{2}y = -3
\]
we can multiply all terms by 2 to eliminate the fraction:
\[
-6x + y = -6
\]
Rearranging this gives us:
\[
y = 6x - 6
\]
For the system to have an infinite number of solutions, the two equations must represent the same line. This will happen if their slopes and y-intercepts are the same.
From the equations, we can see that:
- The slope of the first equation \( y = 6x + b \) is \( 6 \) and its y-intercept is \( b \).
- The slope of the second equation \( y = 6x - 6 \) is also \( 6 \) and its y-intercept is \(-6\).
For the two lines to be the same, the y-intercepts must equal each other. Therefore, we set \( b \) equal to \(-6\):
\[
b = -6
\]
Thus, the value of \( b \) that will cause the system to have an infinite number of solutions is:
\[
\boxed{-6}
\]
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