Question
Graphs of Quadratic Equations Quick Check
2 of 52 of 5 Items
Question
Given the table of values, complete the table for the quadratic equation y=−6x2+3x+8
y
=
−
6
x
2
+
3
x
+
8
to find the values of the high or low point of the parabola.
x y
−1
−
1
−1
−
1
−0.75
−
0.75
2.375
−0.5
−
0.5
5
−0.25
−
0.25
0 8
0.25 8.375
0.5
0.75
1 5
Which of the following is correct?
(1 point)
Responses
(−1,−1)
(
−
1
,
−
1
)
is the low point on the parabola.
left parenthesis negative 1 comma negative 1 right parenthesis is the low point on the parabola.
(0.25,8.375)
(
0.25
,
8.375
)
is the low point on the parabola.
left parenthesis 0.25 comma 8.375 right parenthesis is the low point on the parabola.
(0.5,9)
(
0.5
,
9
)
is the high point on the parabola.
left parenthesis 0.5 comma 9 right parenthesis is the high point on the parabola.
(0.25,8.375)
(
0.25
,
8.375
)
is the high point on the parabola.
2 of 52 of 5 Items
Question
Given the table of values, complete the table for the quadratic equation y=−6x2+3x+8
y
=
−
6
x
2
+
3
x
+
8
to find the values of the high or low point of the parabola.
x y
−1
−
1
−1
−
1
−0.75
−
0.75
2.375
−0.5
−
0.5
5
−0.25
−
0.25
0 8
0.25 8.375
0.5
0.75
1 5
Which of the following is correct?
(1 point)
Responses
(−1,−1)
(
−
1
,
−
1
)
is the low point on the parabola.
left parenthesis negative 1 comma negative 1 right parenthesis is the low point on the parabola.
(0.25,8.375)
(
0.25
,
8.375
)
is the low point on the parabola.
left parenthesis 0.25 comma 8.375 right parenthesis is the low point on the parabola.
(0.5,9)
(
0.5
,
9
)
is the high point on the parabola.
left parenthesis 0.5 comma 9 right parenthesis is the high point on the parabola.
(0.25,8.375)
(
0.25
,
8.375
)
is the high point on the parabola.
Answers
GPT-4o mini
To find the high or low point of the parabola represented by the quadratic equation \( y = -6x^2 + 3x + 8 \), we need to determine whether the vertex of the parabola is a maximum (high point) or minimum (low point).
The vertex \( x \)-coordinate for a quadratic equation in the form \( y = ax^2 + bx + c \) is given by the formula:
\[
x = -\frac{b}{2a}
\]
In this equation:
- \( a = -6 \)
- \( b = 3 \)
Calculating the \( x \)-coordinate of the vertex:
\[
x = -\frac{3}{2(-6)} = -\frac{3}{-12} = \frac{1}{4} = 0.25
\]
Next, we substitute \( x = 0.25 \) back into the equation to find the corresponding \( y \)-value:
\[
y = -6(0.25)^2 + 3(0.25) + 8
\]
Calculating each term:
1. \( (0.25)^2 = 0.0625 \)
2. \( -6 \cdot 0.0625 = -0.375 \)
3. \( 3 \cdot 0.25 = 0.75 \)
Putting it all together:
\[
y = -0.375 + 0.75 + 8 = 0.375 + 8 = 8.375
\]
Thus, the vertex is \( (0.25, 8.375) \), and since \( a < 0 \) (the parabola opens downward), this point is the **high point** of the parabola.
Based on the available choices, the correct response is:
**(0.25, 8.375) is the high point on the parabola.**
The vertex \( x \)-coordinate for a quadratic equation in the form \( y = ax^2 + bx + c \) is given by the formula:
\[
x = -\frac{b}{2a}
\]
In this equation:
- \( a = -6 \)
- \( b = 3 \)
Calculating the \( x \)-coordinate of the vertex:
\[
x = -\frac{3}{2(-6)} = -\frac{3}{-12} = \frac{1}{4} = 0.25
\]
Next, we substitute \( x = 0.25 \) back into the equation to find the corresponding \( y \)-value:
\[
y = -6(0.25)^2 + 3(0.25) + 8
\]
Calculating each term:
1. \( (0.25)^2 = 0.0625 \)
2. \( -6 \cdot 0.0625 = -0.375 \)
3. \( 3 \cdot 0.25 = 0.75 \)
Putting it all together:
\[
y = -0.375 + 0.75 + 8 = 0.375 + 8 = 8.375
\]
Thus, the vertex is \( (0.25, 8.375) \), and since \( a < 0 \) (the parabola opens downward), this point is the **high point** of the parabola.
Based on the available choices, the correct response is:
**(0.25, 8.375) is the high point on the parabola.**