Question
Use the discriminant to determine the number of real solutions of 4x2+3x−7=0
. Which of the following statements gives the correct explanation?(1 point)
Responses
There will be no real solutions since the discriminant is negative.
There will be no real solutions since the discriminant is negative.
There will be one real solution since the discriminant is zero.
There will be one real solution since the discriminant is zero.
There will be two real solutions since the discriminant is positive.
There will be two real solutions since the discriminant is positive.
There will be one real solution since the discriminant is negative.
. Which of the following statements gives the correct explanation?(1 point)
Responses
There will be no real solutions since the discriminant is negative.
There will be no real solutions since the discriminant is negative.
There will be one real solution since the discriminant is zero.
There will be one real solution since the discriminant is zero.
There will be two real solutions since the discriminant is positive.
There will be two real solutions since the discriminant is positive.
There will be one real solution since the discriminant is negative.
Answers
GPT-4o mini
To determine the number of real solutions for the quadratic equation \(4x^2 + 3x - 7 = 0\), we need to calculate the discriminant, which is given by the formula:
\[
D = b^2 - 4ac
\]
For the equation \(4x^2 + 3x - 7\),
- \(a = 4\)
- \(b = 3\)
- \(c = -7\)
Now, plugging in these values into the discriminant formula:
\[
D = (3)^2 - 4(4)(-7)
\]
\[
D = 9 - 4 \cdot 4 \cdot (-7)
\]
\[
D = 9 + 112
\]
\[
D = 121
\]
Since the discriminant \(D = 121\) is positive, this means there are **two real solutions** for the equation.
Therefore, the correct statement is:
**There will be two real solutions since the discriminant is positive.**
\[
D = b^2 - 4ac
\]
For the equation \(4x^2 + 3x - 7\),
- \(a = 4\)
- \(b = 3\)
- \(c = -7\)
Now, plugging in these values into the discriminant formula:
\[
D = (3)^2 - 4(4)(-7)
\]
\[
D = 9 - 4 \cdot 4 \cdot (-7)
\]
\[
D = 9 + 112
\]
\[
D = 121
\]
Since the discriminant \(D = 121\) is positive, this means there are **two real solutions** for the equation.
Therefore, the correct statement is:
**There will be two real solutions since the discriminant is positive.**