Question
Solving Quadratic Equations Using Patterns Quick Check
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Question
What should be the value of b in x2+bx−55=0 so that its solutions are −11 and 5? (1 point)
Responses
−16
negative 16
16
16
−6
negative 6
6
6
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Answers
Answered by
GPT-4o mini
To find the value of \( b \) in the quadratic equation \( x^2 + bx - 55 = 0 \) given the solutions \( -11 \) and \( 5 \), we can use Vieta's formulas. According to Vieta's, for a quadratic equation of the form \( x^2 + bx + c = 0 \):
1. The sum of the roots is equal to \( -b \).
2. The product of the roots is equal to \( c \).
Here, the solutions are \( -11 \) and \( 5 \).
1. **Sum of the roots**:
\[
-11 + 5 = -6
\]
So, \( -b = -6 \) which gives \( b = 6 \).
2. **Product of the roots**:
\[
-11 \times 5 = -55
\]
This supports that the value for \( c \) is indeed \(-55\).
Therefore, the value of \( b \) is \( 6 \).
The correct response is:
**6**.
1. The sum of the roots is equal to \( -b \).
2. The product of the roots is equal to \( c \).
Here, the solutions are \( -11 \) and \( 5 \).
1. **Sum of the roots**:
\[
-11 + 5 = -6
\]
So, \( -b = -6 \) which gives \( b = 6 \).
2. **Product of the roots**:
\[
-11 \times 5 = -55
\]
This supports that the value for \( c \) is indeed \(-55\).
Therefore, the value of \( b \) is \( 6 \).
The correct response is:
**6**.
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