Question
Solve the equation. (Enter your answers as a comma-separated list.) \[ p(p+1)=56 \] SUBMIT ANSWER
Ask by Brooks Cox. in the United States
Mar 10,2025
Upstudy AI Solution
Tutor-Verified Answer
Answer
The solutions are \(7, -8\).
Solution
We start with the equation
\[
p(p+1)=56.
\]
Expanding the left-hand side, we obtain
\[
p^2+p=56.
\]
Subtract \(56\) from both sides to rewrite the equation in standard quadratic form:
\[
p^2+p-56=0.
\]
Next, we factor the quadratic equation. We look for two numbers whose product is \(-56\) and sum is \(1\). These numbers are \(8\) and \(-7\), because
\[
8 \times (-7) = -56 \quad \text{and} \quad 8 + (-7) = 1.
\]
Thus, we can factor the quadratic as:
\[
(p+8)(p-7)=0.
\]
Setting each factor equal to zero gives the solutions:
\[
p+8=0 \quad \text{or} \quad p-7=0.
\]
Solving these, we find:
\[
p=-8 \quad \text{or} \quad p=7.
\]
So, the solutions are:
\[
7, -8.
\]
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Simplify this solution Extra Insights
To solve the equation \( p(p + 1) = 56 \), we can rearrange it into standard quadratic form: \[ p^2 + p - 56 = 0. \] Next, we can factor the quadratic equation. We look for two numbers that multiply to \(-56\) and add to \(1\). These numbers are \(8\) and \(-7\). Thus, we can factor the equation as: \[ (p + 8)(p - 7) = 0. \] Setting each factor equal to zero gives us the solutions: 1. \( p + 8 = 0 \) → \( p = -8 \) 2. \( p - 7 = 0 \) → \( p = 7 \) So, the solutions are: \(-8, 7\)
