Question
Use the quadratic equation x2−18x=−80
to answer the questions.
Part A: Suppose the equivalent quadratic equation is written x2−18x+c=−80+c
. What value of c makes the equation a perfect square trinomial?
Part B: Factor the perfect square trinomial, and rewrite the equation as (x−h)2=k
Part C: Solve the quadratic equation and find a solution to x. Enter the lesser number.
Part D: Solve the quadratic equation and find a solution to x. Enter the greater number.
to answer the questions.
Part A: Suppose the equivalent quadratic equation is written x2−18x+c=−80+c
. What value of c makes the equation a perfect square trinomial?
Part B: Factor the perfect square trinomial, and rewrite the equation as (x−h)2=k
Part C: Solve the quadratic equation and find a solution to x. Enter the lesser number.
Part D: Solve the quadratic equation and find a solution to x. Enter the greater number.
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To solve the problem, let's start by rewriting and analyzing the given quadratic equation.
The given quadratic equation is:
\[ x^2 - 18x = -80 \]
### Part A: Finding the value of c
To convert the expression \( x^2 - 18x + c = -80 + c \) into a perfect square trinomial, we can complete the square. The term \( c \) can be determined using the formula:
\[
c = \left( \frac{b}{2} \right)^2
\]
where \( b \) is the coefficient of \( x \) (in this case, \( -18 \)).
Calculating \( c \):
\[
b = -18 \implies \frac{b}{2} = \frac{-18}{2} = -9
\]
\[
c = (-9)^2 = 81
\]
Thus, the value of \( c \) that makes the equation a perfect square trinomial is **81**.
### Part B: Factor the perfect square trinomial
Insert the value of \( c \) back into the equation:
\[
x^2 - 18x + 81 = -80 + 81
\]
\[
x^2 - 18x + 81 = 1
\]
The left side can be factored as:
\[
(x - 9)^2 = 1
\]
### Part C: Solve the quadratic equation and find the lesser number
Now we need to solve \( (x - 9)^2 = 1 \). Taking the square root of both sides:
\[
x - 9 = \pm 1
\]
This leads to two equations:
1. \( x - 9 = 1 \)
2. \( x - 9 = -1 \)
Solving each equation gives:
1. \( x = 10 \)
2. \( x = 8 \)
Thus, the lesser number is **8**.
### Part D: Solve the quadratic equation and find the greater number
From the solutions above, the greater number is **10**.
### Summary of Answers:
- **Part A:** 81
- **Part B:** \((x - 9)^2 = 1\)
- **Part C:** 8
- **Part D:** 10
The given quadratic equation is:
\[ x^2 - 18x = -80 \]
### Part A: Finding the value of c
To convert the expression \( x^2 - 18x + c = -80 + c \) into a perfect square trinomial, we can complete the square. The term \( c \) can be determined using the formula:
\[
c = \left( \frac{b}{2} \right)^2
\]
where \( b \) is the coefficient of \( x \) (in this case, \( -18 \)).
Calculating \( c \):
\[
b = -18 \implies \frac{b}{2} = \frac{-18}{2} = -9
\]
\[
c = (-9)^2 = 81
\]
Thus, the value of \( c \) that makes the equation a perfect square trinomial is **81**.
### Part B: Factor the perfect square trinomial
Insert the value of \( c \) back into the equation:
\[
x^2 - 18x + 81 = -80 + 81
\]
\[
x^2 - 18x + 81 = 1
\]
The left side can be factored as:
\[
(x - 9)^2 = 1
\]
### Part C: Solve the quadratic equation and find the lesser number
Now we need to solve \( (x - 9)^2 = 1 \). Taking the square root of both sides:
\[
x - 9 = \pm 1
\]
This leads to two equations:
1. \( x - 9 = 1 \)
2. \( x - 9 = -1 \)
Solving each equation gives:
1. \( x = 10 \)
2. \( x = 8 \)
Thus, the lesser number is **8**.
### Part D: Solve the quadratic equation and find the greater number
From the solutions above, the greater number is **10**.
### Summary of Answers:
- **Part A:** 81
- **Part B:** \((x - 9)^2 = 1\)
- **Part C:** 8
- **Part D:** 10
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