Which are the solutions of x^2=19x+1?
The Correct Answer and Explanation is:
To solve the quadratic equation (x^2 = 19x + 1), we first rearrange it into standard form. Standard form for a quadratic equation is given by:
[
ax^2 + bx + c = 0
]
In our case, we can rewrite the equation as:
[
x^2 – 19x – 1 = 0
]
Here, (a = 1), (b = -19), and (c = -1). To find the solutions to this quadratic equation, we will use the quadratic formula:
[
x = \frac{{-b \pm \sqrt{{b^2 – 4ac}}}}{{2a}}
]
Substituting the values of (a), (b), and (c) into the formula, we first calculate the discriminant ((b^2 – 4ac)):
- Calculate (b^2):
[
b^2 = (-19)^2 = 361
]
- Calculate (4ac):
[
4ac = 4 \cdot 1 \cdot (-1) = -4
]
- Find the discriminant:
[
b^2 – 4ac = 361 – (-4) = 361 + 4 = 365
]
Now that we have the discriminant, we can substitute back into the quadratic formula:
[
x = \frac{{-(-19) \pm \sqrt{365}}}{{2 \cdot 1}} = \frac{{19 \pm \sqrt{365}}}{2}
]
Next, we calculate (\sqrt{365}). Approximating this value:
[
\sqrt{365} \approx 19.1
]
Now we substitute this approximation back into our formula:
[
x = \frac{{19 \pm 19.1}}{2}
]
This yields two possible solutions:
- (x_1 = \frac{{19 + 19.1}}{2} \approx \frac{38.1}{2} \approx 19.05)
- (x_2 = \frac{{19 – 19.1}}{2} \approx \frac{-0.1}{2} \approx -0.05)
Therefore, the solutions to the equation (x^2 = 19x + 1) are approximately:
[
x_1 \approx 19.05 \quad \text{and} \quad x_2 \approx -0.05
]
In conclusion, the solutions to the quadratic equation are (x \approx 19.05) and (x \approx -0.05).