-5(x%2B1%2Fx)%2B6%3D0.jpeg "(x2+1/x2)-5(x+1/x)+6=0")
Solving the Equation: (x² + 1/x²) - 5(x + 1/x) + 6 = 0
This equation might seem intimidating at first glance, but we can solve it by using a clever substitution and factoring. Here's how:
1. Substitution:
Let's make a substitution to simplify the equation. We can define:
y = x + 1/x
Now, let's square both sides of this equation:
y² = (x + 1/x)² = x² + 2(x)(1/x) + 1/x² = x² + 2 + 1/x²
Notice that we can rearrange this to get:
x² + 1/x² = y² - 2
2. Rewriting the Equation:
Substituting these expressions back into our original equation, we get:
(y² - 2) - 5y + 6 = 0
This simplifies to a quadratic equation:
y² - 5y + 4 = 0
3. Solving the Quadratic:
Now, we can easily factor this quadratic:
(y - 4)(y - 1) = 0
This gives us two possible solutions for y:
- y = 4
- y = 1
4. Finding x:
Now, we need to find the values of x that correspond to these values of y. Let's remember our substitution:
y = x + 1/x
For y = 4:
4 = x + 1/x
Multiplying both sides by x:
4x = x² + 1
Rearranging into a quadratic:
x² - 4x + 1 = 0
Using the quadratic formula, we get:
x = (4 ± √12)/2 = 2 ± √3
For y = 1:
1 = x + 1/x
Following a similar procedure as above, we get:
x² - x + 1 = 0
Again, using the quadratic formula, we get:
x = (1 ± √-3)/2 = (1 ± i√3)/2
where 'i' represents the imaginary unit (√-1).
Conclusion:
Therefore, the solutions to the equation (x² + 1/x²) - 5(x + 1/x) + 6 = 0 are:
- x = 2 + √3
- x = 2 - √3
- x = (1 + i√3)/2
- x = (1 - i√3)/2