To solve the equation 9x4 + 2x2 + 7 = 0 using u substitution, we first let u = x2. This gives us:
9u2 + 2u + 7 = 0
This is a quadratic equation in terms of u. We can use the quadratic formula, u = (-b ± √(b2 – 4ac)) / 2a, where a = 9, b = 2, and c = 7.
Calculating the discriminant:
b2 – 4ac = 22 – 4(9)(7) = 4 – 252 = -248
Since the discriminant is negative, there are no real solutions for u. However, we can find complex solutions:
u = (-2 ± √(-248)) / (2 * 9)
Calculation of the square root of -248 gives us:
√(-248) = √248 * i = √(4 * 62) * i = 2√62 * i
Plugging this back into our equation for u:
u = (-2 ± 2√62 * i) / 18 = -1/9 ± √62 * i / 9
Now, recall that we let u = x2. Thus, we have:
x2 = -1/9 ± √62 * i / 9
To find x, we take the square root of both sides:
x = ±√(-1/9 ± √62 * i / 9)
This means that there are complex solutions for x, and they can be expressed as:
x = ±(1/3)√(1 ± √62 * i)
Thus, the solutions to the original equation in terms of complex numbers are:
x = ±(1/3)√(1 + √62 * i) and x = ±(1/3)√(1 – √62 * i).