2(y² – 6y)² – 8(y² – 6y + 3) – 40 = 0

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Solution

Given: 2(y² – 6y)² – 8(y² – 6y + 3) – 40 = 0
Let y² – 6y = m. Then, the equation can be written as:
2m² – 8(m + 3) – 40 = 0
$\Rightarrow$ 2m² – 8m – 24 – 40 = 0
$\Rightarrow$ 2m² – 8m – 64 = 0
$\Rightarrow$ 2(m² – 4m– 32) = 0
$\Rightarrow$ m² – 4m – 32 = 0
On splitting the middle term –4m as 4m – 8m, we get:
m² + 4m – 8m – 32 = 0
$\Rightarrow$ m( m + 4) – 8( m + 4) = 0
$\Rightarrow$ ( m – 8)( m + 4) = 0
$\Rightarrow$ m – 8 = 0 or m + 4 = 0
$\Rightarrow$ m = 8 or m = –4
On substituting m = y² – 6y, we get:
y² – 6y = 8 or y²– 6y = –4
$\Rightarrow$ y² – 6y – 8 = 0…(1) or y² – 6y + 4 = 0…(2)
Now, from equation (1), we get:
y²– 6y – 8 = 0
On using a quadratic formula, we get:
$y = \frac{- (- 6) \pm \sqrt{{(- 6)}^{2} - 4 (1) (- 8)}}{2 (1)} = \frac{6 \pm \sqrt{36 + 32}}{2} = \frac{6 \pm \sqrt{68}}{2} = \frac{6 \pm 2 \sqrt{17}}{2} = 3 \pm \sqrt{17} Now, from equation (2), we get : y^{2} - 6 y + 4 = 0 On using the quadratic formula, we get : y = \frac{- (- 6) \pm \sqrt{{(- 6)}^{2} - 4 (1) (4)}}{2 (1)} = \frac{6 \pm \sqrt{36 - 16}}{2} = \frac{6 \pm \sqrt{20}}{2} = \frac{6 \pm 2 \sqrt{5}}{2} = 3 \pm \sqrt{5} Thus the solutions of the given equation are y = 3 \pm \sqrt{17}, 3 \pm \sqrt{5} .$

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