Transform the equation `x^(2)-3xy+11x-12y+36=0` to parallel axes through the point (-4, 1) becomes `ax^(2)+bxy+1=0` then `b^(2)-a=`

To solve the equation \( x^2 - 3xy + 11x - 12y + 36 = 0 \) and transform it to parallel axes through the point (-4, 1), we will follow these steps: ### Step 1: Change of Variables We will make a change of variables to shift the origin to the point (-4, 1). Let: \[ x = X - 4 \quad \text{and} \quad y = Y + 1 \] ### Step 2: Substitute the New Variables Substituting \( x \) and \( y \) into the original equation: \[ (X - 4)^2 - 3(X - 4)(Y + 1) + 11(X - 4) - 12(Y + 1) + 36 = 0 \] ### Step 3: Expand the Equation Now we will expand each term: 1. \( (X - 4)^2 = X^2 - 8X + 16 \) 2. \( -3(X - 4)(Y + 1) = -3(XY + X - 4Y - 4) = -3XY - 3X + 12Y + 12 \) 3. \( 11(X - 4) = 11X - 44 \) 4. \( -12(Y + 1) = -12Y - 12 \) Putting it all together: \[ X^2 - 8X + 16 - 3XY - 3X + 12Y + 12 + 11X - 44 - 12Y - 12 + 36 = 0 \] ### Step 4: Combine Like Terms Now we will combine all like terms: \[ X^2 + (-8X - 3X + 11X) + (12Y - 12Y) + (16 + 12 - 44 - 12 + 36) - 3XY = 0 \] This simplifies to: \[ X^2 + 0X - 3XY + 8 = 0 \] or \[ X^2 - 3XY + 8 = 0 \] ### Step 5: Divide by 8 To put the equation in the form \( aX^2 + bXY + 1 = 0 \), we divide the entire equation by 8: \[ \frac{1}{8}X^2 - \frac{3}{8}XY + 1 = 0 \] ### Step 6: Identify Coefficients From the equation \( \frac{1}{8}X^2 - \frac{3}{8}XY + 1 = 0 \), we can identify: - \( a = \frac{1}{8} \) - \( b = -\frac{3}{8} \) ### Step 7: Calculate \( b^2 - a \) Now we need to calculate \( b^2 - a \): \[ b^2 = \left(-\frac{3}{8}\right)^2 = \frac{9}{64} \] \[ b^2 - a = \frac{9}{64} - \frac{1}{8} \] To subtract these fractions, we convert \( \frac{1}{8} \) to a fraction with a denominator of 64: \[ \frac{1}{8} = \frac{8}{64} \] Thus, \[ b^2 - a = \frac{9}{64} - \frac{8}{64} = \frac{1}{64} \] ### Final Answer The value of \( b^2 - a \) is: \[ \frac{1}{64} \]