Assignment: find \( \frac{d z}{d x} \) and \( \frac{d z}{d y} \) for the following: \( 1-z=(4 x-2 y)(3 x+5 y) \) \( 2-\frac{5 x+y}{x-2 y} \)

To find \( \frac{dz}{dx} \) and \( \frac{dz}{dy} \) for the equations provided, we can use implicit differentiation for both equations. Starting with the first equation: \[ 1 - z = (4x - 2y)(3x + 5y) \] ### Step 1: Differentiate implicitly with respect to \( x \) Differentiating both sides, we have: \[ -\frac{dz}{dx} = \frac{d}{dx}[(4x - 2y)(3x + 5y)] \] Using the product rule on the right-hand side: \[ \frac{d}{dx}[(4x - 2y)(3x + 5y)] = (4)(3x + 5y) + (4x - 2y)(3) \frac{dy}{dx} \] Combining these results gives: \[ -\frac{dz}{dx} = 12x + 20y + (4x - 2y)(3) \frac{dy}{dx} \] Thus, we can express \( \frac{dz}{dx} \) as: \[ \frac{dz}{dx} = - \left( 12x + 20y + (4x - 2y) \cdot 3 \frac{dy}{dx} \right) \] ### Step 2: Differentiate implicitly with respect to \( y \) Next, differentiate the same equation with respect to \( y \): \[ -\frac{dz}{dy} = \frac{d}{dy}[(4x - 2y)(3x + 5y)] \] Again, using the product rule: \[ \frac{d}{dy}[(4x - 2y)(3x + 5y)] = (-2)(3x + 5y) + (4x - 2y)(5) \] This yields: \[ -\frac{dz}{dy} = -6x - 10y + 5(4x - 2y) \] Thus, \[ \frac{dz}{dy} = 6x + 10y - 5(4x - 2y) \] Now let's simplify: \[ \frac{dz}{dy} = 6x + 10y - 20x + 10y \] \[ \frac{dz}{dy} = -14x + 20y \] ### Final Results So, the derivatives are: \[ \frac{dz}{dx} = - \left( 12x + 20y + (4x - 2y) \cdot 3 \frac{dy}{dx} \right) \] \[ \frac{dz}{dy} = 6x + 10y - 5(4x - 2y) = -14x + 20y \]