Consider a Cobb-Douglas production function for rice with Q = 200 K0.25 0.75 where Q = number of rice produced in cavan : K = the land area in ha covered with the crop ; L = number of employed workers during the 3-month production period (16 days work) For production cost, the following is set: r = average rent/hectare of agricultural land; W= daily wage rate/person; C = total production cost 1. Solve for the input demand functions, where each kg of tomato is sold at p 2. Solve for the output supply function 3. Solve for the indirect profit function 4. Solve for the conditional input demand functions 5. Solve for the indirect cost function 6. Upon consolidating the expenses, land rent is at P3,900 and daily wage is at P350. With a capital of P56,000 for 3 months. The selling price of rice is P2100/cavan. Find the combination of inputs that maximizes profit, along with the maximum output level. Confirm the optimal inputs by solving via cost minimization.