Review of Mathematics Function 1. What is a function? What is a dependent and independent variable? 2. Draw graphs of the following functions (corre- spondences): (a) p = 2x − 5 (b) x2 = 5 − √ x1 (c) x2 = 5 − x2 1 (d) x2 = 4/x1 (e) S(p) = s1(p) + s2(p), where s1(p) = p a s2(p) = 2p. (f) S(p) = s1(p) + s2(p), where s1(p) = 2p a s2(p) = p − 1 for p ≥ 1 and s2(p) = 0 for p < 1. 3. Draw curves that correspond to this equation: 10 = min{x1, x2}. 4. What is a continuous function? What is the opposite to the continuous function? 5. What is a monotonic function? What is the shape of a positive and negative monotonic func- tion? 6. What is the shape of a convex and concave func- tion? 7. What is the inverse function? Formulate the inverse function of: (a) y = ax + b (b) y = 5/x (c) y = ex Logarithm 8. What is the logarithm? Draw the function y = ln x. 9. Calculate the logarithm of xa 1xb 2. Derivatives 10. What is the derivative? What is the relationship between the derivative and the slope of a tangent line to a function? What is the relationship between derivatives and convexity (concavity) of a function? 11. What is the product rule? What is the chain rule? 12. Take the derivative of the following functions with respect to p: (a) D(p) = 50 − 2p (b) D(p) = 30p−2 (c) D(p) = (2p + a)(−b) (d) R(p) = pq(p) 13. What is a partial derivative? Take a partial derivative of the following functions with respect to x1 a x2: (a) U(x1, x2) = ax1 + bx2 (b) f(x1, x2) = xa 1xb 2 (c) U(x1, x2) = a ln x1 + bx2 (d) U(x1, x2) = a √ x1 + bx2 (e) U(x1, x2) = (x2 1 + x2 2)a Optimalization 14. Solve the following problem: max x1,x2 c ln x1 + d ln x2 subject to p1x1 + p2x2 = m, where 0 < c < 1, 0 < d < 1, p1 > 0, p2 > 0 a m > 0 are constants.