Please answer part a and b Q.9 a) explain liouville’s theorem with example b) show that...

find the derivative of each of the following show all work and circle answer please part...

find the derivative of each of the following show all work and circle answer please part 1) f(x)= x+2/x^2+2 part 2) f(x)=2tan(x)+sin(3x)-10 part 3) f(x)=x^2 . cos(x^3-2) part 4) f(x)=ln((x^7 sqrt(x^3+1)/(3x^2+8)^5))

please only answer if you can do all parts, show work and circle answer part 1)...

please only answer if you can do all parts, show work and circle answer part 1) Use implicit differentiation to find the first derivative of y with respect to x. ln(4y)=5xy dy/dx= part 2) Find dy/dx by implicit differentiation. 3+8x=sin(xy^2) Answer: dy/dx= part 3) Find dy/dx by implicit differentiation. e^((x^2)y)=x+y dy/dx= part 4) Find dy/dx by implicit differentiation. sqrt(x+y)= 9+x^2y^2 dy/dx= part 5) Find dy/dx by implicit differentiation. e^y=8x^2+7y^2 dy/dx=

# 12 In Exercises 9–12, determine whether Rolle’s Theorem can be applied to f on the...

# 12 In Exercises 9–12, determine whether Rolle’s Theorem can be applied to f on the closed interval [a, b]. If Rolle’s Theorem can be applied, find all values of c in the open interval (a, b) such that f ′(c) = 0. If Rolle’s Theorem cannot be applied, explain why not. 12. f (x) = sin 2x, [−π, π]

please show all work and circle answer if you cant do all the parts please don't...

please show all work and circle answer if you cant do all the parts please don't answer question part 1) Let g(x,y)=cos(8x+5y). Evaluate g(1,−2). Answer: g(1,−2)= part 2) Suppose f(x,y)=xy^2−8. Compute the following values: f(4,3) = f(3,4) = f(0,0) = f(−1,3) = f(t,2t) = f(uv,u−v) = part 3) Consider the concentration, C, (in mg/liter) of a drug in the blood as a function of the amount of drug given, x, and the time since injection, t. For 0≤x≤6 mg and...

Please show all steps, thank you: Problem C: Does there exist an analytic function f(z) in...

Please show all steps, thank you: Problem C: Does there exist an analytic function f(z) in some domain D with the real part u(x,y)=x^2+y^2? Problem D: Is the function f(z)=(x-iy)^2 analytic in any domain in C? Are the real part u(x,y) and the imaginary pary v(x,y) harmonic in C? Are u and v harmonic conjugates of each other in any domain?

Need work shown, please a) Suppose a function f is continuous on the interval [a,b]. If...

Need work shown, please a) Suppose a function f is continuous on the interval [a,b]. If f(a) is negative and f(b) is positive, explain why there must be a number c between a and b such that f(c) = 0. (Context: related to “Intermediate Value Theorem”.) b) Use the idea from part (a) to show that the equation x^5 = 2 − 2x has a solution in the interval [0, 1]. (Hint: A solution for an equation f(x) = g(x)...

(6) (a) Give an example of a ring with 9 elements which is not a field....

(6) (a) Give an example of a ring with 9 elements which is not a field. Explain your answer. (b) Give an example of a field of 25 elements. Explain why. (c) Find a non-zero polynomial f(x) in Z3[x] such that f(a) = 0 for every a ? Z3. (d) Find the smallest ideal of Q that contains 3/4.

a. Please define the Coase Theorem. b. Was there an externality between consumers (customers) in this...

a. Please define the Coase Theorem. b. Was there an externality between consumers (customers) in this news article? http://www.cbc.ca/newsblogs/yourcommunity/2013/08/houston-restaurant-bans-kids-during-dinner-hours.html c. Was the restaurant owners action an example of an application of the Coase Theorem? Explain using your definition in part a.

Using Matlab please answer problem 1, parts a and b. Please explain each for part a....

Using Matlab please answer problem 1, parts a and b. Please explain each for part a. Please explain the result for part b. 1. MATLAB ARRAY INDEXING (a) Explain what the each of the following will produce: jk1 = 2:4:17       jk1 = 99:-1:88 ttt = 2:(1/9):4 (b) Extract or insert numbers in a vector. Try the following: xx= [ ones(1,4), [2:2:11], zeros(1,3) ] xx(3:7) length(xx) Explain the result.

About convex function: (1) Please show that f(x) = ax2 + bx + c is a...

About convex function: (1) Please show that f(x) = ax2 + bx + c is a convex function if and only if a ≥ 0. (2) Please show that f(x) = 1/2·xTQx+aTx is a convex function if and only if Q is positive semi-definite.