I'm supposed to solve this using Laplace Transformations.
Proving the double differential of implies
implies z is of the form . Is there a proof for the same. I was trying to arrive at the desired function but couldn't understand how to get these trigonometric functions in the equations by integration. Does it require the use of taylor polynomial expansion of ?
Prove if is unramified or totally ramified in certain conditions
Find the length of the confidence interval given the following data
S=3 n=275 confidence level 95 %
Expand each function (using the appropriate technique/formula) Compute the derivative of the expanded function by applying the differentiation rules
f(x)= sin(2x)
f(x)= (3x-2)^3
f(x)= (x^2+2x+3)^2
individual plays a game of tossing a coin where he wins Rs 2 if head turns up and nothing if tail turns up.On the basis of the given information, find (i) The expected value of the game. (4) (ii) The risk premium this person will be willing to pay to avoid the risk associated with the game.