Probability |
market |
|
0.3 |
12% |
|
0.4 |
4% |
|
0.3 |
24 |
Please explain and how to solve on BA II Plus financial calculator.
The market has the following probability distributions: Probability market 0.3 12% 0.4 4% 0.3 24 Calculate...
The market and Stock J have the following probability distributions: Probability rM rJ 0.3 14% 21% 0.4 8 3 0.3 20 11 Calculate the expected rate of return for the market. Round your answer to two decimal places. % Calculate the expected rate of return for Stock J. Round your answer to two decimal places. % Calculate the standard deviation for the market. Do not round intermediate calculations. Round your answer to two decimal places. % Calculate the standard deviation...
1. The market and Stock A have the following probability distributions: Return on Return on Probability market Stock A 0.2 18% 16% 0.3 12% 14% 1 0 .5 10% 11% a. Calculate the expected rates of return for the market and Stock A. b. Calculate the coefficient of variation for the market and Stock A (Standard deviation for market is 3.0265% and standard deviation for Stock A is 2.0224%).
Expected Returns: Discrete Distribution The market and Stock J have the following probability distributions: Probability rM rJ 0.3 15% 18% 0.4 9 7 0.3 20 11 Calculate the expected rate of return for the market. Round your answer to two decimal places. % Calculate the expected rate of return for Stock J. Round your answer to two decimal places. % Calculate the standard deviation for the market. Round your answer to two decimal places. % Calculate the standard deviation for...
a. Stock Moon and Noon have the following probability distributions of returns: Probability Returns Stock Moon Stock Noon 20% 10% 12% 15% 2% 0.3 0.4 0.3 -2% From the above information, calculate for each stock: i) The expected rate of return. (3 Marks) ii) The standard deviation. (3 Marks) iii) The coefficient of variation. (2 Marks) iv) Based on your calculation in part (iii), decide on the stock that you should invest on. Justify your answer. (4 Marks) b. Suppose...
Stocks A and B have the following probability distributions of expected future returns: Probability 0.1 0.3 0.3 (35%) 0 18 29 36 (996) 4 24 0.1 39 a. Calculate the expected rate of return, r, for Stock B (rA = 12.30%.) Do not round intermediate calculations. Round your answer to two decimal places. b. Calculate the standard deviation of expected returns, σΑ, for Stock A (OB = 19.74%.) Do not round intermediate calculations. Round your answer to two decimal places....
Discrete Probability Distributions, Continuous Probability Distri- butions, and Sampling Distributions (100 points) 1. Does each of the following tables represent a probability distribution? Explain why or why not. For those that represent a probability distribution, calculate the mean and variance of the variable r. a f(x) 0.5 0.25 0.25 f(x) 0.4 0.4 0.4 0.2 ( X 1 2 3 4 C) f(x) 0.5 0.3 0.3 -0.1
Stocks A and B have the following probability distributions of expected future returns: Probability 0.1 0.3 0.3 0.2 0.1 (10%) 3 16 19 32 (36%) 0 24 27 47 a. Calculate the expected rate of return, r, for Stock B (TA-11.70%.) Do not round intermediate calculations. Round your answer to two decimal places. b. Calculate the standard deviation of expected returns, , for Stock A (Og- 21.94%.) Do not round intermediate calculations. Round your answer to two decimal places. nalolo...
Consider the probability distribution shown below: X 10 12 18 20 p(x) 0.2 0.3 0.1 0.4 Find the standard deviation of X.
******HOW TO FIND ON BA II PLUS FINANCIAL CALCULATOR?***** Uneven Cash Flow: If CF0 = -10000; CF1 = 1000; CF2 = 3000; CF3 = 0; CF4 = 5000; CF5 = 5000 1.) What are the NPV and IRR if the discount rate is 8%? PLEASE EXPLAIN STEP BY STEP HOW TO SOLVE THIS ON A BA II PLUS FINANCIAL CALCULATOR
The random variable X has the probability distribution table shown below. Calculate the standard deviation of X. Show all work as to how you performed your calculations as if you did not have a calculator. (Rounded to two decimal place [6 points) [Hint: First, find E(X)] * 0136 P(X = x) 0.1 0.2 0.3 0.4