1. What is inflation. Give an example.
2. What is hyperinflation. Give an example.
3. Explain the causes of hyperinflation?
4. Explain the costs of hyperinflation.
5. Why sometimes governments are unable to borrow by issuing
debt?
1. Give and explain 3 example of financial instrument
2. Give and explain 3 example of Generalized Audit Software
3. Why it called Generalized Audit Software?
4. Give 1 of the most famous GAS
Cybercrime 1) What is Cybercrime? 2) Give an example of
Cybercrime? 3) What do you do to protect yourself from Cybercrime?
4) What do you do if you come across an internet scam/crime? What
do you do if you are a victim? or, You receive a scam e-mail. or,
You come across a scam webpage. 5) Who do you report the crime too?
Your internet provider? The organization that owns /operates the
search engine? The local police? The FBI? (what...
1. What is the Cost Principle?and Definition of Cost
Principle
2. give 3 example of Cost Principle
3. Some Issues with the Cost Principle
4. Short-Term vs Long-Term Assets
Let X = {1, 2, 3, 4}, Y = {a, b, c}.
(1) Give an example for f : X → Y so that ∀y ∈ Y, ∃x ∈ X, f(x) =
y. 1 2
(2) Give an example for f : X → Y so that ∃y ∈ Y, ∀x ∈ X, f(x) =
y.
(3) Give an example for f : X → Y and g : Y → X so that f ◦ g =
IY
Consider the following function: (?) = ?(?3 + 1), ?
= 0, 1, 2, 3
What is the value of the constant ? so that (?) is a pmf?
Plug-in the value of ? in the expression of (?) and show the
pmf in a table. Draw a probability histogram of the pmf.
Find the cdf (?) and write it explicitly defined over the
entire real number line. Draw the cdf (?).
Calculate the probabilities: (i). (0 < ? ≤...
2.)What is Opportunity Cost (Define and Explain) ? Give an
example of an Opportunity Cost.
-3.) What is a Demand Schedule & Demand Curve (Define and
Explain)? What does a Demand Schedule and Demand Curve tell (State)
in economics?
Prove that 1^3 + 2^3 + · · · + n^3 = (1 + 2 + · · · + n)^2 for
every n ∈ N. That is, the sum of the first n perfect cubes is the
square of the sum of the first n natural numbers. (As a student, I
found it very surprising that the sum of the first n perfect cubes
was always a perfect square at all.)
1- What is the Probability Density Functions and give
example?
2- what is the types of Invertible Probability Distributions
such as (uniform, trinagular, exponetial....) and give example for
each?