Answer:
Explanation:
A product item is a specific version of a product that can be designated as a distinct offering among an organization's products. A product line is a group of closely related products offered by an organization.
I believe the answer you are looking for is open seating arrangement - nobody has assigned seats and people can move around freely to interact with whoever they like. This improves collaboration and communication among the people in the meeting.
Answer:
$1 million
Explanation:
Section 179 deduction of the IRS code was enacted to help small business owners take depreciation deductions for certain assets ( capital expenditure I.e. the money spent on acquiring and maintaining fixed assets such as buildings and equipments ) in one year rather than continuous depreciation over a long period of time.
The new law increased the maximum deduction from $500,000 to $1 million.
For example: lets say you buy a computer for your office, under section 179 you can deduct the full cost of your computer in one year. This a very okay because the life span of your computer is short
Answer:
C. order getter
Explanation:
Based on the information provided within the question it can be said that this type of salesperson is referred to as an order getter. This is the person focuses on identifying potential customers, giving them information about a product/service, and persuades them into buying what he/she is offering in order to close a sale and gain a loyal customer. Which is exactly what Ju Li believes in doing.
Answer:
12.00%
Explanation:
As per the given question the solution of standard deviation of a portfolio is provided below:-
Standard deviation of a portfolio = √(Standard deviation of Product 1)^2 × (Weight 1)^2 + Standard deviation of Product 2)^2 × (Weight 2)^2 + 2 × Standard deviation of product 1 × Standard deviation of product 2 × Weight 1 × Weight 2 × Correlation
= √(0.165^2 × 0.6^2) + (0.068^2 × 0.4^2) + (2 × 0.6 × 0.4 × 0.165 × 0.068 × 0.7)
= √0.009801 + 0.0007398 + 0.00376992
= √0.01431076
= 0.119628592
or
= 12.00%
So, we have calculated the standard deviation of a portfolio by using the above formula.