Answer:
The correct answer to the following question will be Option A (Enhanced efficiency).
Explanation:
- Enhanced Efficiency seems to be an innovation that decreases the probability of discharge of that same object surface. It is indeed a definitive version of an effective. The whole bonus is going to take 2 elements in such a gizmo. It could be generated in the gizmos of guns, shields, and devices.
- It would be the most immediate consequence of direct exports providing economic assets to regions where they'll be required.
Other given choices are not related to the given scenario. So that Option A seems to be the appropriate choice.
Answer:
<h2>
Value of X = 1</h2>
<h2>
Value of y = 3</h2>
Solution,
Using substitution method,
y + x = 4
Move 'x' to the left hand side and change its sign:
y = 4 - x --------> equation (i)
Now,
2y - X = 5
putting the value of y from equation (i)
2( 4 - x ) - X = 5
8 - 2x - x = 5
8 - 3x = 5
- 3x = 5 - 8
- 3x = - 3
The difference sign (-) will be cancelled in both sides
3x = 3
3x/3 = 3/3
X = 1
Value of X is 1
Now, replacing the value of X in equation (i)
y = 4 - x
= 4 - 1
= 3
Value of y is 3
Hope this helps...
Good luck on your assignment...
Answer:
to attract customers or other buissness man that might want to invest
Answer: Rick is a new product manager for a large biochemical firm. He is currently working on a proposal for a new chemical solvent and knows that introducing the new product can be risky because it might fail. He also knows that <u>not introducing new products</u> is risky as well.
Explanation: Launching new products to the market is essential if a company wants to survive. The development of new products is linked to the ability of a company to remain competitive and the longevity of a business. since as time passes new products are created better than the previous ones leaving them obsolete.
Answer: $32.70
Explanation:
According to the dividend discount model, the value of the stock today is the present value of the dividends to be paid plus the present value of the value of the dividend from when the company starts maintaining a stable growth rate which in this question in year 2.
= (Year 1 Dividend / ( 1 + r)) + (Year 2 Dividend / ( 1 + r)²) + (value at year 2 / ( r - g))
Value at year 2 = Year 3 dividend / ( required return - growth rate)
= ( Year 2 dividend * (1 + g)) / ( required return - growth rate)
= (2.46* ( 1 + 0.039)) / ( 0.113 - 0.039)
= $34.54
Value today = (Year 1 Dividend / ( 1 + r)) + (Year 2 Dividend / ( 1 + r)²) + (value at year 2 / ( r - g))
= 3.15/1.113 + 2.46/1.113² + 34.54/1.113²
= 2.83 + 1.99 + 27.88
= $32.70
