SCORE is where retired experts volunteer to provide free advice to small businesses that are just getting started.
<h3>What is SCORE?</h3>
SCORE is a non-profit organization where mentors and experts in different business fields who volunteer together to help the small organizations and ventures to launch and grow their business by further expansions.
Hence, option D holds true regarding SCORE.
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Answer:
Subtract operating costs, calculate taxes off of that number, and then add them back.
Explanation:
The computation of the operating cash flow is shown below:
= Earning before interest and taxes + Depreciation - Income tax expense
where,
Earning before interest and taxes = Sales - cost of good sold - depreciation expense
While calculating the incremental cash flows we deduct the operating cost, depreciation, tax expense and then added back the depreciation expense as it is a non cash expense
The producer will decrease the quantity of bicycle production. In the basic Laws of supply and demand, when price decreases there is an increase of supply. Therefore the decrease of price suggest that there is an increase of supply in the market. Also as the price decreases profitability also decreases.
When aggregate demand increases in the classical range of the aggregate supply curve the cost of goods or services tends to evince a corresponding rise.
Answer:
Explanation:
The <em>minimum probability of a successful bunt that would warrant using the bunt </em>is that probability that, at least, does not decrease the probability of winning after the<em> batter hit </em>the <em>double</em>: <em>0.807.</em>
Call p the probability of a succesful sacrifice bunt.
Using a probability tree diagram:
- successful sacrifice bunt: p
- win: 0.830
- loose: 0.17
- unsucessful sacfifice bunt: ( 1 - p)
- win: 0.637
- loose: 0.363
From that, the probability of winning is 0.830(p) + 0.637(1 - p)
You want to determine p, such that 0.830(p) + 0.637(1 - p) ≥ 0.807
<u>Solve for p</u>:
- 0.830p + 0.637 - 0.637p ≥ 0.807
Rounding to thousandths, <em>the minimum probability of a succesful bunt that would warrant using the bunt is </em><u><em>0.881.</em></u>
