Answer:
a. $17.44 per hour
b. $43,600 ; $104,640
Explanation:
The computation is shown below:
a. Single plantwide overhead rate equals to
= Total Overhead Amount ÷ Budgeted Direct Labor Hours
where,
Total overhead amount is
= $625,000 + $900,000 + $105,000 + $175,000 + $300,000 + $75,000
= $2,180,000
And, the budgeted direct labor hours is 125,000
So, the overhead rate is
= $2,180,000 ÷ 125,000
= $17.44 per hour
2. Now the overhead cost is
For Deluxe model
= 2,500 direct labor hours × $17.44 per hour
= $43,600
For basic model
= 6,000 direct labor hours × $17.44 per hour
= $104,640
Marketers apply <u>"marketing analytics"</u> to the large and complex sets of data they collect to gain customer insights and gauge performance.
Marketing analytics is the act of estimating, overseeing and dissecting promoting execution to augment its viability and streamline rate on investment (ROI). Understanding marketing analytics enables advertisers to be more effective at their employments and limit squandered web marketing dollars.
Past the conspicuous deals and lead age applications, advertising examination can offer significant bits of knowledge into client inclinations and patterns.
Attacking someone else's opinion. I hope this helps!
Answer: D) The message must be short and simple
Explanation:
As the world evolves and new development takes place, the internet has become an advertising tool used in marketing. Even though it's effective in reaching out to the customers, it has disadvantages such as high costs, the promotion effects can be difficult to measure, privacy and security issues.
The advantage in the question given is that the message must be short and simple.
We can solve this problem by using the formula for
finding the present value given the annuity values. The formula is given as:
P = A * [(1 + i)^n – 1] / i (1 + i)^n
Where,
P = present value of the annuity
A = the annuity value = $26,000
i = interest rate = 0.06
n = number of years = 90 – 65 = 25
Substituting the given values to the equation:
P = 26,000 * [(1 + 0.06)^25 – 1] / 0.06 (1 + 0.06)^25
P = 26,000 * 12.783356183
P = $332,367.26
<span>Therefore the present value of his social security
benefits will be about $332,367.26</span>
