Answer:
d. 234,000 lbs. of A; e. 39,000 lbs. of B
Explanation:
For computing the number of pounds first we have to find out the production units which is shown below:
Production units = Sales units + ending inventory units - beginning inventory units
= 76,000 units + 10,500 units - 8,500 units
= 78,000 units
Now number of material pounds required is
Direct material A B
One unit requires 3 lbs 1 ÷ 2 lbs
Multiply 78000 unit requires 234,000 39,000
We simply multiplied the production units with the required unit of each material i.e A and B so that the accurate number of pounds could arrive
i would say E) cause that 28 people that work when it was raised to $25
Explanation:
Humans are rational beings and are thus influenced or motivated by rewards. An organisation compensation plan may include the following;
- life insurance,
- bonuses,
- employee stock ownership plans,
- subsidized meal plans,
- child care availability,
In conclusion, in most cases the most effective elements of motivation of workers are non-monetary in nature.
Answer:
I will be willing to pay $1,106 for a vanguard bond.
Explanation:
Coupon payment = Par value x Coupon rate
Coupon payment = $1,000 x 8%
Coupon payment = = $80
Price of bond is the present value of future cash flows, to calculate Price of the bond use following formula:
Price of the Bond = C x [ ( 1 - ( 1 + r )^-n ) / r ] + [ F / ( 1 + r )^n ]
Price of the Bond =$80 x [ ( 1 - ( 1 + 7% )^-20 ) / 7% ] + [ $1,000 / ( 1 + 7% )^20 ]
Price of the Bond = $80 x [ ( 1 - ( 1.07 )^-20 ) / 0.07 ] + [ $1,000 / ( 1.07 )^20 ]
Price of the Bond = $848 + $258
Price of the Bond = $1,106
Answer:
Since the expected return and required return are different for both Stock X and Z, we say that they are not correctly priced
Explanation:
<em>To determine whether or not the stocks are correctly priced ,</em>
<em>we have to compare the r</em><em>equired return</em><em> and the </em><em>expected return on each of them.</em>
Required return = Rf +β (Rm-Rf)
Note that Rm-Rf is also known as market risk premium
<em>Stock Y Stock Z</em>
<em>Required return </em> 2.4% + 1.2(7.2%) 2.4% + 0.8(7.2%)
= 11% = 8.2%
<em>Expected return</em> <em>12.1% 7.85%</em>
Since the expected return and required return are different for both Stock X and Z, we say that they are not correctly priced
