Answer:
The spending variance for "Employee salaries and wages" for March would have been closest to $1,200F
.
Explanation:
Customers served (q)
Employee salaries and wages ($58,400 + $1,000q)
The spending variance for "Employee salaries and wages" for March would have been closest to
Actual Results Flexible Budget Revenue and Spending Variances
(q) 26 26
($58,400 + $1,000q) $ 83,200 $ 84,400 $1,200F
Answer:
1.90%
Explanation:
There is the accordance or connection between nominal and real interest rates. It is basically possible to convert from nominal interest rates to real interest rates. According to the Fisher, there is a equation that's called the Fisher Equation:
Real interest rate ≈ nominal interest rate − inflation rate.
On our example,
Inflation rate in October- 3.33%
Inflation rate in November- 2.90%
Nominal interest rate in October- 4.75%
Nominal interest rate in November- 4.80%
In October,
Real interest rate=4.75%-3.33%=1.42%
In November,
Real interest rate=4.80%-2.90%=1.90%
As a result, we see that there is 1.90% real interest rate in November and the real interest rate has increased 0.48% in November compared to October.
Answer:
$857
Explanation:
Price of the bond is the present value of all cash flows of the bond. These cash flows include the coupon payment and the maturity payment of the bond. Both of these cash flows discounted and added to calculate the value of the bond.
According to given data
Face value of the bond is $1,000
Coupon payment = C = $1,000 x 5.5% = $55 annually = $27.5 semiannually
Number of periods = n = (April 18, 2036 - April 18, 2020) years x 2 = 16 x 2 period = 32 periods
Market Rate = 7% annually = 3.5% semiannually
Price of the bond is calculated by following formula:
Price of the Bond = C x [ ( 1 - ( 1 + r )^-n ) / r ] + [ F / ( 1 + r )^n ]
Price of the Bond = 27.5 x [ ( 1 - ( 1 + 3.5% )^-32 ) / 3.5% ] + [ $1,000 / ( 1 + 3.5% )^32 ]
Price of the Bond = $524.29 + $332.59 = $856.98 = $857
Answer:
$8,770.00
Explanation:
In this question we use the present value formula i.e shown in the attachment below:
Data provided in the question
Future value = $0
Rate of interest = 0.48%
NPER = 4 years × 12 months = 48 months
PMT = $205
The formula is shown below:
= -PV(Rate;NPER;PMT;FV;type)
So, after solving this, the answer would be $8,770.00
