$131,000
WTP-price paid
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Answer: Revenue is maximum at x=25 and y=0. That is when the firm makes only yellow cakes and no strawberry cakes.
Explanation:
x- Number of Yellow cakes
y- Number of Strawberry cakes
Time constrain is given by
Revenue is given by,
At the vertices, revenue is
At (0,0)
TR = $0
At (0,150)
At (225,0)
Therefore, Revenue is maximum at x=25 and y=0. That is when the firm makes only yellow cakes and no strawberry cakes.
An activity's normal time and cost are = 8 and $100 respectively
estimated crash time and cost are = 6 and $160 respectively
Activity's crash cost per unit time = ?
crash cost per unit time = cost slope and,
cost slope = rise/run = (crash cost - normal cost) / (normal time - crash time)
cost slope = (160 - 100) / (8 - 6) = 60 / 2 = $30
so, crash cost per unit time is $30.
Answer:
$2,306,938.21
Explanation:
Let the fund balance at the end of the year be X
1.16 = ($1230000 / $1205000) + (X / $2030000)
1.16 = 1.02075 + (X / $2030000)
1.16 / 1.02075 = (X / $2030000)
1.13642 = (X / $2030000)
X = 1.13642 * $2030000
X = $2,306,938.21
Hence, the fund balance at the end of the year is $2,306,938.21
Answer:
the bonds' current market value = PV of face value + PV of coupon payments
a. The bond has a 6 percent coupon rate.
PV of face value = $1,000 / (1 + 5%)²⁴ = $310.07
PV of coupon payments = 30 x 13.799 (PV annuity factor, 5%, 24 periods) = $413.97
bond's market value = $724.04
b. The bond has a 8 percent coupon rate.
PV of face value = $1,000 / (1 + 5%)²⁴ = $310.07
PV of coupon payments = 40 x 13.799 (PV annuity factor, 5%, 24 periods) = $551.96
bond's market value = $862.03