Answer:
ill do it of you make it more readable
Explanation:
Answer:
(a) The arbitrage strategy is to buy zeros with face values of $140 and $1,140 and respective maturities of one and two years, and simultaneously sell the coupon bond.
(b) The profit on the activity equals $0.72 on each bond.
Explanation:
The price of the coupon bond = 140 × PV(7.9%, 2) + 1000 × PV(7.9%, 2)
= 140 × (1-(1/1.079)^2)/0.079 + 1,000/1.079^2
= $1,108.93
If the coupons were withdrawn and sold as zeros individually, then the coupon payments could be sold separately on the basis of the zero maturity yield for maturities of one and two years.
[140/1.07] + [1,140/1.08^2] = $1,108.21.
The arbitrage strategy is to buy zeros with face values of $140 and $1,140 and respective maturities of one and two years, and simultaneously sell the coupon bond.
The profit on the activity equals $0.72 on each bond.
Answer:
$8000
Explanation:
They have to pay $8,000 as an implicit costs.
The implicit expenditure is the advantage of the right to use the personal resources of a company that is not listed as actual, distinct expenditures.
Computation of Implicit cost for the Boston Batting Cage :
Implicit cost = Labor + maintenance + electricity
= $5,000 + $2,000 + $1,000
= $,8000
Answer:
option (C) L(x) = 200,000(x - 0.40)²
Explanation:
Given:
quality characteristic = 0.40
Tolerance = 0.03
Repair cost = $180
Now,
Taguchi loss function is given as:
Loss (in $) = Constant × ( Quality characteristic - Target value )²
For quality characteristic of 'x' target value 't'
and constant A
L(x) = A × ( x - t)²
substituting the given values, we get
$180 = A × (0.03)² [x - t = tolerance]
or
$180 = A × 0.0009
or
A = 200,000
Hence,
Taguchi loss function
L(x) = 200,000(x - 0.40)²
Hence,
the correct answer is option (C) L(x) = 200,000(x - 0.40)²
